{"group":{"id":1,"name":"Community","lockable":false,"created_at":"2012-01-18T18:02:15.000Z","updated_at":"2025-12-14T01:33:56.000Z","description":"Problems submitted by members of the MATLAB Central community.","is_default":true,"created_by":161519,"badge_id":null,"featured":false,"trending":false,"solution_count_in_trending_period":0,"trending_last_calculated":"2025-12-14T00:00:00.000Z","image_id":null,"published":true,"community_created":false,"status_id":2,"is_default_group_for_player":false,"deleted_by":null,"deleted_at":null,"restored_by":null,"restored_at":null,"description_opc":null,"description_html":null,"published_at":null},"problems":[{"id":43123,"title":"Sum of cubes","description":"Write a program to determine sum of cubes of first n odd numbers.","description_html":"\u003cp\u003eWrite a program to determine sum of cubes of first n odd numbers.\u003c/p\u003e","function_template":"function y = sc(n)\r\n  y = x;\r\nend","test_suite":"%%\r\nn = 1;\r\ny_correct = 1;\r\nassert(isequal(sc(n),y_correct))\r\n\r\n%%\r\nn = 5;\r\ny_correct = 1225;\r\nassert(isequal(sc(n),y_correct))\r\n\r\n%%\r\nn = 10;\r\ny_correct = 19900;\r\nassert(isequal(sc(n),y_correct))\r\n","published":true,"deleted":false,"likes_count":6,"comments_count":1,"created_by":91311,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":113,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":1,"created_at":"2016-10-06T12:19:20.000Z","updated_at":"2026-02-13T18:11:18.000Z","published_at":"2016-10-06T12:19:20.000Z","restored_at":null,"restored_by":null,"spam":false,"simulink":false,"admin_reviewed":false,"description_opc":"{\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"relationshipId\":\"rId1\",\"target\":\"/matlab/document.xml\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/output\",\"relationshipId\":\"rId2\",\"target\":\"/matlab/output.xml\"}],\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"relationship\":[],\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eWrite a program to determine sum of cubes of first n odd numbers.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\"},{\"partUri\":\"/matlab/output.xml\",\"contentType\":\"text/xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\" standalone=\\\"no\\\" ?\u003e\u003cembeddedOutputs\u003e\u003cmetaData\u003e\u003cevaluationState\u003emanual\u003c/evaluationState\u003e\u003clayoutState\u003ecode\u003c/layoutState\u003e\u003coutputStatus\u003eready\u003c/outputStatus\u003e\u003c/metaData\u003e\u003coutputArray type=\\\"array\\\"/\u003e\u003cregionArray type=\\\"array\\\"/\u003e\u003c/embeddedOutputs\u003e\"}]}"},{"id":2491,"title":"Dudeney Numbers: Numbers which are the cube of their decimal sum","description":"From Wikipedia: \r\n_A Dudeney number is a positive integer that is a perfect cube such that the sum of its decimal digits is equal to the cube root of the number._\r\n\r\nFor example:\r\n\r\n512=(5+1+2)^3\r\n\r\n4913=(4+9+1+3)^3\r\n\r\n19683=(1+9+6+8+3)^3\r\n\r\nWrite a function that returns true if a number is a Dudeney number and false otherwise.\r\n\r\nAssume all numbers are of base 10.\r\n\r\nIf a number is negative, assume that only the leading digit carries the negative sign e.g. -4913 -\u003e (-4+9+1+3)^3","description_html":"\u003cp\u003eFrom Wikipedia:  \u003ci\u003eA Dudeney number is a positive integer that is a perfect cube such that the sum of its decimal digits is equal to the cube root of the number.\u003c/i\u003e\u003c/p\u003e\u003cp\u003eFor example:\u003c/p\u003e\u003cp\u003e512=(5+1+2)^3\u003c/p\u003e\u003cp\u003e4913=(4+9+1+3)^3\u003c/p\u003e\u003cp\u003e19683=(1+9+6+8+3)^3\u003c/p\u003e\u003cp\u003eWrite a function that returns true if a number is a Dudeney number and false otherwise.\u003c/p\u003e\u003cp\u003eAssume all numbers are of base 10.\u003c/p\u003e\u003cp\u003eIf a number is negative, assume that only the leading digit carries the negative sign e.g. -4913 -\u0026gt; (-4+9+1+3)^3\u003c/p\u003e","function_template":"function y = isDudenay(x)\r\n  s = num2str(x)';\r\nend","test_suite":"%%\r\nx = 1;\r\ny_correct = 1;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 10;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 21;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 99;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 512;\r\ny_correct = 1;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 666;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 1729;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 4913;\r\ny_correct = 1;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = -4913;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 5832;\r\ny_correct = 1;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 17576;\r\ny_correct = 1;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 19683;\r\ny_correct = 1;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 87539319;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n\r\n","published":true,"deleted":false,"likes_count":2,"comments_count":2,"created_by":379,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":78,"test_suite_updated_at":"2014-08-08T09:11:49.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2014-08-08T08:47:21.000Z","updated_at":"2026-03-04T14:07:40.000Z","published_at":"2014-08-08T09:11:49.000Z","restored_at":null,"restored_by":null,"spam":false,"simulink":false,"admin_reviewed":false,"description_opc":"{\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"targetMode\":\"\",\"relationshipId\":\"rId1\",\"target\":\"/matlab/document.xml\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/output\",\"targetMode\":\"\",\"relationshipId\":\"rId2\",\"target\":\"/matlab/output.xml\"}],\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"relationship\":[],\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\\n\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eFrom Wikipedia: \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eA Dudeney number is a positive integer that is a perfect cube such that the sum of its decimal digits is equal to the cube root of the number.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eFor example:\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e512=(5+1+2)^3\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e4913=(4+9+1+3)^3\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e19683=(1+9+6+8+3)^3\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eWrite a function that returns true if a number is a Dudeney number and false otherwise.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eAssume all numbers are of base 10.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eIf a number is negative, assume that only the leading digit carries the negative sign e.g. -4913 -\u0026gt; (-4+9+1+3)^3\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\"},{\"partUri\":\"/matlab/output.xml\",\"contentType\":\"text/xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\" standalone=\\\"no\\\" ?\u003e\u003cembeddedOutputs\u003e\u003cmetaData\u003e\u003cevaluationState\u003emanual\u003c/evaluationState\u003e\u003clayoutState\u003ecode\u003c/layoutState\u003e\u003coutputStatus\u003eready\u003c/outputStatus\u003e\u003c/metaData\u003e\u003coutputArray type=\\\"array\\\"/\u003e\u003cregionArray type=\\\"array\\\"/\u003e\u003c/embeddedOutputs\u003e\"}]}"},{"id":60983,"title":"Check Euler's characteristic on regular polyhedra","description":"Problem statement\r\nGiven the number of vertices and the number of faces of a given regular polyhedron, compute the number of its edges with Euler characteristic, a powerful generic formula linking these three.\r\n\r\nExamples -\u003e check the test suite\r\n\r\nForbidden functions / expressions\r\nregexp\r\nassignin\r\nstr2num\r\necho\r\n\r\nSee also\r\nMesh processing\r\nMesh generation toolbox","description_html":"\u003cdiv style = \"text-align: start; line-height: 20.4333px; min-height: 0px; white-space: normal; color: rgb(0, 0, 0); font-family: Menlo, Monaco, Consolas, monospace; font-style: normal; font-size: 14px; font-weight: 400; text-decoration: rgb(0, 0, 0); white-space: normal; \"\u003e\u003cdiv style=\"block-size: 414.733px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 408px 207.367px; transform-origin: 408px 207.367px; vertical-align: baseline; \"\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 63.0083px 8px; transform-origin: 63.0083px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eProblem statement\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 42px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 21px; text-align: left; transform-origin: 385px 21px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 263.333px 8px; transform-origin: 263.333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eGiven the number of vertices and the number of faces of a given regular polyhedron, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 110.042px 8px; transform-origin: 110.042px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003ecompute the number of its edges\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 1.94167px 8px; transform-origin: 1.94167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e with Euler characteristic, a powerful generic formula linking these three.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 34.6167px 8px; transform-origin: 34.6167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eExamples \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 6.425px 8px; transform-origin: 6.425px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e-\u0026gt;\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 1.94167px 8px; transform-origin: 1.94167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003e \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 59.8917px 8px; transform-origin: 59.8917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003echeck the test suite\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 114.308px 8px; transform-origin: 114.308px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eForbidden functions / expressions\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cul style=\"block-size: 81.7333px; counter-reset: list-item 0; font-family: Helvetica, Arial, sans-serif; list-style-type: square; margin-block-end: 20px; margin-block-start: 10px; margin-bottom: 20px; margin-top: 10px; perspective-origin: 392px 40.8667px; transform-origin: 392px 40.8667px; margin-top: 10px; margin-bottom: 20px; \"\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 21.4px 8px; transform-origin: 21.4px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eregexp\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.6833px 8px; transform-origin: 25.6833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eassignin\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.2833px 8px; transform-origin: 25.2833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003estr2num\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 15.175px 8px; transform-origin: 15.175px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eecho\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003c/ul\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 28.3917px 8px; transform-origin: 28.3917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eSee also\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003ca target='_blank' href = \"https://fr.mathworks.com/matlabcentral/cody/groups/57483\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"\"\u003eMesh processing\u003c/span\u003e\u003c/span\u003e\u003c/a\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003ca target='_blank' href = \"https://fr.mathworks.com/matlabcentral/fileexchange/85173-mesh-generation-toolbox?s_tid=prof_contriblnk\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"\"\u003eMesh generation toolbox\u003c/span\u003e\u003c/span\u003e\u003c/a\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function e = check_Euler_chracteristic(v,f)\r\n  e = f;\r\nend","test_suite":"%% tetrahedron\r\nv = 4;\r\nf = 4;\r\ne_correct = 6;\r\nassert(isequal(check_Euler_chracteristic(v,f),e_correct))\r\n\r\n%% octahedron\r\nv = 6;\r\nf = 8;\r\ne_correct = 12;\r\nassert(isequal(check_Euler_chracteristic(v,f),e_correct))\r\n\r\n%% hexahedron / cube\r\nv = 8;\r\nf = 6;\r\ne_correct = 12;\r\nassert(isequal(check_Euler_chracteristic(v,f),e_correct))\r\n\r\n%% icosahedron\r\nv = 12;\r\nf = 20;\r\ne_correct = 30;\r\nassert(isequal(check_Euler_chracteristic(v,f),e_correct))\r\n\r\n%% dodecahedron\r\nv = 20;\r\nf = 12;\r\ne_correct = 30;\r\nassert(isequal(check_Euler_chracteristic(v,f),e_correct))\r\n\r\n%% Forbidden functions\r\nfiletext = fileread('check_Euler_chracteristic.m');\r\nillegal = contains(filetext, 'regexp') || contains(filetext, 'str2num') || contains(filetext, 'assignin') || contains(filetext, 'echo')\r\nassert(~illegal);","published":true,"deleted":false,"likes_count":1,"comments_count":0,"created_by":149128,"edited_by":149128,"edited_at":"2025-07-26T07:45:16.000Z","deleted_by":null,"deleted_at":null,"solvers_count":31,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":1,"created_at":"2025-07-23T20:08:07.000Z","updated_at":"2026-02-10T17:11:09.000Z","published_at":"2025-07-24T07:25:21.000Z","restored_at":null,"restored_by":null,"spam":null,"simulink":false,"admin_reviewed":false,"description_opc":"{\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eProblem statement\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eGiven the number of vertices and the number of faces of a given regular polyhedron, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003ecompute the number of its edges\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e with Euler characteristic, a powerful generic formula linking these three.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eExamples \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e-\u0026gt;\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003echeck the test suite\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eForbidden functions / expressions\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eregexp\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eassignin\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003estr2num\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eecho\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eSee also\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:hyperlink w:docLocation=\\\"https://fr.mathworks.com/matlabcentral/cody/groups/57483\\\"\u003e\u003cw:r\u003e\u003cw:t\u003eMesh processing\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:hyperlink w:docLocation=\\\"https://fr.mathworks.com/matlabcentral/fileexchange/85173-mesh-generation-toolbox?s_tid=prof_contriblnk\\\"\u003e\u003cw:r\u003e\u003cw:t\u003eMesh generation toolbox\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\",\"relationship\":null}],\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"target\":\"/matlab/document.xml\",\"relationshipId\":\"rId1\"}]}"},{"id":2175,"title":"Slicing the cube","description":"A bored matlab enthusiast has a cube with volume n^3.\r\nHe decides to paint the entire surface of the cube red. Then, with slices parallel to the faces of the cube, he cuts the cube into 1x1x1 cubes.\r\n\r\nSome cubes are completely free of paint:x \r\n\r\nSome cubes are painted red on only one side:y\r\n\r\nSome cubes are painted red on two sides:z\r\n\r\n\r\nHelp him find x,y \u0026 z\r\n\r\n\r\n","description_html":"\u003cp\u003eA bored matlab enthusiast has a cube with volume n^3.\r\nHe decides to paint the entire surface of the cube red. Then, with slices parallel to the faces of the cube, he cuts the cube into 1x1x1 cubes.\u003c/p\u003e\u003cp\u003eSome cubes are completely free of paint:x\u003c/p\u003e\u003cp\u003eSome cubes are painted red on only one side:y\u003c/p\u003e\u003cp\u003eSome cubes are painted red on two sides:z\u003c/p\u003e\u003cp\u003eHelp him find x,y \u0026 z\u003c/p\u003e","function_template":"function [x y z] = cube_slices(n)\r\n x=\r\n y=\r\n z=\r\nend","test_suite":"%%\r\nn=5\r\ny_correct=[27 54 36]\r\nassert(isequal(cube_slices(n),y_correct))\r\n\r\n%%\r\nn=3\r\ny_correct=[1 6 12]\r\nassert(isequal(cube_slices(n),y_correct))\r\n\r\n%%\r\nn=7\r\ny_correct=[125 150 60]\r\nassert(isequal(cube_slices(n),y_correct))","published":true,"deleted":false,"likes_count":10,"comments_count":0,"created_by":17228,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":92,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":26,"created_at":"2014-02-11T19:13:57.000Z","updated_at":"2026-02-19T10:22:38.000Z","published_at":"2014-02-11T19:13:57.000Z","restored_at":null,"restored_by":null,"spam":false,"simulink":false,"admin_reviewed":false,"description_opc":"{\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"relationshipId\":\"rId1\",\"target\":\"/matlab/document.xml\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/output\",\"relationshipId\":\"rId2\",\"target\":\"/matlab/output.xml\"}],\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"relationship\":[],\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eA bored matlab enthusiast has a cube with volume n^3. He decides to paint the entire surface of the cube red. Then, with slices parallel to the faces of the cube, he cuts the cube into 1x1x1 cubes.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eSome cubes are completely free of paint:x\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eSome cubes are painted red on only one side:y\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eSome cubes are painted red on two sides:z\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eHelp him find x,y \u0026amp; z\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\"},{\"partUri\":\"/matlab/output.xml\",\"contentType\":\"text/xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\" standalone=\\\"no\\\" ?\u003e\u003cembeddedOutputs\u003e\u003cmetaData\u003e\u003cevaluationState\u003emanual\u003c/evaluationState\u003e\u003clayoutState\u003ecode\u003c/layoutState\u003e\u003coutputStatus\u003eready\u003c/outputStatus\u003e\u003c/metaData\u003e\u003coutputArray type=\\\"array\\\"/\u003e\u003cregionArray type=\\\"array\\\"/\u003e\u003c/embeddedOutputs\u003e\"}]}"},{"id":60979,"title":"Mesh the cube","description":"Problem statement : mesh the cube with quadranglar / squared faces\r\n\r\nAn cube / regular hexahedron is a regular polyhedron with 8 vertices and 6 squared / quadrangular faces. It is also one of the five well known platonic solids.\r\nA quadrangular mesh F (stands for faces here) is simply a N x 4 matrix of positive integers where each row contains the vertex indices of squared faces, and where N is the number of faces. \r\n\r\nYour task here is to mesh this cube. To do so, you will list the squares/rows in a matrix of faces, F. You will also be careful to always keep the faces coherently / consistently oriented (all clockwise or all counterclockwise : square [1, 2, 3, 4] and [4, 3, 2, 1] are distinct).\r\nOn the other hand [1, 2, 3, 4], [2, 3, 4, 1], [3, 4, 1, 2] and [4, 1, 2, 3] are one same unique square.\r\nThe row order of the faces in the list doesn't matter.\r\n\r\nEdit / update\r\nFaces orientation not taken into account anymore, because of too many possible cases to check in the tests (!)\r\n\r\nExample\r\nThe first square (Z \u003e 0) here can be [1, 2, 3, 4] if counterclockwise oriented (normals outward).\r\n\r\n\r\n\r\nForbidden functions / expressions\r\nregexp\r\nassignin\r\nstr2num\r\necho\r\n\r\nSee also\r\nMesh processing\r\nMesh generation toolbox","description_html":"\u003cdiv style = \"text-align: start; line-height: 20.4333px; min-height: 0px; white-space: normal; color: rgb(0, 0, 0); font-family: Menlo, Monaco, Consolas, monospace; font-style: normal; font-size: 14px; font-weight: 400; text-decoration: rgb(0, 0, 0); white-space: normal; \"\u003e\u003cdiv style=\"block-size: 1194.73px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 408px 597.367px; transform-origin: 408px 597.367px; vertical-align: baseline; \"\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 229.433px 8px; transform-origin: 229.433px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eProblem statement : mesh the cube with quadranglar / squared faces\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 42px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 21px; text-align: left; transform-origin: 385px 21px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 376.933px 8px; transform-origin: 376.933px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eAn cube / regular hexahedron is a regular polyhedron with 8 vertices and 6 squared / quadrangular faces. It is also one of the five well known platonic solids.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 42px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 21px; text-align: left; transform-origin: 385px 21px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 68.8583px 8px; transform-origin: 68.8583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eA quadrangular mesh \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 4.275px 8px; transform-origin: 4.275px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eF\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 36.9417px 8px; transform-origin: 36.9417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e (stands for \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 16.725px 8px; transform-origin: 16.725px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003efaces\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 54.8417px 8px; transform-origin: 54.8417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e here) is simply a \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 5.05833px 8px; transform-origin: 5.05833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eN\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 185.533px 8px; transform-origin: 185.533px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e x 4 matrix of positive integers where each row contains the vertex indices of squared faces, and where \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 5.05833px 8px; transform-origin: 5.05833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eN\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 74.6667px 8px; transform-origin: 74.6667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e is the number of faces. \u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 63px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 31.5px; text-align: left; transform-origin: 385px 31.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 296.108px 8px; transform-origin: 296.108px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eYour task here is to mesh this cube. To do so, you will list the squares/rows in a matrix of faces, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 7.25833px 8px; transform-origin: 7.25833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eF. \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 80.6583px 8px; transform-origin: 80.6583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eYou will also be careful to always keep the faces coherently / consistently oriented (all clockwise or all counterclockwise : square \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 31.1px 8px; transform-origin: 31.1px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e[1, 2, 3, 4]\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 15.5583px 8px; transform-origin: 15.5583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e and \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 17.4917px 8px; transform-origin: 17.4917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e[4, 3, 2, 1]\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 40.0583px 8px; transform-origin: 40.0583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e are distinct).\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 58.3417px 8px; transform-origin: 58.3417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eOn the other hand \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 31.1px 8px; transform-origin: 31.1px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e[1, 2, 3, 4]\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 3.88333px 8px; transform-origin: 3.88333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 66.0833px 8px; transform-origin: 66.0833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e[2, 3, 4, 1], [3, 4, 1, 2]\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 15.5583px 8px; transform-origin: 15.5583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e and \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 31.1px 8px; transform-origin: 31.1px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e[4, 1, 2, 3]\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 92.975px 8px; transform-origin: 92.975px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e are one same unique square.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 158.842px 8px; transform-origin: 158.842px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eThe row order of the faces in the list doesn't matter.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 41.9833px 8px; transform-origin: 41.9833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eEdit / update\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 342.275px 8px; transform-origin: 342.275px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eFaces orientation not taken into account anymore, because of too many possible cases to check in the tests (!)\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 28.7833px 8px; transform-origin: 28.7833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eExample\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 50.5583px 8px; transform-origin: 50.5583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eThe first square \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 20.8083px 8px; transform-origin: 20.8083px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e(Z \u0026gt; 0)\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 42.7833px 8px; transform-origin: 42.7833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e here can be [\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 29.1583px 8px; transform-origin: 29.1583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e1, 2, 3, 4]\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 148.208px 8px; transform-origin: 148.208px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e if counterclockwise oriented (normals outward).\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 378px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 189px; text-align: left; transform-origin: 385px 189px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" width=\"504\" height=\"378\" style=\"vertical-align: middle;width: 504px;height: 378px\" src=\"data:image/png;base64,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\" data-image-state=\"image-loaded\"\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 114.308px 8px; transform-origin: 114.308px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eForbidden functions / expressions\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cul style=\"block-size: 81.7333px; counter-reset: list-item 0; font-family: Helvetica, Arial, sans-serif; list-style-type: square; margin-block-end: 20px; margin-block-start: 10px; margin-bottom: 20px; margin-top: 10px; perspective-origin: 392px 40.8667px; transform-origin: 392px 40.8667px; margin-top: 10px; margin-bottom: 20px; \"\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 21.4px 8px; transform-origin: 21.4px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eregexp\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.6833px 8px; transform-origin: 25.6833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eassignin\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.2833px 8px; transform-origin: 25.2833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003estr2num\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 15.175px 8px; transform-origin: 15.175px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eecho\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003c/ul\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 28.3917px 8px; transform-origin: 28.3917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eSee also\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003ca target='_blank' href = \"https://fr.mathworks.com/matlabcentral/cody/groups/57483\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"\"\u003eMesh processing\u003c/span\u003e\u003c/span\u003e\u003c/a\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003ca target='_blank' href = \"https://fr.mathworks.com/matlabcentral/fileexchange/85173-mesh-generation-toolbox?s_tid=prof_contriblnk\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"\"\u003eMesh generation toolbox\u003c/span\u003e\u003c/span\u003e\u003c/a\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function F = mesh_the_cube()\r\n  F = 1;\r\nend","test_suite":"%%\r\nF_correct = [1 2 3 4;\r\n             8 7 6 5;\r\n             1 4 8 5;\r\n             2 1 5 6;\r\n             3 2 6 7;\r\n             4 3 7 8];\r\n\r\n% Check every possible solutions\r\nassert(isequal(sortrows(sort(mesh_the_cube(),2)),sortrows(sort(F_correct,2))))\r\n\r\n%% Forbidden functions\r\nfiletext = fileread('mesh_the_cube.m');\r\nillegal = contains(filetext, 'regexp') || contains(filetext, 'str2num') || contains(filetext, 'assignin') || contains(filetext, 'echo')\r\nassert(~illegal);","published":true,"deleted":false,"likes_count":1,"comments_count":4,"created_by":149128,"edited_by":149128,"edited_at":"2025-07-26T07:44:33.000Z","deleted_by":null,"deleted_at":null,"solvers_count":42,"test_suite_updated_at":"2025-07-23T16:15:41.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2025-07-23T10:23:00.000Z","updated_at":"2026-03-31T18:43:29.000Z","published_at":"2025-07-23T10:53:38.000Z","restored_at":null,"restored_by":null,"spam":null,"simulink":false,"admin_reviewed":false,"description_opc":"{\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eProblem statement : mesh the cube with quadranglar / squared faces\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eAn cube / regular hexahedron is a regular polyhedron with 8 vertices and 6 squared / quadrangular faces. It is also one of the five well known platonic solids.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eA quadrangular mesh \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eF\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e (stands for \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003efaces\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e here) is simply a \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eN\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e x 4 matrix of positive integers where each row contains the vertex indices of squared faces, and where \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eN\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e is the number of faces. \u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eYour task here is to mesh this cube. To do so, you will list the squares/rows in a matrix of faces, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eF. \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003eYou will also be careful to always keep the faces coherently / consistently oriented (all clockwise or all counterclockwise : square \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e[1, 2, 3, 4]\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e and \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e[4, 3, 2, 1]\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e are distinct).\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eOn the other hand \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e[1, 2, 3, 4]\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e[2, 3, 4, 1], [3, 4, 1, 2]\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e and \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e[4, 1, 2, 3]\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e are one same unique square.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe row order of the faces in the list doesn't matter.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eEdit / update\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eFaces orientation not taken into account anymore, because of too many possible cases to check in the tests (!)\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eExample\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe first square \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e(Z \u0026gt; 0)\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e here can be [\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e1, 2, 3, 4]\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e if counterclockwise oriented (normals outward).\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:customXml w:element=\\\"image\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"height\\\" w:val=\\\"378\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"504\\\"/\u003e\u003cw:attr w:name=\\\"verticalAlign\\\" w:val=\\\"middle\\\"/\u003e\u003cw:attr w:name=\\\"altText\\\" w:val=\\\"\\\"/\u003e\u003cw:attr w:name=\\\"relationshipId\\\" w:val=\\\"rId1\\\"/\u003e\u003c/w:customXmlPr\u003e\u003c/w:customXml\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eForbidden functions / expressions\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eregexp\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eassignin\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003estr2num\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eecho\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eSee also\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:hyperlink w:docLocation=\\\"https://fr.mathworks.com/matlabcentral/cody/groups/57483\\\"\u003e\u003cw:r\u003e\u003cw:t\u003eMesh processing\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:hyperlink w:docLocation=\\\"https://fr.mathworks.com/matlabcentral/fileexchange/85173-mesh-generation-toolbox?s_tid=prof_contriblnk\\\"\u003e\u003cw:r\u003e\u003cw:t\u003eMesh generation toolbox\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\",\"relationship\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/image\",\"target\":\"/media/image1.png\",\"relationshipId\":\"rId1\"}]},{\"partUri\":\"/media/image1.png\",\"contentType\":\"image/png\",\"content\":\"data:image/png;base64,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\",\"relationship\":null}],\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"target\":\"/matlab/document.xml\",\"relationshipId\":\"rId1\"}]}"},{"id":42320,"title":"Write a function man that takes a row vector v and returns a matrix H as follows..","description":"Write a function called man that takes a row vector v as an input and returns a matrix H whose first column consist of the elements of v, whose second column consists of the squares of the elements of v, and whose third column consists of the cubes of the elements v. For example,\r\n if A = man(1:3) , then A will be [ 1 1 1; 2 4 8; 3 9 27 ].","description_html":"\u003cp\u003eWrite a function called man that takes a row vector v as an input and returns a matrix H whose first column consist of the elements of v, whose second column consists of the squares of the elements of v, and whose third column consists of the cubes of the elements v. For example,\r\n if A = man(1:3) , then A will be [ 1 1 1; 2 4 8; 3 9 27 ].\u003c/p\u003e","function_template":"function H = man(v)\r\n  % Read question Carefully!\r\nend","test_suite":"%%\r\nv = 0;\r\nH = [0 0 0];\r\nassert(isequal(man(v),H))\r\n\r\n%%\r\nv = [1 4];\r\nH =  [1 1 1;4 16 64];\r\nassert(isequal(man(v),H))\r\n\r\n%%\r\nv = [1 2 3];\r\nH = [ 1 1 1;2 4 8; 3 9 27];\r\nassert(isequal(man(v),H))\r\n\r\n%%\r\nv =[2 7 5 1 6 5 1 1 7 9 8 3 8 2 8 4 1 9];\r\nH =  [2 4 8;7 49 343;5 25 125;1 1 1;6 36 216;5 25 125;1 1 1;1 1 1;7 49 343;9 81 729;8 64 512;3 9 27;8 64 512;2 4 8;8 64 512;4 16 64;1     1     1;9    81   729];\r\nassert(isequal(man(v),H))","published":true,"deleted":false,"likes_count":1,"comments_count":0,"created_by":44015,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":647,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":23,"created_at":"2015-05-18T16:26:03.000Z","updated_at":"2026-02-28T12:00:39.000Z","published_at":"2015-05-18T16:26:27.000Z","restored_at":null,"restored_by":null,"spam":false,"simulink":false,"admin_reviewed":false,"description_opc":"{\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"relationshipId\":\"rId1\",\"target\":\"/matlab/document.xml\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/output\",\"relationshipId\":\"rId2\",\"target\":\"/matlab/output.xml\"}],\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"relationship\":[],\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eWrite a function called man that takes a row vector v as an input and returns a matrix H whose first column consist of the elements of v, whose second column consists of the squares of the elements of v, and whose third column consists of the cubes of the elements v. For example, if A = man(1:3) , then A will be [ 1 1 1; 2 4 8; 3 9 27 ].\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\"},{\"partUri\":\"/matlab/output.xml\",\"contentType\":\"text/xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\" standalone=\\\"no\\\" ?\u003e\u003cembeddedOutputs\u003e\u003cmetaData\u003e\u003cevaluationState\u003emanual\u003c/evaluationState\u003e\u003clayoutState\u003ecode\u003c/layoutState\u003e\u003coutputStatus\u003eready\u003c/outputStatus\u003e\u003c/metaData\u003e\u003coutputArray type=\\\"array\\\"/\u003e\u003cregionArray type=\\\"array\\\"/\u003e\u003c/embeddedOutputs\u003e\"}]}"},{"id":60941,"title":"Prime numbers which are the difference of two consecutive cubes","description":"Problem statement\r\n\r\nGiven a positive integer n greater than 2, find the prime numbers less or equal to n and which are the difference of the cubes of two consecutive integers and store them in ascending order in a row vector u. Also, compute the frequency / ratio f of those numbers compare to all the prime numbers less or equal to n.\r\n\r\nExamples\r\n\r\nIf n = 100, then u = [7, 19, 37, 61], and f = 4/25, since 7 = 2^3 - 1^3, 19 = 3^3 - 2^3, 37 = 4^3 - 3^3, 61 = 5^3 - 4^3, and there are 25 prime numbers less or equal to 100;\r\nIf n = 400, then u = [7, 19, 37, 61, 127, 271, 331, 397], and f = 8/78, since 127 = 7^3 - 6^3, 271 = 10^3 - 9^3, 331 = 11^3 - 10^3, 397 = 12^3 - 11^3, and there are 78 prime numbers less or equal to 400;\r\nTips\r\n\r\n\r\n\r\nForbidden functions\r\n\r\nregexpr\r\nstr2num\r\nassignin\r\n\r\nSee also\r\nPrime numbers properties II","description_html":"\u003cdiv style = \"text-align: start; line-height: 20.4333px; min-height: 0px; white-space: normal; color: rgb(0, 0, 0); font-family: Menlo, Monaco, Consolas, monospace; font-style: normal; font-size: 14px; font-weight: 400; text-decoration: rgb(0, 0, 0); white-space: normal; \"\u003e\u003cdiv style=\"block-size: 668.033px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 408px 334.017px; transform-origin: 408px 334.017px; vertical-align: baseline; \"\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 63.0083px 8px; transform-origin: 63.0083px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eProblem statement\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 63px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 31.5px; text-align: left; transform-origin: 385px 31.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 75.075px 8px; transform-origin: 75.075px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eGiven a positive integer \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 5.83333px 8px; transform-origin: 5.83333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003en \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 37.7333px 8px; transform-origin: 37.7333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003egreater than\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 9.71667px 8px; transform-origin: 9.71667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 2, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 122.917px 8px; transform-origin: 122.917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003efind the prime numbers less or equal to \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 3.89167px 8px; transform-origin: 3.89167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003en\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 129.833px 8px; transform-origin: 129.833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e and which are the difference of the cubes of two consecutive integers and store them in ascending order in a row vector \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 3.89167px 8px; transform-origin: 3.89167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eu\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 113.95px 8px; transform-origin: 113.95px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e. Also, compute the frequency / ratio \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 1.94167px 8px; transform-origin: 1.94167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003ef\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 9.71667px 8px; transform-origin: 9.71667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e of those numbers compare to all the prime numbers less or equal to \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 3.89167px 8px; transform-origin: 3.89167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003en\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 1.94167px 8px; transform-origin: 1.94167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 32.675px 8px; transform-origin: 32.675px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eExamples\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cul style=\"block-size: 81.7333px; counter-reset: list-item 0; font-family: Helvetica, Arial, sans-serif; list-style-type: square; margin-block-end: 20px; margin-block-start: 10px; margin-bottom: 20px; margin-top: 10px; perspective-origin: 392px 40.8667px; transform-origin: 392px 40.8667px; margin-top: 10px; margin-bottom: 20px; \"\u003e\u003cli style=\"block-size: 40.8667px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 20.4333px; text-align: left; transform-origin: 364px 20.4333px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 6.21667px 8px; transform-origin: 6.21667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eIf \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 27.8083px 8px; transform-origin: 27.8083px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; font-weight: 700; \"\u003en = 100, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 14.775px 8px; transform-origin: 14.775px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003ethen\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 61.6333px 8px; transform-origin: 61.6333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; font-weight: 700; \"\u003e u = [7, 19, 37, 61], \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 12.4417px 8px; transform-origin: 12.4417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eand\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.8667px 8px; transform-origin: 25.8667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; font-weight: 700; \"\u003e f = 4/25\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 3.88333px 8px; transform-origin: 3.88333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 16.3417px 8px; transform-origin: 16.3417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003esince\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 190.017px 8px; transform-origin: 190.017px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 7 = 2^3 - 1^3, 19 = 3^3 - 2^3, 37 = 4^3 - 3^3, 61 = 5^3 - 4^3, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 41.625px 8px; transform-origin: 41.625px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eand there are\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 11.6667px 8px; transform-origin: 11.6667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 25 \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 96.0833px 8px; transform-origin: 96.0833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eprime numbers less or equal to\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 15.5583px 8px; transform-origin: 15.5583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 100;\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 40.8667px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 20.4333px; text-align: left; transform-origin: 364px 20.4333px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 6.21667px 8px; transform-origin: 6.21667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eIf \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 27.8083px 8px; transform-origin: 27.8083px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; font-weight: 700; \"\u003en = 400, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 14.775px 8px; transform-origin: 14.775px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003ethen\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 123.867px 8px; transform-origin: 123.867px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; font-weight: 700; \"\u003e u = [7, 19, 37, 61, 127, 271, 331, 397], \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 12.4417px 8px; transform-origin: 12.4417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eand\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.8667px 8px; transform-origin: 25.8667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; font-weight: 700; \"\u003e f = 8/78\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 3.88333px 8px; transform-origin: 3.88333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 16.3417px 8px; transform-origin: 16.3417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003esince\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 129.25px 8px; transform-origin: 129.25px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 127 = 7^3 - 6^3, 271 = 10^3 - 9^3, 331 = 11^3 - 10^3, 397 = 12^3 - 11^3, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 41.625px 8px; transform-origin: 41.625px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eand there are\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 11.6667px 8px; transform-origin: 11.6667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 78 \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 96.0833px 8px; transform-origin: 96.0833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eprime numbers less or equal to\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 15.5583px 8px; transform-origin: 15.5583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 400;\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003c/ul\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 14.2583px 8px; transform-origin: 14.2583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eTips\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"vertical-align:-5px\"\u003e\u003cimg src=\"data:image/png;base64,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\" width=\"176\" height=\"19.5\" style=\"width: 176px; height: 19.5px;\"\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 67.6417px 8px; transform-origin: 67.6417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eForbidden functions\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cul style=\"block-size: 61.3px; counter-reset: list-item 0; font-family: Helvetica, Arial, sans-serif; list-style-type: square; margin-block-end: 20px; margin-block-start: 10px; margin-bottom: 20px; margin-top: 10px; perspective-origin: 392px 30.65px; transform-origin: 392px 30.65px; margin-top: 10px; margin-bottom: 20px; \"\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 23.7333px 8px; transform-origin: 23.7333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eregexpr\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.2833px 8px; transform-origin: 25.2833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003estr2num\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.6833px 8px; transform-origin: 25.6833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eassignin\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003c/ul\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 28.3917px 8px; transform-origin: 28.3917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eSee also\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003ca target='_blank' href = \"https://fr.mathworks.com/matlabcentral/cody/groups/95759\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"\"\u003ePrime numbers properties II\u003c/span\u003e\u003c/span\u003e\u003c/a\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function [u, f] = cube_delta_primes(n)\r\n  \r\n    u = n;\r\n    f = 1;\r\n\r\nend","test_suite":"%%\r\nn = 100;\r\nu_correct = [7, 19, 37, 61];\r\nf_correct = 4/25;\r\n[u,f] = cube_delta_primes(n);\r\nassert(isequal([u,f],[u_correct,f_correct]));\r\n\r\n%%\r\nn = 400;\r\nu_correct = [7, 19, 37, 61, 127, 271, 331, 397];\r\nf_correct = 8/78;\r\n[u,f] = cube_delta_primes(n);\r\nassert(isequal([u,f],[u_correct,f_correct]));\r\n\r\n%% Forbidden functions\r\nfiletext = fileread('cube_delta_primes.m');\r\nillegal = contains(filetext, 'regexp') || contains(filetext, 'str2num') || contains(filetext, 'assignin') || contains(filetext, 'echo')\r\nassert(~illegal);","published":true,"deleted":false,"likes_count":2,"comments_count":2,"created_by":149128,"edited_by":149128,"edited_at":"2025-07-26T06:46:51.000Z","deleted_by":null,"deleted_at":null,"solvers_count":30,"test_suite_updated_at":"2025-07-09T05:55:53.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2025-06-26T11:57:42.000Z","updated_at":"2026-03-30T01:16:24.000Z","published_at":"2025-06-26T12:34:41.000Z","restored_at":null,"restored_by":null,"spam":null,"simulink":false,"admin_reviewed":false,"description_opc":"{\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eProblem statement\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eGiven a positive integer \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003en \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003egreater than\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 2, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003efind the prime numbers less or equal to \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003en\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e and which are the difference of the cubes of two consecutive integers and store them in ascending order in a row vector \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eu\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e. Also, compute the frequency / ratio \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003ef\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e of those numbers compare to all the prime numbers less or equal to \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003en\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eExamples\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eIf \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003en = 100, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003ethen\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e u = [7, 19, 37, 61], \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eand\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e f = 4/25\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003esince\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 7 = 2^3 - 1^3, 19 = 3^3 - 2^3, 37 = 4^3 - 3^3, 61 = 5^3 - 4^3, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003eand there are\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 25 \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003eprime numbers less or equal to\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 100;\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eIf \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003en = 400, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003ethen\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e u = [7, 19, 37, 61, 127, 271, 331, 397], \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eand\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e f = 8/78\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003esince\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 127 = 7^3 - 6^3, 271 = 10^3 - 9^3, 331 = 11^3 - 10^3, 397 = 12^3 - 11^3, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003eand there are\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 78 \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003eprime numbers less or equal to\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 400;\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eTips\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:customXml w:element=\\\"equation\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"displayStyle\\\" w:val=\\\"true\\\"/\u003e\u003c/w:customXmlPr\u003e\u003cw:r\u003e\u003cw:t\u003e(n+1)^3 - n^3 = 3n^2 + 3n + 1\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:customXml\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eForbidden functions\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eregexpr\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003estr2num\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eassignin\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eSee also\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:hyperlink w:docLocation=\\\"https://fr.mathworks.com/matlabcentral/cody/groups/95759\\\"\u003e\u003cw:r\u003e\u003cw:t\u003ePrime numbers properties II\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\",\"relationship\":null}],\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"target\":\"/matlab/document.xml\",\"relationshipId\":\"rId1\"}]}"},{"id":50629,"title":"Solve the snake puzzle","description":null,"description_html":"\u003cdiv style = \"text-align: start; line-height: 20.44px; min-height: 0px; white-space: normal; color: rgb(0, 0, 0); font-family: Menlo, Monaco, Consolas, monospace; font-style: normal; font-size: 14px; font-weight: 400; text-decoration: none solid rgb(0, 0, 0); white-space: normal; \"\u003e\u003cdiv style=\"block-size: 752px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 407px 376px; transform-origin: 407px 376px; vertical-align: baseline; \"\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 10.5px; text-align: left; transform-origin: 384px 10.5px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003eMy son received this puzzle toy from grandma for his 7th birthday, but he's having a bit of trouble solving it. Can you help?\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 42px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 21px; text-align: left; transform-origin: 384px 21px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003eThe toy is a \"twisting snake\" puzzle made of 27 blocks connected by hidden strings into sixteen segments, each either two or three blocks long. The snake's path must make a 90-degree turn at the end of each segment.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 10.5px; text-align: left; transform-origin: 384px 10.5px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003eThe object is to arrange the puzzle's blocks into a 3-by-3-by-3 cube.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 10.5px; text-align: left; transform-origin: 384px 10.5px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003eThese pictures show the puzzle's configuration when laid out two-dimensionally and its final state when solved.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 518px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 259px; text-align: left; transform-origin: 384px 259px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" style=\"vertical-align: baseline\" src=\"data:image/jpeg;base64,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\" data-image-state=\"image-loaded\"\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 84px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 42px; text-align: left; transform-origin: 384px 42px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003eYour code should return a 27x3 array containing the path traversed by the snake when the puzzle is solved. Each row corresponds to one position, with [1 1 1] representing the back left lower corner of the cube and [3 3 3] representing the front right upper corner. For example, if the path begins in the front left lower corner and the first segment proceeds to the right, the first three rows of the array would be [3 1 1; 3 2 1; 3 3 1].\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function moves = solve_snake\r\n    moves = ones(27,3);\r\nend","test_suite":"%%\r\n    result = solve_snake;\r\n    assert(isequal(sortrows(result), ...\r\n        [1 1 1;1 1 2;1 1 3;1 2 1;1 2 2;1 2 3;1 3 1;1 3 2;1 3 3; ...\r\n         2 1 1;2 1 2;2 1 3;2 2 1;2 2 2;2 2 3;2 3 1;2 3 2;2 3 3; ...\r\n         3 1 1;3 1 2;3 1 3;3 2 1;3 2 2;3 2 3;3 3 1;3 3 2;3 3 3]));\r\n    d = diff(result);\r\n    dd = diff(d);\r\n    assert(all(abs(sum(d,2))==1));\r\n    assert(~any(dd([1 5 8 12 14 19 21 23 25],:),'all') || ...\r\n        ~any(dd([1 3 5 7 12 14 18 21 25],:),'all'));\r\n","published":true,"deleted":false,"likes_count":0,"comments_count":0,"created_by":877713,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":2,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":1,"created_at":"2021-03-01T15:12:16.000Z","updated_at":"2021-03-01T15:12:16.000Z","published_at":"2021-03-01T15:12:16.000Z","restored_at":null,"restored_by":null,"spam":false,"simulink":false,"admin_reviewed":false,"description_opc":"{\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eMy son received this puzzle toy from grandma for his 7th birthday, but he's having a bit of trouble solving it. Can you help?\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe toy is a \\\"twisting snake\\\" puzzle made of 27 blocks connected by hidden strings into sixteen segments, each either two or three blocks long. The snake's path must make a 90-degree turn at the end of each segment.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe object is to arrange the puzzle's blocks into a 3-by-3-by-3 cube.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThese pictures show the puzzle's configuration when laid out two-dimensionally and its final state when solved.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:customXml w:element=\\\"image\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"height\\\" w:val=\\\"540\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"810\\\"/\u003e\u003cw:attr w:name=\\\"verticalAlign\\\" w:val=\\\"baseline\\\"/\u003e\u003cw:attr w:name=\\\"altText\\\" w:val=\\\"\\\"/\u003e\u003cw:attr w:name=\\\"relationshipId\\\" w:val=\\\"rId1\\\"/\u003e\u003c/w:customXmlPr\u003e\u003c/w:customXml\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eYour code should return a 27x3 array containing the path traversed by the snake when the puzzle is solved. Each row corresponds to one position, with [1 1 1] representing the back left lower corner of the cube and [3 3 3] representing the front right upper corner. For example, if the path begins in the front left lower corner and the first segment proceeds to the right, the first three rows of the array would be [3 1 1; 3 2 1; 3 3 1].\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\",\"relationship\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/image\",\"target\":\"/media/image1.jpeg\",\"relationshipId\":\"rId1\"}]},{\"partUri\":\"/media/image1.jpeg\",\"contentType\":\"image/jpeg\",\"content\":\"data:image/jpeg;base64,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\",\"relationship\":null}],\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"target\":\"/matlab/document.xml\",\"relationshipId\":\"rId1\"}]}"},{"id":879,"title":"Perform Rubik's Cube Moves","description":"A standard Rubik's Cube is shown in 3-D and also unfolded to identify the specific Tile-face numbering.\r\n\r\nThe faces are White-Up / Red-Left / Blue-Front / Orange-Right / Yellow-Down / Green-Back (ULFRDB)\r\n\r\nMoves are denoted as F for clockwise rotation of the Front face. F' is CCW and F2 is F twice. The F move would map 19 to 25,..., 7 goes to 18,..., and 23 is unchanged.\r\n\r\nThe moves X( R ), Y(U), and Z(F) rotate the entire cube with its associated face.\r\nX would map 23 to 14. (19:27) moves to (10:18). Only contents of 5 and 50 are unchanged There are also X' and X2 moves.\r\n\r\n\r\n\u003c\u003chttps://sites.google.com/site/razapor/matlab_cody/cube_small.gif\u003e\u003e\r\n\r\n\u003c\u003chttps://sites.google.com/site/razapor/matlab_cody/Cube_Map28_200.png\u003e\u003e\r\n\r\n\u003c\u003chttp://mathworks.com/matlabcentral/images/surf.gif\u003e\u003e\r\n\r\n\r\n  \r\n  \r\n  Input: (mov,rubik)\r\n  mov: is an integer 1:27 representing the moves in order: UFDLBRU'F'D'L'B'R'U2F2D2L2B2R2XYZX'Y'Z'X2Y2Z2\r\n  rubik: row vector of size 54\r\n  (A normal cube would have values 0:5 in locations 1:54,\r\n  The test input is generally numbered 1:54 to check that each tile is correctly remapped. A normal cube with 6 values may be used in testing)\r\n\r\n  Output: rubik vector of the input cubes values remapped based upon mov\r\n\r\nAll 27 moves are enumerated in the test suite\r\n\r\nFollow-up Challenges will be solving the cube at various move depths for time and actual face moves required.\r\n \r\nNote: Images inserted/linked to my free google web page. Used a gif and a png.\r\n\r\n\r\n\r\n\r\n","description_html":"\u003cp\u003eA standard Rubik's Cube is shown in 3-D and also unfolded to identify the specific Tile-face numbering.\u003c/p\u003e\u003cp\u003eThe faces are White-Up / Red-Left / Blue-Front / Orange-Right / Yellow-Down / Green-Back (ULFRDB)\u003c/p\u003e\u003cp\u003eMoves are denoted as F for clockwise rotation of the Front face. F' is CCW and F2 is F twice. The F move would map 19 to 25,..., 7 goes to 18,..., and 23 is unchanged.\u003c/p\u003e\u003cp\u003eThe moves X( R ), Y(U), and Z(F) rotate the entire cube with its associated face.\r\nX would map 23 to 14. (19:27) moves to (10:18). Only contents of 5 and 50 are unchanged There are also X' and X2 moves.\u003c/p\u003e\u003cimg src=\"https://sites.google.com/site/razapor/matlab_cody/cube_small.gif\"\u003e\u003cimg src=\"https://sites.google.com/site/razapor/matlab_cody/Cube_Map28_200.png\"\u003e\u003cimg src=\"http://mathworks.com/matlabcentral/images/surf.gif\"\u003e\u003cpre class=\"language-matlab\"\u003eInput: (mov,rubik)\r\nmov: is an integer 1:27 representing the moves in order: UFDLBRU'F'D'L'B'R'U2F2D2L2B2R2XYZX'Y'Z'X2Y2Z2\r\nrubik: row vector of size 54\r\n(A normal cube would have values 0:5 in locations 1:54,\r\nThe test input is generally numbered 1:54 to check that each tile is correctly remapped. A normal cube with 6 values may be used in testing)\r\n\u003c/pre\u003e\u003cpre class=\"language-matlab\"\u003eOutput: rubik vector of the input cubes values remapped based upon mov\r\n\u003c/pre\u003e\u003cp\u003eAll 27 moves are enumerated in the test suite\u003c/p\u003e\u003cp\u003eFollow-up Challenges will be solving the cube at various move depths for time and actual face moves required.\u003c/p\u003e\u003cp\u003eNote: Images inserted/linked to my free google web page. Used a gif and a png.\u003c/p\u003e","function_template":"function r = rubik_rot(mov,r)\r\n  r=r;\r\nend","test_suite":"%%\r\n% Single move cases\r\nmov=1; % U\r\nr=1:54;\r\nr_exp=[19 2 3 22 5 6 25 8 9 12 15 18 11 14 17 10 13 16 46 20 21 49 23 24 52 26 27 28 29 30 31 32 33 34 35 36 37 38 7 40 41 4 43 44 1 45 47 48 42 50 51 39 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\nmov=7; % U'\r\nr=1:54;\r\nr_exp=[45 2 3 42 5 6 39 8 9 16 13 10 17 14 11 18 15 12 1 20 21 4 23 24 7 26 27 28 29 30 31 32 33 34 35 36 37 38 52 40 41 49 43 44 46 19 47 48 22 50 51 25 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\nmov=13; % U2\r\nr=1:54;\r\nr_exp=[46 2 3 49 5 6 52 8 9 18 17 16 15 14 13 12 11 10 45 20 21 42 23 24 39 26 27 28 29 30 31 32 33 34 35 36 37 38 25 40 41 22 43 44 19 1 47 48 4 50 51 7 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\nmov=19; % X\r\nr=1:54;\r\nr_exp=[7 4 1 8 5 2 9 6 3 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 10 11 12 13 14 15 16 17 18 48 51 54 47 50 53 46 49 52];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\nmov=22; % X'\r\nr=1:54;\r\nr_exp=[3 6 9 2 5 8 1 4 7 37 38 39 40 41 42 43 44 45 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 52 49 46 53 50 47 54 51 48];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\nmov=25; % X2\r\nr=1:54;\r\nr_exp=[9 8 7 6 5 4 3 2 1 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 54 53 52 51 50 49 48 47 46];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Remaining CW Face moves 2-6\r\nmov=2; % F\r\nr=1:54;\r\nr_exp=[1 2 3 4 5 6 28 31 34 10 11 9 13 14 8 16 17 7 21 24 27 20 23 26 19 22 25 48 29 30 47 32 33 46 35 36 37 38 39 40 41 42 43 44 45 12 15 18 49 50 51 52 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=3; % D\r\nr=1:54;\r\nr_exp=[1 2 43 4 5 40 7 8 37 10 11 12 13 14 15 16 17 18 19 20 3 22 23 6 25 26 9 30 33 36 29 32 35 28 31 34 54 38 39 51 41 42 48 44 45 46 47 21 49 50 24 52 53 27];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=4; % L\r\nr=1:54;\r\nr_exp=[3 6 9 2 5 8 1 4 7 37 38 39 13 14 15 16 17 18 10 11 12 22 23 24 25 26 27 19 20 21 31 32 33 34 35 36 28 29 30 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=5; % B\r\nr=1:54;\r\nr_exp=[16 13 10 4 5 6 7 8 9 52 11 12 53 14 15 54 17 18 19 20 21 22 23 24 25 26 27 28 29 1 31 32 2 34 35 3 39 42 45 38 41 44 37 40 43 46 47 48 49 50 51 36 33 30];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=6; % R\r\nr=1:54;\r\nr_exp=[1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 25 26 27 19 20 21 22 23 24 34 35 36 28 29 30 31 32 33 43 44 45 37 38 39 40 41 42 16 17 18 48 51 54 47 50 53 46 49 52];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Remaining CCW Face moves 8-12\r\nmov=8; % F'\r\nr=1:54;\r\nr_exp=[1 2 3 4 5 6 18 15 12 10 11 46 13 14 47 16 17 48 25 22 19 26 23 20 27 24 21 7 29 30 8 32 33 9 35 36 37 38 39 40 41 42 43 44 45 34 31 28 49 50 51 52 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=9; % D'\r\nr=1:54;\r\nr_exp=[1 2 21 4 5 24 7 8 27 10 11 12 13 14 15 16 17 18 19 20 48 22 23 51 25 26 54 34 31 28 35 32 29 36 33 30 9 38 39 6 41 42 3 44 45 46 47 43 49 50 40 52 53 37];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=10; % L'\r\nr=1:54;\r\nr_exp=[7 4 1 8 5 2 9 6 3 19 20 21 13 14 15 16 17 18 28 29 30 22 23 24 25 26 27 37 38 39 31 32 33 34 35 36 10 11 12 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=11; % B'\r\nr=1:54;\r\nr_exp=[30 33 36 4 5 6 7 8 9 3 11 12 2 14 15 1 17 18 19 20 21 22 23 24 25 26 27 28 29 54 31 32 53 34 35 52 43 40 37 44 41 38 45 42 39 46 47 48 49 50 51 10 13 16];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=12; % R'\r\nr=1:54;\r\nr_exp=[1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 43 44 45 19 20 21 22 23 24 16 17 18 28 29 30 31 32 33 25 26 27 37 38 39 40 41 42 34 35 36 52 49 46 53 50 47 54 51 48];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Remaining Double Face moves 14-18\r\nmov=14; % F2\r\nr=1:54;\r\nr_exp=[1 2 3 4 5 6 48 47 46 10 11 34 13 14 31 16 17 28 27 26 25 24 23 22 21 20 19 18 29 30 15 32 33 12 35 36 37 38 39 40 41 42 43 44 45 9 8 7 49 50 51 52 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=15; % D2\r\nr=1:54;\r\nr_exp=[1 2 48 4 5 51 7 8 54 10 11 12 13 14 15 16 17 18 19 20 43 22 23 40 25 26 37 36 35 34 33 32 31 30 29 28 27 38 39 24 41 42 21 44 45 46 47 3 49 50 6 52 53 9];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=16; % L2\r\nr=1:54;\r\nr_exp=[9 8 7 6 5 4 3 2 1 28 29 30 13 14 15 16 17 18 37 38 39 22 23 24 25 26 27 10 11 12 31 32 33 34 35 36 19 20 21 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=17; % B2\r\nr=1:54;\r\nr_exp=[54 53 52 4 5 6 7 8 9 36 11 12 33 14 15 30 17 18 19 20 21 22 23 24 25 26 27 28 29 16 31 32 13 34 35 10 45 44 43 42 41 40 39 38 37 46 47 48 49 50 51 3 2 1];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=18; % R2\r\nr=1:54;\r\nr_exp=[1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 34 35 36 19 20 21 22 23 24 43 44 45 28 29 30 31 32 33 16 17 18 37 38 39 40 41 42 25 26 27 54 53 52 51 50 49 48 47 46];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Remaining Cube CW moves 20-21\r\nmov=20; % Y\r\nr=1:54;\r\nr_exp=[19 20 21 22 23 24 25 26 27 12 15 18 11 14 17 10 13 16 46 47 48 49 50 51 52 53 54 34 31 28 35 32 29 36 33 30 9 8 7 6 5 4 3 2 1 45 44 43 42 41 40 39 38 37];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=21; % Z\r\nr=1:54;\r\nr_exp=[30 33 36 29 32 35 28 31 34 3 6 9 2 5 8 1 4 7 21 24 27 20 23 26 19 22 25 48 51 54 47 50 53 46 49 52 43 40 37 44 41 38 45 42 39 12 15 18 11 14 17 10 13 16];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Remaining Cube CCW moves 23-24\r\nmov=23; % Y\r\nr=1:54;\r\nr_exp=[45 44 43 42 41 40 39 38 37 16 13 10 17 14 11 18 15 12 1 2 3 4 5 6 7 8 9 30 33 36 29 32 35 28 31 34 54 53 52 51 50 49 48 47 46 19 20 21 22 23 24 25 26 27];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=24; % Z\r\nr=1:54;\r\nr_exp=[16 13 10 17 14 11 18 15 12 52 49 46 53 50 47 54 51 48 25 22 19 26 23 20 27 24 21 7 4 1 8 5 2 9 6 3 39 42 45 38 41 44 37 40 43 34 31 28 35 32 29 36 33 30];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Remaining Cube Half Rotate moves 26-27\r\nmov=26; % Y\r\nr=1:54;\r\nr_exp=[46 47 48 49 50 51 52 53 54 18 17 16 15 14 13 12 11 10 45 44 43 42 41 40 39 38 37 36 35 34 33 32 31 30 29 28 27 26 25 24 23 22 21 20 19 1 2 3 4 5 6 7 8 9];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=27; % Z\r\nr=1:54;\r\nr_exp=[54 53 52 51 50 49 48 47 46 36 35 34 33 32 31 30 29 28 27 26 25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 10 45 44 43 42 41 40 39 38 37 9 8 7 6 5 4 3 2 1];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Verify that values in the array are returned and not positions\r\nmov=2; % F\r\nr=1:54;\r\nr=r*0; % The simplest Cube - Solid\r\nr_exp=r; \r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Perform Sequence of moves and then back\r\nr=1:54;\r\nr_exp=r; \r\nmov=1; % U\r\nr=rubik_rot(mov,r);\r\nmov=2; % F\r\nr=rubik_rot(mov,r);\r\nmov=3; % D\r\nr=rubik_rot(mov,r);\r\nmov=4; % L\r\nr=rubik_rot(mov,r);\r\nmov=5; % B\r\nr=rubik_rot(mov,r);\r\nmov=6; % R\r\nr=rubik_rot(mov,r);\r\nmov=12; % R'\r\nr=rubik_rot(mov,r);\r\nmov=11; % B'\r\nr=rubik_rot(mov,r);\r\nmov=10; % L'\r\nr=rubik_rot(mov,r);\r\nmov=9; % D'\r\nr=rubik_rot(mov,r);\r\nmov=8; % F'\r\nr=rubik_rot(mov,r);\r\nmov=7; % U'\r\n\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n\r\n\r\n","published":true,"deleted":false,"likes_count":3,"comments_count":0,"created_by":3097,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":22,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":1,"created_at":"2012-08-05T05:47:50.000Z","updated_at":"2026-03-28T16:32:39.000Z","published_at":"2012-08-05T19:30:31.000Z","restored_at":null,"restored_by":null,"spam":false,"simulink":false,"admin_reviewed":false,"description_opc":"{\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"targetMode\":\"\",\"relationshipId\":\"rId1\",\"target\":\"/matlab/document.xml\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/output\",\"targetMode\":\"\",\"relationshipId\":\"rId2\",\"target\":\"/matlab/output.xml\"}],\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"relationship\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/image\",\"targetMode\":\"\",\"relationshipId\":\"rId1\",\"target\":\"/media/image1.gif\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/image\",\"targetMode\":\"\",\"relationshipId\":\"rId2\",\"target\":\"/media/image1.png\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/image\",\"targetMode\":\"\",\"relationshipId\":\"rId3\",\"target\":\"/media/image2.gif\"}],\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\\n\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eA standard Rubik's Cube is shown in 3-D and also unfolded to identify the specific Tile-face numbering.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe faces are White-Up / Red-Left / Blue-Front / Orange-Right / Yellow-Down / Green-Back (ULFRDB)\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eMoves are denoted as F for clockwise rotation of the Front face. F' is CCW and F2 is F twice. The F move would map 19 to 25,..., 7 goes to 18,..., and 23 is unchanged.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe moves X( R ), Y(U), and Z(F) rotate the entire cube with its associated face. X would map 23 to 14. (19:27) moves to (10:18). Only contents of 5 and 50 are unchanged There are also X' and X2 moves.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:customXml w:element=\\\"image\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"height\\\" w:val=\\\"-1\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"-1\\\"/\u003e\u003cw:attr w:name=\\\"relationshipId\\\" w:val=\\\"rId1\\\"/\u003e\u003c/w:customXmlPr\u003e\u003c/w:customXml\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:customXml w:element=\\\"image\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"height\\\" w:val=\\\"-1\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"-1\\\"/\u003e\u003cw:attr w:name=\\\"relationshipId\\\" w:val=\\\"rId2\\\"/\u003e\u003c/w:customXmlPr\u003e\u003c/w:customXml\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:customXml w:element=\\\"image\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"height\\\" w:val=\\\"-1\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"-1\\\"/\u003e\u003cw:attr w:name=\\\"relationshipId\\\" w:val=\\\"rId3\\\"/\u003e\u003c/w:customXmlPr\u003e\u003c/w:customXml\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"code\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c![CDATA[Input: (mov,rubik)\\nmov: is an integer 1:27 representing the moves in order: UFDLBRU'F'D'L'B'R'U2F2D2L2B2R2XYZX'Y'Z'X2Y2Z2\\nrubik: row vector of size 54\\n(A normal cube would have values 0:5 in locations 1:54,\\nThe test input is generally numbered 1:54 to check that each tile is correctly remapped. A normal cube with 6 values may be used in testing)\\n\\nOutput: rubik vector of the input cubes values remapped based upon mov]]\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eAll 27 moves are enumerated in the test suite\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eFollow-up Challenges will be solving the cube at various move depths for time and actual face moves required.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eNote: Images inserted/linked to my free google web page. Used a gif and a png.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\"},{\"partUri\":\"/matlab/output.xml\",\"contentType\":\"text/xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\" standalone=\\\"no\\\" ?\u003e\u003cembeddedOutputs\u003e\u003cmetaData\u003e\u003cevaluationState\u003emanual\u003c/evaluationState\u003e\u003clayoutState\u003ecode\u003c/layoutState\u003e\u003coutputStatus\u003eready\u003c/outputStatus\u003e\u003c/metaData\u003e\u003coutputArray type=\\\"array\\\"/\u003e\u003cregionArray type=\\\"array\\\"/\u003e\u003c/embeddedOutputs\u003e\"},{\"partUri\":\"/media/image1.gif\",\"contentType\":\"image/gif\",\"content\":\"data:image/gif;base64,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\"},{\"partUri\":\"/media/image1.png\",\"contentType\":\"image/png\",\"content\":\"data:image/png;base64,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\"},{\"partUri\":\"/media/image2.gif\",\"contentType\":\"image/gif\",\"content\":\"data:image/gif;base64,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\"}]}"}],"problem_search":{"errors":[],"problems":[{"id":43123,"title":"Sum of cubes","description":"Write a program to determine sum of cubes of first n odd numbers.","description_html":"\u003cp\u003eWrite a program to determine sum of cubes of first n odd numbers.\u003c/p\u003e","function_template":"function y = sc(n)\r\n  y = x;\r\nend","test_suite":"%%\r\nn = 1;\r\ny_correct = 1;\r\nassert(isequal(sc(n),y_correct))\r\n\r\n%%\r\nn = 5;\r\ny_correct = 1225;\r\nassert(isequal(sc(n),y_correct))\r\n\r\n%%\r\nn = 10;\r\ny_correct = 19900;\r\nassert(isequal(sc(n),y_correct))\r\n","published":true,"deleted":false,"likes_count":6,"comments_count":1,"created_by":91311,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":113,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":1,"created_at":"2016-10-06T12:19:20.000Z","updated_at":"2026-02-13T18:11:18.000Z","published_at":"2016-10-06T12:19:20.000Z","restored_at":null,"restored_by":null,"spam":false,"simulink":false,"admin_reviewed":false,"description_opc":"{\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"relationshipId\":\"rId1\",\"target\":\"/matlab/document.xml\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/output\",\"relationshipId\":\"rId2\",\"target\":\"/matlab/output.xml\"}],\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"relationship\":[],\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eWrite a program to determine sum of cubes of first n odd numbers.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\"},{\"partUri\":\"/matlab/output.xml\",\"contentType\":\"text/xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\" standalone=\\\"no\\\" ?\u003e\u003cembeddedOutputs\u003e\u003cmetaData\u003e\u003cevaluationState\u003emanual\u003c/evaluationState\u003e\u003clayoutState\u003ecode\u003c/layoutState\u003e\u003coutputStatus\u003eready\u003c/outputStatus\u003e\u003c/metaData\u003e\u003coutputArray type=\\\"array\\\"/\u003e\u003cregionArray type=\\\"array\\\"/\u003e\u003c/embeddedOutputs\u003e\"}]}"},{"id":2491,"title":"Dudeney Numbers: Numbers which are the cube of their decimal sum","description":"From Wikipedia: \r\n_A Dudeney number is a positive integer that is a perfect cube such that the sum of its decimal digits is equal to the cube root of the number._\r\n\r\nFor example:\r\n\r\n512=(5+1+2)^3\r\n\r\n4913=(4+9+1+3)^3\r\n\r\n19683=(1+9+6+8+3)^3\r\n\r\nWrite a function that returns true if a number is a Dudeney number and false otherwise.\r\n\r\nAssume all numbers are of base 10.\r\n\r\nIf a number is negative, assume that only the leading digit carries the negative sign e.g. -4913 -\u003e (-4+9+1+3)^3","description_html":"\u003cp\u003eFrom Wikipedia:  \u003ci\u003eA Dudeney number is a positive integer that is a perfect cube such that the sum of its decimal digits is equal to the cube root of the number.\u003c/i\u003e\u003c/p\u003e\u003cp\u003eFor example:\u003c/p\u003e\u003cp\u003e512=(5+1+2)^3\u003c/p\u003e\u003cp\u003e4913=(4+9+1+3)^3\u003c/p\u003e\u003cp\u003e19683=(1+9+6+8+3)^3\u003c/p\u003e\u003cp\u003eWrite a function that returns true if a number is a Dudeney number and false otherwise.\u003c/p\u003e\u003cp\u003eAssume all numbers are of base 10.\u003c/p\u003e\u003cp\u003eIf a number is negative, assume that only the leading digit carries the negative sign e.g. -4913 -\u0026gt; (-4+9+1+3)^3\u003c/p\u003e","function_template":"function y = isDudenay(x)\r\n  s = num2str(x)';\r\nend","test_suite":"%%\r\nx = 1;\r\ny_correct = 1;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 10;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 21;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 99;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 512;\r\ny_correct = 1;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 666;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 1729;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 4913;\r\ny_correct = 1;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = -4913;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 5832;\r\ny_correct = 1;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 17576;\r\ny_correct = 1;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 19683;\r\ny_correct = 1;\r\nassert(isequal(isDudenay(x),y_correct))\r\n%%\r\nx = 87539319;\r\ny_correct = 0;\r\nassert(isequal(isDudenay(x),y_correct))\r\n\r\n","published":true,"deleted":false,"likes_count":2,"comments_count":2,"created_by":379,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":78,"test_suite_updated_at":"2014-08-08T09:11:49.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2014-08-08T08:47:21.000Z","updated_at":"2026-03-04T14:07:40.000Z","published_at":"2014-08-08T09:11:49.000Z","restored_at":null,"restored_by":null,"spam":false,"simulink":false,"admin_reviewed":false,"description_opc":"{\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"targetMode\":\"\",\"relationshipId\":\"rId1\",\"target\":\"/matlab/document.xml\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/output\",\"targetMode\":\"\",\"relationshipId\":\"rId2\",\"target\":\"/matlab/output.xml\"}],\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"relationship\":[],\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\\n\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eFrom Wikipedia: \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eA Dudeney number is a positive integer that is a perfect cube such that the sum of its decimal digits is equal to the cube root of the number.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eFor example:\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e512=(5+1+2)^3\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e4913=(4+9+1+3)^3\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e19683=(1+9+6+8+3)^3\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eWrite a function that returns true if a number is a Dudeney number and false otherwise.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eAssume all numbers are of base 10.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eIf a number is negative, assume that only the leading digit carries the negative sign e.g. -4913 -\u0026gt; (-4+9+1+3)^3\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\"},{\"partUri\":\"/matlab/output.xml\",\"contentType\":\"text/xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\" standalone=\\\"no\\\" ?\u003e\u003cembeddedOutputs\u003e\u003cmetaData\u003e\u003cevaluationState\u003emanual\u003c/evaluationState\u003e\u003clayoutState\u003ecode\u003c/layoutState\u003e\u003coutputStatus\u003eready\u003c/outputStatus\u003e\u003c/metaData\u003e\u003coutputArray type=\\\"array\\\"/\u003e\u003cregionArray type=\\\"array\\\"/\u003e\u003c/embeddedOutputs\u003e\"}]}"},{"id":60983,"title":"Check Euler's characteristic on regular polyhedra","description":"Problem statement\r\nGiven the number of vertices and the number of faces of a given regular polyhedron, compute the number of its edges with Euler characteristic, a powerful generic formula linking these three.\r\n\r\nExamples -\u003e check the test suite\r\n\r\nForbidden functions / expressions\r\nregexp\r\nassignin\r\nstr2num\r\necho\r\n\r\nSee also\r\nMesh processing\r\nMesh generation toolbox","description_html":"\u003cdiv style = \"text-align: start; line-height: 20.4333px; min-height: 0px; white-space: normal; color: rgb(0, 0, 0); font-family: Menlo, Monaco, Consolas, monospace; font-style: normal; font-size: 14px; font-weight: 400; text-decoration: rgb(0, 0, 0); white-space: normal; \"\u003e\u003cdiv style=\"block-size: 414.733px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 408px 207.367px; transform-origin: 408px 207.367px; vertical-align: baseline; \"\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 63.0083px 8px; transform-origin: 63.0083px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eProblem statement\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 42px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 21px; text-align: left; transform-origin: 385px 21px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 263.333px 8px; transform-origin: 263.333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eGiven the number of vertices and the number of faces of a given regular polyhedron, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 110.042px 8px; transform-origin: 110.042px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003ecompute the number of its edges\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 1.94167px 8px; transform-origin: 1.94167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e with Euler characteristic, a powerful generic formula linking these three.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 34.6167px 8px; transform-origin: 34.6167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eExamples \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 6.425px 8px; transform-origin: 6.425px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e-\u0026gt;\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 1.94167px 8px; transform-origin: 1.94167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003e \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 59.8917px 8px; transform-origin: 59.8917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003echeck the test suite\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 114.308px 8px; transform-origin: 114.308px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eForbidden functions / expressions\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cul style=\"block-size: 81.7333px; counter-reset: list-item 0; font-family: Helvetica, Arial, sans-serif; list-style-type: square; margin-block-end: 20px; margin-block-start: 10px; margin-bottom: 20px; margin-top: 10px; perspective-origin: 392px 40.8667px; transform-origin: 392px 40.8667px; margin-top: 10px; margin-bottom: 20px; \"\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 21.4px 8px; transform-origin: 21.4px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eregexp\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.6833px 8px; transform-origin: 25.6833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eassignin\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.2833px 8px; transform-origin: 25.2833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003estr2num\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 15.175px 8px; transform-origin: 15.175px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eecho\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003c/ul\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 28.3917px 8px; transform-origin: 28.3917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eSee also\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003ca target='_blank' href = \"https://fr.mathworks.com/matlabcentral/cody/groups/57483\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"\"\u003eMesh processing\u003c/span\u003e\u003c/span\u003e\u003c/a\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003ca target='_blank' href = \"https://fr.mathworks.com/matlabcentral/fileexchange/85173-mesh-generation-toolbox?s_tid=prof_contriblnk\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"\"\u003eMesh generation toolbox\u003c/span\u003e\u003c/span\u003e\u003c/a\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function e = check_Euler_chracteristic(v,f)\r\n  e = f;\r\nend","test_suite":"%% tetrahedron\r\nv = 4;\r\nf = 4;\r\ne_correct = 6;\r\nassert(isequal(check_Euler_chracteristic(v,f),e_correct))\r\n\r\n%% octahedron\r\nv = 6;\r\nf = 8;\r\ne_correct = 12;\r\nassert(isequal(check_Euler_chracteristic(v,f),e_correct))\r\n\r\n%% hexahedron / cube\r\nv = 8;\r\nf = 6;\r\ne_correct = 12;\r\nassert(isequal(check_Euler_chracteristic(v,f),e_correct))\r\n\r\n%% icosahedron\r\nv = 12;\r\nf = 20;\r\ne_correct = 30;\r\nassert(isequal(check_Euler_chracteristic(v,f),e_correct))\r\n\r\n%% dodecahedron\r\nv = 20;\r\nf = 12;\r\ne_correct = 30;\r\nassert(isequal(check_Euler_chracteristic(v,f),e_correct))\r\n\r\n%% Forbidden functions\r\nfiletext = fileread('check_Euler_chracteristic.m');\r\nillegal = contains(filetext, 'regexp') || contains(filetext, 'str2num') || contains(filetext, 'assignin') || contains(filetext, 'echo')\r\nassert(~illegal);","published":true,"deleted":false,"likes_count":1,"comments_count":0,"created_by":149128,"edited_by":149128,"edited_at":"2025-07-26T07:45:16.000Z","deleted_by":null,"deleted_at":null,"solvers_count":31,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":1,"created_at":"2025-07-23T20:08:07.000Z","updated_at":"2026-02-10T17:11:09.000Z","published_at":"2025-07-24T07:25:21.000Z","restored_at":null,"restored_by":null,"spam":null,"simulink":false,"admin_reviewed":false,"description_opc":"{\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eProblem statement\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eGiven the number of vertices and the number of faces of a given regular polyhedron, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003ecompute the number of its edges\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e with Euler characteristic, a powerful generic formula linking these three.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eExamples \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e-\u0026gt;\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003echeck the test suite\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eForbidden functions / expressions\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eregexp\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eassignin\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003estr2num\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eecho\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eSee also\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:hyperlink w:docLocation=\\\"https://fr.mathworks.com/matlabcentral/cody/groups/57483\\\"\u003e\u003cw:r\u003e\u003cw:t\u003eMesh processing\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:hyperlink w:docLocation=\\\"https://fr.mathworks.com/matlabcentral/fileexchange/85173-mesh-generation-toolbox?s_tid=prof_contriblnk\\\"\u003e\u003cw:r\u003e\u003cw:t\u003eMesh generation toolbox\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\",\"relationship\":null}],\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"target\":\"/matlab/document.xml\",\"relationshipId\":\"rId1\"}]}"},{"id":2175,"title":"Slicing the cube","description":"A bored matlab enthusiast has a cube with volume n^3.\r\nHe decides to paint the entire surface of the cube red. Then, with slices parallel to the faces of the cube, he cuts the cube into 1x1x1 cubes.\r\n\r\nSome cubes are completely free of paint:x \r\n\r\nSome cubes are painted red on only one side:y\r\n\r\nSome cubes are painted red on two sides:z\r\n\r\n\r\nHelp him find x,y \u0026 z\r\n\r\n\r\n","description_html":"\u003cp\u003eA bored matlab enthusiast has a cube with volume n^3.\r\nHe decides to paint the entire surface of the cube red. Then, with slices parallel to the faces of the cube, he cuts the cube into 1x1x1 cubes.\u003c/p\u003e\u003cp\u003eSome cubes are completely free of paint:x\u003c/p\u003e\u003cp\u003eSome cubes are painted red on only one side:y\u003c/p\u003e\u003cp\u003eSome cubes are painted red on two sides:z\u003c/p\u003e\u003cp\u003eHelp him find x,y \u0026 z\u003c/p\u003e","function_template":"function [x y z] = cube_slices(n)\r\n x=\r\n y=\r\n z=\r\nend","test_suite":"%%\r\nn=5\r\ny_correct=[27 54 36]\r\nassert(isequal(cube_slices(n),y_correct))\r\n\r\n%%\r\nn=3\r\ny_correct=[1 6 12]\r\nassert(isequal(cube_slices(n),y_correct))\r\n\r\n%%\r\nn=7\r\ny_correct=[125 150 60]\r\nassert(isequal(cube_slices(n),y_correct))","published":true,"deleted":false,"likes_count":10,"comments_count":0,"created_by":17228,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":92,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":26,"created_at":"2014-02-11T19:13:57.000Z","updated_at":"2026-02-19T10:22:38.000Z","published_at":"2014-02-11T19:13:57.000Z","restored_at":null,"restored_by":null,"spam":false,"simulink":false,"admin_reviewed":false,"description_opc":"{\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"relationshipId\":\"rId1\",\"target\":\"/matlab/document.xml\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/output\",\"relationshipId\":\"rId2\",\"target\":\"/matlab/output.xml\"}],\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"relationship\":[],\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eA bored matlab enthusiast has a cube with volume n^3. He decides to paint the entire surface of the cube red. Then, with slices parallel to the faces of the cube, he cuts the cube into 1x1x1 cubes.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eSome cubes are completely free of paint:x\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eSome cubes are painted red on only one side:y\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eSome cubes are painted red on two sides:z\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eHelp him find x,y \u0026amp; z\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\"},{\"partUri\":\"/matlab/output.xml\",\"contentType\":\"text/xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\" standalone=\\\"no\\\" ?\u003e\u003cembeddedOutputs\u003e\u003cmetaData\u003e\u003cevaluationState\u003emanual\u003c/evaluationState\u003e\u003clayoutState\u003ecode\u003c/layoutState\u003e\u003coutputStatus\u003eready\u003c/outputStatus\u003e\u003c/metaData\u003e\u003coutputArray type=\\\"array\\\"/\u003e\u003cregionArray type=\\\"array\\\"/\u003e\u003c/embeddedOutputs\u003e\"}]}"},{"id":60979,"title":"Mesh the cube","description":"Problem statement : mesh the cube with quadranglar / squared faces\r\n\r\nAn cube / regular hexahedron is a regular polyhedron with 8 vertices and 6 squared / quadrangular faces. It is also one of the five well known platonic solids.\r\nA quadrangular mesh F (stands for faces here) is simply a N x 4 matrix of positive integers where each row contains the vertex indices of squared faces, and where N is the number of faces. \r\n\r\nYour task here is to mesh this cube. To do so, you will list the squares/rows in a matrix of faces, F. You will also be careful to always keep the faces coherently / consistently oriented (all clockwise or all counterclockwise : square [1, 2, 3, 4] and [4, 3, 2, 1] are distinct).\r\nOn the other hand [1, 2, 3, 4], [2, 3, 4, 1], [3, 4, 1, 2] and [4, 1, 2, 3] are one same unique square.\r\nThe row order of the faces in the list doesn't matter.\r\n\r\nEdit / update\r\nFaces orientation not taken into account anymore, because of too many possible cases to check in the tests (!)\r\n\r\nExample\r\nThe first square (Z \u003e 0) here can be [1, 2, 3, 4] if counterclockwise oriented (normals outward).\r\n\r\n\r\n\r\nForbidden functions / expressions\r\nregexp\r\nassignin\r\nstr2num\r\necho\r\n\r\nSee also\r\nMesh processing\r\nMesh generation toolbox","description_html":"\u003cdiv style = \"text-align: start; line-height: 20.4333px; min-height: 0px; white-space: normal; color: rgb(0, 0, 0); font-family: Menlo, Monaco, Consolas, monospace; font-style: normal; font-size: 14px; font-weight: 400; text-decoration: rgb(0, 0, 0); white-space: normal; \"\u003e\u003cdiv style=\"block-size: 1194.73px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 408px 597.367px; transform-origin: 408px 597.367px; vertical-align: baseline; \"\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 229.433px 8px; transform-origin: 229.433px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eProblem statement : mesh the cube with quadranglar / squared faces\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 42px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 21px; text-align: left; transform-origin: 385px 21px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 376.933px 8px; transform-origin: 376.933px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eAn cube / regular hexahedron is a regular polyhedron with 8 vertices and 6 squared / quadrangular faces. It is also one of the five well known platonic solids.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 42px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 21px; text-align: left; transform-origin: 385px 21px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 68.8583px 8px; transform-origin: 68.8583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eA quadrangular mesh \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 4.275px 8px; transform-origin: 4.275px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eF\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 36.9417px 8px; transform-origin: 36.9417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e (stands for \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 16.725px 8px; transform-origin: 16.725px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003efaces\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 54.8417px 8px; transform-origin: 54.8417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e here) is simply a \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 5.05833px 8px; transform-origin: 5.05833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eN\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 185.533px 8px; transform-origin: 185.533px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e x 4 matrix of positive integers where each row contains the vertex indices of squared faces, and where \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 5.05833px 8px; transform-origin: 5.05833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eN\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 74.6667px 8px; transform-origin: 74.6667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e is the number of faces. \u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 63px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 31.5px; text-align: left; transform-origin: 385px 31.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 296.108px 8px; transform-origin: 296.108px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eYour task here is to mesh this cube. To do so, you will list the squares/rows in a matrix of faces, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 7.25833px 8px; transform-origin: 7.25833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eF. \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 80.6583px 8px; transform-origin: 80.6583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eYou will also be careful to always keep the faces coherently / consistently oriented (all clockwise or all counterclockwise : square \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 31.1px 8px; transform-origin: 31.1px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e[1, 2, 3, 4]\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 15.5583px 8px; transform-origin: 15.5583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e and \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 17.4917px 8px; transform-origin: 17.4917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e[4, 3, 2, 1]\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 40.0583px 8px; transform-origin: 40.0583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e are distinct).\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 58.3417px 8px; transform-origin: 58.3417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eOn the other hand \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 31.1px 8px; transform-origin: 31.1px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e[1, 2, 3, 4]\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 3.88333px 8px; transform-origin: 3.88333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 66.0833px 8px; transform-origin: 66.0833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e[2, 3, 4, 1], [3, 4, 1, 2]\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 15.5583px 8px; transform-origin: 15.5583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e and \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 31.1px 8px; transform-origin: 31.1px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e[4, 1, 2, 3]\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 92.975px 8px; transform-origin: 92.975px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e are one same unique square.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 158.842px 8px; transform-origin: 158.842px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eThe row order of the faces in the list doesn't matter.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 41.9833px 8px; transform-origin: 41.9833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eEdit / update\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 342.275px 8px; transform-origin: 342.275px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eFaces orientation not taken into account anymore, because of too many possible cases to check in the tests (!)\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 28.7833px 8px; transform-origin: 28.7833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eExample\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 50.5583px 8px; transform-origin: 50.5583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eThe first square \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 20.8083px 8px; transform-origin: 20.8083px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e(Z \u0026gt; 0)\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 42.7833px 8px; transform-origin: 42.7833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e here can be [\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 29.1583px 8px; transform-origin: 29.1583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e1, 2, 3, 4]\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 148.208px 8px; transform-origin: 148.208px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e if counterclockwise oriented (normals outward).\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 378px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 189px; text-align: left; transform-origin: 385px 189px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" width=\"504\" height=\"378\" style=\"vertical-align: middle;width: 504px;height: 378px\" src=\"data:image/png;base64,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\" data-image-state=\"image-loaded\"\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 114.308px 8px; transform-origin: 114.308px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eForbidden functions / expressions\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cul style=\"block-size: 81.7333px; counter-reset: list-item 0; font-family: Helvetica, Arial, sans-serif; list-style-type: square; margin-block-end: 20px; margin-block-start: 10px; margin-bottom: 20px; margin-top: 10px; perspective-origin: 392px 40.8667px; transform-origin: 392px 40.8667px; margin-top: 10px; margin-bottom: 20px; \"\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 21.4px 8px; transform-origin: 21.4px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eregexp\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.6833px 8px; transform-origin: 25.6833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eassignin\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.2833px 8px; transform-origin: 25.2833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003estr2num\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 15.175px 8px; transform-origin: 15.175px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eecho\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003c/ul\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 28.3917px 8px; transform-origin: 28.3917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eSee also\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003ca target='_blank' href = \"https://fr.mathworks.com/matlabcentral/cody/groups/57483\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"\"\u003eMesh processing\u003c/span\u003e\u003c/span\u003e\u003c/a\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003ca target='_blank' href = \"https://fr.mathworks.com/matlabcentral/fileexchange/85173-mesh-generation-toolbox?s_tid=prof_contriblnk\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"\"\u003eMesh generation toolbox\u003c/span\u003e\u003c/span\u003e\u003c/a\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function F = mesh_the_cube()\r\n  F = 1;\r\nend","test_suite":"%%\r\nF_correct = [1 2 3 4;\r\n             8 7 6 5;\r\n             1 4 8 5;\r\n             2 1 5 6;\r\n             3 2 6 7;\r\n             4 3 7 8];\r\n\r\n% Check every possible solutions\r\nassert(isequal(sortrows(sort(mesh_the_cube(),2)),sortrows(sort(F_correct,2))))\r\n\r\n%% Forbidden functions\r\nfiletext = fileread('mesh_the_cube.m');\r\nillegal = contains(filetext, 'regexp') || contains(filetext, 'str2num') || contains(filetext, 'assignin') || contains(filetext, 'echo')\r\nassert(~illegal);","published":true,"deleted":false,"likes_count":1,"comments_count":4,"created_by":149128,"edited_by":149128,"edited_at":"2025-07-26T07:44:33.000Z","deleted_by":null,"deleted_at":null,"solvers_count":42,"test_suite_updated_at":"2025-07-23T16:15:41.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2025-07-23T10:23:00.000Z","updated_at":"2026-03-31T18:43:29.000Z","published_at":"2025-07-23T10:53:38.000Z","restored_at":null,"restored_by":null,"spam":null,"simulink":false,"admin_reviewed":false,"description_opc":"{\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eProblem statement : mesh the cube with quadranglar / squared faces\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eAn cube / regular hexahedron is a regular polyhedron with 8 vertices and 6 squared / quadrangular faces. It is also one of the five well known platonic solids.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eA quadrangular mesh \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eF\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e (stands for \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003efaces\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e here) is simply a \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eN\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e x 4 matrix of positive integers where each row contains the vertex indices of squared faces, and where \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eN\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e is the number of faces. \u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eYour task here is to mesh this cube. To do so, you will list the squares/rows in a matrix of faces, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eF. \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003eYou will also be careful to always keep the faces coherently / consistently oriented (all clockwise or all counterclockwise : square \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e[1, 2, 3, 4]\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e and \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e[4, 3, 2, 1]\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e are distinct).\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eOn the other hand \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e[1, 2, 3, 4]\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e[2, 3, 4, 1], [3, 4, 1, 2]\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e and \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e[4, 1, 2, 3]\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e are one same unique square.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe row order of the faces in the list doesn't matter.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eEdit / update\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eFaces orientation not taken into account anymore, because of too many possible cases to check in the tests (!)\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eExample\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe first square \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e(Z \u0026gt; 0)\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e here can be [\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e1, 2, 3, 4]\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e if counterclockwise oriented (normals outward).\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:customXml w:element=\\\"image\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"height\\\" w:val=\\\"378\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"504\\\"/\u003e\u003cw:attr w:name=\\\"verticalAlign\\\" w:val=\\\"middle\\\"/\u003e\u003cw:attr w:name=\\\"altText\\\" w:val=\\\"\\\"/\u003e\u003cw:attr w:name=\\\"relationshipId\\\" w:val=\\\"rId1\\\"/\u003e\u003c/w:customXmlPr\u003e\u003c/w:customXml\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eForbidden functions / expressions\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eregexp\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eassignin\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003estr2num\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eecho\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eSee also\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:hyperlink w:docLocation=\\\"https://fr.mathworks.com/matlabcentral/cody/groups/57483\\\"\u003e\u003cw:r\u003e\u003cw:t\u003eMesh processing\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:hyperlink w:docLocation=\\\"https://fr.mathworks.com/matlabcentral/fileexchange/85173-mesh-generation-toolbox?s_tid=prof_contriblnk\\\"\u003e\u003cw:r\u003e\u003cw:t\u003eMesh generation toolbox\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\",\"relationship\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/image\",\"target\":\"/media/image1.png\",\"relationshipId\":\"rId1\"}]},{\"partUri\":\"/media/image1.png\",\"contentType\":\"image/png\",\"content\":\"data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAABaAAAAQ4CAIAAABwgOwFAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAF1kSURBVHhe7d0JtGVVfeB/LYpiKjUEWEyN04q0iQSN/JFEoFFD27o0aQYR0TYoOCSmY2ewY1qDRHAAjWKwkjQqJq4EodXgnGBHUcGgJlHiFIlDEwREQCiDiEVRVP0Pb19OLnd4dYcz/PY5n8+q9Tjvvuq12rfvPnfvb845dT8AAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAIGtr1qw5+eST3/e+9918882bN2/etGnTNddcc+GFFx555JGDvwEAAAAQ2cMf/vCvfvWr26a4+OKL169fP/irAAAAAAHtvffeN9xwQ2oZV1111Stf+crjjjvuxBNPfMtb3nL77ben1//2b/928LcBAAAAAjr//PNTxXjf+963du3awasrDjjggKuvvjr99NRTTx28CgAAABDKAx/4wC1btmzbtu3aa6/deeedB68OOfTQQ1Pg+PznPz94CQAAACCUY445JvWLt7zlLYOXxlx//fXFX9iyZcvgewAAarNm8F8AYB4bN2784Ac/eOWVV372s58dvDTmO9/5TvF1hx12GLmBBQAAACAPa9eu3bx587Zt2zZt2jR4CQCA2riCAwBq8YIXvGDHHXcsDi655JL0CgAAAEBO9tprrxtvvHHlGR3bnvzkJw9eBQAAAMjFunXrPv3pT6e68YEPfGDwKgAAAEAu1q5d+9d//depblx99dV77LHH4AcAAAAAWVi/fv0nPvGJVDeuv/76Aw44YPADAAAAgCzsvffeX/ziF1PduPrqq9UNAAAAIDOHHHLIDTfckOrGP/7jP+61116DHwAAAABk4ZhjjrnjjjtS3fjIRz6yfv36wQ8AAAAAsnDqqaemtFF485vfPHgVAAAAIBcnn3zyoG1s2/arv/qrg1cBAAAAcnHUUUcN2sa2bcccc8zgVQAAAIBcrFu37pprrkl14yUvecngVQAAWnL/wX8BgHm87GUve+Mb31gc3H333R/60IfSi9M8+9nP3rRp0+AbAAAAgCC++tWvpss3ZuHfVQEAAAAi2rJly6BezEDgAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAACAqe4/+C8AUIlt2wYHhfv7nAUAaIiFFwBUZ7hujNM7AABqY6UFAFVYPW1MI3kAAFTEugoAljOeNq655p6vGzbc8/WNb7zn64z0DgCARVlIAcCixtPGm998v+OPHxynwDFO8gAAqIFlEwDMb2LaSLYbOEbM1TsKkgcAwCQWSQAwp5G6UaaNZN7AMc4lHgAA87MqAoCZrZ42kuUDxzjJAwBge6yBAGAGq9yTMqKOwDFC7wAAGGPRAwCrmj1tJA0EjnGSBwDQe5Y4ADDFvGkjaSVwjPDgUgCgfyxoAGDMYmkjiRA4xrnEAwDoOisYALivWZ4kuoqYgWOc5AEAdIv1CgDca8m0keQSOEboHQBA5ixQAGC5e1JGZBo4xkkeAEBWLEcA6LcK00bSmcAxwoNLAYDYLD4A6KvK00bS1cAxziUeAEAkVhsA9FIlj9uYqD+Bo1TGize8YXAwC8kDAKiUtQUAPVNf2kh6FThWjxR6BwDQIIsJAHqj7rSR9CdwLJAkJA8AoDaWDgD0QE2P25ioJ4GjkvowV+8oSB4AwHQWCgB0WpNpI+lD4KgvNLjEAwBYlJUBAB3VfNpIOh84Gs4KkgcAMBvrAAC6qJnHbUzU7cDRekHQOwCAKXzwA9AtLaaNpMOBI2YvkDwAgBU+5gHoitbTRtLVwJFLGvDgUgDoKx/qAOSvrcdtTNTJwJF1BXCJBwD0g09xAHIWKm0k3Qsc3dvzSx4A0EU+swHIU8C0kXQpcPRkb++uFgDoBJ/QAGQoyOM2JupM4OjzNt4lHgCQIR/JAGQlctpIuhE4bNpHSB4AEJ4PYAAyET9tJB0IHPbn26V3AEA8PnEBCC/s4zYmyj1w2I0vRvIAgLb5fAUgsLzSRpJ14LDxrooHlwJA43yaAhBSjmkjyTdw2GPXyiUeAFAzH58AxJPL4zYmyjRw2FE3T/IAgEr5sAQgkqzTRpJj4LB5jkDvAIDl+HQEIIZ870kZkVfgsE+OY3wszj57cDALQwlA7/ksBKBtnUkbSUaBw5Y4jlnGYq7eUTC+APSMTz4A2tOxtJHkEjjsfuNYeCxc4gEAQ3zUAdCGTqaNJIvAYa8bR7VjIXkA0GM+2ABoXAeeJLqK+IHDtjaOusdC7wCgT3ySAdCgbqeNJHjgsImNo5WxkDwA6C6fWwA0osP3pIyIHDjsV+MIMhYeXApAh/iUAqBm/UkbSdjAYWsaRPCBcIkHANnysQRAbcbTxpve1P0dUczAYSMaRI4DIXkAkAkfQgDUY6RuvOlN93ztw+YnYOCw5wyiGwOhdwAQlU8dAKrW27SRhAoctpdxdHgsJA8AYvAZA0B1JqaNQq+2NHECh51kHL0aCw8uBaAlPlEAqMLEx20kfdu9BAkcNo1xGAuXeADQCB8hACxnlbRR6OFeJULgsEWMw1hMJHkAUAMfGAAsavW0UejntqT1wGE3GIexmJHeAUAVfEIAsJBpj9tI+rwDaTdw2PvFYSyWIXkAMD+fBwDMafW0Uej5ZqPFwGGbF4exqJYHlwIwA2d/AGa23bRRsK9oJXD4tcdhLJrhEg8AxjjdAzCD7T5uI7GLKDQfOPza4zAWLZI8AHrPyR2AVUkb82o4cPjNx2Es4ijG4qyzBsczMnwA+XMqB2CKGdNGwcZgWJOBw28+DmMRx7SxmCt5GFCADDl3AzDJLI/bSGwDRjQTOPzaQzEcccw1FpIHQLc4UwNwX7OnjYIV/7gGAodfeyiGI44lx0LvAMicUzMA95orbRSs7yeqO3D4tYdiOOKoYywkD4CsOBEDMM/jNhLr+FXUGjj85kMxHEE0NhAeXMqcfuZnfubLX/7yHXfc8cAHPnDwElAnp12Afps3bRQs2VdXX+Dwmw/FcATR7kC4xIPp1q9f/5nPfObRj370D3/4Q4EDmuE8C9BXC6SNggX6dtUROPzaozEiQQQcCMmDFbvuuuuHP/zhJz3pScWxwAGNcVYF6KV5H7eRWIvPovLA4dceiuGII4ux0Dt6ae+99/7Qhz70uMc9Ln0rcEBjnEYBemaxtFGw8p5RtYHDrz0UwxFHvmMheXTdSSeddO655+65556D7wUOaJCTJkBvLHZPSsEKey4VBg6/+VAMRxxdGgsPLu2QxzzmMW9961uPOOKI9O2f/umfnnDCCXvuuafAAY1xigTogYXTRsFiel5VBQ6/+VAMRxydHwuXeGRrw4YNv/7rv14cfO9733vpS1/63ve+9+abbxY4oEnOiQCdtkzaKFg6L2D5wOHXHo0RiaOfYyF5ZGLDhg3Pe97zzjnnnLPPPvv2228vXhE4oGHOgAAdtWTaKFglL2bJwOHXHo0RicNYJHpHVIceeui3vvWtjRs3Dr4XOKBxTnkAXbTwk0QTC+JlLBM4/OajMSJBGIjVSR5RCRzQMCc4gG5ZMm0UrH2XtHDg8JuPxogEYSDm5cGlYQgc0DCnM4CuWP6elIJl7vIWCBx+7QEZlCAMRCVc4tESgQMa5vwFkL9K0kbBorYS8wYOv/ZojEgcxqI+kkcjBA5omLMVQM6qShsF69eqzBU4/NqjMSJxGIsm6R31EDigYU5PANla/nEbiaVqtWYPHH7z0RiROIxF6ySPKggc0DAnI4AMVZU2ClallUuBo/jFvvWtK99P4TcfjRGJw1jEUY7F618/OJiRQVwhcEDDnHoAslJh2ihYgNbh+OMHv9hpgcOvPSCDEoexCGK7AzFX8ujrsAoc0DAfIQCZqPBxG4ldRE2e8YzBwcTA4dcekEGJw1gEsdhASB5jBA5omE8RgPAqTxsFu4j6rBI4/NoDMihxGIsgqhoIvUPggMb5IAEITNrI0bTA4TcfkEEJwkDEUetY9C95CBzQMB8nAFFV+7iNxC6iARMDh998QAYlCAMRR8Nj0YMHlwoc0DCfKADx1JE2CnYRzRgJHH7tMRmXIAxEHBHGonOXeAgc0DAfKgCR1JQ2CnYRjRkOHH7tARmUOIxFHGHHIvPkIXBAw3yuAMRQx+M2EluIhpWBY8OGwQFxmA5xGIs4MhqLHtzVAizDnAdoW31po2Bt1zyBIyzTIQ5jEUfuY9G/B5cCqzDJAdpTa9ooWMm1QuCIyXSIw1jE0cmxkDygx0xpgJbU97iNxKKtLQJHQKZDHMYiiP4MhN4BfWIOAzSu7rRRsERrkcARjekQh7EIoucD4UEe0F2mK0CDpI0+EDhCMSPiMBZBGIgR2+0dfmOQD9MVoBF1P24jsQiLQOCIw4wIwkDEYSxmMZ48/N4gE+YqQM2aSRsFy68gBI4gzIggDEQcxmK7Jl7N4fcG+Vgz+C8Aldu2bcI9KeoGNMCMCMJAxGEsVvf614/WjRe9aHAA5MOZDqAeDTxuo2TZGoorONplOsRhLOIwFqsYv2qjTBtve9s9X/32IB+u4ACo2siFG/VdtVEoVl0WXlAyHeIwFnEYi1WMX7Xhwg3ImcABUJ2J96TUx5oVhpkRcRiLOIzFNCP3pEgb0AkCB0AVJqYNdQMaY0bEYSziMBYTjaSNgrQBXeGsB7Ccka5RqLVrJNaskXkGR/PMiDiMRRAGYqKRrlFYPW14BgfkxnQFWJS0wUQCR8NMijiMRRAGYty8aSMROCA3blEBWEjDN6Qk1lgwwqSIw1gEYSDGjd+Q4p4U6ChnQIA5jaeNZliz5sIVHI0xKYIwEHEYixFLPmvDFRyQG1dwAMxsW7P/SMowqysYYVIEYSDiMBbDXu8fSYE+EjgAZjAxbagb0BaTIggDEYexKI2kjYK0Ab3hVAiwqpGuUWisaxQsWHPkFpVamRRxGIs4jEUy0jUKS6YNt6hAbkxXgOnauiEl6cyKKv0a+7NAFDjqY5sRh7GIw1gUKk8bicABuXGLCsAkI/ekNHlDStKB5VT6HfatblAf76I4jEUcxqIwfkOKe1Kgr5wTAe5ruGsUGu4aSb4L1pHfXtK39bcrOOpgFxeHsYjDWNT9rA1XcEBuXMEBcK/ycoOSujGL9Hsb/+0l1oUsz7soDmMRRDEQPR+L1/tHUoAJBA6AKWmj+bqR14J1lahRshdied5FcRiLIHo+ECNpoyBtAPfyQQX02/j+vJWrNgpZLFhXzxnD+rz+dotKheyo4zAWQfR5IEa6RqHutOEWFciN6Qr02Mh2va20UQi+eJq9ayQ9XwsKHFWxqQjCQMTR27FoPm0kAgfkxi0qQC8VO/bhTXsrN6SUYq6c0q9o5Bc1CwtBKuGNFISBiKO3YzF+Q4p7UoApfGgBPTOyXW+xayTRFqzz5owR9kIFV3AszxspCAMRRz/HovVnbbiCA3LjCg6gN8YvRmi3bhQLpiBrpvSbGf/9zMsSkOXFmRcYiDh6OBav94+kAIsQOIAeGN+6t3tPSqH11WpZNEZ+M4uxKaUS3kVxGIs4+jYWI2mjIG0AM/PpBXTa+O699XtSCi2uVivJGSNshEa4RWUx3khxGIs4ejUWI12j0HracIsK5MZ0BbprZDMfIW0Uml8n1RE1SpZ94wSOBXgjxWEsgujVQARMG4nAAblxiwrQRcWWfnhX3/oNKUmxQmpykZR+CeoG8XkjxWEsgujVQIzfkOKeFGBRPsaAbhnZzwe5aqPQzGq11pwxzC5oFa7gmIv3UhzGIoj+DET8Z224ggNy4woOoCvGr1boT91I/9vVDbLjvRREMRDGIoieDMTrPUkUqIUPMyB/4xv7OGmjUNNqtbGcMcIuaLtcwTELb6Q4jEUcfRiLsI/bmMgVHJAb0xXIWfC0Uah2VdRW1ChZ5M1C4Ngub6Q4jEUcnR+LvNJGInBAbkxXIFsju/0Op43Wu0ZihTcjgWN13khxGIs4uj0WOaaNROCA3HgGB5ChYsM/vOd/U4x/JGXY8ouh9L9x5H9pW4r/OZZ3VMIbKQ5jEUe3x2L8WRsetwHURuAAsjK+4Y+WNgrLLFXjRI2SXRCVKN5I3ktxGIs4OjwWr7/vk0SlDaB+AgeQiYlpoxt1o4waI/8DI7ALohLeSKEYjji6OhYjaaMgbQCN8AkHhDe+7Q/YNZK5lqoBc8YIu6DFeAbHCG+kUAxHEB1OGyOyThuewQG5MV2BwLqXNuJHjZL13MIEjmHeSKEYjiA6ORAdSxuJwAG5cYsKENVIC4h5Q0qy3aVP8b8l/clC8T/HYo5KeCOFYjiC6ORAjN+Q4p4UoA0+6oB4xtNGZNOWqrnkjBG2QMtzBUfBGykUwxFH98ai28/acAUH5MYVHEAk45c55FU30v//x/9X5MIajkp4I4ViOOLo2Fi83j+SAoQjcAAxjEeByPekFIp1arlUzTpqlOyCqIQ3UiiGI44ujcVI2ihIG0AMPvaAto13geBXbRSKdWruOWOEXVCF+nyLijdSKIYjjs6MxUjXKHQ7bbhFBXJjugKtGskE8dNG91i3Va63gcN7KRTDEUc3xqJvaSMROCA3blEBWjJyT0fwG1K6yqKNShRvJO+lUAxHHN0Yi/EbUtyTAoTk8w9onKs2grAFqknfruDwRorGiMTRgbHo+bM2XMEBuXEFB9Cgkas2CupGWyzXqIQ3UjRGJIhiIHIfi9f7R1KA/AgcQCMmpg11oxUdWHYThDdSNEYkiI6ljYK0AWTCByFQs5GuUdA1WmT/04A+3KLijRSQQQki64EY6RqFnqcNt6hAblzBAdGdeuqpl1xyyW233bZ58+bia3H8ohe9aM2aTCavqzZCsUSjEt5I0RQjYlCCyHcgJl614cINIDc+DiGufffd98Mf/vAhhxwy+H7I17/+9eOOO+6qq64afB+QZ21EY//TmG5fweGNFI0RiSPrujFM1yi5ggNyY7pCUOvXr//iF7/4iEc8ojj+2te+9r//9/++7rrr9thjj1NOOeXxj3988eJNN9108MEH33jjjSt/PRJpIyCLsyZ1OHB4I0VjROLIdCykjdUJHJAb0xWCOuuss17+8pcXB+9///uf8YxnbN26Nb1eOPfcc3/jN36jOHjHO97xwhe+ML0YgsdtBGRZ1ryuBg7vpWiMSBw5joW0MQuBA3JjukJEa9eu/cEPfrDbbrv96Ec/2m+//W677bbBD1asWbPm+uuv32effe66665dd911y5Ytgx+0SNqIyZqsFd0LHN5IARmUOLIbi5G0UVA3phE4IDceMgoRHX300bvttltx8Fd/9VcjdaOwdevWyy+/vDjYcccdDz300PRia7b591+jsiCjEt5IARmUOPIai9d7kijQcQIHRHTJJZfstttuT3va01772tcOXrqvtWvXpoMf//jH6aAd0kZY9j9UwhspIIMSR0ZjIW0A/eAzEvKzfv36733ve7vtttvGjRv33HPP4cdzNGc8bRCH/U+7OnOLijdSQAYliLwGYjxtMCO3qEBuXMEBmXngAx940UUXpRtY3vSmN7VQN0buSXHVRijFIsw6jEp4IwVkUILIaCBGLtxw1QbQdT4pIQ+HHXbYvvvue8QRR5x88sl77rln8cpFF1100kknpZ82ZOSqjYK0EYrNTxC5X8HhjRSTcQkil4EYuWqjIG0swBUckBvTFfJw2223PeABDxh8c88H7tte/OIXD75pgLQRn+VXHFkHDm+kgAxKHFmMhbRRIYEDcmO6QgbWrFmzefPmjRs37rDDDrvvvnt68Zvf/OZzn/vcz3/+8+nbukgbWbD2CiXfwOGNFJBBiSP+WEgblRM4IDeewQEZ2Lp167p16/baa6+f/Mmf3G+//d7xjncULz7iEY/45Cc/edBBB6W/U4uRuuFxGwEVqy4LLyrhjRSQQYkj+FiMPGuj4HEbQC8JHJCH8mGiN9xwwwtf+MJzzjmnON5ll13OO++89HrFtnmSaA5sfqhE8UbyXgrIoMQRv24MkzaAHvPZCVlat27dTTfd9KAHPag4fvCDH3zttdem1yvgnpRc2PyEldctKt5IMRmXOCKPxXjaoFpuUYHcuIIDsrR58+ZLL700HT/60Y9OB8sauWqj4MKNsCy2qIQ3UkzGJY6wYzHxnhSA3hM4IKJ169YdcsghxxxzzN577z14acydd96ZDtauXZsOFidt5MXmh0p4I8VkXIIoBiLmWExMG+oGwAqBAyJ6y1ve8o//+I/vf//7jz766MFLY/bbb790cMstt6SDKv3O79znD0GEXXCTZDRA3kgxGZcgYg6EtAGwPT5HIaLjjjvur/7qr4qDyy677KijjkovDnv4wx/+jW98Y4cddvjhD3/4Ez/xE+UjSBc0/tyN1bm4oxV2PsGVA3T88YODmM/g8EYKy9AEEbZuDNM1muEZHJAb0xUiWrt27bXXXrvPPvsUx8985jPf+973pteTXXfd9WMf+9gRRxxRHL/uda975StfmV5fXBk4yo1ZYaWwzEryqJvVVXDDAxQ5cHgjxWRc4gg4FtJGiwQOyI3pCkGdeOKJF110UXFw1113nXbaaX/6p3962223rVmz5uijj/7DP/zDn/3Zny1+9JWvfOVxj3vcpk2bVv5fLGFi4BgxV+8oSB4VsrQKbmSAwgYOb6SYjEsc0cZC2midwAG5MV0hrpe//OVnnXVWOr777rvvuOOOnXfeeccdd0yvXHnllU996lNvvPHG9O1SZgkc41zi0QzrquDGByhm4PBGism4xBFqLEbSRkHdaIXAAbkxXSG0I4888pxzzjnkkEMG36+46aabNmzYcPbZZ2/evHnw0pIWCxzjJI9qWVEFN22AAgYO76WYjEscccZC2ghF4IDcmK6QgQMOOOCQQw7Zaaedtm7d+q//+q//8A//MPhBVaoKHCP0jmVYTgW3ygCFChzeSGEZmjiCjIW0EZDAAbkxXYHaAsc4yWNG1lLBrT5AcQKHN1JYhiaOIGPhcRsxCRyQG9MVaDBwjPDg0okspILb7gAFCRzeSGEZmjgijIW0EZnAAbkxXYH2Ase4nl/iYQkV3yxjFCFweC+FZWiCiDAQ0kZ8AgfkxnQFIgWOcf1JHtZPwc0+QO0GDm+kyIxOEK0PhMdt5ELggNyYrkDswDGiq73D4im4uQaoxcDhjRSZ0Qmi3YGQNvIicEBuTFcgq8AxrgPJw8opuHkHqK3A4Y0UlqGJo8WxkDZyJHBAbkxXIPPAMSK7B5daNgW3wAC1Eji8kcIyNHG0OBYet5EpgQNyY7oC3Qoc48Je4mHBFNzCA9R84PBeCsvQxNHWWEgbWRM4IDemK9D1wDEuQvKwWgpumQFqMnB4I0VmdOJoZSykjQ4QOCA3pivQv8AxovneYakU3JID1Fjg8EaKzOjE0fxYeNxGZwgckBvTFeh94BhXa/KwTgpu+QFqJnB4I0VmdOJoeCykjY4ROCA3pisgcGxPhQ8utUgKrpIBaiBweCNFZnTiaHIspI1OEjggN6YrIHDMb4FLPCyPgqtwgOoOHN5LkRmdIBoeCI/b6CqBA3JjugICRxXmSh5vfvPggCCqXbzWFzgssoMzQEE0ORDSRrcJHJAb0xUQOGqgd2Sk8pVrTYHDCjs4AxREYwPhnpQ+EDggN6YrIHA0QvKIqY5lax2Bw/I6MqMTRzNjIW30h8ABuTFdAYGjDfM+uFTyqENNa9bKA4e1dWRGJ44GxkLa6I+0NHr72+/5appDPkxXQOCIwSUeTap1tVpt4LCwjszoxFH3WEgbPVGuiBKBA3JjugICR1SSR03qXqpWFTgsqYMzQHE0XDekje4Z6RolgQNyY7oCAkcm9I5KNLBOrSRwWE8HZ4DiqHUspI1um9Y1SgIH5MZ0BQSObEke82pmkbp84LCYDs4AxVHfWLgnpdu2mzYSgQNyY7oCAkeHSB7TNLk8XTJwWEkHZ4DiqGkspI0Om7FrlAQOyI3pCggc3aV3JA2vTRcOHNbQ8RmjIKQN5jJv1ygJHJAb0xUQOPqkh8mj+YXpYoHDAjo4AxRHM3VD2uiAhbtGSeCA3JiugMDRY3P1jkJ2yaOVVekCgcPqOTgDFEcdYyFtdMzyXaMkcEBuTFdA4GBIly7xaGtJOm/gsHQOzgDFUflYSBtdUmHXKAkckBvTFRA4WFWOyaPdxehcgcO6OTgDFEe1Y+FxG51RR9coCRyQG9MVEDiYR/ze0fpKdMbAYcUcnAEKpcLhkDa6odauURI4IDemKyBwsJxQySPCMjTNo+L/J29968r3k1guB2eAQqlqOKSNDmima5QEDsiN6QoIHFSqxQeXBlmDFvMo/f9kWuCwVg7OAIVS1XB43EbuGk4bicABuTFdAYGDmjVziUecBegznjE4mBg4LJSDM0ChVDIc0ka+WokawwQOyI3pCggcNK7a5BFt6blK4LBKDs4AxSFt9FbrUWOYwAG5MV0BgYO2LdM7Aq47JwYO6+PgDFAoyw+Hx21kJ1TXKAkckBvTFRA4iGeu5HHOOYODIMYDh8VxcAYolCWHQ9rISMyoMUzggNyYroDAQXjzPri03eQxEjisjIMzQKEsMxzSRhbiR41hAgfkxnQFBA4yFPkSj+HAYVkcnAEKpcK6IW2EklfUGCZwQG5MV0DgoBPiJI8ycGzYMDggJpuWUBYeDmkjrHy7RknggNyYroDAQRe12DsEjvhsV6JZbESkjYA6EDWGCRyQG9MVEDjoh8aSh8ARnL1KNAuMiMdthNKxqDFM4IDcmK6AwEEv1ffgUoEjMhuVaOYdEWkjiA5HjWECB+TGdAUEDlhR1SUeAkdYdinRzDUi0kYEPekaJYEDcmO6AgIHTLFY8hA4ArI/iWbeEfG4jRb1LWoMEzggN6YrIHDAbObqHddeK3BEYXMSzVwjIm20os9RY5jAAbkxXQGBAxY1V/J4+csHBzTJziSa2UfEPSkNEzXGCRyQG9MVEDigIvM+uFTyqJttSTQzjoi00RhRY3UCB+TGdAUEDqhUOY82bLjfFVcMjmehd1TLniSaWUZE2miGrjEjgQNyY7oCAgdUajhwjJM8GmA3EtB2B0XaqJuosQCBA3JjugICB1Rq9cAxQu+onK1IQPPWDWmjKqLGkgQOyI3pCggcUKm5Asc4yWMZ9iEBrT4o0kblRI0KCRyQG9MVEDigCuU8esYzBgdV/TOxkseMbEICWmVQ3JNSLV2jDgIH5MZ0BQQOWML4pqLywDFC75jIDiSgaYMibVRF1KibwAG5MV0BgQPmtPqmou7AMa7nycPeIyBpoz6iRpMEDsiN6QoIHDCbGfcVzQeOEXP1jkLWycPGI6AZ64a0MTtRoy0CB+TGdAUEDphugX1F64FjXFcv8bDrCGjioEgbi9E1WidwQG5MV0DggDHL7CsCBo5xHUgethwBjQ+KtDEvUSMUgQNyY7oCAgesqGpfkUXgGJFX77DZiGlkXDxuY3aiRlgCB+TGdAUEDvqt8q1FjoFjXNjkYacR0/C4SBuzEDWyIHBAbkxXQOCgf2rdWnQjcIwI8uBS24yYynGRNlYnamRH4IDcmK6AwEE/NLa16GTgGNf8JR72GDFNqxvSRknXyJfAAbkxXQGBg05rfmvRk8AxrtbkYYMRUxoXaWOcqNENAgfkxnQFBA46p92tRW8Dx4iqeoetRVjF0Egbw0SN7hE4IDemKyBw0BVBdhcCxzQLJA/7ipjG00ahn3VD1Og2gQNyY7oCAgc5C7i7EDhmNO+DS3/v9wYHtOusswYHpR6mDV2jJwQOyI3pCggcZCjy7kLgWNhcyUPvaF7P04ao0UMCB+TGdAUEDjKRy+5C4KiQ5BHHSN3oSdoQNXpO4IDcmK6AwEFgOe4uBI766B2t6FvaEDUoCRyQG9MVEDiIJ+sNhsDRJMmjVr1KG7oG4wQOyI3pCggcxNCZ3YXA0SIPLq1KTx63IWqwOoEDcmO6AgIHrereBkPgCMUlHvPqfNoQNZidwAG5MV0BgYPGdXuDIXAEJ3lM0+G0IWqwGIEDcmO6AgIHTenJHkPgyIvekXTycRu6BksSOCA3pisgcFCnHm4wBI7c9S15dCxtiBpUSOCA3JiugMBB1Xq+wRA4OqbDDy7tzD0pogY1ETggN6YrIHBQEXuMRODovA5c4tGBtOGEQwMEDsiN6QoIHCzBHmOcwNFDGSWPrNOGEw4NEzggN6YrIHAwP9uMVQgcxOwd+aYNJxzaInBAbkxXQOBgNvYYMxI4GNd68sjuSaJOOEQgcEBuTFdA4GBVthnzEjiYRWPJI6O04WxDNAIH5MZ0BQQOxthmLEPgYAF19I4s7klxtiEygQNyY7oCAgcrbDOqInBQiWWSR/y04YRDFgQOyI3pCggc/WabUTmBgzrM1TuGxUkbzjZkR+CA3JiugMDRP7YZtRI4aMZ2k0eEtOFsQ9YEDsiN6QoIHL1hp9EMgYO2lMmj3bThVENnCByQmzWD/wLQScVOo/wDdNvjHz84aIVTDQBtEzgAushOA2hAeapxtgEgAIEDoCvsNIAGONUAEJXAAZAzOw2gAU41AORA4ADIkJ0G0ACnGgCyInAAZKLcadhsAPVxqgEgWwIHQGx2GkDdyvOMUw0AORM4AOKx2QDq5jwDQOcIHABh2GwAtSpPMs4zAHSRwAHQKvsNoG5OMgD0g8AB0Lhys2G/AdTEeQaA/hE4AJpiswE0w3kGgF4SOADqVEYN+w0AAKiTwAFQA1EDmMevHnvsbR//ePFnjwc9aPASADAngQOgImXU0DWAeRz44Ae/+aUvfcCuuxZ/Bi8BAPMTOACWI2oAS1izZs1FZ5yxy047Db4HABYlcADMr4waugawnFe/4AU/d+CBg28AgCUIHAAzEzWASh1+8MG//7znFQf/dvvt6RUAYGECB8CqyqihawCVWr/LLu9+9auLg49eccXffO5z6UUAYGECB8AYUQOo3x+/7GUP3nvvmzZuPPV1rxu8BAAsQeAAuJeoATTlhCc96Vee+tTi4MVnn33jrbemFwGAZQgcQL+VUUPXAJqy7x57nPfylxcHf/7Rj37gssvSiwDAkgQOoJdEDaA9f/kHf7D7Ax7wrzfc8BtvfvPgJQBgaQIH0Ce6BtC23z7ppCcdckhx8CtnnHH7j3+cXgQAlidwAD2gawAxHPTwh5/1a79WHJz9l395+Ze+lF4EACohcADdpWsAkazbcceLzjxzx7Vrv/Ltb//+eecNXgUAKiJwAJ2jawAhveHXf/1RD3vYnXfd9axXvWrL3XcPXgUAKiJwAF2hawCBHX3oof/jmc8sDs78sz/71nXXrdtxx+E/O6wZLMnKV9bc+woAMKP7D/4L9FkZBY4/fnCQEUWDaJ7xjMHBhg2DA7jf/d7+e7/3gl/+5cE3M3jay17211dcMfhmdun/yQtfuPINsJy3v/2er/e3Y4Js+D8OAHlyvQYAADBEjwSyuoJD0SA+V3AwyUn/+T8ffvDBg2/GPPlxj3vEAQcUB+/40IfuvOuu4uBPLr74n6++euWH83AFB1TIFRyQG9MVyCFw6BpkROBgfheeccazjj66ONjzqU+95d/+Lb24CIEDKiRwQG7cogIEts19KAAAwEwEDiAeXQMAAJiTwAGEoWsAAACLEjiAtukaAADA0gQOoCW6BsC9TnrVq+7/+McXf5Z6wigA9JvAATRL1wAAAGogcACN0DUAAIA6CRxAnXQNAACgEQIHUANdAwAAaJbAAVRH1wAAAFoicABL0zUAAIC2CRzAonQNAAAgDIEDmJOuAQAAxCNwALPRNQAAgMAEDmBVugYAAJADgQOYRNcAAACyInAAQ3QNAAAgTwIHAAAAkD2BAwAAAMiewAEAAABkT+AAAAAAsidwAAAAANkTOAAAAIDsCRwAAABA9gQOAAAAIHsCBwAAAJA9gQMAAADInsABAAAAZE/gAAAAALIncAAAAADZEzgAAADua9u2wQGQD4EDAABgxbZtgz9AhgQOAACg33QN6ASBAwAA6CVdA7pF4AAAAPpE14COEjgAAIAe0DWg6wQOAACgu3QN6A2BAwAA6BxdA/pH4AAAADpE14C+EjgAAID8uWQDek/gAAAAsqVrAPcSOAAAgNzoGsAYgQMAAMiErgFMJ3AAAACx6RrADAQOAAAgJF0DmIfAAQAARKJrAAsROAAAgAB0DWA5AgcAANAqXQOogsABAAC0wSUbQKUEDgAAoEG6BlAPgQMAAKifrgHUTOAAAABqo2sATRE4AACAqukaQOMEDgAAoCK6BtAegQMAAFiOrgEEIHAAAAAL0TWASAQOAABgHroGEJLAAQAAzEbXAAITOAAAgFW5ZAPIgcABAABMomsAWRE4AACAIboGkCeBAwAA0DWA7AkcAADQY7oG0BUCBwAA9I+uAXSOwAEAAL2hawDdJXAAAEDX6RpADwgcAADQUboG0CcCBwAAdEgZNXQNoGcEDgAAyJyoASBwAABAlkQNgPsSOAAAIBOiBsB0AgcAAMQmagDMQOAAAIB4yqihawDMRuAAAIAYRA2AJQgcAADQHlEDoCICBwAANE7UAKiawAEAAI0oo4auAVADgQMAAGojagA0ReAAAIBKiRoAbRA4AACgCqIGQKsEDgAAWFQZNXQNgLYJHAAAMA9RAyAkgQMAALZH1AAIT+AAAIBJRA2ArAgcAAAwRNQAyJPAAQBA75VRQ9cAyJbAAQBAL4kaAN0icAAA0BuiBkB3CRwAAHSdqAHQAwIHAABdVEYNXQOgHwQOAAC6QtQA6DGBAwCAnIkaAKwQOAAAyJCoAcB9CRwAAGSijBq6BgBjBA4AAAITNQCYjcABAEAwogYA8xM4AACIQdQAYAkCBwAA7Smjhq4BwHIEDgAAmiVqAFADgQMAgPqJGgDUTOAAAKAeogYADRI4AAColKgBQBsEDgAAllZGDV0DgJYIHAAALETUACASgQMAgJmJGgBEJXAAALA9ogYA4QkcAABMUkYNXQOAHAgcAADcS9QAIFsCBwBAv4kaAHSCwAEA0EuiBgDdInAAAPRGGTV0DQA6R+AAAOg0UQOAfhA4AAA6R9QAoH8EDgCAbhE1AOglgQMAAADInsABAAAAZE/gAAAAALIncAAAAADZEzgAAACA7AkcAAAAQPYEDgAAACB7AgcAAACQPYEDAAAAyJ7AAQAAAGRP4AAAAACyJ3AAAAAA2RM4AAAAgOwJHAAAAED2BA4AAAAgewIHAAAAkD2BAwAAAMiewAEAAABkT+AAAAAAsidwAAAAANkTOAAAAIDsCRwAAABA9gQOAAAAIHsCBwAAAJA9gQMAAADInsABAAAAZE/gAAAAALIncAAAAADZEzgAAACA7AkcAAAAQPYEDgAAACB7AgcAAACQPYEDAAAAyJ7AAQAAAGRP4AAAAACyJ3AAAAAA2RM4AAAAgOwJHAAAAED2BA4AAAAgewIHAAAAkD2BAwAAAMiewAEAAABkT+AAAAAAsidwAAAAANkTOAAAAIDsCRwAAAD3tW3b4ADIh8ABAACwYtu2wR8gQwIHAADQe7oG5E/gAAAA+solG9AhAgcAANAzugZ0kcABAAD0g64BnSZwAAAAnaZrQD8IHAAAQBfpGtAzAgcAANAhugb0lcABAADkT9eA3hM4AACAbOkawL0EDgAAIDe6BjBG4AAAAPKhawBTCBwAAEB4LtkAtkfgAAAAotI1gJkJHAAAQDC6BjA/gQMAAIhB1wCWIHAAAACt0jWAKggcAABAG3QNoFICBwAA0CBdA6iHwAEAANRP1wBqJnAAAAB10jWARggcAABADVyyATRL4AAAAKqjawAtETgAAICl6RpA2wQOAABgUboGEIbAAQAAzEnXAOIROAAAgNnoGkBgAgcAALAqXQPIgcABAABMomsAWRE4AACA+9I1gAwJHAAAwAqXbAA5EzgAAKDfdA2gEwQOAADoJV0D6BaBAwCqY58AxKdrAB0lcADAcsqtgt0CEJkzFdB1AgcALMRWAciCkxXQGwIHAMys3CfYKgDBOVkB/SNwAMCqyk2CfQIQn/MV0GMCBwBMYpMAZMQpC0DgAIB/V+4QbBKAXDhlAdxL4ACg90QNIDtOXABjBA4AeqncG9geABlx4gKYTuAAoE/sDYAcOXcBzEDgAKDryo2BvQGQF+cugHkIHAB0lI0BkCmnL4CFCBwAdEi5K7AxALLj9AWwHIEDgPzZFQD5cgYDqIjAAUC27AqAfDmDAVRN4AAgN3YFQNacwQDqIXAAkAldA8iakxhAzQQOAGKzJQCy5iQG0BSBA4CQbAmArDmJATRO4AAgElsCIGtOYgDtETgACMCWAMiakxhAAAIHAO2xJQCy5iQGEInAAUDjbAmArDmJAYQkcADQFFsCIGtOYgCxCRwA1MyWAMhXeQZzEgMIT+AAoB62BECmytOXMxhAVgQOACplVwDkqDx3OX0BZEvgAKAKNgZAjpy7ADpE4ABgCfYGQHbKE5dzF0C3CBwAzM/eAMhLedZy4gLoLoEDgJnZHgAZKU9ZzloA/SBwALA9dghALsrzlVMWQP8IHABMYZMA5ML5CgCBA4BR9glAFsqTlfMVACsEDgBW2CcA8ZVnKicrAMYIHAD9ZqsABFeeppypAFiVwAHQS3YL8azfddffPumkT27YcMcnP7n5sstu+/jHP3D22Sc86UmDH0PfOE0BMCeBA6BPbBiiOvIxj/mXiy5602/8xhMe+9hddtppx7VrH7Drrv/1yCPf85rXfOKtb12/666DvwfdVp6jnKYAmJ/AAdADNgyxHX7wwR8755z99tyzOP7oFVc8+/TTj3/FK/7g/PNv2rixeOVJhxxy0RlnrPxF6KLyBOUcBcByBA6ATrNnCG/XnXd+96tfvctOOxXHz3vNa57+spdd+Ld/e/GnPvXq888/+LnP/X/f/W7x+tMe//gnH3bYyl+HTiiLhhMUANUROAC6yM4hHy857rgH7713cXD2X/7lu/76r9OLyY233vpbf/RH6fj5T3taOoCMOTUBUCeBA6BDbB4y9KL/+l+Lr9//wQ/+4Pzz0yvDPvJ3f3fTxo2f+dKX7ti0afAS5KU8Lzk1AVAzgQMgfzYP2XrkQx7yiAMOKA4u+L//d9Odd6YXh23dunXvpz3tyF/7tVNf97rBSxBfeVJyXgKgQQIHQLbsH/L3cwcemA4+9cUvpgPIVXlGclICoCUCB0BubCE65LBHPSodXHXNNcXXh+yzz6tf8IKP/OEfXv+hD11yzjlv+c3ffORDHpL+AgTljARAGAIHQCbsIrpo75/8yXTwreuue+kzn/nN97znVaec8rTHP36/Pff8L4cd9j+e+cyvX3jhmS96Ufo7EEV5OnJGAiASgQMgNruITttt553TwW+eeOIf/eZv7rh27Tevvfaij3+8+FMcpB/9/vOet+F3ficdQ2vKc5HTEQBRCRwAIdlI9MOaNYMP4rNe8pIf33nnr5xxxoEnnnjSq15V/CkOim/v2rKl+OmvH3/80w8/PP1NaE55InIuAiAHAgdAJPYSfbXDmjUnn3nmX1xyyeD7FcW3v/mWt6TjVz7veekA6lWehZyIAMiNwAEQgO1E733ua19776WXDr4Z8icXX3zdTTcVBz//qEc9cLfd0otQPWchAPIncAC0x46i9zZt3pwOPn3llelg3Ge+/OV08Pif/dl0ANUoT0HOQgB0gsAB0Dg7Cu618bbb0sG/fOc76WDc7XfckQ52XrcuHcDiyvOPUxAAnSNwADTFpoIxV3z1q+ngofvskw7GlQ8iLS/3gPmUJx/nHwA6TeAAqJl9BdNd+Y1vpINDHvnIdDBu3z32SAflX4aZOPkA0DMCB0A9bC2YwT994xv/77vfLQ6e8vM///D9908vDtt3zz2ffNhhxcFXvv3tG2+9Nb0I2+HkA0AvCRwAldI1mNMfvec9xdcd1qw5/3/9r5132im9WDrvd3+3+FFx8LYPfjC9AgDARAIHQBV0DRZ17nve85kvfak4eMJjH3vFeecd+ZjHpNd/5mEPu+Scc37piCOK4y9cddWfXHxxeh0AgIkEDoAl6BpU4Zdf/vIrvvKV4uDnDjzwsj/5k02f/vTtn/jE1y644L+s3Jzy/7773V/63d/dunXryt8FAGAygQNgfroGldp4221H/tqv/f7b3vb9H/yg+HanHXfcbZddioM777rrnIsu+v9OOeWG739/5S8CADDV/Qf/Bfqs3Kgfd9zggIkUDWZxwgmDgw0bBgfzOOxRj9p/r712WLPmh3fc8fF/+Ictd989+AHM4oor7vl66qkr3wDLOf/8e77e344JsuEKDoDtcb0GDfr817528ac+9d5LL73kc59TNwAAZidwAEyhawAAQD4EDoD70jUAACBDAgfACl0DAAByJnAA/aZrAABAJwgcQC/pGgAA0C0CB9AnugYAAHSUwAH0gK4BAABdJ3AA3aVrAABAbwgcQOfoGgAA0D8CB9AVugYAAPSYwAFkTtcgrP/+3wcHAADU7/6D/wJ9VtaB444bHMSnaBDTCScMDqbZsGFwAHW44op7vp566so3wHLOP/+er/e3Y4JsmK5AVoFD1yCsaWnj1a8eHJx++j3HxddhegfVEjigQgIH5MZ0BXIIHLoGkY2kjQ9/eHBQ+qVfGhwUyt5RkjyokMABFRI4IDemKxA4cOgaBDd+1cZ43Rg33DsKw5d4jNM7mIvAARUSOCA3pisQL3DoGsS3WNqYZuIlHumWlnQwTPJgFQIHVEjggNyYrkCYwKFrkIVq08Y005LHRJIHJYEDKiRwQG5MV6DtwKFrkJHtPm6jJqv0juJbl3hQEjigQgIH5MZ0BVoKHLoGeWkrbUwjeTCRwAEVEjggN6Yr0Gzg0DXITjP3pCxp2oNLk/F7WySPrhI4oEICB+TGdAUaCRy6BjnKIm2MKBfiT3/64KCQesd45ijpHZ0hcECFBA7IjekK1Bk4dA0ylXXamGY8eRRO92+1dIvAARUSOCA3pitQQ+DQNchXjmmjsMD6e7h3FIaTxzi9IxcCB1RI4IDcmK5AdYFD1yB30Z4kOqOqFt8jl3iUpcMlHhkROKBCAgfkxnQFlg4cugYdkGnaKNS38p7rEo+C5BGBwAEVEjggN6YrsGjg0DXohkzvSUkaXnZPfIpHySUeEQgcUCGBA3JjugJzBg5dg86QNpY3cpVHYfjelhGSRwMEDqiQwAG5MV2B2QKHrkGXZJ02CmFX29Puaklc4tEAgQMqJHBAbkxXYNXAoWvQPfk+biPJa6k98a4Wl3jUR+CACgkckBvTFZgUOHQNOin3tFHIfZ098ZaWQkoe47e3SB7zEjigQgIH5MZ0BYZyxrHHDg6gY6SNsKbd1TLxKg+9Y7sEDqiQwAG5MV0BgYNOy/1xG0mvltcT72opSB6zEDigQgIH5MZ0BQQOOqobaaPQ87X1Kpd4uKVlnMABFRI4IDemKyBw0DmdSRsFC+tx0y7xSHqePAQOqJDAAbkxXQGBg27pwOM2SlbVs5jrKR6FbicPgQMqJHBAbkxXQOCgK6QNkmnJI+n2JR4CByyvXBe98533fHVChnyYroDAQf66lDYKFtOVm3hXy8SneBSyTh4CByysXA6VBA7IjekKCBzkrEuP20ispBsw8RKPVDqGj5O8eofAAfMa7xolgQNyY7oCAgd56l7aKFhGt2X15DFylUfk5CFwwIxW6RolgQNyY7oCAge56WTaKFhDx7H6UzwKYZOHwAGrm6VrlAQOyI3pCggcZKVjj9tIrJ7jG08eI41jWIu9Q+CAaeZKG4nAAbkxXQGBg0x0Mm0ULJ0zNfHBpaW2LvEQOGDEAl2jJHBAbkxXQOAgvK6mjYJ1c2dMu6vl9JV/qyUdlOrrHQIHJMt0jZLAAbkxXQGBg8C6+riNxKK520aSx7DxO1yqSh4CBz1XSdcoCRyQG9MVEDgISdqgeybe1ZJKR1XJQ+Cgn6rtGiWBA3JjugICB8F0O20UrJVJpt3VkizWOwQOeqWmrlESOCA3pisgcBBJhx+3kVgos4rxu1rSlR2pfcySPAQO+qDurlESOCA3pisgcBBD59NGwSqZuax+iUdhPHkIHHRYY12jJHBAbkxXQOCgbZ2/JyWxRGZ505JHWTqe/ex7vl555T1fq3pwKbSr+a5REjggN6YrIHDQHmkDljSSPFLgOOaYlW8WfZAHRNBi1ygJHJAb0xUQOGhDT9JGwcqYJr373fd8TVdwFEYu8UhP9CjpHcQUIW0kAgfkxnQFBA6a1Z+0UbAspmEpcJx55so3K7Z7V8swyYMWxekaJYEDcmO6AgIHDerDk0RL1sQ0bzxwjFild6Rjd7XQsIBdoyRwQG5MV0DgoBHSBjRgu4Fj3Fz/VoveQVUid42SwAG5MV0BgYOa9eqelIKlMC1aIHCMm5g8UuYojl3iwTKy6BolgQNyY7oCAge16VvaKFgH065KAseIkd5RGLnKwyUebFdeXaMkcEBuTFdA4KAGPUwbBYtgWldH4Bg3MXmc7ikejMm0a5QEDsiN6QoIHFStV4/bKFkBE0EzgWPE6re0lMclyaPzcu8aJYEDcmO6AgIH1ZE2oF2tBI5x0x5cOvEqD72jMzrTNUoCB+TGdAUEDqrQz7RRsPAllCCBY9y05JG4xCN33UsbicABuTFdAYGD5fTzcRuJVS/RhA0cI8af4jHs1ff9t1r0jrC62jVKAgfkxnQFBA4W1ee0UbDkJaBcAse41S/xKEgecXS+a5QEDsiN6QoIHMxP2oCY8g0cIyZe4pGu7Bh/ikdB8mhAf7pGSeCA3JiugMDBnHr7uI3ESpfIOhM4xk1LHiWXeNSkh12jJHBAbkxXQOBgZj1PGwXLXILrcOAYN/GulpQ50rUewySPefW5a5QEDsiN6QoIHMxA2ihY4xJfrwLHiNWf4qF3zEjXGCZwQG5MV0DgYFU9f9xGyQKXLPQ5cIwbv6slXdlRtg93tZR0jYkEDsiN6QoIHEwhbSSWtmRE4FjFxN4xrIdXeegaqxM4IDemKyBwMEbaKFnXkheBYy7THlw6UjqSjvUOaWMWAgfkxnQFBA7uy+M2Sha1ZEfgWNK05FHK/a4WXWMuAgfkxnQFBA7uJW0Ms6IlRwJHtabd1ZIyx8i1HpF7h66xGIEDcmO6AgIH0sZ9WcuSL4GjbiPJo7y4I2by0DWWJHBAbkxXQODoN4/bGGEhS9YEjuZNvMrj9Hv/rZbh3lFoJnnoGlUROCA3pisgcPSVtDHOKpbcCRytm3aJR6m+Szx0jcoJHJAb0xUQOPpH2pjIEpYOEDgCmvbg0olXeSyQPHSN+ggckBvTFRA4esbjNiayfqUbBI74JvaOQnmtx4x3tegaDRA4IDemKyBw9Ia0MZGVK10icORo4lM8Cql0pGs9Sm996+CABggckBvTFRA4esA9KdNYttIxAkc3jD/Io4wdieTRDIEDcmO6AgJHp0kbq7BmpXsEjk6a6ykeekeFBA7IjekKCBwdJW2szoKVThI4emL8Eo8RkkclBA7IjekKCBydI22szlKVDhM4+mnag0uTP/iD+/SOQrX/PG2HCRyQG9MVEDi6xZNEV2edSrcJHCRPf/q/f7gXVr/EQ++YRuCA3JiugMDRFdLGdlmk0nkCB9M87WmDgyQ9wiMdFFziMZHAAbkxXQGBI3/uSZmFFSp9IHAwo5HekQxf6OESj4LAAbkxXQGBI2fSxowsT+kJgYOFTbvEIx0Xepg8BA7IjekKCBx5kjZmZGFKrwgcVGX8Eo9p13cknUweAgfkxnQFBI4MedzGjKxK6RuBg/pMvKulNHzFR6EbvUPggNyYroDAkRVpY3aWpPSQwEGTxu9qGZF78hA4IDemKyBwZELamIv1KP0kcNCiiXe1jN/MkmTROwQOyI3pCggc4XncxlysROkzgYNQcr/EQ+CA3JiugMARmLQxL8tQek7gILLVL/FI+SNU8hA4IDemKyBwhCRtLMAaFAQO8jIxeRRS5hi5w6X53iFwQG5MV0DgiMfjNhZgAQoFgYPcTbyr5fTTBwfpuFR38hA4IDemKyBwRCJtLMbqExKBg46ZdldL2TsKZfKovHcIHJAb0xUQOGKQNhZj3QnDBA46b5UHeZSXe5SWTB4CB+TGdAUEjrZ53MbCLDphhMBB30x7isewhZOHwAG5MV0BgaM90sYyrDhhnMABq1ziMXJcWL13CByQG9MVEDjaIG0syXITJhI4YNz4g0uHb2kpTEseAgfkxnQFBI7GedzGMiw0YRUCB2zXtLtaTh/7t1oe+9h7vvrcgXyYroDA0SBpY0lWmbA6gQMWMDF5fPCDg2MfPZAP0xUQOBohbSzPEhO2S+CA5Z122uAg8ekD+Vgz+C8ANTnhBHWjAtaXEMq2bYM/0CWnnaZuQNYEDoDaTEwb6sYCrC8hgjJqlF3D3KQzJqYN73DIjcABUANpoyrWl9Cu8aiRmJt0hrQBHSJwAFRN2qiK9SW0YlrUKJmbdIO0AZ0jcABUZ+TCDWljGZaY0LDVo0bJ3KQbpA3oIoEDoAoT70lhYVaZ0Iwyamy3ayTmJh0wcuGGtAEdInAALGdi2lA3FmahCXWbN2ok5iYdMPGeFKBDBA6ARUkblbPQhJosFjVK5ia5m5g2vLGhcwQOgPlJG3Ww0ITKLRM1SuYmWZM2oE8EDoA5SRt1sNaEClXSNRJzk6xJG9AzAgfAzEYu3JA2qmK5CTGZm+Rr5MINaQP6wTwHVv5vfcmxxw4OGDFy1UZB2qiE5SZU693vvufrGWesfLMEc5N8jV+1UYPzzjtvzZrV/k/F73znOz/72c8OvgGa4tMLEDhWJW3Uxw4KKldJ4DA3ydRI2ijU82Y+8MAD/+Vf/mXwzRS/8iu/8hd/8ReDb4CmuEUFYIqRG1IK7kmpkB0UxGRukqORG1IKxTu5tjfzox/96MEREIzAATCJtFErOyiIydwkO82mjeSQQw5JB0ccccROU1xwwQXp7wBNEjgA7mvkwg1po1r1rzuBRZib5KjxtJEceOCBxde77rrrs5/97OYptm7dmv4y0CSBA+Be0kbdbJ8gJnOT7IxcuNFU2kie8IQnFF+vvPJKFQOiETgApjxug2rZQUFM5iZ5aTVtFHZfURz88z//c3oFiEPgAPptYtpQNypnBwUxmZtkZCRtFNp4Ax9++OHp4NJLL00He+2115FHHrlu3br0LdAigQPoK2mjMXZQEJO5SS4mpo2W3sDpARyFW2655ayzzrrxxhtvuummyy677M4777z66qtPO+20nXfeOf0FoHk+2ID73W/btsHBsccODjrPDSnNsH2Chr373fd8PeOMlW+mMzfJxUjXKLT97r3wwguf9axnFQf/9m//9qAHPSi9OOyb3/zmL/7iL1577bWD74EG+XgDehY4pI3G2EFB82YJHOYmuQhwQ8q4q6666j/+x/+Yji+77LILLrjgpptu2mmnnY466qhTTjmlOChe/853vvPYxz72lltuSX8NaIxPOKA3gUPaaJIdFLRiu4HD3OyS9PHdyTENmTYKa9eu3bRp0w477FAc/7f/9t8uuOCC9HryUz/1U5/4xCce/OAHF8fvfOc7Tz311PQ60BgfckAPAsdI2iioG7Wyg4K2rB44zM1uKD+1C90b06hpI1m3bt3RRx/9oAc9aOPGjZdccsng1SGPecxjrrzyyuLg7rvv3nvvvV3EAQ3zOQd0OnBIGw2zfYJ2rRI4TM/cDXeNpGNjGu9xG4v55Cc/+YQnPKE4OP744y+++OL0ItAM/4oK0FEn+EdSGmf7BGGZnvnatm3wZ0SXxvS0QP9IyvK+8IUvpIN99tknHQCNETiALpI2mmf7BGGZnjma1jWSzoxpt9JG8vWvfz0dPPShD00HQGMEDqBbRi7ckDaaYfsEYZmeeVm9axTy3///uzzTxs4773zooYfuscceg+/H/PRP/3Q6+MpXvpIOgMYIHEBXSBttsX2CmLq0E+687XaNpDMDOnLhRj7v1T/7sz/78Y9//Pd///cnnnji4KUxj370o9PBt771rXQANEbgAPI3kjYK0kYzbJ8gLHMzCzN2jaQbYzrxnpR8lP9yykknnZQORhx44IFPfOITi4Prrrvus5/9bHoRaIzAAeRsYtpQN5ph+wRhmZ7xzd41kg6M6cS0kdv/rg9/+MMbN24sDo444ojnPOc56cXS+vXr3/Wud+2www7F8dlnn51eBJokcAB5kjbaZfsEsIC5Ltko5X7K7UTaSO64447/+T//Zzp+17vedfrpp+++++7F8Zo1a44++ujPfe5zP//zP198+6lPfWrDhg0rfwtolBUqsLLeSo49dnAQnBtS2qVuQFjvfvc9X888c+Ubwpi3aAzL+pQ70jUKnfgEee1rX/uKV7xi8M397vejH/1o7dq1O+20U/r2M5/5zC//8i+nCz2AhrmCA8jKyIUbrtpoWLb/NzfoBdMzmsWu1xjWpbrRoU+QV77ylU996lOvvPLK9O1uu+2W6sb3vve9V7ziFUcddZS6AW3xQQhkcgXHyFUbBWmjYfZOEFmaoRdccM9XV3C0a5miMSzfs+542uio/fff/+d+7ud22223u+6665prrvnCF74w+AHQEqtVIHzgkDYiUDcgsnKGChwtqqprJJmedTt6TwqQC7eoAIGN3JBScE9KKyxPITIztF3blr4PZVyOY3pad54kCuRL4ABCkjbisDyFyMzQttTRNZLsxlTaAMIQOIB4pI0grFAhODO0efV1jUKOZ11pA4hE4AAiGblwQ9pokRUqRGYb2bBau0aS3YCOXLjhPQkEIHAAMUy8J4W2WKRCZGZok+ruGkleYyptAFEJHEDbJqYNdaNF1qkQmRnajAYu2ShlNKYjaaPgDQlEInAA7ZE2oinWqZaqEJkZWrcmu0aSy5hOTBvekEAwAgfQEmkjGutUCM4krU/zXSPJYkylDSAfAgfQuJELN6SNCCxVITiTtA5tdY0kl7oxTNoAYhM4gAZJGzFZrUJwJmm12u0aSfwxHblwQ9oAciBwAI0YSRsFaSMIC1YIziStSoSukQQfU2kDyJbAAdRsYtpQNyKwZoX4TNLlxekaSeQxHUkbBe9AICsCB1AbaSMya1aIzzxdRrSukYQd04lpwzsQyI3AAdRD2ojMmhXiM08XFrBrFML2AmkD6BCBA6jayIUb0kY0lq0QnO3lYmJespGEHVBpA+gWgQOojrQRnJUrxGeSzity10hijunIhRs+IIBOEDiAKoykjYK0EY2VK8Rnns4uftdIAo6ptAF0l8ABLGdi2lA3orF4hfjM01nk0jWSaGM6kjYK3nVAtwgcwKKkjVxYv0J85unq8uoaSagxnZg2vOuAzhE4gIVIG7mwfoX4zNNpcuwaSZwxlTaAPhE4gDmNXLghbURmCQvxmafj8u0aSai6MUzaALpO4ABmJm3kxSoW4jNPh+XeNZIgYzpy4Ya0AfSDwAHMYCRtFKSN4CxkIT7ztNSBrpFEGNOJ96QA9IPAAaxqYtpQN4KzloX4zNNCNy7ZKLU+phPThnca0CcCBzCFtJEpa1mIr+fztGNdo9B6R5A2AFYIHMAk0kamLGchuD5vO7vXNZJ2B1TaABgicAD3NXLhhrSRCytaiK+fk7SrXSNpd0ylDYD7EjiAIeMXbpAFK1qIr2/ztNtdI2lxTEcu3JA2AFY4FQIry9ARJ500OCA+i1qIr7F5esEF93w988yVb9rQ7aIxrK1z78hVGwWfAgD3ckIE7rXKqlTvCMu6FuJrcp62FTj60zWSVs690gbA9jgtAvdKy9Px1dLEZavkEYGlLcTX8DxtOHD0rWskzZ97pQ2A2Tg5AlOUy9bhVdS0taze0TyrW4iv+XnaTODoZ9dIWq8bTv4A0zlFAjOTPOKwwIX4Wpmn9QWOPkeNUsNjKm0AzMmJEljUxN5RkDzqZo0L8bU1T6sNHKLGsCbHVNoAWIjTJVCd8eSRXim+HV8l6x2LscyF+Fqcp5UEDl1jXGNj6nEbAEtwxgTqNJ48CtOWzpLHdlnmQnCtT9KFA4eoMY20AZAP502gQRN7RzK+ttY7hlnmQnwR5ulcgUPU2K5mxlTaAKiIsyfQqpHkkb4tjicuu3ubPKx0Ib4g83S7gUPUmF0zY+pxGwDVcQ4Fgikbx7BpK/I+JA+LXYgvzjydFjh0jXk1MKbSBkDVnEmB2MpF+SzJo3u9w3oX4gs1T4cDh6ixsLrHVNoAqIfzKWTjqKOOOuWUUwbfbM+55577hS98YfBNxwwnj3RcHozLOnlY8kJ80eZpChxnnLHyDQupdUw9bgOgTk6pkI1TTz31He94x+Cb7Tn22GM/8IEPDL7ptuHeMSz35GHJC/EFnKcCx5LqG1NpA6B+awb/BbrllltuGRx1XrFATH9K27b9+5UdI38KF154nz8xpf+vApGZp91T05iedtqEe1K8fwBq4NwK2VizZs3atWsH30zyx3/8xy94wQuKg9e85jWnjf9fivps5GqOtKwMe4mHVS/EF3aeuoJjYTWN6XjaAKA2TrLQEc9//vPf+c53Fgcf/ehHn/70p6cXmaxMG+MLzfHq0XDvsPaF+CLPU4FjMXWMqbQB0DinWuiCn/qpn/ryl7+8yy673HTTTQcddNDNN988+AEzmpg8mr/Ew/IX4gs+TwWOBVQ+ptIGQEuccKELLr/88iOOOKI4eNaznvV//s//SS+yuJG0sd3qUUnysAKG4LKYpALHXOpOGwXndoAGOedC9sp/XeVjH/vYU57ylPQiFZt4iUehkt5h+Qvx5TJPBY7ZVTum0gZAAM68kLf169d/85vf3Geffe6+++6DDjroqquuGvyAuk1MHhN7R2GV5GEFDPFlNE8FjhlVOKbSBkAY/plYyNtv/dZv7bPPPsXB2972NnWjUcX6Nf1Jtt37b9MWyh+VP532b9OWfwEIyzztngrHdPxxG94wAO1xCoaMrV+//rvf/e4DHvCAu+6662EPe9j1118/+AERTLzEIxm/0OPZzx4cAKFkt1l1Bcd2VTWmniQKEI9zMWTsZS972Rvf+Mbi4G1ve9uLX/zi9CJBDUeNch08XjpKkge0Lsctq8CxukrG1D0pAFE5HUPGrr766oc+9KHFwU//9E+7PyU/LvGAyDLdsgocq1h+TKUNgNiclCFXT3ziEy+99NLi4DOf+cyRRx6ZXiRvE5PHtKs8JA+oT767VoFjmiXHVNoAyIGHjEKunn3v/vbP//zP0wHZK5bL6U+ybezBpcPe/e77/AGqMjLX6IBlxvS00yY8bsObBCAkZ2fI1c0337znnnvefffde+2118aNGwev0m3DV3OUy+vixeJ4/EIPl3jAAnLfuLqCY9wyYzqeNgAIzGkasnTooYf+/d//fXFw6aWX/uIv/mJ6kd6Z2DtKkgfMqwPbV4FjxMJjKm0AZMgtKpClo446Kh38zd/8TTqgj4oFd/kn2bZyV0v6U75YHrirBaYZnkd0w8JjOvGeFABy4HwNWXrf+953/PHHFwf/6T/9p8svvzy9CBOU13GML9DLH5Vc4kE/dWn76gqOZOG0MULaAMiKszZk6YYbbthnn33uvvvudevWbd26dfAqbNdw1BheuI/HjoLeQR90bAcrcBQWGFNpA6ATnLshP+vWrbvzzjuLg+uuu+6AAw5IL8KChi/xSMflst4lHnRe9zaxAsfydUPaAMiWMzjk5+CDD/7Sl75UHHzwgx885phj0otQjZGoMRw7imPJgy7p5D6254Fj3jGVNgC6xUNGIT//4T/8h3Twwx/+MB1AZYr1/fCfwraVR5amg/GfenApmUpvYLpkrjE97b5PEi3PaQDkzKkcgDmNXMeRdgXjF3ckLvEgoA5vZXt7BcfsY+pxGwDd5YQOwHKG08b4PmEkfOgdtK7bu9l+Bo4Zx1TaAOg6p3UAqjYteUy8ykPyoEmd39D2MHDMMqbSBkA/OLkDUL9VrvIYrx6SBzXpw562b4FjgbohbQB0l1M8AI0biRrlfqN4vTge+aneQSV6sq3tVeDY7phKGwA940QPQAATL/EYv7gjkTyYS6+2tT0JHNIGAJM43QMQz3jaSPsTyYN59W1n24fAsfqYetwGQI854wOQg4mXeCTj1UPvIOnhzrbzgWOVMZU2AHrPeR+API0nj/RKcSx5UOjn5rbbgWPamEobAKxw9gegE1a5xKMwkjz0js7r7f62w4FjxrohbQD0mM8AADpqJGqkbc/4xR2J5NElfd7idjVwTBxTaQOA+/JJAEA/jF/iMS12JJJHpnq+y+1k4BgfU2kDgEl8HgDQV+OBY5XwoXdkwUa3e4FjZEw9bgOA6XwkAMC9xq/yKI1XD8kjGhvdQscCx/CYShsAbI8PBgCYYuKlHMWeqng9fR2md7TLXjfpUuAox1TaAGA2Ph4AYGarXOJRkDzaYrtb6kzgmFY3jDUA0/mQAIBFjV/ikXZf468nkkflbHdHdCBwSBsALMpHBQBUZ1rySFziUS073nG5B440pu5JAWAhPi0AoE4Tk0fxYvo6QvKYnR3vRFkHjmJMpQ0AluAzAwAaNBw1RnZuesfsbHqnyTdwvOpVg4OSUQZgTj45AKBVI10jberSi8XxyE8lj4J97ypyDBzSBgAV8fkBAJFM7B0lV3nY+q4uu8AxUjeMLwBL8CkCALENR41i+1d8mzaB47Gj0O3eYfe7XRkFDmkDgKr5LAGA3ExLHslI+OhM8rABnkUWgcM9KQDUw8cJAGRu4qUcZfjoRu+wAZ5R8MAhbQBQJx8qANA5w1Gj3ECmF3NMHvbAswsbOKQNAOrnowUAum6kaIw0juDJwzZ4LjEDh8dtANAIHzAA0D/jyWNYkN5hG7yAaIFD2gCgQT5mAICxu1rKb9OOtPnkYSe8mDiBQ9oAoHE+bACAMe1e4mEzvLAIgcPjNgBoic8bAGAGEy/xSAflt6VlkofN8DLaDRzSBgCt8qkDACxkWvJIFkse9sNLaitwSBsABOCzBwCowkjRKJPHRBN7hy3x8loJHB63AUAMPoEAgHqMXOIxYiR/POc5gwOW0XDgkDYAiMTnEADQiIkXdKQLPdLGWPJYXmOBQ9oAIB6fRgBAS0aKxsgmWe9YQAOBw+M2AIjKBxIAEMZw1Jh4WccwyWNcrYFD2gAgNh9LAEBU0+pGua8e/gt6R6GmwCFtAJADH04AQD5GkkexzU6vTLzco4fJo47A4XEbAGTCRxQAkK3x3lEa+VHS+eRRbeCQNgDIig8qAKBDJl7iMfx1WPd6R1WBQ9oAIEM+rgCAThuOGuMb9Y4lj+UDh8dtAJAtn1gAQJ+MFI20ey9fHLnKI7vesUzgkDYAyJzPLQCg38aTR/FKubcf+Wnw5LFY4JA2AOgEn14AAEPGe0chvTh8XAqVPBYIHB63AUBX+AwDAFjVXMmj3d4xV+CQNgDoFp9kAABzWj15jPy0yeQxY+BwTwoAXeTDDABgOdN6R1kNhv9Crb1ju4FD2gCgu3ykAQBUbTx5pFfqTh6rBA5pA4Cu88EGAFCzkd5RGIkLI39h4eQxMXBIGwD0g483AIDGjV/iURi+ymOxSzzGA4cniQLQGz7kAAACGL/Ko1D2iBkv8RgOHNIGAD3jow4AIJ6Jl3gUyqs8Jl7ikQLHOHUDgB7waQcAkINpySMZ+WlJ2gCgN3zmAQBkaJWiUV7lAQB94pMPAKATyuQhbQAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAnfbkJz/5wgsvvPnmmzdv3nzHHXf80z/90xve8Ib9999/8GMAAACAyNatW/e+971v2yS33377CSecMPh7AAAAAGFdcMEFKWfceuutZ5555nHHHXfiiSe+5z3vSS8Wjj766MFfBQAAAAjoyCOPTBXj+uuvH7kh5fnPf3760TXXXDN4CQAAACCgt7/97aliPPe5zx28NOSSSy5JP33iE584eAkA+mTN4L8AAMS29957p4P3v//96WDYJZdckg7222+/dAAAvSJwAABkZvfddx8cAQD3EjgAAPLwpS99KR1M/NdSyhe/9a1vpQMAAACAcPbff//bbrtt27ZtxdfDDz988OqK1772tekBHJ/85CcHLwEAAADEdPTRR996662pZXzkIx/ZsGHDeeed9+Uvfzm98vnPf36vvfYa/FUAAACAsPbff/+yaAx717vetWaNu48BAACA8E499dQf/OAHqWjccccdn/70p7/xjW9s2bIlvfJ3f/d3BxxwwOCvAgAAAAT0kpe8JIWMm2+++TnPeU55vcZee+117rnnph/deOONGgcAAAAQ1L777rtp06Zt27YVXw866KDBq0NOO+201Dg+8IEPDF4CAAAACOWlL31p6hdnnXXW4KUx3/72t9Pf2XfffQcvAUBveBIVAEAGDjvssHRw2WWXpYNxn/rUp9JB+ZcBoD8EDgCADOy0007p4Ec/+lE6GPe1r30tHZR/GQD6Q+AAAMhA2TX22GOPdDDuUY96VDq488470wEAAABAICeffHJ6vsaFF144eOm+1qxZc/XVVxd/YcuWLatEEAAAAIDWrF+//tZbb02N4ylPecrg1SFveMMb0k/9KyoAAABAXCeddFJKGFu2bHn1q19d/lMpj3zkIy+44IL0o1tvvfUhD3lIeh0AAAAgot/+7d9OISO5/fbbN23aNPhm27abb775F37hFwZ/FQAAACCsX/iFX/j0pz89SBr32rx583nnnVde0wEAPXT/wX8BAMjH7rvvfvjhh++2225bt279/ve/f/nll2/ZsmXwMwAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAoBPud7//H4hOUYRN0VMpAAAAAElFTkSuQmCC\",\"relationship\":null}],\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"target\":\"/matlab/document.xml\",\"relationshipId\":\"rId1\"}]}"},{"id":42320,"title":"Write a function man that takes a row vector v and returns a matrix H as follows..","description":"Write a function called man that takes a row vector v as an input and returns a matrix H whose first column consist of the elements of v, whose second column consists of the squares of the elements of v, and whose third column consists of the cubes of the elements v. For example,\r\n if A = man(1:3) , then A will be [ 1 1 1; 2 4 8; 3 9 27 ].","description_html":"\u003cp\u003eWrite a function called man that takes a row vector v as an input and returns a matrix H whose first column consist of the elements of v, whose second column consists of the squares of the elements of v, and whose third column consists of the cubes of the elements v. For example,\r\n if A = man(1:3) , then A will be [ 1 1 1; 2 4 8; 3 9 27 ].\u003c/p\u003e","function_template":"function H = man(v)\r\n  % Read question Carefully!\r\nend","test_suite":"%%\r\nv = 0;\r\nH = [0 0 0];\r\nassert(isequal(man(v),H))\r\n\r\n%%\r\nv = [1 4];\r\nH =  [1 1 1;4 16 64];\r\nassert(isequal(man(v),H))\r\n\r\n%%\r\nv = [1 2 3];\r\nH = [ 1 1 1;2 4 8; 3 9 27];\r\nassert(isequal(man(v),H))\r\n\r\n%%\r\nv =[2 7 5 1 6 5 1 1 7 9 8 3 8 2 8 4 1 9];\r\nH =  [2 4 8;7 49 343;5 25 125;1 1 1;6 36 216;5 25 125;1 1 1;1 1 1;7 49 343;9 81 729;8 64 512;3 9 27;8 64 512;2 4 8;8 64 512;4 16 64;1     1     1;9    81   729];\r\nassert(isequal(man(v),H))","published":true,"deleted":false,"likes_count":1,"comments_count":0,"created_by":44015,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":647,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":23,"created_at":"2015-05-18T16:26:03.000Z","updated_at":"2026-02-28T12:00:39.000Z","published_at":"2015-05-18T16:26:27.000Z","restored_at":null,"restored_by":null,"spam":false,"simulink":false,"admin_reviewed":false,"description_opc":"{\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"relationshipId\":\"rId1\",\"target\":\"/matlab/document.xml\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/output\",\"relationshipId\":\"rId2\",\"target\":\"/matlab/output.xml\"}],\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"relationship\":[],\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eWrite a function called man that takes a row vector v as an input and returns a matrix H whose first column consist of the elements of v, whose second column consists of the squares of the elements of v, and whose third column consists of the cubes of the elements v. For example, if A = man(1:3) , then A will be [ 1 1 1; 2 4 8; 3 9 27 ].\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\"},{\"partUri\":\"/matlab/output.xml\",\"contentType\":\"text/xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\" standalone=\\\"no\\\" ?\u003e\u003cembeddedOutputs\u003e\u003cmetaData\u003e\u003cevaluationState\u003emanual\u003c/evaluationState\u003e\u003clayoutState\u003ecode\u003c/layoutState\u003e\u003coutputStatus\u003eready\u003c/outputStatus\u003e\u003c/metaData\u003e\u003coutputArray type=\\\"array\\\"/\u003e\u003cregionArray type=\\\"array\\\"/\u003e\u003c/embeddedOutputs\u003e\"}]}"},{"id":60941,"title":"Prime numbers which are the difference of two consecutive cubes","description":"Problem statement\r\n\r\nGiven a positive integer n greater than 2, find the prime numbers less or equal to n and which are the difference of the cubes of two consecutive integers and store them in ascending order in a row vector u. Also, compute the frequency / ratio f of those numbers compare to all the prime numbers less or equal to n.\r\n\r\nExamples\r\n\r\nIf n = 100, then u = [7, 19, 37, 61], and f = 4/25, since 7 = 2^3 - 1^3, 19 = 3^3 - 2^3, 37 = 4^3 - 3^3, 61 = 5^3 - 4^3, and there are 25 prime numbers less or equal to 100;\r\nIf n = 400, then u = [7, 19, 37, 61, 127, 271, 331, 397], and f = 8/78, since 127 = 7^3 - 6^3, 271 = 10^3 - 9^3, 331 = 11^3 - 10^3, 397 = 12^3 - 11^3, and there are 78 prime numbers less or equal to 400;\r\nTips\r\n\r\n\r\n\r\nForbidden functions\r\n\r\nregexpr\r\nstr2num\r\nassignin\r\n\r\nSee also\r\nPrime numbers properties II","description_html":"\u003cdiv style = \"text-align: start; line-height: 20.4333px; min-height: 0px; white-space: normal; color: rgb(0, 0, 0); font-family: Menlo, Monaco, Consolas, monospace; font-style: normal; font-size: 14px; font-weight: 400; text-decoration: rgb(0, 0, 0); white-space: normal; \"\u003e\u003cdiv style=\"block-size: 668.033px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 408px 334.017px; transform-origin: 408px 334.017px; vertical-align: baseline; \"\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 63.0083px 8px; transform-origin: 63.0083px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eProblem statement\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 63px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 31.5px; text-align: left; transform-origin: 385px 31.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 75.075px 8px; transform-origin: 75.075px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eGiven a positive integer \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 5.83333px 8px; transform-origin: 5.83333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003en \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 37.7333px 8px; transform-origin: 37.7333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003egreater than\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 9.71667px 8px; transform-origin: 9.71667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 2, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 122.917px 8px; transform-origin: 122.917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003efind the prime numbers less or equal to \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 3.89167px 8px; transform-origin: 3.89167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003en\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 129.833px 8px; transform-origin: 129.833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e and which are the difference of the cubes of two consecutive integers and store them in ascending order in a row vector \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 3.89167px 8px; transform-origin: 3.89167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eu\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 113.95px 8px; transform-origin: 113.95px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e. Also, compute the frequency / ratio \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 1.94167px 8px; transform-origin: 1.94167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003ef\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 9.71667px 8px; transform-origin: 9.71667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e of those numbers compare to all the prime numbers less or equal to \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 3.89167px 8px; transform-origin: 3.89167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003en\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 1.94167px 8px; transform-origin: 1.94167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 32.675px 8px; transform-origin: 32.675px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eExamples\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cul style=\"block-size: 81.7333px; counter-reset: list-item 0; font-family: Helvetica, Arial, sans-serif; list-style-type: square; margin-block-end: 20px; margin-block-start: 10px; margin-bottom: 20px; margin-top: 10px; perspective-origin: 392px 40.8667px; transform-origin: 392px 40.8667px; margin-top: 10px; margin-bottom: 20px; \"\u003e\u003cli style=\"block-size: 40.8667px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 20.4333px; text-align: left; transform-origin: 364px 20.4333px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 6.21667px 8px; transform-origin: 6.21667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eIf \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 27.8083px 8px; transform-origin: 27.8083px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; font-weight: 700; \"\u003en = 100, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 14.775px 8px; transform-origin: 14.775px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003ethen\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 61.6333px 8px; transform-origin: 61.6333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; font-weight: 700; \"\u003e u = [7, 19, 37, 61], \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 12.4417px 8px; transform-origin: 12.4417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eand\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.8667px 8px; transform-origin: 25.8667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; font-weight: 700; \"\u003e f = 4/25\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 3.88333px 8px; transform-origin: 3.88333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 16.3417px 8px; transform-origin: 16.3417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003esince\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 190.017px 8px; transform-origin: 190.017px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 7 = 2^3 - 1^3, 19 = 3^3 - 2^3, 37 = 4^3 - 3^3, 61 = 5^3 - 4^3, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 41.625px 8px; transform-origin: 41.625px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eand there are\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 11.6667px 8px; transform-origin: 11.6667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 25 \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 96.0833px 8px; transform-origin: 96.0833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eprime numbers less or equal to\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 15.5583px 8px; transform-origin: 15.5583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 100;\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 40.8667px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 20.4333px; text-align: left; transform-origin: 364px 20.4333px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 6.21667px 8px; transform-origin: 6.21667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eIf \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 27.8083px 8px; transform-origin: 27.8083px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; font-weight: 700; \"\u003en = 400, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 14.775px 8px; transform-origin: 14.775px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003ethen\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 123.867px 8px; transform-origin: 123.867px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; font-weight: 700; \"\u003e u = [7, 19, 37, 61, 127, 271, 331, 397], \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 12.4417px 8px; transform-origin: 12.4417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eand\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.8667px 8px; transform-origin: 25.8667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; font-weight: 700; \"\u003e f = 8/78\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 3.88333px 8px; transform-origin: 3.88333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 16.3417px 8px; transform-origin: 16.3417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003esince\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 129.25px 8px; transform-origin: 129.25px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 127 = 7^3 - 6^3, 271 = 10^3 - 9^3, 331 = 11^3 - 10^3, 397 = 12^3 - 11^3, \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 41.625px 8px; transform-origin: 41.625px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eand there are\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 11.6667px 8px; transform-origin: 11.6667px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 78 \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 96.0833px 8px; transform-origin: 96.0833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eprime numbers less or equal to\u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 15.5583px 8px; transform-origin: 15.5583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e 400;\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003c/ul\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 14.2583px 8px; transform-origin: 14.2583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eTips\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"vertical-align:-5px\"\u003e\u003cimg src=\"data:image/png;base64,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\" width=\"176\" height=\"19.5\" style=\"width: 176px; height: 19.5px;\"\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 67.6417px 8px; transform-origin: 67.6417px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eForbidden functions\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cul style=\"block-size: 61.3px; counter-reset: list-item 0; font-family: Helvetica, Arial, sans-serif; list-style-type: square; margin-block-end: 20px; margin-block-start: 10px; margin-bottom: 20px; margin-top: 10px; perspective-origin: 392px 30.65px; transform-origin: 392px 30.65px; margin-top: 10px; margin-bottom: 20px; \"\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 23.7333px 8px; transform-origin: 23.7333px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eregexpr\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.2833px 8px; transform-origin: 25.2833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003estr2num\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003cli style=\"block-size: 20.4333px; counter-reset: none; display: list-item; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-start: 56px; margin-left: 56px; margin-top: 0px; perspective-origin: 364px 10.2167px; text-align: left; transform-origin: 364px 10.2167px; white-space-collapse: preserve; margin-left: 56px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-inline-start: 0px; margin-left: 0px; perspective-origin: 25.6833px 8px; transform-origin: 25.6833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003eassignin\u003c/span\u003e\u003c/span\u003e\u003c/li\u003e\u003c/ul\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 8px; transform-origin: 0px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-style: italic; \"\u003e\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 28.3917px 8px; transform-origin: 28.3917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"font-weight: 700; \"\u003eSee also\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 10.5px; text-align: left; transform-origin: 385px 10.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003ca target='_blank' href = \"https://fr.mathworks.com/matlabcentral/cody/groups/95759\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"\"\u003ePrime numbers properties II\u003c/span\u003e\u003c/span\u003e\u003c/a\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function [u, f] = cube_delta_primes(n)\r\n  \r\n    u = n;\r\n    f = 1;\r\n\r\nend","test_suite":"%%\r\nn = 100;\r\nu_correct = [7, 19, 37, 61];\r\nf_correct = 4/25;\r\n[u,f] = cube_delta_primes(n);\r\nassert(isequal([u,f],[u_correct,f_correct]));\r\n\r\n%%\r\nn = 400;\r\nu_correct = [7, 19, 37, 61, 127, 271, 331, 397];\r\nf_correct = 8/78;\r\n[u,f] = cube_delta_primes(n);\r\nassert(isequal([u,f],[u_correct,f_correct]));\r\n\r\n%% Forbidden functions\r\nfiletext = fileread('cube_delta_primes.m');\r\nillegal = contains(filetext, 'regexp') || contains(filetext, 'str2num') || contains(filetext, 'assignin') || contains(filetext, 'echo')\r\nassert(~illegal);","published":true,"deleted":false,"likes_count":2,"comments_count":2,"created_by":149128,"edited_by":149128,"edited_at":"2025-07-26T06:46:51.000Z","deleted_by":null,"deleted_at":null,"solvers_count":30,"test_suite_updated_at":"2025-07-09T05:55:53.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2025-06-26T11:57:42.000Z","updated_at":"2026-03-30T01:16:24.000Z","published_at":"2025-06-26T12:34:41.000Z","restored_at":null,"restored_by":null,"spam":null,"simulink":false,"admin_reviewed":false,"description_opc":"{\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eProblem statement\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eGiven a positive integer \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003en \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003egreater than\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 2, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003efind the prime numbers less or equal to \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003en\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e and which are the difference of the cubes of two consecutive integers and store them in ascending order in a row vector \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eu\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e. Also, compute the frequency / ratio \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003ef\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e of those numbers compare to all the prime numbers less or equal to \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003en\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eExamples\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eIf \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003en = 100, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003ethen\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e u = [7, 19, 37, 61], \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eand\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e f = 4/25\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003esince\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 7 = 2^3 - 1^3, 19 = 3^3 - 2^3, 37 = 4^3 - 3^3, 61 = 5^3 - 4^3, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003eand there are\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 25 \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003eprime numbers less or equal to\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 100;\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eIf \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003en = 400, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003ethen\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e u = [7, 19, 37, 61, 127, 271, 331, 397], \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eand\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e f = 8/78\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003esince\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 127 = 7^3 - 6^3, 271 = 10^3 - 9^3, 331 = 11^3 - 10^3, 397 = 12^3 - 11^3, \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003eand there are\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 78 \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003eprime numbers less or equal to\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e 400;\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eTips\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:customXml w:element=\\\"equation\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"displayStyle\\\" w:val=\\\"true\\\"/\u003e\u003c/w:customXmlPr\u003e\u003cw:r\u003e\u003cw:t\u003e(n+1)^3 - n^3 = 3n^2 + 3n + 1\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:customXml\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eForbidden functions\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eregexpr\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003estr2num\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"ListParagraph\\\"/\u003e\u003cw:numPr\u003e\u003cw:numId w:val=\\\"1\\\"/\u003e\u003c/w:numPr\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eassignin\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eSee also\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:hyperlink w:docLocation=\\\"https://fr.mathworks.com/matlabcentral/cody/groups/95759\\\"\u003e\u003cw:r\u003e\u003cw:t\u003ePrime numbers properties II\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\",\"relationship\":null}],\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"target\":\"/matlab/document.xml\",\"relationshipId\":\"rId1\"}]}"},{"id":50629,"title":"Solve the snake puzzle","description":null,"description_html":"\u003cdiv style = \"text-align: start; line-height: 20.44px; min-height: 0px; white-space: normal; color: rgb(0, 0, 0); font-family: Menlo, Monaco, Consolas, monospace; font-style: normal; font-size: 14px; font-weight: 400; text-decoration: none solid rgb(0, 0, 0); white-space: normal; \"\u003e\u003cdiv style=\"block-size: 752px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 407px 376px; transform-origin: 407px 376px; vertical-align: baseline; \"\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 10.5px; text-align: left; transform-origin: 384px 10.5px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003eMy son received this puzzle toy from grandma for his 7th birthday, but he's having a bit of trouble solving it. Can you help?\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 42px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 21px; text-align: left; transform-origin: 384px 21px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003eThe toy is a \"twisting snake\" puzzle made of 27 blocks connected by hidden strings into sixteen segments, each either two or three blocks long. The snake's path must make a 90-degree turn at the end of each segment.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 10.5px; text-align: left; transform-origin: 384px 10.5px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003eThe object is to arrange the puzzle's blocks into a 3-by-3-by-3 cube.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 10.5px; text-align: left; transform-origin: 384px 10.5px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003eThese pictures show the puzzle's configuration when laid out two-dimensionally and its final state when solved.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 518px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 259px; text-align: left; transform-origin: 384px 259px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" style=\"vertical-align: baseline\" src=\"data:image/jpeg;base64,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\" data-image-state=\"image-loaded\"\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 84px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 42px; text-align: left; transform-origin: 384px 42px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003eYour code should return a 27x3 array containing the path traversed by the snake when the puzzle is solved. Each row corresponds to one position, with [1 1 1] representing the back left lower corner of the cube and [3 3 3] representing the front right upper corner. For example, if the path begins in the front left lower corner and the first segment proceeds to the right, the first three rows of the array would be [3 1 1; 3 2 1; 3 3 1].\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function moves = solve_snake\r\n    moves = ones(27,3);\r\nend","test_suite":"%%\r\n    result = solve_snake;\r\n    assert(isequal(sortrows(result), ...\r\n        [1 1 1;1 1 2;1 1 3;1 2 1;1 2 2;1 2 3;1 3 1;1 3 2;1 3 3; ...\r\n         2 1 1;2 1 2;2 1 3;2 2 1;2 2 2;2 2 3;2 3 1;2 3 2;2 3 3; ...\r\n         3 1 1;3 1 2;3 1 3;3 2 1;3 2 2;3 2 3;3 3 1;3 3 2;3 3 3]));\r\n    d = diff(result);\r\n    dd = diff(d);\r\n    assert(all(abs(sum(d,2))==1));\r\n    assert(~any(dd([1 5 8 12 14 19 21 23 25],:),'all') || ...\r\n        ~any(dd([1 3 5 7 12 14 18 21 25],:),'all'));\r\n","published":true,"deleted":false,"likes_count":0,"comments_count":0,"created_by":877713,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":2,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":1,"created_at":"2021-03-01T15:12:16.000Z","updated_at":"2021-03-01T15:12:16.000Z","published_at":"2021-03-01T15:12:16.000Z","restored_at":null,"restored_by":null,"spam":false,"simulink":false,"admin_reviewed":false,"description_opc":"{\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eMy son received this puzzle toy from grandma for his 7th birthday, but he's having a bit of trouble solving it. Can you help?\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe toy is a \\\"twisting snake\\\" puzzle made of 27 blocks connected by hidden strings into sixteen segments, each either two or three blocks long. The snake's path must make a 90-degree turn at the end of each segment.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe object is to arrange the puzzle's blocks into a 3-by-3-by-3 cube.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThese pictures show the puzzle's configuration when laid out two-dimensionally and its final state when solved.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:customXml w:element=\\\"image\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"height\\\" w:val=\\\"540\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"810\\\"/\u003e\u003cw:attr w:name=\\\"verticalAlign\\\" w:val=\\\"baseline\\\"/\u003e\u003cw:attr w:name=\\\"altText\\\" w:val=\\\"\\\"/\u003e\u003cw:attr w:name=\\\"relationshipId\\\" w:val=\\\"rId1\\\"/\u003e\u003c/w:customXmlPr\u003e\u003c/w:customXml\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eYour code should return a 27x3 array containing the path traversed by the snake when the puzzle is solved. Each row corresponds to one position, with [1 1 1] representing the back left lower corner of the cube and [3 3 3] representing the front right upper corner. For example, if the path begins in the front left lower corner and the first segment proceeds to the right, the first three rows of the array would be [3 1 1; 3 2 1; 3 3 1].\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\",\"relationship\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/image\",\"target\":\"/media/image1.jpeg\",\"relationshipId\":\"rId1\"}]},{\"partUri\":\"/media/image1.jpeg\",\"contentType\":\"image/jpeg\",\"content\":\"data:image/jpeg;base64,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\",\"relationship\":null}],\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"target\":\"/matlab/document.xml\",\"relationshipId\":\"rId1\"}]}"},{"id":879,"title":"Perform Rubik's Cube Moves","description":"A standard Rubik's Cube is shown in 3-D and also unfolded to identify the specific Tile-face numbering.\r\n\r\nThe faces are White-Up / Red-Left / Blue-Front / Orange-Right / Yellow-Down / Green-Back (ULFRDB)\r\n\r\nMoves are denoted as F for clockwise rotation of the Front face. F' is CCW and F2 is F twice. The F move would map 19 to 25,..., 7 goes to 18,..., and 23 is unchanged.\r\n\r\nThe moves X( R ), Y(U), and Z(F) rotate the entire cube with its associated face.\r\nX would map 23 to 14. (19:27) moves to (10:18). Only contents of 5 and 50 are unchanged There are also X' and X2 moves.\r\n\r\n\r\n\u003c\u003chttps://sites.google.com/site/razapor/matlab_cody/cube_small.gif\u003e\u003e\r\n\r\n\u003c\u003chttps://sites.google.com/site/razapor/matlab_cody/Cube_Map28_200.png\u003e\u003e\r\n\r\n\u003c\u003chttp://mathworks.com/matlabcentral/images/surf.gif\u003e\u003e\r\n\r\n\r\n  \r\n  \r\n  Input: (mov,rubik)\r\n  mov: is an integer 1:27 representing the moves in order: UFDLBRU'F'D'L'B'R'U2F2D2L2B2R2XYZX'Y'Z'X2Y2Z2\r\n  rubik: row vector of size 54\r\n  (A normal cube would have values 0:5 in locations 1:54,\r\n  The test input is generally numbered 1:54 to check that each tile is correctly remapped. A normal cube with 6 values may be used in testing)\r\n\r\n  Output: rubik vector of the input cubes values remapped based upon mov\r\n\r\nAll 27 moves are enumerated in the test suite\r\n\r\nFollow-up Challenges will be solving the cube at various move depths for time and actual face moves required.\r\n \r\nNote: Images inserted/linked to my free google web page. Used a gif and a png.\r\n\r\n\r\n\r\n\r\n","description_html":"\u003cp\u003eA standard Rubik's Cube is shown in 3-D and also unfolded to identify the specific Tile-face numbering.\u003c/p\u003e\u003cp\u003eThe faces are White-Up / Red-Left / Blue-Front / Orange-Right / Yellow-Down / Green-Back (ULFRDB)\u003c/p\u003e\u003cp\u003eMoves are denoted as F for clockwise rotation of the Front face. F' is CCW and F2 is F twice. The F move would map 19 to 25,..., 7 goes to 18,..., and 23 is unchanged.\u003c/p\u003e\u003cp\u003eThe moves X( R ), Y(U), and Z(F) rotate the entire cube with its associated face.\r\nX would map 23 to 14. (19:27) moves to (10:18). Only contents of 5 and 50 are unchanged There are also X' and X2 moves.\u003c/p\u003e\u003cimg src=\"https://sites.google.com/site/razapor/matlab_cody/cube_small.gif\"\u003e\u003cimg src=\"https://sites.google.com/site/razapor/matlab_cody/Cube_Map28_200.png\"\u003e\u003cimg src=\"http://mathworks.com/matlabcentral/images/surf.gif\"\u003e\u003cpre class=\"language-matlab\"\u003eInput: (mov,rubik)\r\nmov: is an integer 1:27 representing the moves in order: UFDLBRU'F'D'L'B'R'U2F2D2L2B2R2XYZX'Y'Z'X2Y2Z2\r\nrubik: row vector of size 54\r\n(A normal cube would have values 0:5 in locations 1:54,\r\nThe test input is generally numbered 1:54 to check that each tile is correctly remapped. A normal cube with 6 values may be used in testing)\r\n\u003c/pre\u003e\u003cpre class=\"language-matlab\"\u003eOutput: rubik vector of the input cubes values remapped based upon mov\r\n\u003c/pre\u003e\u003cp\u003eAll 27 moves are enumerated in the test suite\u003c/p\u003e\u003cp\u003eFollow-up Challenges will be solving the cube at various move depths for time and actual face moves required.\u003c/p\u003e\u003cp\u003eNote: Images inserted/linked to my free google web page. Used a gif and a png.\u003c/p\u003e","function_template":"function r = rubik_rot(mov,r)\r\n  r=r;\r\nend","test_suite":"%%\r\n% Single move cases\r\nmov=1; % U\r\nr=1:54;\r\nr_exp=[19 2 3 22 5 6 25 8 9 12 15 18 11 14 17 10 13 16 46 20 21 49 23 24 52 26 27 28 29 30 31 32 33 34 35 36 37 38 7 40 41 4 43 44 1 45 47 48 42 50 51 39 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\nmov=7; % U'\r\nr=1:54;\r\nr_exp=[45 2 3 42 5 6 39 8 9 16 13 10 17 14 11 18 15 12 1 20 21 4 23 24 7 26 27 28 29 30 31 32 33 34 35 36 37 38 52 40 41 49 43 44 46 19 47 48 22 50 51 25 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\nmov=13; % U2\r\nr=1:54;\r\nr_exp=[46 2 3 49 5 6 52 8 9 18 17 16 15 14 13 12 11 10 45 20 21 42 23 24 39 26 27 28 29 30 31 32 33 34 35 36 37 38 25 40 41 22 43 44 19 1 47 48 4 50 51 7 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\nmov=19; % X\r\nr=1:54;\r\nr_exp=[7 4 1 8 5 2 9 6 3 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 10 11 12 13 14 15 16 17 18 48 51 54 47 50 53 46 49 52];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\nmov=22; % X'\r\nr=1:54;\r\nr_exp=[3 6 9 2 5 8 1 4 7 37 38 39 40 41 42 43 44 45 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 52 49 46 53 50 47 54 51 48];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\nmov=25; % X2\r\nr=1:54;\r\nr_exp=[9 8 7 6 5 4 3 2 1 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 54 53 52 51 50 49 48 47 46];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Remaining CW Face moves 2-6\r\nmov=2; % F\r\nr=1:54;\r\nr_exp=[1 2 3 4 5 6 28 31 34 10 11 9 13 14 8 16 17 7 21 24 27 20 23 26 19 22 25 48 29 30 47 32 33 46 35 36 37 38 39 40 41 42 43 44 45 12 15 18 49 50 51 52 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=3; % D\r\nr=1:54;\r\nr_exp=[1 2 43 4 5 40 7 8 37 10 11 12 13 14 15 16 17 18 19 20 3 22 23 6 25 26 9 30 33 36 29 32 35 28 31 34 54 38 39 51 41 42 48 44 45 46 47 21 49 50 24 52 53 27];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=4; % L\r\nr=1:54;\r\nr_exp=[3 6 9 2 5 8 1 4 7 37 38 39 13 14 15 16 17 18 10 11 12 22 23 24 25 26 27 19 20 21 31 32 33 34 35 36 28 29 30 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=5; % B\r\nr=1:54;\r\nr_exp=[16 13 10 4 5 6 7 8 9 52 11 12 53 14 15 54 17 18 19 20 21 22 23 24 25 26 27 28 29 1 31 32 2 34 35 3 39 42 45 38 41 44 37 40 43 46 47 48 49 50 51 36 33 30];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=6; % R\r\nr=1:54;\r\nr_exp=[1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 25 26 27 19 20 21 22 23 24 34 35 36 28 29 30 31 32 33 43 44 45 37 38 39 40 41 42 16 17 18 48 51 54 47 50 53 46 49 52];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Remaining CCW Face moves 8-12\r\nmov=8; % F'\r\nr=1:54;\r\nr_exp=[1 2 3 4 5 6 18 15 12 10 11 46 13 14 47 16 17 48 25 22 19 26 23 20 27 24 21 7 29 30 8 32 33 9 35 36 37 38 39 40 41 42 43 44 45 34 31 28 49 50 51 52 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=9; % D'\r\nr=1:54;\r\nr_exp=[1 2 21 4 5 24 7 8 27 10 11 12 13 14 15 16 17 18 19 20 48 22 23 51 25 26 54 34 31 28 35 32 29 36 33 30 9 38 39 6 41 42 3 44 45 46 47 43 49 50 40 52 53 37];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=10; % L'\r\nr=1:54;\r\nr_exp=[7 4 1 8 5 2 9 6 3 19 20 21 13 14 15 16 17 18 28 29 30 22 23 24 25 26 27 37 38 39 31 32 33 34 35 36 10 11 12 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=11; % B'\r\nr=1:54;\r\nr_exp=[30 33 36 4 5 6 7 8 9 3 11 12 2 14 15 1 17 18 19 20 21 22 23 24 25 26 27 28 29 54 31 32 53 34 35 52 43 40 37 44 41 38 45 42 39 46 47 48 49 50 51 10 13 16];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=12; % R'\r\nr=1:54;\r\nr_exp=[1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 43 44 45 19 20 21 22 23 24 16 17 18 28 29 30 31 32 33 25 26 27 37 38 39 40 41 42 34 35 36 52 49 46 53 50 47 54 51 48];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Remaining Double Face moves 14-18\r\nmov=14; % F2\r\nr=1:54;\r\nr_exp=[1 2 3 4 5 6 48 47 46 10 11 34 13 14 31 16 17 28 27 26 25 24 23 22 21 20 19 18 29 30 15 32 33 12 35 36 37 38 39 40 41 42 43 44 45 9 8 7 49 50 51 52 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=15; % D2\r\nr=1:54;\r\nr_exp=[1 2 48 4 5 51 7 8 54 10 11 12 13 14 15 16 17 18 19 20 43 22 23 40 25 26 37 36 35 34 33 32 31 30 29 28 27 38 39 24 41 42 21 44 45 46 47 3 49 50 6 52 53 9];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=16; % L2\r\nr=1:54;\r\nr_exp=[9 8 7 6 5 4 3 2 1 28 29 30 13 14 15 16 17 18 37 38 39 22 23 24 25 26 27 10 11 12 31 32 33 34 35 36 19 20 21 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=17; % B2\r\nr=1:54;\r\nr_exp=[54 53 52 4 5 6 7 8 9 36 11 12 33 14 15 30 17 18 19 20 21 22 23 24 25 26 27 28 29 16 31 32 13 34 35 10 45 44 43 42 41 40 39 38 37 46 47 48 49 50 51 3 2 1];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=18; % R2\r\nr=1:54;\r\nr_exp=[1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 34 35 36 19 20 21 22 23 24 43 44 45 28 29 30 31 32 33 16 17 18 37 38 39 40 41 42 25 26 27 54 53 52 51 50 49 48 47 46];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Remaining Cube CW moves 20-21\r\nmov=20; % Y\r\nr=1:54;\r\nr_exp=[19 20 21 22 23 24 25 26 27 12 15 18 11 14 17 10 13 16 46 47 48 49 50 51 52 53 54 34 31 28 35 32 29 36 33 30 9 8 7 6 5 4 3 2 1 45 44 43 42 41 40 39 38 37];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=21; % Z\r\nr=1:54;\r\nr_exp=[30 33 36 29 32 35 28 31 34 3 6 9 2 5 8 1 4 7 21 24 27 20 23 26 19 22 25 48 51 54 47 50 53 46 49 52 43 40 37 44 41 38 45 42 39 12 15 18 11 14 17 10 13 16];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Remaining Cube CCW moves 23-24\r\nmov=23; % Y\r\nr=1:54;\r\nr_exp=[45 44 43 42 41 40 39 38 37 16 13 10 17 14 11 18 15 12 1 2 3 4 5 6 7 8 9 30 33 36 29 32 35 28 31 34 54 53 52 51 50 49 48 47 46 19 20 21 22 23 24 25 26 27];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=24; % Z\r\nr=1:54;\r\nr_exp=[16 13 10 17 14 11 18 15 12 52 49 46 53 50 47 54 51 48 25 22 19 26 23 20 27 24 21 7 4 1 8 5 2 9 6 3 39 42 45 38 41 44 37 40 43 34 31 28 35 32 29 36 33 30];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Remaining Cube Half Rotate moves 26-27\r\nmov=26; % Y\r\nr=1:54;\r\nr_exp=[46 47 48 49 50 51 52 53 54 18 17 16 15 14 13 12 11 10 45 44 43 42 41 40 39 38 37 36 35 34 33 32 31 30 29 28 27 26 25 24 23 22 21 20 19 1 2 3 4 5 6 7 8 9];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\nmov=27; % Z\r\nr=1:54;\r\nr_exp=[54 53 52 51 50 49 48 47 46 36 35 34 33 32 31 30 29 28 27 26 25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 10 45 44 43 42 41 40 39 38 37 9 8 7 6 5 4 3 2 1];\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Verify that values in the array are returned and not positions\r\nmov=2; % F\r\nr=1:54;\r\nr=r*0; % The simplest Cube - Solid\r\nr_exp=r; \r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n%%\r\n% Perform Sequence of moves and then back\r\nr=1:54;\r\nr_exp=r; \r\nmov=1; % U\r\nr=rubik_rot(mov,r);\r\nmov=2; % F\r\nr=rubik_rot(mov,r);\r\nmov=3; % D\r\nr=rubik_rot(mov,r);\r\nmov=4; % L\r\nr=rubik_rot(mov,r);\r\nmov=5; % B\r\nr=rubik_rot(mov,r);\r\nmov=6; % R\r\nr=rubik_rot(mov,r);\r\nmov=12; % R'\r\nr=rubik_rot(mov,r);\r\nmov=11; % B'\r\nr=rubik_rot(mov,r);\r\nmov=10; % L'\r\nr=rubik_rot(mov,r);\r\nmov=9; % D'\r\nr=rubik_rot(mov,r);\r\nmov=8; % F'\r\nr=rubik_rot(mov,r);\r\nmov=7; % U'\r\n\r\nassert(isequal(rubik_rot(mov,r),r_exp))\r\n\r\n\r\n","published":true,"deleted":false,"likes_count":3,"comments_count":0,"created_by":3097,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":22,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":1,"created_at":"2012-08-05T05:47:50.000Z","updated_at":"2026-03-28T16:32:39.000Z","published_at":"2012-08-05T19:30:31.000Z","restored_at":null,"restored_by":null,"spam":false,"simulink":false,"admin_reviewed":false,"description_opc":"{\"relationships\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/document\",\"targetMode\":\"\",\"relationshipId\":\"rId1\",\"target\":\"/matlab/document.xml\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/output\",\"targetMode\":\"\",\"relationshipId\":\"rId2\",\"target\":\"/matlab/output.xml\"}],\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"relationship\":[{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/image\",\"targetMode\":\"\",\"relationshipId\":\"rId1\",\"target\":\"/media/image1.gif\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/image\",\"targetMode\":\"\",\"relationshipId\":\"rId2\",\"target\":\"/media/image1.png\"},{\"relationshipType\":\"http://schemas.mathworks.com/matlab/code/2013/relationships/image\",\"targetMode\":\"\",\"relationshipId\":\"rId3\",\"target\":\"/media/image2.gif\"}],\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\\n\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eA standard Rubik's Cube is shown in 3-D and also unfolded to identify the specific Tile-face numbering.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe faces are White-Up / Red-Left / Blue-Front / Orange-Right / Yellow-Down / Green-Back (ULFRDB)\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eMoves are denoted as F for clockwise rotation of the Front face. F' is CCW and F2 is F twice. The F move would map 19 to 25,..., 7 goes to 18,..., and 23 is unchanged.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe moves X( R ), Y(U), and Z(F) rotate the entire cube with its associated face. X would map 23 to 14. (19:27) moves to (10:18). Only contents of 5 and 50 are unchanged There are also X' and X2 moves.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:customXml w:element=\\\"image\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"height\\\" w:val=\\\"-1\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"-1\\\"/\u003e\u003cw:attr w:name=\\\"relationshipId\\\" w:val=\\\"rId1\\\"/\u003e\u003c/w:customXmlPr\u003e\u003c/w:customXml\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:customXml w:element=\\\"image\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"height\\\" w:val=\\\"-1\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"-1\\\"/\u003e\u003cw:attr w:name=\\\"relationshipId\\\" w:val=\\\"rId2\\\"/\u003e\u003c/w:customXmlPr\u003e\u003c/w:customXml\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:customXml w:element=\\\"image\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"height\\\" w:val=\\\"-1\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"-1\\\"/\u003e\u003cw:attr w:name=\\\"relationshipId\\\" w:val=\\\"rId3\\\"/\u003e\u003c/w:customXmlPr\u003e\u003c/w:customXml\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"code\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003e\u003c![CDATA[Input: (mov,rubik)\\nmov: is an integer 1:27 representing the moves in order: UFDLBRU'F'D'L'B'R'U2F2D2L2B2R2XYZX'Y'Z'X2Y2Z2\\nrubik: row vector of size 54\\n(A normal cube would have values 0:5 in locations 1:54,\\nThe test input is generally numbered 1:54 to check that each tile is correctly remapped. A normal cube with 6 values may be used in testing)\\n\\nOutput: rubik vector of the input cubes values remapped based upon mov]]\u003e\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eAll 27 moves are enumerated in the test suite\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eFollow-up Challenges will be solving the cube at various move depths for time and actual face moves required.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eNote: Images inserted/linked to my free google web page. Used a gif and a png.\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003c/w:body\u003e\u003c/w:document\u003e\"},{\"partUri\":\"/matlab/output.xml\",\"contentType\":\"text/xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\" standalone=\\\"no\\\" ?\u003e\u003cembeddedOutputs\u003e\u003cmetaData\u003e\u003cevaluationState\u003emanual\u003c/evaluationState\u003e\u003clayoutState\u003ecode\u003c/layoutState\u003e\u003coutputStatus\u003eready\u003c/outputStatus\u003e\u003c/metaData\u003e\u003coutputArray type=\\\"array\\\"/\u003e\u003cregionArray type=\\\"array\\\"/\u003e\u003c/embeddedOutputs\u003e\"},{\"partUri\":\"/media/image1.gif\",\"contentType\":\"image/gif\",\"content\":\"data:image/gif;base64,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\"},{\"partUri\":\"/media/image1.png\",\"contentType\":\"image/png\",\"content\":\"data:image/png;base64,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\"},{\"partUri\":\"/media/image2.gif\",\"contentType\":\"image/gif\",\"content\":\"data:image/gif;base64,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\"}]}"}],"term":"tag:\"cube\"","current_player_id":null,"fields":[{"name":"page","type":"integer","callback":null,"default":1,"directive":null,"facet":null,"facet_method":"and","operator":null,"param":null,"static":null,"prepend":true},{"name":"per_page","type":"integer","callback":null,"default":50,"directive":null,"facet":null,"facet_method":"and","operator":null,"param":null,"static":null,"prepend":true},{"name":"sort","type":"string","callback":null,"default":null,"directive":null,"facet":null,"facet_method":"and","operator":null,"param":null,"static":null,"prepend":true},{"name":"body","type":"text","callback":null,"default":"*:*","directive":null,"facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":false},{"name":"group","type":"string","callback":null,"default":null,"directive":"group","facet":true,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"difficulty_rating_bin","type":"string","callback":null,"default":null,"directive":"difficulty_rating_bin","facet":true,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"id","type":"integer","callback":null,"default":null,"directive":"id","facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"tag","type":"string","callback":null,"default":null,"directive":"tag","facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"product","type":"string","callback":null,"default":null,"directive":"product","facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"created_at","type":"timeframe","callback":{},"default":null,"directive":"created_at","facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"profile_id","type":"integer","callback":null,"default":null,"directive":"author_id","facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"created_by","type":"string","callback":null,"default":null,"directive":"author","facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"player_id","type":"integer","callback":null,"default":null,"directive":"solver_id","facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"player","type":"string","callback":null,"default":null,"directive":"solver","facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"solvers_count","type":"integer","callback":null,"default":null,"directive":"solvers_count","facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"comments_count","type":"integer","callback":null,"default":null,"directive":"comments_count","facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"likes_count","type":"integer","callback":null,"default":null,"directive":"likes_count","facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"leader_id","type":"integer","callback":null,"default":null,"directive":"leader_id","facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true},{"name":"leading_solution","type":"integer","callback":null,"default":null,"directive":"leading_solution","facet":null,"facet_method":"and","operator":null,"param":"term","static":null,"prepend":true}],"filters":[{"name":"asset_type","type":"string","callback":null,"default":null,"directive":null,"facet":null,"facet_method":"and","operator":null,"param":null,"static":"\"cody:problem\"","prepend":true},{"name":"profile_id","type":"integer","callback":{},"default":null,"directive":null,"facet":null,"facet_method":"and","operator":null,"param":"author_id","static":null,"prepend":true}],"query":{"params":{"per_page":50,"term":"tag:\"cube\"","current_player":null,"sort":"map(difficulty_value,0,0,999) asc"},"parser":"MathWorks::Search::Solr::QueryParser","directives":{"term":{"directives":{"tag":[["tag:\"cube\"","","\"","cube","\""]]}}},"facets":{"#\u003cMathWorks::Search::Field:0x00007f1020a51680\u003e":null,"#\u003cMathWorks::Search::Field:0x00007f1020a515e0\u003e":null},"filters":{"#\u003cMathWorks::Search::Field:0x00007f1020a50d20\u003e":"\"cody:problem\""},"fields":{"#\u003cMathWorks::Search::Field:0x00007f1020a51900\u003e":1,"#\u003cMathWorks::Search::Field:0x00007f1020a51860\u003e":50,"#\u003cMathWorks::Search::Field:0x00007f1020a517c0\u003e":"map(difficulty_value,0,0,999) asc","#\u003cMathWorks::Search::Field:0x00007f1020a51720\u003e":"tag:\"cube\""},"user_query":{"#\u003cMathWorks::Search::Field:0x00007f1020a51720\u003e":"tag:\"cube\""},"queried_facets":{}},"query_backend":{"connection":{"configuration":{"index_url":"http://index-op-v2/solr/","query_url":"http://search-op-v2/solr/","direct_access_index_urls":["http://index-op-v2/solr/"],"direct_access_query_urls":["http://search-op-v2/solr/"],"timeout":10,"vhost":"search","exchange":"search.topic","heartbeat":30,"pre_index_mode":false,"host":"rabbitmq-eks","port":5672,"username":"search","password":"J3bGPZzQ7asjJcCk","virtual_host":"search","indexer":"amqp","http_logging":"true","core":"cody"},"query_connection":{"uri":"http://search-op-v2/solr/cody/","proxy":null,"connection":{"parallel_manager":null,"headers":{"User-Agent":"Faraday v1.0.1"},"params":{},"options":{"params_encoder":"Faraday::FlatParamsEncoder","proxy":null,"bind":null,"timeout":null,"open_timeout":null,"read_timeout":null,"write_timeout":null,"boundary":null,"oauth":null,"context":null,"on_data":null},"ssl":{"verify":true,"ca_file":null,"ca_path":null,"verify_mode":null,"cert_store":null,"client_cert":null,"client_key":null,"certificate":null,"private_key":null,"verify_depth":null,"version":null,"min_version":null,"max_version":null},"default_parallel_manager":null,"builder":{"adapter":{"name":"Faraday::Adapter::NetHttp","args":[],"block":null},"handlers":[{"name":"Faraday::Response::RaiseError","args":[],"block":null}],"app":{"app":{"ssl_cert_store":{"verify_callback":null,"error":null,"error_string":null,"chain":null,"time":null},"app":{},"connection_options":{},"config_block":null}}},"url_prefix":"http://search-op-v2/solr/cody/","manual_proxy":false,"proxy":null},"update_format":"RSolr::JSON::Generator","update_path":"update","options":{"url":"http://search-op-v2/solr/cody"}}},"query":{"params":{"per_page":50,"term":"tag:\"cube\"","current_player":null,"sort":"map(difficulty_value,0,0,999) asc"},"parser":"MathWorks::Search::Solr::QueryParser","directives":{"term":{"directives":{"tag":[["tag:\"cube\"","","\"","cube","\""]]}}},"facets":{"#\u003cMathWorks::Search::Field:0x00007f1020a51680\u003e":null,"#\u003cMathWorks::Search::Field:0x00007f1020a515e0\u003e":null},"filters":{"#\u003cMathWorks::Search::Field:0x00007f1020a50d20\u003e":"\"cody:problem\""},"fields":{"#\u003cMathWorks::Search::Field:0x00007f1020a51900\u003e":1,"#\u003cMathWorks::Search::Field:0x00007f1020a51860\u003e":50,"#\u003cMathWorks::Search::Field:0x00007f1020a517c0\u003e":"map(difficulty_value,0,0,999) asc","#\u003cMathWorks::Search::Field:0x00007f1020a51720\u003e":"tag:\"cube\""},"user_query":{"#\u003cMathWorks::Search::Field:0x00007f1020a51720\u003e":"tag:\"cube\""},"queried_facets":{}},"options":{"fields":["id","difficulty_rating"]},"join":" "},"results":[{"id":43123,"difficulty_rating":"easy"},{"id":2491,"difficulty_rating":"easy"},{"id":60983,"difficulty_rating":"easy"},{"id":2175,"difficulty_rating":"easy-medium"},{"id":60979,"difficulty_rating":"easy-medium"},{"id":42320,"difficulty_rating":"easy-medium"},{"id":60941,"difficulty_rating":"easy-medium"},{"id":50629,"difficulty_rating":"medium"},{"id":879,"difficulty_rating":"medium"}]}}