{"group":{"id":1,"name":"Community","lockable":false,"created_at":"2012-01-18T18:02:15.000Z","updated_at":"2026-04-06T14:01:22.000Z","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":"2026-04-06T00:00:00.000Z","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":43604,"title":"make histogram","description":"You probably know the function hist(x,n) to get the histogram. Now try to write the function yourself!\r\nFor the cheaters wanting to use the function hist(), this will make the assertion fail!","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: 51px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 407px 25.5px; transform-origin: 407px 25.5px; 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: 310.5px 8px; transform-origin: 310.5px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eYou probably know the function hist(x,n) to get the histogram. Now try to write the function yourself!\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: 258.5px 8px; transform-origin: 258.5px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eFor the cheaters wanting to use the function hist(), this will make the assertion fail!\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function y = h_istogram(x,n)\r\n % do not use the function hist\r\n y = x;\r\nend","test_suite":"%%\r\nx = randi(20,100,1);\r\nn = 1:20;\r\ny = h_istogram(x,n);\r\nassert(isequal(y,hist(x,n)))\r\n\r\n%%\r\nx = (1:20);\r\nn = 1:20;\r\ny = h_istogram(x,n);\r\nassert(isequal(y,hist(x,n)))\r\n\r\n%%\r\nx = ones(1,20);\r\nn = 1:20;\r\ny = h_istogram(x,n);\r\nassert(isequal(y,hist(x,n)))\r\n\r\n%%\r\nassessFunctionAbsence({'hist'}, 'FileName', 'h_istogram.m');\r\nassessFunctionAbsence({'histc'}, 'FileName', 'h_istogram.m');\r\n","published":true,"deleted":false,"likes_count":0,"comments_count":1,"created_by":94929,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":21,"test_suite_updated_at":"2021-06-25T19:05:13.000Z","rescore_all_solutions":true,"group_id":1,"created_at":"2016-10-24T13:26:44.000Z","updated_at":"2026-03-28T21:33:04.000Z","published_at":"2016-10-24T13:26:44.000Z","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\u003eYou probably know the function hist(x,n) to get the histogram. Now try to write the function yourself!\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\u003eFor the cheaters wanting to use the function hist(), this will make the assertion fail!\u003c/w:t\u003e\u003c/w:r\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":46022,"title":"Let's create histogram data by yourself.","description":"We'd like to create histogram data, which first column shows the data, and second column shows the frequency.\r\ninput = [1, 2, 1, 1, 2, 3, 4, 1];\r\noutput = [1, 4; 2, 2; 3, 1; 4, 1];\r\nActually, useful matlab function exists to solve. Please try to solve it with and without the useful matlab function.","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: 111px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 407px 55.5px; transform-origin: 407px 55.5px; 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: 350.5px 8px; transform-origin: 350.5px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eWe'd like to create histogram data, which first column shows the data, and second column shows the frequency.\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: 89.5px 8px; transform-origin: 89.5px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003einput = [1, 2, 1, 1, 2, 3, 4, 1];\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: 94px 8px; transform-origin: 94px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eoutput = [1, 4; 2, 2; 3, 1; 4, 1];\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: 347.5px 8px; transform-origin: 347.5px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eActually, useful matlab function exists to solve. Please try to solve it with and without the useful matlab function.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function y = your_accum_count(x)\r\n\r\n\r\nend","test_suite":"%% Test 1\r\nx = [1, 2, 1, 1, 2, 3, 4, 1];\r\ny_correct = [1, 4; 2, 2; 3, 1; 4, 1];\r\nassert(isequal(your_accum_count(x),y_correct))\r\n\r\n%% Test 2\r\nx = [1:10, 2*ones(1, 50), 5*ones(1, 20)];\r\ny_correct = [ 1 1\r\n 2 51\r\n 3 1\r\n 4 1\r\n 5 21\r\n 6 1\r\n 7 1\r\n 8 1\r\n 9 1\r\n 10 1];\r\nassert(isequal(your_accum_count(x),y_correct))","published":true,"deleted":false,"likes_count":1,"comments_count":0,"created_by":415927,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":23,"test_suite_updated_at":"2022-02-21T09:33:13.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2020-07-04T13:52:51.000Z","updated_at":"2026-03-05T13:53:45.000Z","published_at":"2020-07-04T14:06:42.000Z","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\u003eWe'd like to create histogram data, which first column shows the data, and second column shows the frequency.\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\u003einput = [1, 2, 1, 1, 2, 3, 4, 1];\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\u003eoutput = [1, 4; 2, 2; 3, 1; 4, 1];\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\u003eActually, useful matlab function exists to solve. Please try to solve it with and without the useful matlab function.\u003c/w:t\u003e\u003c/w:r\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":1985,"title":"How unique?","description":"Sometimes, when we check unique entries of vector we would like to know how many times each value occurs.\r\n\r\nGiven vector of numbers *A* return vector *U* of unique values of A and corresponding vector *H* with occurrences.\r\n\r\nExample:\r\n\r\n in: A = [2 2 2 3 3 2 3 8 6 5 6]\r\n out: U = [2 3 8 6 5]\r\n H = [4 3 1 2 1] ","description_html":"\u003cp\u003eSometimes, when we check unique entries of vector we would like to know how many times each value occurs.\u003c/p\u003e\u003cp\u003eGiven vector of numbers \u003cb\u003eA\u003c/b\u003e return vector \u003cb\u003eU\u003c/b\u003e of unique values of A and corresponding vector \u003cb\u003eH\u003c/b\u003e with occurrences.\u003c/p\u003e\u003cp\u003eExample:\u003c/p\u003e\u003cpre\u003e in: A = [2 2 2 3 3 2 3 8 6 5 6]\r\n out: U = [2 3 8 6 5]\r\n H = [4 3 1 2 1] \u003c/pre\u003e","function_template":"function [U,H] = hunique(A)\r\n U = 1:5;\r\n H = ones(1,5);\r\nend","test_suite":"%%\r\nA = [2 2 2 3 3 2 3 8 6 5 6];\r\n[U, H] = hunique(A);\r\nU_ok = [2 3 8 6 5];\r\nH_ok = [4 3 1 2 1];\r\nassert(isequal(U,U_ok));\r\nassert(isequal(H,H_ok));\r\n%%\r\nA = [2 2 2 3 3 2 3 8 6 5 6 8];\r\n[U, H] = hunique(A);\r\nU_ok = [2 3 8 6 5];\r\nH_ok = [4 3 2 2 1];\r\nassert(isequal(U,U_ok));\r\nassert(isequal(H,H_ok));\r\n%%\r\nA = 100:-11:1;\r\nassert(isequal(hunique(A),A));\r\n[~,H] = hunique(A);\r\nassert(isequal(H,ones(1,10)));\r\n%%\r\nA = randi([-10 10],1,100);\r\n[U,H] = hunique(A);\r\nassert(sum(H)==numel(A));\r\nassert(isequal(unique(A),sort(U)));\r\n\r\n% number of test cases may increace in the future.\r\n% any proposals of test cases warmly welcome.","published":true,"deleted":false,"likes_count":1,"comments_count":0,"created_by":14358,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":137,"test_suite_updated_at":"2014-04-06T18:52:22.000Z","rescore_all_solutions":false,"group_id":21,"created_at":"2013-11-12T23:00:10.000Z","updated_at":"2026-02-26T16:00:10.000Z","published_at":"2013-11-13T23:40:01.000Z","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\u003eSometimes, when we check unique entries of vector we would like to know how many times each value occurs.\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\u003eGiven vector of numbers\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:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eA\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e return vector\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:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eU\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e of unique values of A and corresponding vector\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:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eH\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e with occurrences.\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\u003eExample:\u003c/w:t\u003e\u003c/w:r\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[ in: A = [2 2 2 3 3 2 3 8 6 5 6]\\n out: U = [2 3 8 6 5]\\n H = [4 3 1 2 1]]]\u003e\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":60421,"title":"Largest Rectangle Area in a Histogram","description":"Given a histogram represented by an array of integers, e.g., [2, 1, 4, 5, 1, 3, 3] :\r\n\r\nfind the maximum area of a rectangle that can be formed using the histogram bars. In the example histogram, the maximum area is 8 units.\r\n","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: 623.537px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 386.491px 311.761px; transform-origin: 386.499px 311.768px; vertical-align: baseline; \"\u003e\u003cdiv style=\"block-size: 21.0085px; 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: 363.494px 10.4972px; text-align: left; transform-origin: 363.501px 10.5043px; 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 0px; transform-origin: 0px 0px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eGiven a histogram represented by an array of integers, e.g., [2, 1, 4, 5, 1, 3, 3] :\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 263.991px; 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: 363.494px 131.989px; text-align: left; transform-origin: 363.501px 131.996px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" width=\"320\" height=\"264\" style=\"vertical-align: middle;width: 320px;height: 264px\" src=\"data:image/png;base64,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\" data-image-state=\"image-loaded\"\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 42.017px; 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: 363.494px 21.0085px; text-align: left; transform-origin: 363.501px 21.0085px; 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 0px; transform-origin: 0px 0px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003efind the maximum area of a rectangle that can be formed using the histogram bars. In the example histogram, the maximum area is 8 units.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 269.545px; 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: 363.494px 134.773px; text-align: left; transform-origin: 363.501px 134.773px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" width=\"320\" height=\"264\" style=\"vertical-align: baseline;width: 320px;height: 264px\" 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\" data-image-state=\"image-loaded\"\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function a = max_rectangle_area(H)\r\n\r\nend\r\n","test_suite":"%%\r\nH = [2, 1, 4, 5, 1, 3, 3]\r\nbar(H)\r\na = max_rectangle_area(H)\r\na_correct = 8\r\nassert(isequal(a,a_correct))\r\n\r\n%% ones\r\nH = randi([1,100])\r\nbar(H)\r\na = max_rectangle_area(H)\r\na_correct = H\r\nassert(isequal(a,a_correct))\r\n\r\n%% two \r\nH = [31, 96]\r\nbar(H)\r\na = max_rectangle_area(H)\r\na_correct = 96\r\nassert(isequal(a,a_correct))\r\n\r\n%% two\r\nH = [31, 61]\r\nbar(H)\r\na = max_rectangle_area(H)\r\na_correct = 31*2\r\nassert(isequal(a,a_correct))\r\n\r\n%% two\r\nH = randi([1,100], 1,2)\r\nbar(H)\r\na = max_rectangle_area(H)\r\na_correct = max(2*min(H),max(H))\r\nassert(isequal(a,a_correct))\r\n\r\n%% \r\nv = randi([2,5]);\r\nn = randi([2,5]);\r\ni = randi([1,n]);\r\nH = ones(1,n);\r\nH(i) = v;\r\nH\r\nbar(H)\r\na = max_rectangle_area(H)\r\na_correct = max(v,n)\r\nassert(isequal(a,a_correct))\r\n\r\n%%\r\nH = 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= max_rectangle_area(H)\r\na_correct = 355232\r\nassert(isequal(a,a_correct))\r\n","published":true,"deleted":false,"likes_count":2,"comments_count":0,"created_by":208445,"edited_by":208445,"edited_at":"2024-06-02T10:46:17.000Z","deleted_by":null,"deleted_at":null,"solvers_count":6,"test_suite_updated_at":"2024-06-02T10:46:17.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2024-06-02T10:37:17.000Z","updated_at":"2024-06-02T10:46:17.000Z","published_at":"2024-06-02T10:37:17.000Z","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 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Outages Histogram","description":"Create a function that takes power outage data as an input and creates a histogram of the number of outages as a function of Region. Note that the Region column of the power outage table contains a cell array of character vectors.\r\nRotate the x-axis tick labels by 30 degrees and label the y-axis with \"Number of Outages\".\r\nYour function should return the figure handle as output.\r\n","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: 424.667px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 407px 212.333px; transform-origin: 407px 212.333px; vertical-align: baseline; \"\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=\"\"\u003eCreate a function that takes power outage data as an input and creates a histogram of the number of outages as a function of Region. Note that the Region column of the power outage table contains a cell array of character vectors.\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=\"\"\u003eRotate the \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: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"font-style: italic; \"\u003ex\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: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003e-axis tick labels by 30 degrees and label the \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: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"font-style: italic; \"\u003ey\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: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003e-axis with \"Number of Outages\".\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=\"\"\u003eYour function should return the figure handle as output.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 313.667px; 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 156.833px; text-align: left; transform-origin: 384px 156.833px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" width=\"678\" height=\"308\" style=\"vertical-align: baseline;width: 678px;height: 308px\" 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Yvj2P2OZdtiI3rqG4zOm8tLoRWTamDiw+EtmbDmBXq/HpiqLOeETWHwih4Y9R/PeC724eDtwaTKA0a89iocO1Nb2WJQk8tPiRWQVG0GlQlOWyuyvf2BnoZb9C95i+ZFotn/5PnNPVnN22wymLdoIWnvsrWr49ceP+XHzGczKndvvt0cphxd+zZjv92LUO1CTvZMvxn3K/qIKClK38s3nC8g12aLXV7JjzgxWHk7GTCzTR4zl10QVej2krf+eD38+QOkd3pKY/buw6/MID3b0QmVhSd9h4/nw2XtwaeDIiV/eYPGxPOwd9OhTV/PhfzeTTRZrPxzP5H1V6PVaSk//yvgv1pOLCktrW2xtNKis7GrPX3tb1BYqjJWHmfjqp2xON2GvN3F4xmgmzz1EVfZBXnxhCpHp6cye/j2xZfH88sIYdpzNYPXXHzDnWDp6vR6rgtNMeusj1qdVY2FpTVn8Jj585QmeG7uKrPJkfly2nsKKE/zwwlvsSVOj1yskL5/C54sjKb/+LrhtqjMyyc+tRqVSocrewmfj3iW2XI1er6dsZzhvfrKA5PI0lr3+Kt8fMaHXW1N0dA2vTNpIPiostbbYaS1RWdftX50NagsozdnFx29OYX++gqO+ip3fvsT3y49SjhqtzobN347g6ac/55jBgtStXzNn/wUsLLXoHPXo9XZkHfmFKcsOA2BppcXO1hoLK9u6Y6hDo67tPjU29lSe28yERduu2KpUFr84mjc3pGGhtyJ37xc8+dh0zllYUhSzgY9e/YA9yVVoy1OYPn0+sSUGvPqN5s2nu+BQF8Ez+H5Gv3A/zjag1tqj5J3mu0XLKaowg8oCq9JEvpv0PfsqHNkx733WRZ1i8ydvsjDqT/q93edu74H9f6783DEWJnnw2XevEeIIDo268u2M+TzUAlRqDbb2juj1esx5J5k9ZzEZxdVYaizZsHQyh1KrcHTUUxb5Cz8sO0Yp55n52FMsi6lBr1eTvWMer329g6LKdFZOeZ85J7LQ6/Vo8qOZ+OZHRGT+6zuLa1P+JSKn3qOorO0URwcHxa7pYGXKyQuKsaJA+eqp5orGWqs4ODoqjg72irVGrQyauEVJ+Lan0n3sEiXHXKMo1SYlceazyt1Pz1HS6+IVpx5Xnh39kLLtbF5tQe4Z5Y1ho5RvjqUo1YqiVJsTlR+G91JeXJGvFKUcVZ4Z+YCy+VS2otSYlfUTRiljvt2hlN2pnVGPRX47QLEYHXFV2ZLRjsrjs04qUXOeVpxGL6wtTNyihLUdrWyoqVEURVHOrnhT8R/9/e/i7Vr4vhIc7Kg4OtorNpYWyn9WpSl5e79TWvR/RzlTVa0oNdVK1aEflIb2o5XtOXHKW/f5KxqtjeLo6Kg42OsUK0u18vBPMZfinZj5iGI/+pff1ZMdvV65b/QY5Wxm3VFN3asM7/GcsjS/XPlmVDPlvdUblC96BCkvbjAoM0YFKRora8XBofac02rUStj7K5VK003aifVCovLRPU2VqbtyLhflxyrvDB+lTD6UWHeNJCszHrtLefGXLCUnYa1yn7+VorN3UPr1u0uZuHSvkmk0K4qSpHzYRqVo7RyUtm1bK2MmLlZiKoxKzZ3arDrL3hukvPTTAaXiD5bNHu2ujFl4uvYfm19WWnT9rxKv5CqLR7ZRLG3sFT8/X+XxVz9VdmUUKtV1vzn2w/2K9ejVV8UpXvOi0n3oNOWcqVpRlGolLXqaMmrIq0r0pu8Va81IJSJ2l/LwqCeVQ0kbldG6BspXy7YrD3dxV6xs7GrPX52tYmmhVkZvMCqKoihxq95RApwHK2uLKxVTtUkprzQo1TXnlDdDLRStnYPSoUN75cUvVyrx9WD/5pzaoNzfuvZ8cHByV8ImrFNSTNVK4k+DFEsLtWJr76A4OjoqOq1a8e10n7IjJVuZ/VBjRWNjrwQENFGeeuML5WB+2aX9e/CLHorNS5uvqiNp/gvKgJGzlVRzjaIo1Urszs+VUU98opwvVBSzoUx5v7+PMuqrzUpRdY1iMpQpFUazknlyo3LvQBfF0dFB0dlYKaGvXr4XnFr4vOI2es4fbk/82g+UwNFfXy44s0hp4vqs8mulSalRahRz1T7lOStb5ZtIRYlb/a7S9NkvlSpTtVKTflh5Nmy0svBC4aWfRn47UFGPXv+7OtIPL1LuHv26kl5oqC1I3Krc0+45ZZ2pRpk4qrUyadMG5ZPWjZXX1v9Zv7f1Rg7V/6y8fdOVkHvfV879wbKilCjlP893VPR6R8VeZ6s0HjROic0yKMayPOWt0b2U2fsvKIqiKKd/HK3c/59lSo5yQZnSWa1Y2dorwcEtlZEf/qRElVUpxbFblAc7uilWtrqrrukxm+70FXpn/btGTJ9eRlZqFOPDDGxfdpS8KgusrZvy2MSVJOUXUliQR3JcFF8/3RErnT2UFVBuqAZTJTkX3yP+GUs1NhozuXllmFAwV1ZQXKnB1q7uVb9ajUajBkClUqHUKPyPP/P8Id/QPvie3squrDLMmClN38qBKHc6tvS6vJJSTXlRAVVVl2eeajRWWFiYqFIUKnMzOJeSh/nMN7wzYRfha86Tk7iH11vWrqu2skZrLCKnyAQ1ZorzSqipqcHCQo21VQhjft5OVlERhfnZJJ45wcQhfje4NRaoLQAVWFhcnPKhwlrbmAfeW0x8XgGFhQWkJETz3fO9sVLfYDX/DxQlHSE2txKtppq8vNJL10iJwRJbWxX2zm35ZP4hFs79gr59/Jj17utMWXIUQ5WOh36IZsOyuTzzTG+OzxvPsKcXkH2Ht8dRpyV5/y7OZFQACob8NM4np2OsvuKqNpWTnVE3V8SspfNrS9kXsZH3338SQ/w6+vebxMUxKo2VFjBgrDFTlnGBuLQiVHZ2WBiKKak0o2CiLLcMs6UNlpYAaixUgMri0mstC0sNWsuOvLstmuyiIgryMkmIPsrbXa94PzusH/c5aLG0sMRWa42F0Z6npp9k3dJZPP54Vw58/yJPvrKcPOqBjs9wOC6dXfOepfzIEqJjS7G009Ek6GU2pWRTUFRETkYCv/78Be0aaunx3gZ2r1vL+PHDKTi+mO69viCpLpSVtQ1QibHGRElaCrHppVjY2lBTUUKpwQwYKSuooMZKi/ridejnRZu2zXG0UGFpbYdNaRSTxn2K/9h9FOScZ+WEx/C0udxcjcYalcpIlVJDRU46Can51PzZTd7aGgdVGZl5lZipwVBYQpHiiM3FeBorrCwtakeJFai54d7i8j1IpVKhAlSqP+j3YqP45ukON1jH/yZLeyf8s/cxc20sRSbAVEFO3HHOpWUQ8cNn5Pi+Rl5BFpHLJ9LJ+Q8CVJWQl1M3A99oxz1To9myaikvvDCQ8xFf0nvgD2RqNGg1nXh/x2myi4rIz8sgPiqS8Z1VfxDwf4d6woQJE+50I/6ZajLP7GbB3PnsjS3ExymIhx/pwvGv32VlqoHOXdpzatd6Dp2KJnLfdhYuW0SOfSsGh3Ula+9CNh88zbHtq1gw5xA1TXoy9P7W2JPEis++Y83Bo2RnW+DRqQteDWxwUWWxZsNuIk8c5MiG3aSoe/HcmE4U7fqZGSv2kOPQisH+OUyfMocjxXr63t0OF+2/aGLhTWDnF0JHZRtfrTjKmaPb2f9rBHT8gFGPhqJTsti/cxepcXGcOXmC/YejyXMK5e42XjhoDRzas5rIEwnsW72D6Cp7uvo3YOfOZJLz0kmIO8WxXbuJt/CifbdutDLsZM76Q8Qd3smK+Rs4luzCiM+GE6otZvXKNRw/e4aDezYzb9ESKv370MXfEUousGrpPDYeSaNV1/4EuloDUFMdz5LPfiDi6CkKs8G9XWtKj69h9uItZNoHYZ84nxMVnmhPRxNZpOe+oaGc3rme/VFRHN+/i8UrFpJmGUiPEB/U/5L7TdHxX/hi5gZSiowkRh9kUfgTLLN5mHFdLVm/cTeHTxzmyMZdJNONEc93pWrvFF56ewkm+wZoVHqcnP0I6tKNNtY7Gd7pZVLd3LGtscGloQeuLXoS1t2vdq7wHdIoqA0WMVv4aeMe4k9Gsn3Vdk6UWNGhVTOqK06wY3cMcfEJ5J7cz9ozlYSGWDPvxTfZWKXB0azGXueGvVc7Bt8bjB6wta1g+6bFJJxJZNeq7STY+tH37rYUH/6VdUeiiD64iUMbSmh6Xxg1CVv4ZVsUDRp7kxe1gRJnf4pXbCY/tD8D21uxdPFKYuNOs3d3BD/PXoZtt0dooytkx9oFrNgVi7kwnRr3Vvg5WcGFxTzQ520yXVyxqbHFzdkTj5De3NXJG5vr7oVbQ6nJY8P0KazcfYqC7Ib0HjUSvwtbmLF0M+79n6NRwR5W7DxI7IlIInbOZcPOLNqG2jBh8HPsstThYNbgaO+GzrsD99/bEkfAzq6cTeuXkhSTyI6V20hybsFd3QPIPLiFDZEniD6wkcid1bR65FG6BjujxEUw8cdlpGaVUe7QlLb+DcBYRczxCxxLOkdqdDTHjx3meFw6FR5t6RbQABttJft2rCAqOoG9q3ZwBmd6hvpQdOEQi6bOYfvpVGqKwK1VKA3dG9K4+Ahztx7jzPGdHFh2nJLOrzFqmJ6Dy2eyZt85LHw74pG3l58XbiLNNpCwLgFoi5JYsmguW05k06lHPwJcau9BxoozLJk0g43Hz1Kco+DWOoi8Q6uYs2wHuU6hWMXO5ozZC03kUU6aGzFoUCDHtl7R7/2yiByH1vRs6XGHjvr/P1o3f7o1b8C2bz5g7Zk0zuzcw/oVv2IM6Yt7SS77ohM5fyaGk2eOExl5miynEO5p7UlG8m4O7I8h6uw50o/tZke6Nd1a5vNq11EkuHugq7bGSe+OvklXht3XCh+LdGbNX0lc3Gn27l7PrNnLsev1OG0a/ks6ixugUhTl//nAnkJZbirx5y9QYQadvjHNg10oiT/FuQITTVq2gfx4zmcUUWOhxsrRmSZ+PjS0taYi/xxx57MoN0Ly6g9Yrn2deeGD0VNE7L7TdaMKtjRu17b2ydlUQU5GCvEX8tFo7PHyb4aniw0FySc4m14OTn5081Nx4ngSFdqGBIU0pYG1zDb/vUrOx5wls6ACO+dGtGjujxaAcpJjTpFWDA2dnakqKaRM40nH0EZYUcmF+DOk5FShsXHGv5k3Lva2ZMWe4HyeCVsPVxzK0sgy6vBv2pxGNiXEn40npwwqo5bw4GwXjh6bQFOzgfSksyRll4OlJVq9C00b++JoZQlVJcTFx5NbbMAtsANN6zoFRSkgZn8MtXPWdTRtF4Im7xwJKbmY7H3xtEohv1qPo8FArtGaFm2aU52TwPn0AsxYYKV3xt/HGxfdnUoFbj5DVgxHz139Pb6+cSuCXSzJyUiuu0Z0NPJrhqerLcbCZE7HpGGoW9fGvTGBfp7oqnM4GRlP2cUgOlcCWzSjbtffUebSbE7HJVJmqMFS64pfUx/cHK0xG7M5G51AiUpPC3ctZ1OL8PT2xJyXQU5Z3RZqHfBu1gJfh4sPpmUknoomo1iFtc6FgOY+NNBqqCzIID45ndIKI04Nm+LnpyPnfBzpRRVY6z3QmjMxOTZCl55BuZMXzfxdyEk6RVqBCayssHV0pUUzX2yqDSSfiyMtrwyV2hLv5m3xaWAFhixOHD13eU6pvTvNWwTgfCc/zFQqOXfiGFkVAM6EdA9EU5BOfEIytk0642uZQ2xCIqVVoHJwwN2lEb7OlpyPiiXXUPflvo0e3+Yt8ba7OJ5cSkJUFNmllmgdXGjWwhcHSwvK89OJT86g3GDC2TUQ38Yu2FhCdX4CB8/WjsvrvINp7asHoCwzmejEdFTWDdA7KpTmFVLtFkyXxnqggpTY01zIM2Nl60zjQB+c7bRUlqQTF51EGWCh1tO8XTBOVoChmOTkJNLyyrC1dceveRP06nKSEs6SWVSFpWdLmmvziEvMwaTzoUNrH6yrioiJTaCgtArP5h1pXHegqk15nD0cS1Fti2nWLghVzjnOX8jHbO+PhyaJApxwLCsjX9HRPDQAY9Yf93vi7ym7EMXJlFJAi87FjxaBzlCUR2zCOUqrbNDhhqROAAAgAElEQVR76TDnZlKma0z3Fh6UFaUQF5dGpbUrAfoazuWYaNqkIdmxSZRcTLfsnAlo0Rx3LWAqJzn+FGmF5svXdKDfHXtwrA/+BYnpjYuc/wqPvvAzmUCD/q/x64xwgl3vdKvETXFhMd2bj+IEQJPezJu/jAdb293pVgkhhBDiGv6nE1MhhBBCCFF//Ls+fhJCCCGEEP9vSWIqhBBCCCHqBUlMhRBCCCFEvSCJqRBCCCGEqBckMRVCCCGEEPWCJKZCCCGEEKJekMRUCCGEEELUC5KYCiGEEEKIekESUyGEEEIIUS9IYiqEEEIIIeoFSUyFEEIIIUS9IImpEEIIIYSoFyQxFUIIIYQQ9YLlnaq4JCeZrCLjnar+X8PKwRVfNz0q1a2Jr5iryM1Kp6jCfGsqEDfE3t0fDwfNLYtvLsslKaMQ5ZbVcGNUFpY09PTFyVZ9y+owFaWRlFNxy+LXZxaWVjh7eKO3uXX711iYSnKu4ZbFF3+flYMLPm4NsLhV/Ui1kbysdArLTbemAlFvaZ198XGy/lu/uWOJadyuRczfm3Wnqv/XcO30EG8/2gON+tbcUcxluexcM5t9ccW3JL64MW0e/5gRnZ1uWfzyxH18N2sHNfUsM1Vr7Rkw4h3CWtjfsjqKo9cwbXncLYtfn2kcXBny7H/oFaC7ZXUUHl/OtDXJtyy++Ptc2g/lzcd6Y6O5NS9Rq8sL2LtuDjtjCm9JfFF/+Q5+izf6e/2t36gURalnXY8QQgghhPhfJHNMhRBCCCFEvSCJqRBCCCGEqBckMRVCCCGEEPWCJKZCCCGEEKJekMRUCCGEEELUC5KYCiGEEEKIekESUyGEEEIIUS9IYiqEEEIIIeoFSUyFEEIIIUS9IImpEEIIIYSoFyQxFUIIIYQQ9YIkpkIIIYQQol6QxFQIIYQQQtQLkpgKIYQQQoh6QRJTIYQQQghRL0hiKoQQQggh6gVJTIUQQgghRL2gnjBhwoQ73YjKpPX895uNODZrjbuDpq40j21fT+az7ZUM6RlwaV1jVQo/fzWJ72YtIionh/hjVbRr533T2lIcvYY3PppMdeB9BDa8WKqQfmo9X749iQVrj+PQvj0xiz/k8+8XE61uRa/ABjet/lopLH7hLdbkutKrjdel0pLU4/w4Zw7GwNb42ljf5Dqv5xyzPhnHtLnbic3U0SbECyvL2ueaouPb+Gr2ZyzZkE+DgGZ4N7ACwJCZxKpFX/D19H1kNgyhvY9tXaxTfPPe28xYuI80gxcdg12uW3tp/FFmz5vIjPlnwTeIQDctAAXZ25k84VPmLomk2DaY1k10141VeHQzU2aH88uvxbgENKORXkN1tYnUuD2sXjGdDbkB9Gx6/WNaXJzKuX3r+GntChSXjvg5WdUtKeHQrz8y8YsZRGxOoaFfS7xdrn288vLiiN62grm7j+HmHYKznWXdkjLOb5zHuInfsW1/DO5+QXg0tLlu226uLNZP+JTvshox8OKxyt3Nh2M/Zv7ataxdm4j/kM64q1RAGQnrfuaNST+w/VA83v4tcXO6dnvNlWUs++oDpvy8mKhcD0LaeVF7phQSNXcK70ydw/7TRbQJbY6d1vKasW4Wk6mClNM7WfrLNHaUtaV7Y7u/8KsCjv08mfemzeVATBkdWjdHa60G8tmx/Cs+mzKHnfvy8GgSiHvduWLITmHNoi/4esZe0p2C6XDpGjnN1PfeYsbCvVyobESnENcb3hZzWRE7lk5myk+/ckIdRM+Ay9dIjdnIgc0/M3nadyw7oqJH7+bYXiPWzVPKkS0zmPjf6azflEQD3yB8XGuvEVNJPtuWTOarn7YQbRVMjyuu6fPrZzDp5wVsT9HTPdQLSwsVkMOm+Z8z8ZuF7Dtagk9AU5wdNX9Sby2l2syR5V/x5cw1HKrwo0/Lizf7FBZ+MZ6vZ20k6ryaoJZ+2GnV14xlLMzm1yWT+WrGds7aBtPNv/Zc2TNtHBOmL2Xt2rWsXbuWU9Yd6dXU/k/jmM1VpMTsYsWy79lUGErPgKvXNRRlsmrZ13w9bS4Hslzp1M6bP72rGDJZ9+NXfDl9HqvXbiO9ypWWwZ5YAca8dCIWf8nXM3Zx3j6Yzn5/5dy+iZQaEnbP5ceIZIKDm2GjuTg+9sf93rVU5Jxjza+bcPRsgcN1jtP/ioqig0wZPwdL72Z4uf75+XYrpB9awEcLD+DXvQPO/yBOvRgxPbdxBqUtBlxKNmo1oDj5IPM2nrl63bnjMPs/QXh4OIM8jezZc+6G6007Ec+qNXsou6LMPvAunmycRFTOlWuqcGvoiW2rjjz/xvN0crOj18OjCWrgR+92N56UznzgXaL/cIknuTFL2Xgg6apSnUdLOtkns2FP7g3XeaNWj5vKqeDRhL/7Gs0St/DZrwW1C9L28c2JKkaO+owPR7QiK/4Q6aWAqYLDBzeiafMcn376Er2KfmZ9Qu1PZt0/HkOvlwkfNxJtxBQ+2XedygsSWBaZQKfB4/n0nQdxTNvIiazaRQvGz8N32DjCX36YnC9G8nPUdWKl7OKLEwpjxoTzwZPNSY49SnY5qNWWNGrckaEh7uxNKP1L+8Te3oOmXe6jr6uR+Jyqy1UcPsOGo/DiWxP4zz0t2DZ7Hqeuc8gaNPCnVee78dVUklViulReeGwNy2MbEh4ezn8eDObIyYMUGP5S826SSo7MW0yCcw1nIzMvF5fFEd9wCOHh4YSHP0OgSgVAweFl/HLOi/DwcF4d3IQ9J45Rarx2DflbP2NlZjveeSecFzuWkBBZW5654Uvm5oURHh7OiFb5/HQg+xZt4+9ZWmrxCuzGI0GObD5b8pd+k7F2IktLBhAeHs4zLS/w7f58AGI2HmBzqgcffvIZz7ZpwJqF60gtAcwGjh5YD6Ej+eSTl7ireBZr42tj/fzA25T3HEv4G6Ow2zSVCXv/YsMjv+Xx+SlXFaXv+Z4Y14f44IPXGGOezMyTl5fFzv6YY0VBvPJKOOEv9kX/F6v5py4cO0vEITOjx0/gjcGh7Jg9m6i6w5u8dxaJjR7hww9fZYRhCnMu3iQPT2ZCZhfeeOMdXm9+mol7ai+E479sY1tJEOGffcpwf1jyyw7yKq9df9XOD4lQD+Sdd95grP1S/nuwtnzrxLns93qU8A/eolPFKb5Zf/6625KwbwFZ/o/z0Uev8FjFVBadri2P31HNfeHhhIeH80pPLVtii68ZR622wqtpFx4KdmZzzNXnXLWhnN1LF4HzUD76KJzXH2rNNdNJUxFRBi9ef/sjwsPf57EBwXUPHAqn9y+jpNnTTJjwMveX/cCys9fdxJtKqakm+mQk3q074qi9MgX5437vWrROPoT1G4Sb/V97YD26eAub4lL/ZotvnoUfzORW115jcufEoQgSM659vt0Kbq3uo3fhdyw7+M/i1IvEtNpYhbWDHq2l6opSNVpbC2zbhVy9srWWFEMSGQUF6FsPZ86cpwAoyYrmm/efJCQkhP53jWLmvnMYDCXM/k8vhnywmJIqWPpac9oNe5kjKRUoKfMZ/eAgXn3laTqFhNChex/WxIOFtT0uDtacnP8WvVqEENB9GAvyjVg6OmNrZYebXRojPHwYv/wUNnof2uq0mMsL2fTdK/TpEkJoaCve+2k1meW1N828xPU89VBfgkJCeOC13jw+cjEUn+KzRwfy0eYZDAsJISQkhDdWJl+xkRrs7MG6RcBVm26h0dLEvxlgxe02dMo0pg7rgmcTL1p21WFbN4iRHJ9BI68GuLh44u7jSk7KBcryizAZTWSl5NCsRRM8PFywbmBHYuQpAJ5bs4m3+7fFs4UvrbtrsLzOPSUvuwhLlYK3jw8ejVyoqCwjJ/ECAK/Om89TXYPxDPGjfY8a1NeJlXj2An6NXXB2rm1v5rlkKotLARUaazv0OntUKtW1g9SxsNBgbeeI3lZ7Vblvpy58+v5rBDfxxaejN/6BChaXQhqI+PhVPFRD2HLFb9RqK2x0jui0V4+BWFiqMTrrMRgKMVapyC0oxGw2/6X23QwXjuzhQKUvj/ZtzW/HoMyVJRQUFFBQXoqpLi9XaS62twijEXLy86murr5mHbnp8fQYNpCAAFdsvAtYMWUOVYCFlSWVrg0xGEoxmlSkZWVeM87NpFJZYKW1o4Hu+iPwF1lYqzG4OGEwlGE0qbiQmQFAy4GD+e+4kfh6NcKvkwde/goqFZjN1WQkZhLYsvYasXHWcf5wbRY2cmUE74a1w7O5D626WWFZt/PLzkcyaUw3QkJC6DPkMZYeOIWiXNEIUykF5Vfv7xP7YmjVLhB3d1ecA704tXl/7YLzc/jubGcGt3PEUFOFrc6W2zXm5N2uI598+DqtAnzx7uBD4+YKqrre6PSROELbNsPd3RWnpp7EbD8EwJ6Nx+jVLxRXV3dcm3hy6JdNALR9+DGmjH0Uz0aeNO7khoeXwvWu4O1rDtOxW0vc3V1xadaIo6u2AtDv3Y/48bE+ePp7EdhVj6OTcp1IEHvyPMGtmuLh4YKjnyuxu2ufrJ5b/Q1DPT3xdHPibFwrwl9uds04KtXFe5CO325AxekfiKlqQ5vGKoqNNeh0tld03gkMUnkx8ovNXJXOmgwUFRZQUFRIaZURpQZQIDEmlZYhAXh4uGDfqAFx+45fdxtvthoF7HR2qC2u3NDf93uzHvAkoNeTbIurHSxYNa453qH3sPFwKhz4nJDgIHqO+ITY7NobUEVqJK8PDabV8Me5NzCE5h368s6mw5gViN/0Oa+MH8WYQf0ICQlhwFOvc7xugOPcph957J7avvjxd6ZxJq82qTs561FCmvnw8AeLGTdoAG3uf5lDJv6cYuLE7ukM6NeV4JAQhrw0hMlTd0POdp5qFcpbP35Iv7o+f3LtaU1Z7lmmh48mJCSEvr2e4Ltfz1AFFCUe5PXBvrR+fi4/ffQKYZ3D+O/OJUzs0hzvTsMZ3PUe3h3/PEMCQwh7YzJxdQMAKgtr7LycsGx4s9/kXp+ljSOtmgdTVXX9da8Z5+Y058aVxh5h9yEVTXv8/vkv9N77mVjd+qqywEcncc/sBaybswsLFxsa+DzGqw84M3/aFtq8Op9Tn6mgPId5b33HwZBPeGj0u5RF1QDwyKfbqVlXezNT+T7Fj4vbsy8xnfse7cdvB7xN2rtZfvS/GCI+4LEFKTz5oi26knLKT20i556H6HpyN1FNu1NtaUnGmd1sOV7GPQ89iwbIOraDtXp3Rg7vQkHcdlRN2vNEF3d0Jee4ENwcHEN4f8lGdL1eosfu72n3B/ul53Mv4eAb8LtyW1sdxWvmEdHkZQYFO9zILr9xSjXZ0ZvZmObL48/+Sd15hdSelVcnaxiNkFtw+d/mUs7tWUOEcRAvdwYo48zmzew4k8Ll696foa8P/d2xoaQM7K4Y5zZkczxiGRFOb/NhEEABh+av4kDelbfpljzy+j2/b29ufm3bboWSM2z5ZS1K0EMEXHqvoaZxl948/3ohvn8hhGNgENbb9xERsQm1IZCWHVthb3v7Lttt898h0jSAmowUUqNdOJjUmS7+duAYShftcubMiQJbS3Qtx/Dxo/40aBGK1daDRESkoK4MoFW3DthYXzvd8e7wAHGzP+W/+20xGlI4U9CYZCCwSy/4MIKIomI0JQ7c+0jj27LNN8q9212YJ6wnoqAMTbEd9z/5m/YWnWTzxoM07PQgHvbAb0e+jaba8/Eicxnn960houoexnYGjIWsXrCUIu+BPPusDRgKWTZxAe3XfI5Dwm7WbDpJWfJ+kjMq+KqyId7twrive9DvG5pe2xuXxp9h69HzlE12w8UvgJBWPRh2bydu612lJIatS1ZjavEggX80o0dRIONPRsrPXz0yXJN3lM07Y/Hv9SB6G6gsPsP6nzeTdmkNO1p06UffLn9wHiVfuOqfRQk72RRjRf+HGgE15CQcZNP6w1w+Og3pPGQgXZr8ptE1NZB11es2qtIPEuvny3DVjY8D5UUdYsHGSGITXNE1CaJXx17069aS2kkyDbj/9dHYd/C7PGRh5UQnDyNrli+i2kKFxqc9ox4aQhO339yXzdWQdXvfwBUc205iooZu9/9+IsJv+72npi2meEE5fqVH+HGplkHjI/jEZz9tWvuA9Tsc2zGIb+seUABsfTrw9tinOLXZiW+nL8IpZSPv78zA3E+h2YB3mPJREJldQxgW5H+50pLTfPP1alrc8yztAfJOM+XDFXz1w0haP7eEfQ1fYNjGKl7/fAlfuudRXAb8Sc5XYzaSkRqDX7d+3OXgiLkki4bNvcC1CfOjopnxytf0+/Y/XDoDjQWsnLMd/4cnc+o9B6gsYPmnP7GrU0vCGnfhqy+/4u4PT6Ia+DIrxtZO57FbUMKx0el88nk3XvzsENP3RXFmzhtcSIdAf7C21fHEs4/QyPt2vf+4moO+ARfWzySy8eNXTE36e+54YqpxdMbdBfIMv38M8e4+ipd/U6a29qLPC+/QB6gsWMaLgyK4MPBuEu39ePHiPcLOlQD3FE7nU3ui3YAOw/vhagf4O0EmYOWAQ4mGVb+uoOnAldjsHc253I5goaLaogBXXTCtg2o7gaCg9ng3D8QC8L9rPGN1pyhIL6Qi7zyROX9teL3Z/RP5o+drs9mElWcAXg2uPYfqVkhc+QMrSgIZ8khP/HQXbyoF5BbouTSu0MARrKyAaioq0ymvABwAjQYaXr5QDi5dRJRVS0aM7Ejt7C4N+ka+tEDH5fEel7qktJziknxMJmrPWJ1d7R/AVJzLhuUbqPTqxDsvd8QRAGtcmjQjyO3K93me2AIG8snNL79c3FBf27abrOjkLr7dnkWvux6ib+umV8wF09Cy/1Am9P9rcdIjY7BrdxdjewVSnX6cH/ekUVpRjY3u9oxt9R7xOZ65QO5OdLEuuFx8ZebUmXFTOtf+vWofTwzZCo+OJu3QKey7DuCVHv6YUw/z7f5MKqtCsLb58/Y6tBnOG2N8iM+swNEzGCWlEC8gbv0evJ/5mFdCwRi1nHGHMxgUcONzLW+1s2t24v/M57wSAsbji3h5fzr3+tX2YAWHIvh8dyVDBz9A65a+WAJmaqgwpFFWATgCGktwunyNHP5lIcctW/LsyA6114i6DEOVI51aBGGrr01Jgto546i2wNrRg8AgEwbVKXQ0IyjIHSd3PWoVmMyJFJUAF++P7rV/KSzII8/cmI8mTqSJs4qICWPY06ETg27TLi6O3sO0bRl07/MQvds0u3SNGI1JFJcADQGVCtwuPtWdJzMbuJhT+Da6FCtvzwomHVQxfOhQQpt5ogYsrfT4BQXV3RMArPFwsccCUJRY8goAj7pFXh6X1spY9wOz0vwYOuxemrs7AApaB1cCgoJwv7SWDlf72iTPWJVCSSngBKgswOXSxwmAmaRTuQQ0a4qF+q+9ifkjuTm5uDR5gs8mjcBFZ2L5xHeICf6Gdo4Azjw35cOrf2DtRv9n/0N/gJpiIpaupyKjANw8MVSlUlpObXKlVoOL0w2360ZYN/TA3l6h0ljzu2W/7ffUzl3wqn6L5Rv8MZ3ZxwbT/VTYh+B6nU8s2nQfSBMnoMwOe/vr7HdNKtVVoXQMuvgQF0Rnp8BLSb6Fxoqu9w+gU4ge0P9ZTlq3rg3dB47FMTqJ8tQsUjLTKSwu//MfVOWQqnVm0MVvEGyc8HPLZl8ehNVV5Nl7AKOGNL38m1LQeTcjyAWsWvnTwhkuXJGDWto40HfwM9fe5lvIZKzCzrvZFd9J/H13/FW+1qMxgU0Uskv+yqjVfl7Sh7EpqvaJ36a4GFNYF7z1bemRc4CpCXXpUV4cO093ol/dY8mFzGxM5mp2LJzKdz8fuiJeKTl5eVQZIfKTMYx/Zi5/PrvQHle3cg6caMcjw9xoZKPCpQYs1WqcnLtSrsvEpWUHwsLCCAvrSUtfJ9TAN0OeJ1bfmrBHHiG0rxUa1eUrSlHOkJYBuTuX8oD7GJL/wh4wGquwadGN1o1u5wcw+Sz5/Am+yxnImyP6oz/5I2+trx0V8GvbCYcaO1AUClJzKTdaonVqgEZrS3DXfpjza0ctI9ccxKNdKyCDqS/04JB2EGOG94Q1L/DGdgBrGgW35+6wsLp9GEZYWFucAWdffxp5NqWmsoqqcgMX4rLR+/sAiUz58BWqA+/j0Xs6UvBNd749CmBHk249r4gTRlhYCHqgccdu2FbVJqK5SVlUqWyxdryZY0QK56OWMWl1LM+PGEZXfx2b53xxaU4sGIj45FU8LO6/6lX+n9FalpGfnwhAZUUJFllZWFT//oZ+q/i3rdt/PUNw8m5NgHPt+TtzyBCeXFA7OfjoxlUs8fWqa28peRfbW16EZVY2FpeaW8jU/j1Qq8cQeUUd1WoNtqE9CAtrRfm8mQSMeg47QKcpJC2jdg55cVEG9jlFt2GL/woTe2Z8ShOLMFaXXX5npdMUkJZVOyexqDADx5wSwETU7hlM3FrOZ68/QBt9CcsWziGpCCytrAntMQBz3WvDQ8v349GxDZDBtLG92Gc1iBce7olq3cu8vg1Qe9O5hYafUquuOK/b4aJS4eDZgl5hYYR1CsC5RQ/CwsLoENgISwvo9sgIjGm1o2K/frUS/7t7AuDz+Ce8azeX3emFkB3LniNt+AffWP0NCkmnVzJpxSlGPD2M7k31bJ0zkaN1MzU6D3sSY0bt2OSWqavx7d0NgJ7PvkjF6dr5hycjDtFsyADAwOGNUwjfp+XL8Q8QpE5m7pJV5JSDxqYRHa+6B/QmNMAFDdBv7FsYEmsr3D1rE4H3DwCKWT/9FT5N6MkHLw7EM3UdE1edBlQ4uDWl21WxuhHgao8KaD/4YYxZtW+Dds7YgHePzpc31VjCqbIKmrg0+kedbcgLX9LVHMG54gpIOsTJmLb4XMq4Exhs4c1zX2659Co/dvNmHnvtCwrKqygtyGPN2RNk2ViDSkWb/kMxZRcCsGfeNry7dvgHLfv77Pxa4uJiprjyWu/Ea6nVKgLdKzlQ7cmIxxuzdOka3Dq2/QdTTnJIuVBBjdHAkmfHMHPmXkw2A+kWGscZK+9Lx7drB78b+gjQUFzK1HdmYNG0C2FPP02z9irUV0yCqqhIoqAQUheFc4/bG2TZN6djyTnmx9e9ASxM4mBMC+4NuPGHmDutsqICp9a98G9441MO7/iIKYCNvgEF52LIK3PGWXetJulp2r05Oxe9w9dvpkPTu/jq+x4ADP3qPVZNfZ3+Y2Nwde3MU1PG1Q6X+7bnbt0XPPPQABq0GciD3Q38tGYvHV8Nw625Oy6/zubZQXOw6vAQX379DObIBby5UUF18AX2WY1k3Zwj2CZuZkaHRQxoY41zWg/6am2JCRvDoPJmaNRg59uEl4Z2ZsL4ESQVVKJrexfPPPw0A1u74duyN4fnjmfBqUwI7Mc3H3a9tDUP/Pc+Pn6mP9+7B/Ha1s/xu85+MpbmcuBkNNYhD/7DPf43lfwfe+8dV2X5P/4/4bDnAQXBI+IWt+LehoimOTLLbJhZVrYzNdumVra0TNMcpblSc5SiuPce4AAU2XtvDhzOeP3+OIhYBr7V1M/vez8fj/MQr/m69uu+7uu+XumkxguX4iYycIvZKWDqi+Y/1B0Y0/BPHhk8CFuv5rz+/uf4ugLY0bpxe775+m2mX0kmYMoqprUAcuKIj3MgfPF4diw2J/HYVzXk7+BLYMNEJr35FKlaC57+eAld6wJpkcRH5rBv5lP8DGDhyKuDa0jLvTNjG2wkKCgIp/pteWvadLydoLw4m1+mP8WmCwDrCdrjwZMvfcD4R27yKrSCmO2zeGf+IcoMAMfZ4DucXYtfQZuURNzxnTx7fBMA9TsPYVrl84gBj0Z16ROopuq+yoXlzzF5TcXK/OtmPvd7gV3zRlOr+xP0XbeIoKC5OHu14t0pH9T4xfHdJvnoMj6auw7KnfjtVAfGdnFnwp8/YzFzOkFBM6jfeTAJix4GoHbvZ+i3ej5BQV/hqmnP1KlTcXG8tozo8PFvQ3+a3/C6WLtvJe/NXomFpj3jP9jMMxWbA5pRn9B/7kyC5kRSp8Vgvvmk6z0rc3F6JAtmvcXeKLBiN0EHGvDGO9MY2qsRYMJN407PwA54qK6rGz5PzqLndzMI+uYKXq2HM/fTjmDQUZSYSdzhjQw9vAyAZv3HMsgKsLShReOOzPl6EjMjk+g7eSUftgRyEoiPdeBi1Hh2LjGnPXK2+d82Y19h9rI5BAUtA3d3fNo9yfT3huNz7ayea0M6+Nz40OrRZCTFc2YQ9HkkLV5aww9drvnU5/WFG/n0i7EESTumzZ1+S8dL7galSYnEndjBuBN/AlCv40CmDTf71W0yhJDvphP02RXaTFzLd9deezUYxxjr2QQF7UMzYCI/jXOE8nzyE3KJOzCPgQfmAdBq6OvY1KC52DSdSL3tnxAUdJYmY77ip75ASQ6Z8Trizk1i4E5zuB4v96g2HQDfxoGEfPsRQR9H4//6CmZ3uO5n0OnxdHOhrk/NGn9pbgKLZ0wgOALs2UrQgbq88Pr7jA5sjr1LR558YhhfvT2KTz37M2fOe1w/RJBPu8DeuPm6Vy7ofgN7M4lEnn/yUUw2Ljz59of0aWHeeW7cuDch30zjm/fj6Pr2b8xsW6Nodx1blRAdl0hZK1fsrKtRwixVqDw6MtDaG/WQSYxav5iW9QCiWTDsbf4sM29o7dmxBxu74Xy5qDdbt54lLGIPy73XU+vkFs79Fc5UFz/mjW5Iq8GtOPTJZwz6vphWw17jg6d6Yw2MmvElS2bMJujLdPDzI6jPq7w8yoltr3/Mr1EpwFiCfoCAqauZFvjvt8hYWtnS0MOdpZ+8yPTkfDx7P8sXb7ao9O8a6Mp3o4PIadiLr8K+xQvw+ug1jEu+JejD07i7t2XM9Ck0s4DEc2v5YtqvpANBW0DTIZD3po7i0LQQ0kwuLD37KP45Iby9KYBB2kKCt2ykwyuPcerScMkAACAASURBVM8vbalCSfplgs9FU+tm5xP/ByxEpObT3f8x5ekn+GNXKl0HP0Lj2vf+w57/K2gzowk5cpqmA4bTxvneXOqioKCgoKBw9xBSzu/iYLwTQwd2w1m55un/N+RE7mH9+VIeeXIod3KJ5wOhmCooKCgoKCgoKCjc9zOmCgoKCgoKCgoKCqAopgoKCgoKCgoKCg8IimKqoKCgoKCgoKDwQKAopgoKCgoKCgoKCg8EimKqoKCgoKCgoKDwQKCaPn369PstRHn6cX7feArHeo1xrzS3WMC5Pzaw6lw5Pdtet/BhKM9gxx9r2bJ9LzH5+SRF6WnW7O7dCl0Se5SfV2zA5NMDnyqXLeoLUtm1eSWbd+zn6NGj5l9kPv6tGmFtdbf1+wz2/rCEYwVq2ja5fmdaSeZVtobsxOjTmDq299ryUwrbVy5i885zJOba07ShB1YVlkyKr57jj5BV7DtZhHPdenhWWAcqz03jyN51bNx6iVzXhjSrNNeRR+ju7WzZuI3wrHIa+DX8uwHTf1CaHMWOXWvYtisR6jTAx818rVh2eiTnju3kcIolbX1vpR/kc2bP76z6YzcXL5fgoamH2skKMFGUfZUDGzaxZddeclVu+NTz+Id9+H+kFrqPtSF/cuKqBb6+XjjamPuCNjGSbTvXsGNfKpZevtRT30p76UkK28/vh1Np5+dTaUc69eROFq7ZxLnwBOzq+OLpYlujLfC7RXr4blYu38j+o0c5E1pOoy4NMdvcKuDSwZ1sXv8X59NKaNCiMfYVQhVGHGfdjvUcPq+jdj0Nbg7VXweTk32Vi8d3czC+lOY+dbGyvLF02bHHWLc9Ap9G9XGo6YLKu4aOmIs7Wfv7Fg4dTcLBswFe7tVfZVdUlErS+SPsOBOGfa0m1Kq0fFJI2ME/WLUhhNDwAmp5++B+bYzkZXB07zo2brtIlnNDmntWHQllXD28g7WhxXTxq3vbJTGWFhN2YAMbgk9z1bIBba8Z5yiMYOUPv7Lz6FGOHk3CrX1TPGweiKutFW6BgoQzrP99FZekBS2cC9izZSWbtu8nTF+PLg1ubo4y78xqflwVcn0NO3qC2CwL6jXyoYZhehcRUs7vZOuJDBo00GBbuX7efN2rjrL8FI6dPo1DrfqVc+//6+iKI/hjcQgqTx881Pf2UtPsyD2s2BuOV+vmVSyu/e88EC0Zt2MuxwvdcL3BbKEtUXt+Y9pPh24IG79lBpF53vj7++OaF87vv5+97XwzLiewd/85qhqutHb1xiNpA3vjbwxraeOIuiya4DgV/v7++PvV4uKhs+jMt6vfFpve/ZGrN/Vx4NyaT1nwx/kbXK3t1VglhrDhROZNY/2X7PtuETtKvPFv0ZSivVv46XCFFZ6MUH45mkDjph1o52NJZPg5MksAQxlhJ0JItmhAhw5+OEf/zsFEc5SUTdNYH2+gtb8/xrg1fLYtrfrMCxMJPnYO29ot6NCqLnmX93G5wmi1nYM73tZF7AlNqD6NCq7sOczGsDz8/TtQOyee9X8cJrcUjKUF7N3+G9lOXnTw9+fy0Z8JCS+sPrHoYD45oqdFi3a0cYhnW2hFOfJi2HLsIi7erWjfvDaZkQeJzqtZtpLsSHb+vppNx6IwGCrMJaUc5/3FR/Hy8qdtIw+KEwoo11Wfzt0kJeEC6SbzeGvXth7Xprn04Fksjiihtb8/VunBvLepwiJ50mG+P5KDn18H2noUceLCFUpqMPBiZ6emjr2BkxdjKNXfaNVKTEkEL/yZrWHR5N+Sdbi7Q258Eps2n6RWo9a0dbMmZMkKztcw7KytHXGtXZeypFDC08oq3WOPnGLjyVTatO9A3eIMNv6+h7RiwFjOxRPBJIgv7du3wC1mLfurdOPs6NPsDdnCun1Rty54+Bre33rjeMo4uZIjeXVo164lzRN/ZuPlCo/8UH47bWGez/yb4m6l3Cf5fwkbZ08srp7ipy8WctXGgfqesGdHHG00zv8aJ+vwAk5qffEoPs2ZQjdaNmnMpT17yLqHc4oYDZw5+CcZ4ozNDZs6N1/3qsPK1om6dethb31rqkzE9uMcia9hvfkPCV6wkf8693KtsGHZj4RG3Xs9wd7NB9PR6ay/9Sa8KQ+EYlqan4d745Z/s61qh52jDRZtmt8Qtig1irT6GjoFBDD06SmsWjUWAJFkvp/YG5VKRcOGw/k1KhOjNo/vnm1OwJSVFOpg4RMq6gW8yKkELRI1l/6tGjGgfyecVCqcPeqx4gLY1GpEl6buRG2aTEOVClXroewQUNm70qSRL55N/fFvoyX5og8rf/sEtasdFGYS8vFQfNxUWNv0Yf6W05W244tyT/DkQ01RqVR0e74rL7ywBnJP8Xq3Zoya8xZ+KhUqlYoxS69UKaUzDi4W0ORGOyw2zh50b9cWnfbe72oEvDuTH195lsChgxg+2Jo0rVkhjw+/ir13HTp3DqRf3xZkJ8aSl12AXqcj7ko87XsHEhDQhfqeBsJORAKgGfkzX054gl4BATT30HM1pbS6rMlOyaDEYMK/eyABAR2w1GWREJ0KgJNLHRr7NsLFvgbjyRU0DxzKl5PfITAwkIcfb42rWy46I6js3RgxdhZPjXyEhwICcLPMITO/eo0qbN8JGj/Uk27dHqJXjwac3n8KgIzEVMpVKjp2CyTgoXYYi9NJjrtmk7SMbZ+9hbfF8BtNkoqw/YtZOAx7B3+NU6VzTmI4DQc/ztixgfQNbEPckT0U5xTcUlnvCrZONG7XnYCAAPr0bsK1Jc9ryDfMmziGHgEBtKir4nKSFoArpy9Qu1VzunQJoE+vpsRcCKestPpVz9HJgwa+jXF3+pvRCBG2v/oUhUM/o29T9R2YIfzfcW/QhCmfzODJoYMJfHYwbZskkV9WfRw7O1c8fP1o4nmj7fFGvQKZOXUKAwcMYNBofzw9sigzgEGvJyYihvZ9zGOkgbeR0GMR5khiYsevv+M7fDzN3K7vokrGRd4fVgeVSkW9dv3442IsN1xEXRBHWPKN4+nUriO0eyiQvn2707mtPQd3nKr0s67fgYCAAAIC/Kljq+yW/l/C3r0+LXzrM6pPEj8vukyLNq3xrtOMPk3dIfUyyyd2xclOhUe9R9l4yPw00uydY2ycPprubX3xbdONR0aO4Kv5H+P377rsf0K50YL6DetjZ1X17cg/172vu1tSu20Qmy+Y57zlT6uw9O7J5oPRsPstbJ3cCXh9AXE55ofW4uiDPN3LG/8xT9FRpUJVtzWfHArDCFxY9xaDHulJn8b1UKlUNOnzBEeSzPlkHF5K7ybmtbjHhG9Iqrje/fjsrtg6qXlxzlZe694S+87PcLjakhm5fGol3Vp4oVKp6DnuYX744SCkbqGPjTVD33icehVr/pR95hgi6Sx+b4h5TNcLYP6JeATz7uMTHSxpP2UrG2aMpXkdP6buXMJbXu549BhF94Yd+OKLl+mpsqLzpHnEVUhgaemGbV1XLNR309T2reHo1Zwh/k3IvYWNmOq474ppWVosl6MtqOPyT8WiVd+OvDWw3Q1ubV5eSPdD83llyBBeev9TNu9JBX0hv77/C/U/PITRaCTu/AJKv17GOdx46YN5jOhoNsU2cVkiX79gtmNs0ewdgo9dZOXqneQbjRRlJfNcFdNsCUkdOZxnJGJySz7/4fq+Zuwfn/LE2G+5WFUoJweaj57E0tXBbN3yHkVHP2N/vNkrftdi1MPf5Y/gYKZ27oy+SV1w78L8E1HM6TORU0YjRqORtS/eqIB3fyyQJ7s1+Ued2NjYUhpx5B+Lzz1BTBTEHOS30Do83/tfZrL0LCi7yQqu00Ha9Se4rKt7ef/JAXy7uzGfDfYCdKRcPM3ukBBCKn9nybpZHvkF5t+/UkL00YNV0gkhJOQiVceKFMexd+8p1PX88ajUA7WcWTWdkYEPcbbgEQa3/B8Hdmzizd1z86GwqOI/lng0acFDg/ypXSVI5E+DmJfWGfe0o8ReOc/pBLPt5Fq+bcg4sJ5ff93BH2uXsW77AXboa7YxfbdwQc+ueW8wZMgQHn3rY3ZdLKr0K0w/zYxng/h8kwNfD9fcPIHkNNDf3luFmNUv8F7yQJrmHeRy+AVCE3JvK507oiydC1vmcEE1gk717zAtbQKHdu/Fsk53NDd706orh7QMAC7M9md9ZjMs4k+SHBPKmUQtGErYuOpPGoxdQHBwMEs/Gc/+79eQYTBRmBrBgZAQQk5cJTviECEhIZy6nMLfNqDNxFWsxnbeNIn4jiFDhjBk7It891f8HRZQ4b4w5CeCLDexO6qAyub2rEWn577gj83BLPsmiAuHfyEy+34KeZ2S+Agys6xwtf/n8aa/r3tvrf2Dd8ZNo4dzCvtOXGXw3BiWfzCWTl2awIAfKEkK4/WgepXhnZr0Ze5n72Dt2JrlqUbStnxJxokY9Aah7egfWPfzFv64EI3RaCT60Hp6+QClycxftJ/X5wcTHBzMJ93LmTttJVqg+7STZPw2mnP7Ixj27SGKt0yheTUbkabyUiLOn2DAe9/yV3AwY1u3xFjXHeqO4FC5noWvf8fVijX/mwDAUMKGr9bg+txqjEYjyZfX4LJhM8dKhNotAlm/dgNOZ7dxwWsSJ84d5f3WI5l75Et6ii9zf5tNyE43vk8s593a8cRUaKY29raMGNmH5t5ud6fB/kfsHRzIDTtQ+bBwO9z3R2R9QTYZ2eBu909Rmg6bwXd/c7Oyb8Ko2csYBRQk/cKLz62nZ6c+XFK35Ntra6NLPdo1uMy5dPC7TbkGvDWGei5ASy84dt290eMzWPVKfWIuXN+/yUs6w/alGynR+GCtUiGO1886Nh02mYDfQ4g7eRLrDANe/rem7Pi/shH/m7hbWVlTnhZDcr6e9vXu7fmR1AMb2RpvSd/HB9Gs8uxKIfmFpdd3bZydwNoaMFGmyzLrqC6AlRW4XN8J9GgayOwVPYnc9y3vfn2Q7T/2Jj81kcsRCVxXuxrSfFBHnCmluKQAgxFzj7W3M//+FR3ZMVeJyL7xVXzbQW1wAwrOH2TFqRSaNetHvz5NqgwCBzo/+xlbhhWw5fcvCd7bjldGteDfySI7p8rKX+vaRKClqLjILK8KcLAHu2vy2tD16VdY8/SNKTm3H82junwirsSSnZFJfI6OPgB1u/L164UsCb5Imasbndq1pY31vds7bNr/dVb1fx2AwqTV/LI+lKA2fQBw8erCp78EE334J577bDdHl48A8sjNrzIhqV1AdXvPv44tBzM+IJGIy9Gkp6WQlKu90+L8T2gTIvjz8HlUtj0YP75bxdna26Mw/BirjsdRv0EfhgX6YQMYMKErz6K0DHAFrFSVY8Sl63gesjUQERVPflYRiXl6Onnlk5mcQ2HJVUqczA/yjVu1QmtpgWVBOlERERTHZ1KcdpWIiFx87H1o11SD0ZhKUQlUGld3r9CKPQOYtyOgorDHefGVgzCswR2UUuF+0bZHN7YdOUpemSdgJOH0QXZtOoJ4+WCpzwW7+6Ok3AxdThrFRRbY3+RM6N/XPZX3EJqUTGftKleunIkg9cVHybXpgFcNS1/fYeNoUwfQueDmVsO8oT9LXIQJt4gIUgCwp33HVpQDDoDKxo4hrzzHwJ61gdpU9yWDpY0DPYKepHDHaa4cuUx5gYo6baoxH16axBWHurx67dy3kxct6idyJBV6NjU7NRr1HDNfan89Tiy4NutANw3Y9m5J57qQV2WXw9qxFk+88HH1Zf4PsbaxpSTpKtklXWhY6/ZMzN93xdTZrwt9uwmbMkuAmt4nhDKr+0L6Lv+C3s1r42qhwrGDH67OLfDP2cSqhMcY2wDIi+NUdFv61wNiID0rB4PRyMmtq1i7MZmPez1VkV4JuXn5lOvh0tLP2JXcjpc/H1GjzLb2jWjZFQ4v2IjpucF4x5wmz6UXb736BNlnVvDT79d389ZOWkCtd2cwqaErMTun8MmZ6ztOQjQZWZAbt4MZU04x5eCn/Mu+UyVabTGu/Z/jkdb3cps+n+1LZ3NGN5IJT7XF6vJKvk8cyeR+tdC08MN6rwlEKEjLpRQ7bN1csbLV0aitP7rcYvB04tL+C3gMfQmAVWPHYpryDWPb2FIWt5dw6QQ40WrgY7Qa+M/cjXW9cXfLw1hajt5UTnpSPs271ftnwErc6Tb2Rbr9w72cS0fX8ecxO8Y8PQwPiSEkOIR+Dw3CsSyX5T+toM/LL9Hao4jc6AOk1xpbba349etN0f4M6OtC4vkYXFq1AqCWjw+uVwyYdAbKTKVkZZZQr593RSwdBxfO5dOfUvni4jx6VLjW6zmeST2Bggtk2Vzmcf9alfmUNB/ApOb9yY7cxrYyPQ1d7l3bf//mezR+6Q2Gtq7HkV1/EeE4BYA/3niDrOc/YKK/I7rkw5yXBgA06OiPcZ95xzwzJg2LWl5YVSrlhax86TW+PtGUtRc+oXUNeXv5j2KSP1ASj2r1UYZ1qK7N7y7ZyUdYufYs3R5+Ev9WbpzaOJfEHu/QyRvAwNn1S/lw5jkmn5xPoEN1k6+BK2c2sWm/gcdGD6WuXTp7t26mY79H0ThY06h9J3Q5xVDHiQu7w/B45GUAGgS8yaQAIOco4fpMRrZzBRzp3Loui02tWDJh8I3ZtAjgpRYBcKyU3efHMGlio0qvdoMGEZqSBw3cOLJiN5pAcx7bPvyQ4HZDWfhEN6JCT3HA7u59RKpwb9G060rtE78TlgMYy7l6NQKnxo/y/It9uPTnbFaeK77fIlbi3rE/jY7+RXqBDqhew7SysqChVw4bktrzxeNpTPptC4+/t7jGj1L/nRxS00sxNdMR8tlstO2HMmJUIAHd1qPqNZznujS+7ZQBdMVaNv96nO4TX6W9mw371r3PuZzrinFZWQoFhZB2aDHTvy7k8wNv0Kb4L/5K0PJ8W1soTCEsphF97/TtzH2kMD8Pn6ET6HwnZZAHgAvzh8jUtRFSWm6qIeQpmdpomDzxRC/RaDSiefgNOVnplyZL3hsuGo1GunR5TtbFZpudi9Ll95mjpXEDjXR7ZqpMHjdU+r23TkREtDlXZO6LgdJEo5FWz8yUiEyRzH3fSaumvtK6x0DZvm+/jA7qKJp6PvLe4mB557EO5nwrf0/IX7klUpYVLTPGdhGNRiMj3lskc6YMkxe++kvyykV+GjlJHnushzn84LfldMr10kTtnCx9NRrRdBsuq09k1lhPxvJSObZ0gkz9M+Z/reI7I/eUvNu/8w1lf33D9YKkh/wivj4+4tfzEdkQmlfpXhQdKhOG9K4In3Q9vdhYeX/sQ6LRaCRwwq+ScAsi5JwIlr7+rcW3WWuZu/96Xf06oWp71JOnp2//90R0WfLHjLHiV6Ucw6YukYxiEdHr5fL2tTKwR2vRaDTy2rzTknsLcsUv/1Q0Go10GvOBhKeVVrpnH9ksXdv4ScNWnWTB4awqMfJl95w3pL3meTn4t7S02fHy4aNmuR6ZH2F2jD0jU/p2FR+fBjLp45WSUngLQt1FUqJ3yhNBHUWj0ciYz36TyppPSJBZLw0QjUYj/Z75XmJM18du8sbvRaPRSJuHn5d9UUVVUkuQJU8OlHr13pOwKq6b3tDc0LcGvr2x0s9kNMjcZ8zuAz7f+18W9QYub/1EOleRqeuw8XIs+ZqvVo7/9pF004yR7cW6yjhnFgy/cX4Y+JVIeYFs/26CtKri/vCbcyWhwBynOPaCTBzWVzQajbyyLukGGfJijsvEgeY4T62Ir3DNkqNfjDWn1aGD9H11mVw1VJk3T/8gT1eGNaPLTZfZ44eJRqORoYuiq/gky9y3BotGo5Geo16TsMKSu1J3CveGxEM/y8Odzf3j4+A0kehgCXrhRxERKbq6X8YPbisajUbGf/ytvDtumExbFyoiJjnww7OVfbFVh5kScY/lNhnK5Y+5E+XXQ0liMNaw5pv0cmLFDPngu+1SUJ4kH3aeIObp9KJ83KzxDeOtcbOP5UTcMXl1WHvRaDTy1b5sWfHBCPN8usBcytzYnfJG33aiqd9ARlSZT0uyTsr7I7qZ03rkEXln0TnJkxiZN7j3v657N6O0sES+e+YV6d3bXPddXvpOruZc9w/5cax01GhEEzhBDlcufJmyauYzotFoxN9/lPx6zjwPRB2aJwOq5N1r9FtyLj1cZrRtIZrW3WXWwmUyOqijDF8cI2un9pNhU36WtOL/uTnuKnptnmye2lI+O3Zn6ViIiNSsvv63lMZtY86KaB6Z8DLtNPf29fT/JQoTQ/llcwgdx75Ob7d7fFpdQUFBQUHhThETVw+uYH24GxOfH4r7vbunSuE/JvXkKr49UMxL771y28coAR4IxVRBQUFBQUFBQUHhvn+Vr6CgoKCgoKCgoACKYqqgoKCgoKCgoPCAoCimCgoKCgoKCgoKDwSKYqqgoKCgoKCgoPBAoCimCgoKCgoKCgoKDwSq6dOnT7/fQhjyr3L8dCy27nVwsr2mK5cSf+okR+MNNKt/3WqF0VDAhVPHORMWToZWS26aAW/vu3fhuC4zin2HT2Jyb0qtKjdXGbV5XDxzlDPnI4iKijL/UrQ08PFEZWnx7wneFgWEh+znqtaR+nWuXwulK0wn9MIFTLXq4Gp1r6/YyOP8kb2cuRBPTrENXh4uleUuS4/n1IWjRESXYudWCxc7s2yG4nyuhJ/gdGgSxfaeeLtcuxa5hISL5zlzOpTkIgMedT1qvDC5PDeN8xePE3oxB1xrU8vRbBuitCSeU4ePcCEiDZ21B3XcarY0UZYWy8kLx4iM1eHg5o6znQpDeRlhh0I4G25u29ikNKzVdVHbV1fPhYSf3M+psGgy8iyoXdsVGytLjEYdBZnxXAo/TbrUpa5rzddBl5bmkBl/mYtJ6Tg6e+JwzSpKeR4Xjh3n9MVwoqKS0du5UsvV/gF4oszh7KF9nLuYSL7OAU2da1a9ysm9ep69x88Sn5KLs7o2jvbmttJmpXDi+HEuRlyhzNoTdzc7bqUXF2Ve5WRYCu6etbC1ujclN5n0FGQlEhFxhgS9F/XUt2rBRChIj+LkhXQ869TCWmUJlJJw+RRHT14gIVmLs7oWjhX9SleQw7kTRwm9FEmh1KZ2bfsqdaIn/cp5jseX0bju7VvuMZWXkRBxkpNhsWRY1qb+tTFSmsKRnYe4EBVFVFQOjr7euNyj+oVyUuNCOXbiHNGx+di51salYkybdKXERZzkVFgcWSoPfKqM6byroZy4cImEAjvqeTpjaWEB6MlLjeXcweNcTk7DysUdFwdbqp2VxURq5ClOhEWRanDFt/a1yb6A8BP7ORUWQ2a+BbVrq7G2qn5+L8xPITbqPFH5NtSvfX2+Tjyzl8Pnrq8XWSpv6rv/0/R2VfQF2USEH+dMaBrlzp54OlfUiaGAy6eOczIsnAytI75e1a95BkMZ+RlxXAg/RTb18HL5+xxUzNVDRwjVOtPIoxrLRP8JQm7iRc5FF+Dh4Ya16lr93nzdqw69No+rsbHYOtXGtoZ2+n8FfVkKp/ZfwNLFHRfH27O8dLsUpV7i8KVkXH28uZNe9UAopvF/Tub746706NwSt8o7zUrZ+vHLjF5r5NMXelSGTd7zFb8fKaFMm0tWUijrN+QzcmS728o3NyGd8JgUatWtXWkCqzw7ms3fv8nFBq/Sp4rlAmNpAac2fsun21Jo4GpBXlokazaGM2xIL+xvYk71VjgwbwOqrq1w/YdPEUtG9mJ+SjteHHbdPk55YSa7Vn/Ocbse9Kn/z1j/JWfXLGTJ2VhU+WVE7TtLsmdb2tazg9wo1u08Q0lJMulJxWQbhLre3thblBN+bBtHo9LIydShK7xKuXsrvJ0g68CX/Hw8F4v8XMIvbuOsVXd61q+mG5eks3f/IeIyUslI0VGoy8XJoyFqO9g2bwYHU4rRpxRwZtNuLDv2o0F1VZMdyaqQUHRlyaQnFZFpVOHjXQdjQS6/zp5DpoMD2rw8Tu/4hXzfoXSqRq7w4LUsOhyGZZGO2MMXSbD1oUNjNUZjOYXZyUTt+ob5qX14osPNDKPfSGlpHrlxF9m09wBO9bvSwL1iQskP4+MvN2NtD3l5Olzq+uLj6XzfFdNjS2azOiIdixwtETtPkNqoF609LSiJ2ceGTefILMojN+kKSTonmjfUYKXPJ3jNSkKOpWBhUYKF0QFXdw3ONcxeIhls+/5zfjySS+8uHajlfG8mWpPJQGFOMjH7FzDjSmee6+p+S/GM+lS2zvuSeUcKCOzZAVcHa1LOn2T5X8GUlBhIPxfP5Qw9jVs2wEGl59Rfy1m5PRoLi1IsDJY4qn1xq9Dx85PD+HPZj3x1RMVLQ29xjovbxcJwVzpX6bdZZzey8Ww6xXklGLLOkuXSiQZqIG0rz713AK86luTlWVK/fVNq29ybB96cuCus/n0N6QXl5EWkcSkqE01rP1xtIe3MJv4KTacoT4s+6xy56o74ugIx2/luezLosilKiyPKuhWt66jQJhxhScghLLLyuZp8hZPpWto2bYqD9b+PkvJL61l2JIOyogJ0GZdIcOxIM3e4tHU1C49eRFWkI+bQBeLtfenQqPq5tig/leRTm/jujB2je1y3877htckcV7tikZdHwqHlLMrpxfjuHv+ekK6Q04d2cT4hlcw0A6UliVjWao6Hg3nd23KkhEJtLlmhIeTWH0iTap5VDAYdhVlJXAn5gl9y+vNou6plKCf60BY2bVrNgos+TBjQsNry3W3EZOTAys/Yl+VLj7a+VRTKm6971WHQ5hObmISbp8/1h/lqiDt+iUQrFV41TTz/Ecc2HsChZYM7UtpqQptzmUlj3sKpXX/aNK5dc4S7SElaBKt/nEJqq/F0urUp8+bc+V3/d07onECz5Yq/sXnSYLEcu/EGt3Nz+su07RelSETKS/IkJSW/widDln86Rvz8/CQg4BXZFJ8jhtIC+WXKQBn71RYp0omsedNP+oz9UM6nbuSezAAAIABJREFUaMUU96sE+TaUunV9pJmfn7Tv2ls2XTanFLPwYXlh+lcS4OcnfkNelkMVOWQe+F5GzdkvBTn7ZPOCvZKVkSNGo0mkKFsOff+y9OnkJy1bPiWr9lyslLc4P0zeeXaA+Pn5yePTHpcPP9wqkn9ePnt8gHg6uEkDPz/x8/OTd9bH3lDO+YEu0m3G320DiaTu/EKmbk68zZq+fQpSUyWjuFzEaJSEzTNl0pYMERFJPvSHzN96WIwmESlOkMUr1siVpCIpLymQDfOmS2i2UURE4o78IPMrLFbpcuMlvdBsJenIqufk4YXVW7LKvXJGflm1WtK1JhF9sezcskx2nTXnn52cIoU6g4heL2c/6yk/nK6+HIl7V8sP2yvshRXFyPxlv0t8eokYDQbJz84XfUW4pa98IqFaQ7VpFWVmSlphmYjJJGn7lsin68JuDHDwI3lsWdzfYpXJ/vmfSy+/V+XI3xMsyZRNa36SA1erWEvKPiYTpm/8e8j7Tl5SkmRpy0UMBole+Za8vN3czlmH5stH68JFRKQwIkTen7dSckoMosuOkRVL5srZxHIREbl8cosc2HypxnwOfDJKfvjzpHy1cJXEphTVGP6uc/xreWje1VsOvnf6GPnpr2My48c1kpJltqRUVlgoGTkFYhKR4pgz8vPSXyQ2T8SoK5GtP78vIZFlYjKJZMZvlU2LTlSm9ceXU2TznmAZ+/Gm6xlkX5HvXu4ufn5+0nvoMxJyJUlusJ1zdJYM+unG8bRjxnMSklzRl8O/kkkLL5j/TlglD7+753+ojLtHuVYrmVm5ojeapDw7WdYs+FxOpZr9tn3+kuxNMcurv/CVvL/U3E9Ozx4r318y9x9J2iKPvL9PREQM2nxJzTFbnEuPPiRvzFkoiXnl1ea/f+ogWRdbMdqjFslTX5wSkYoxXWQe06l7FsnH6y9Wk0oVov6UFxfeOF/nJWfKNVtaIR/Pkd8ytNUmUZIeL6uX/CBRBeaxdG73Qlm91zzXn/9hkCw9Y5Y39ueh8vzaqhaI4uVlv77y4dLD8o8RsneyPPvbjbb1cq+Gyo/zlkvkmaXyyJR7Z03tGiZDuayfM/EGK4HX+Pu6t+QJP+k69HnZddlsomnjJD/x6zlGdp2MFzkyS/z8/KTfi7PkSkaZiIiUxJ+Ud8f0lJGTJsmjfn7i12uI/HA6Uowicjl4lnT1qieaho3Fz89PAp96U85U9LnsMxvkqUDzWjz6o6VyTRs59/MoadW+k3y0fL989sTD0mbkZKl+iTFK7IU/5fFBPcTPz0+enPai/PbbKZGM3fJUyxbi5eYpjSvW/NmV1pGyZN03E8xjuvdYWXXe3La50UflzeF+Mvzr/RIyf6oE9RgoXx9eJ7N6dJZuT74pTwSMkJ9//kSe9Gshj335m1wzTFeclSJjBgbI6uNJNxPwP+fqz8Pkg/13lsb93njBWFJIXoEFDjd5Um/UxoMRvdve4Nb6pe9p8Nvr9PH1ZeikuaRmW4GpnN8nz0E/djWRkZHs3TCZ6I9+44qVC6Oef4eO9W0wCYyZtYeXgxpQphcsGoxj8bptfP3tMs5ERhJ64hCPNr+ez+k99iw5FsnawQ68//3VSveIReNo1elFduYZqO3pjqWlBTg60HTkJH5Zu5PtwTPJ3zeNffHm8JfXzYAhU9i0cyeTO3pzWmsE17Z8sn4X73cawx+RkURGRjLn8RufWtv2rEefdk34Oza2dhjy08kuMdx2nd8OLt7eeDpaUZ59nrWhbjzd0xEAvd6IzbWdCUsLjMnpSEkJiGA0mLCu8BO9EUNckrkMbr4Y44IZ08mHaVvbsOKZ+oCRkpxMkhITSaz8ZVEKGI0mLC0w17WFBca8AkxZOQDU0tTF2cpIUdR6Pjr/PKM7AegpSEutkk4iiYk56AB9uRHba33NwgJDYipSWoqlSoVrLVesAEP4HE42HUb7al/jg5OHB17OthgKYwkOLaVn6zq3VJdGfTmlWh3GWwmsssX95Hf4+vri27Yb7yzeT4nu/tvEUNerR207FWXpx1kc2pypg8y7HrV7PoTtge949NHmvDbrGF06dcDFQYWNrQPa7FyO7T1HYuJBVi1dxvr4VIqqySNx3UQmxw5lRHMD2vwcsop096Zwt0n86vF8Ej+EIU31lBZkk1VUDoCtszOe7i5YGIq4cO4Qeuf21FWDpaUKC6OKYzuOEBd3jDU/LWBNZByZwOU53fmzuBf+tcvQFWaRWWwA0RP8xx7avPYzO3fuZNUXEzn160ZKjCbKS/JISUwkMaOA0jxz38/MK8EkUFaqx+5an7e2QR8RZf7bygHVhvHmvtVrOEsOZt6zurK2t8ejthtWJi0J59Zy1dSLlt5mv3KdHltbs7xiZY3+cjQAWm05jg4Vr6RVVuhOhZn/tHfF272URcN9eejxmXRp8RB1XawwGUrIuGEOSCGnoBQTUFJSfv1Nl7U15ecuAhVj2skWQ0E020LL6dfW0yyTtoC0G9JKo6C0vNoyqjUeOACm7NPsc/XlyVrVv8Y3mQQxCVYq85xpKinFmJIOQKNnxnPo00AefXQ080J7Mm1U3SoxBZ22FJ3eVFO1A8KuFTPAvQkO5UWUFWdTUHZLM9FdQ1+US2mp5U2P5fx93Xt25mQGDJhAT289yRn59J+2i4/GdKFJa1/o+SGhe9fzcEtrdAbznOjg24WpLwwjPM7Ee7sj2TP7RS7svEC5QWg++EPmzljAvK27iYyMZPfqH+joDRiKWfHbYSYv28nOnTv5eoANi2etxQB0eGkDRz5sz6r522j2/DLOfTsS75R/L5tJV8zJg9vpMXUu23fu5NEGjkTpjOAZyOrwCKY/M41dFWv+e90Bk56tny8lP3A2kZGRHNo6i6LFm7mgB7fGPfhh9iySV81jTe5wVq1azjhNX6Ytf4FakWW8+P4r/LYwj5eDLzFCF0pknFkGKxsVvfo0wcfj9o//3Al29k6UZadQeAf96vbeQd9FCi4dYfchC7qMcvqHX9txy9n4Nzdrx9a8vPYALwPZl3/k2UnLWbumO6dqd+Lba7qde2N6NA/lcCI8dZtyPT77DRq5AZ184Nh195avLGfFi26EHbpedcUZ4YT8tJCTOSYMJktc3V1pUeHn9+RkvGf/wpy/tNTCkYFP3Norit7Tw+l9E3dHR2fygxeyocnXTOx1b7fpc84fZndYLP4jB9KmtmOFq5YSrY5KVcneDlRWgKDXF1Cur3BXqcDh+qHdum0fY+2BgZz4cwbPfXGc7V+0IezPVaw5Hsn16b4Nby5+E2/KKSsrwXht3rWxMf8AY1kJl0/t43iYga83voBZNczm0KJ5/JWaU0X67ry3ZDyWaCnRVllQHOzBsqoCWsqxlSfpPmHSLdVJYeQJdoVG4tmpNz1aet1CDFv6vz2dM2/fUvKg9mf29qPMBtDFM3/REYoLtDh6OtYU8z8n7dwB9oUlMuS14TSyMCumBRFXsR09g819NZTFnGRleCba8pa4OHkxdswQ5i1ZzcyjpXg3DKJbHdtqzxYb3ZvQ3u4wM7/czqWYDEo0vejSvNa9KdxtYKrVjBZWB5g5u4ALV7MxNX6Idg3Nxzi0iZHsP3uS3LKWPP5MB2wBrGwJHPk0Kb8s5ssvi6jfdgT99PbYAcY67bGN3MrMbzMIDS9l9ZlHeadbMdFhpzh/+BQq+2s115oYQH1xO/OXHSA/I4yY3ARmxrnQLHAcr43sicmUS2lZFUGdK/pO3UfZmvCo+e/Cwzw7aS8T+o65J3UF5rPeR88eJzahIS+83odrPdpozKXsmrwWgNM1nxwKi6sk4Fb19bQ3r2yJ57Gw/Xy+eTd9O/rgZhHGipnLub6t4EzXoc/x1LB2IJmUaKtEd71+ZrMw4ji7Qq/g3a0v3Zp7AibSL+9n6cJg0ipD1eWR115kaHufGo7VmEgJj6OBXwMsLWvaBzJQXl6E4dqeg7UV2JmV2bRD5xg05wBjmkH2uvdYcraY97teWzMb8GvCyRrSvo6TRy32HFjO+W1XiYn14nDMIB5pdfe+06iJ7BM7uBplzQi13T/8/r7uqXyfoVX2V6ycH8KOw2mMe/8xcuhC3RrehQ8bN4Wu9QCTG7U9tdUHzt/BwW1hRGpnVjppmj1OHuABqOwceGb6ZJ4c5AV4o6kmKUtbR7oFDGDp0iV8kVqEu0tDuo/3/fcIJTGEOTfg1YYVfdzVh45No9kbL7Rtap5TW748mRWvXj/OSCzUatebAY3g6yGd6NcQdnlf97Z1qcOrH/xcfZn/Q9RutYhf+QPHWn3MoBa3Zzr9vium7l0H88TQuWxKLGBEa/saQl9h6bg/6PjZa3TwVVPbvTYajQ2WDg3xK9jB9jR4pC5QlEp4UlPa1gESISevAKPJxKVD2wnZF83rva6lV0pBURF6A8RsWczxzGY89mq/GmV2cG5HjyEQun4f8kgPXK4cJtHYhy/nPIP2SjDL1qytDLt3/iG6vvItUzxtidk+jfdOxTJpeGMAhCRy8qAw9RhLvr/Es0tewrOGvAsL86n9zIx7rJQWcWTzcs4mN6HvkBHUK97P72c9eLajKx4N62I8YgECxdmFlNk4YaN2QWWto04jX0pzSqGWPdFnY3DrNg6A7Z98gox9myFNrHGTWGKycwE1PcdPouf4f+au81Bjb++CoVSPQfTk5JTSoEtdIJM/ly9DW2sAD48LwjL4E3b4zeDhxt4M/Ww2Q29SkuIm9Sg/bn6SK8zMR++kxsqlykNRfhjLM4P4unFNdaLl3N71HLroRveBw2hqdZGQkwk81rWaSQgAPef+WM2iDVm8vm4KbWsIHbVvH5szhfee7E9+Xg7h2ZmMqEm0/5wC9q7+iSslXej38Eg80jazpGAsEzpYUJKeTLneE9AgUkJhYhomvQlsVIhvV96Z1RVb0ti18Becm7bBvDSZiDq4jQU/hTF6yVR6uJhdGw54lyUDgJJ4flh9lGH9m92/It+AkcjdW1iw9DJjV0yli51ZSWw0aBpLBgHF0Xz922meCWwEGEmI2MfOvek06jqAYU0MhB7aDx0fwtMRpI4fz7w/h5fI5Miibylq9SguQKunF7LkaSDnKC/My+Sdfh6AM/7t25Hn1pHpT/S5UaRuT/NNt6fh2Oc8fH4MSyY2qvRq0q0NV1IKwceFsG0n8ew5FoDDP/3Ekaa9eX9AGxLjrhJprPkjvbtFZtJJgv+8SJ22/Rn9Qi0u799MWftHaewGDTu2IimtCDTOXNh+Go/u4wBo8ZA/O8IzoY0n8Wej8A4aDsDVAwc4ZnDhucAO2LgUUJifhN5owsmrJ1OX9Lxp/m0GdSM4Lg8auxGxL4y6QR8DWs7u/p3Dl2rT4+GhNLY8z/ZTSYzq4kN9/xHMWHIbI89QzKUMHU2beFHTN7J2zg6oPeugK9SBqy3J0Rm49DW3Y05kKCa/fECNyZRC7pUcqFRM05k9+jPUT7/Cc8PaUf0qasGQN5cwBCBxJUPna+6pUgrgPeBp2kaeIi5bS8d61Z8ZV6mgnncSW1MD+GxoOl/88icDJnxJ9XvP1VFAVrYOMZRzdPFydM370K9/Pwb134fPWx/ySKt6t50yQLlWx5nDJYz9aB7NbE3sXfsxp6IyGNHNrDmW6zIpLoHsc5v4+bcSXls4gibaEA6mlTHS1RZKMolK1uB/K3scDyjZWRn4TVzHoBY1h/1X7sqhgjvk386Y/pMj8pJdD3l4SAdRq9Wi7jNO9pSaz92Ua2Nk7ptBolarpU2rx2XZhRQxiogpP1GWTn1YvGqrpeXQl+X5oT2k41urRESkKOOSzHiis3ip1eLzyGQ5HaeT9N1fim9te9G06SN/7d4jw7s3EitHtby94E+ZOLChWNs7mfNWq8XRbpCsyy4WbeoFmTy8ubi6qmXA69/Kpy/2kNEzNkuuTuSrvuNkwKB2olarxaXPONkfra8szfn1z0t7F7W4tnpIftoRL8ZbqIGIta/LpA3R/3sl3wk5x+Wljg3F1t5F1Gq1uDrZyTO/VZxfMRkkftNPUtvdXeq1e0iWH8swnzcVk+RHnJCn+nUUtVotz/1yWcorjrmVhYXJa491EbXaVbo+8Z2c1+r/LeeKPIySdnCjdGreUGprGsrMbQliMIpI3FLpZGstjk6u5vp1sKnxjKmYDBK74QdRq9VSv9NAWXMqs0JeM+khn8nrm3NqrpOCcPl0WCdxsHeuqBMHefS7wyIiknkxWEZ3U4vayU6sHVxE3XSA/Hn42rm/PNk6/VnxYpjsrJLckZkdRO3qKo4O9uLk4irq/nNFRESvS5MVXz4varVaGrTpKvP3npUyk0nuKxm7ZWQ9d7FzMPcHF0dbmRBs7r0mfaqs+PxZUavV0qj9w7LtcLyYTCJSlC3r3xgj9dVqCQp6U07Eas1tKCIiZXJs+WRpQoCszSy8ISuT0SBfj3IRewcH6fHxTrlX5Meflpf7qUXtZC9W9i6ibthDlv517byhVg4ufEMaMkA2FpXdEM9QViyzRriIvb2D9J5xUKQ8XzbPGi1edg7mfuLiLD2fnymxeSKi18nBmROliVotffuOlwNXikVf5VhzbvQRGd/bSWzsHGXk0jhz+rpE2THtUfMc1Ly5dHlhkVwxVOkPNzljWpaZIB8/EShqtVr6fX1Oyiry0JVckU+f7y1qtVraDXpG9qf/88zff4LJKMd/mSi+dvbi4qoWtaurtBvyYuUZU21qtEwd+ZCo1WoZMOd8pbxi1MmeT8eLWq2W9uPnSmaR2cOQni6rZ04QtVotvi37yLydV2ocI8ayQlnw0ghRq9XS48PtUqoXkYKL8uHgDmJfZUyPnHu8xuLMG6MWtYuj2Ng7ibqWl4ybdb2flucmyO/L58r59FsZsybJPrNbBnVqJWq1Wt76PVr0FWOkOOeojKtY9/qM+0VKdVVXi50yBI2M/ypECipcUk+vk+Ed1aJ2shUbBxdR+w2V/Wevf5twZcuH0tbXQRxqN5Cv92Tcgmx3j+rOmP4DY7kc+uldmTh9o+SWXJGJDR6TXekiImEyVeMlri7OYm9vL84uruKlmSpHY47I+ID6YuvoIrN2Z8nSSYFi6+Ao/b83n1POjNgiz3VoJGp3Dwl4Y4HEZJnXnryE3fJa/9bmcRUYKK/9eFpy5ap891BHcXW0FTtH81w3YW3yv8sqIqX5RTJ98JPSwb+xqNVqaTHmU7mQen1Qb5o1VJq6qsWl8xMSfF4rJhHRlybIog8eE7VaLX7NB8uPh66KQUQu7/9OejlX9Cu1WjoOf0VOp16Ujxp5iY1XS/nk+/kS2LmxDFxwVX6Z2EYeemOBpN6HY/h/59Anfnd8xtRCRO77gbWSyF9564uLjPtsJr0a3f9XlA8quVEHmbVoNf2mfcUwz/tzfkRBQUFBQeG2ERPnt3zJjyc9+PzD8dRxvu8vbhXuErG7vuHNzQXMWDgL/ztI54FQTBUUFBQUFBQUFBTu+1f5CgoKCgoKCgoKCqAopgoKCgoKCgoKCg8IimKqoKCgoKCgoKDwQKAopgoKCgoKCgoKCg8EimKqoKCgoKCgoKDwQKCaPn369PsthEmXT1pGASo7B6xV124hNlCYkU5qoQk3ZztAT35qGmnZuZSWC9YWOlLT0skrLMbS1vGm5s3uBEN5IempeVjZ2WF9l9O+XYzlWrKysxE7B2xrtCJyt9GRlZpEZnYRZXpLHO1tsKiw9mPUFpKRnUpugRErWztsrMzuJr2OvNx0MrKK0VvZ42hTVWYTJblZpBcZcXWs+bpkY1kJ2dnpZOWUgq09dtZV0zJQmJ5Gapk1bg41XxJuKCkgPTuN3AIj1nZ22Kiu33xtLNeSmZVCVk4RJpUt9rZWVHcvtqEwl7TsTAq0Ftjb26KytAAxUJCdQXpmNnn5hZQbrbB3sLmFp0ChrCiXtDwdLo72WFTJWEwlZCTnILb2d72v14x57GXqrXGttDhkoDg3m4z0TIrKjdg7OVDVfpbJWEJGai7Y2mNTg7xi0pGXnk56dg6lBhucHc2XbhsMOsqK8skqLMDS2vGGdvrvEfS6EnLS0snMy8NkaYOdrXW1feEa5SV5pOVocXCwN5vR5doYSSM3X4/Kzh7bijFi1GvJy8ggMzuHcqyxszf3k8K0eFKz88jPzyc/Px+dyhkn29trdzEZKcpNJz2rAK2FPc52FS1lKCY1IYXs/Hzy88uwdnHEpqZb4O8aRkoKs0hLy6KgoBwrW/tK08ZiNFCYm05GViGllvY4217vWbr8LNKzcyjUqXBysLlxjIiWjOQsTLcyRkQoycsgPSuPYpMtLvY3XlmkLysgI7MIG3t7rGqoEzHqKczNICOrkDJLhxvaScREUUEW6RmZ5GktcXa2q3YeMJWXkpOTTkZmCSYbexyqzJkmo568vAwyMrMp1lvj6Pjvc4rJZESnLSQ7N51SnG6Ye8WgpyAnnfSsInQqh9vuV3dCWVE2mQU67O3tsKxsxHJyEpLIN1jj7FD9xft3gq4glexyO5xsqzc5/aBQlp9FUlom+flF6MQGBzvrG/r9LWEoJT0tnaycPMTWGXvrW2vzcm0+6emF2Dvam9e2GtCX5JCaU4yts+MdWW96IBTTlB3v8vaSBNp26VTlTrM81rz8OIE/a/n0xR5ANvs+nMCoRSdQWTqjsUth0c8/Mueb9TQcMIKmtf73jlyUmUdiWg4u7i78vYumR27lqaHv06hXfxrVdb1p/HtNcWo4P30zmfN1+tKj7r211hF98Ddm/byUo/vCOLU/FlWTtjT2tIH/j733joryaB/3L3qHpYMFe8HeEF0Ve+/G3mJsscQeE1vsRo3ttfcodsHesfeOigUULID0zgLLsm2+fywiJhF8E+Pr7/Pb6xzOYWeeuafP3FOe586I5uzxM5y7tpdzl+KQW0so6e6EqYGK13cD8D9xiOMnQ4hT5eBctAz2uVboMhODObR8JiMOKxjdpWbBkStSuXfhDCcu+HHydAQyU1OKuhdFp79oSAy7hu/8GQy57MKkDmULliV7y6ljpzl/fR/nryaQbe1AKXdHTIxAmRrHnavn2Xd4D2cvP0ZtX46KJRz+1DbySAph5+5TXLp5nJsPElE7lqC8qyXI37B2/gL8T13m9p1AElVuVKpWrFBrJcqst5xYNYuxe6Pp375uvgVRJg8PLOOXZYfRFqtD9RJfsj2qiQu+wNbZ05kcWJzRrXWWaDJC9rJ6zzlunjzD+XtXiHVvQG3XdyYGM7nv9xszVpzArFRtKhcruK3G39vMpo2nOXX5Eo8Dn+JQtTHu1iCTRRF+/wLrd24gy6U5Vdz/bMLw30IjT+Ty2R2c3HuKk5evEBQbS5Ey1XG2LHgy06qTCNgwm0nbQ2jRxAuJpQlkxnL+xBnOXtX1kSxLO0oWccbUQMmjy1vw33OGMxcucTv0MTZlvfGwMWFjhyZsfBHBoxs3CPBdwG5VewZ4ORSe8LiHnIq0opzz+9aWFnyBnQeOcvrsA14np2JXtBKuVkCUP+07LyE04jE3bsRSrHFNipp/GetPGfGv2bH1Nw4cv8yN0yHEpBtTyrMkViaQ9PQcuw4e5fTZh4SnpSEp6omLFRB7ny07T3Lx2nkevEjGwL0ypezf1UcWjw4tY9aSg+QUrU3NkpIC41eHX2Xr3uOcu3SL5zEpWBStQtE864kyLm+dx0+b7lKljhdF7Atud/FB59hz+DCnAoKIzJBhX7QizrkmM2MDL+J/6gRHj5/kargtjRqW+bhlJpWcp9cDOHz6AMeOvyTFEFyLlMDOTKdMht06h9/xQ5w4eY6QzCJ41yzGx2a9nBwZUSE3ObxpNNtT29K1+vsxIzowgL1HD3PqzFOi5Jk4FC2PU2FGFz8nWjUXt05iw01DGnpVyKckxbDYqwoLX1VgaKdPM939d4i8so6DiZ7UK/nlv5kecuMJZh6un265ShHLtl+ms/XyLe7feEisYUlqlXfhv96bSAll85bN+P42nkdufWld8b2p0NTIOGIys5HYWv1h4S0IvbyNnv1X0bRTK5wkhTeShKCjTJ09gxzpQKr9PWukwFdgkhQg6WUonp1/oWqR/AOAI/ZuNqB5Z5nWlXaju1B5TyV6Vkth1dEE5iwYjuX3T2lezhpSXrJx6RTOvhA4l6vDqB9HU83JFsjm4UV/lm0+gdbUmBKVpQzu2ouyVreZ2G8VQVkK3Iu7YGltz/C5W2iaa1HS2LQMNiVtwPzLTYaFYVu8Bt+1rMWqtxqo/WXjNrOpweiZvajmYEbo/l9ZHyqnVWVrEoLvEWxegkmTB2CUFc62Y3eJLetBKYmax4+DaDBgHuNdjYm4uoIzdyrxfWudybdr/oew8G5L9buFN/aMmHCepqrpM2o5RcyyuXB6P09flaFZNQeyk+I4G/CMmn06Udqv8HzEP75FiE0Ffv75W5C9ZOPRIJLKF8fDAULvXyPTsCw//vgNtraF9/w3lw7zvPIQFjYdAXHX+NH/Ee2rttB5lmnM3J86U/xPNu2V3Pfbyfr9iYw9OIXq+Xxu71hPeplWeBtqPxggXhzehH9sIzr3fV2IucHPT0b0a05diMRnWBcuH3nvbmhempZ92+Dl4cj9wxMZdyGB4dV0ysDzA2s5luRDxx4RWH9Ebn7ibp+kaJ+DTK9rxusN7Vh+K4laXZ2QSEoiae5Bj7RoIv6d7H0cQ3NKVG6OV+tRWBtrWL36R55HZVOpkAXw/S0LCHdqQaO6ct6peIkhgQSbFGHCj+sxyX7LzmM3iU7woEIRc5xLSvl2+hDcbS3YtaIbd15k0qCIBe3nbae/Tw0cgLNTp/OyTa6NwvRIdq2dxeFAGRKPSgyd8AP1PVzfJ+D1KVYH9aFdpfeLgUen/SjRbQ1jSpvBo/lMORPGooHlALBuOZ4NS5t/xoL7NIxMHGjccSKDy5XEICGSvfv2EJ7eGGdLCDp/jHLdVzC2pCnqB/OZd646c/qWIfjQRpKQ4iSVAAAgAElEQVQarmR+XUsIP0D3PQ9pOq0uAKFHN7MvqhFd+rt/fCGZjwe7VmD1zT5+q2QOwasZ7P8Mr7GVAQjaMpeHJk1p3iyFTxn9g64EUKnnYsZ6mJJ1byErL1XDs0cpSDjP0TPJtBn8A8NcbDAuZLZVpCXxNDyatkMWMdHBiKBz67j1uALFG7qiiDzFvWdm9Bk0HXcniz/smMXy6zczsRswmsFdamABmJtLKFu7HePSLzEwOv+zgqDbV6nRex7jipmQcvs3tl2tSoUuhZlS/nwIIUhXGtGifXMcPljoFcelpCG4Oed7WEv4TT9W/O5PVBp4fTOKkX2bo1Oz49g6YTGnIrPw+rYHNju2kFyvHTYpV6DFQkbVFuz4bTSPiwxn+YhWmGTHs2/LMvyvvaba0G/zorjw2wh2hbgg9dRw7c5zsso1Z9LkgRgHbGL9PTW1TANJMG1KcdNnXJCVYdaS8VTKSuDUrmX8fvYlFvZu9Bw9gTY1yxJx4GfmX8rE3dCQ1zExSBr15JfxvSiWcofpw5dw+lEoLtXLYQV0mnWQbwuwSZ0RFcSGRWNZczQaz7rVybG1pW8ZO8yNIemiL0v9jhGWWIxW3w3i+w41kT07ybTlu/Aev5d2ppdYuWoNiqaL+K17OXCqzIQZi3ludZPN+eJID9nP2CHrCTUypIiLPRL3Moyc9ht1iwAYYGbpgWVJOzD5tAWru1cfpjTYzu5QoMgnBflLvo4z6o9QtATUrZOv5iws4e59wsMvEXv+IZEhgbwpWwkz4Pi+ABrO2Iavry/LfmjPiXX7AMh4cYP9j2P4fuUG1iyejVoWRXiqHAO3NkyatZDvR/7ERl9ftqxbScPi76MyN4dqNVywtf2UqfXLYWpuhYHBl6+24rVqUc3FChRvOBpsQ/d6OhVJnqXExjL3uNvIiJyIGLSyTIRWoMxWYZl7RKbVgiL0NQCv1rUkQNGcblIPPuUUKSdHjbEhuh1EAwOUKTJUcQkA3N4+iTS3pviU/zRLWFmZOdha5XYyIyMUb96izZKDKpuI14Hs3jCa0iXsqDF4KS9TCpaVnpqNm3Ou4mlqStbDp+89b2+mRmlXbJzc+WbOfuKz3nloiQt5zKlDt4jPJyty5wDWRzVnYKvyWOebwFLu+vLbVStmj2yI+983EP23ubLrV4zLNKVeiQ/7gVWp+pTW3qd3ZRuGb7fn7GjdTnXyzU0suObEjOFSXD8xvSV69uXsz3Vp3rwDSx40ZnxHx8+djf8aI3NbypUtyoUpzXFwLkq82QA6VS145zf64FhmBbdgeKfK2OYbx7PlSqwsjHXKhKERirexaNIzMDA0onjZ8jzfMhIPJxtOp41mjI8TAGVylVJSbnPApBbf51rEu3jiKpW+m4evry+rfurPA7+TaDTaAtOVniLHzia3MqyskQc+yfNLWtURGxsbbKq3Y/8D2X9bTH8bSwcHKnuWxtzYEFn0cUJzalE+V/fOSM/G1ka3ABAWVsgfPdOlNSETt3dbkWYWyC7fAiD13i6WXDFj7qhGfOqmemJ8Bo7vdkItrci4cQ+AuFOz+CmwHmN71cThEw/hMjMU2FjnptfMnOwnITqPkEscfPWEYa2KYO/dlVMvNAXKUau1aNUazHOPmNXZOeSEvwVA+fQcflf9aF/XBdvGQ7n59oMUcPPQaR6ExqMqLLECsjNzsM4dA4WRCfJnLz4to1+AshWhkme5vN9qlZo7T1KYssoXX19f+pfO5PT+ywBs7DAYi1EL8PWdifT5HmYkeTP5h950b1SGmAw1ZrYuDPx2GGbGajQCsHKh24g5LOhoy/XXeQMyPmOXU+z1JiKtfFi6zhffWU14Om8r9k1rob1wFdFrDZLwhwQbdKG3+goHb0LQvWdYe/Vgm68vGxZNRfXoNnFvEynRaiKeRq+QV+7Guq2+eL06xNHrSWBfmxnbtzOoZV+W+ury0rtywWVhXaQKY36ejrTuUA74+uK7ZjbSqjptz9q7IT9M88XXdyFFTjVk/QOwqdiKMfUFTxPBoWwjpg5sxpPo7ALjsC3flXETZzDqp9n87uvLmt9mU8stXxpsoHrNoliYf/rkY2lV8GnFp/A/3zGNP7uD1b8b0u/wn4+pvMae5FZ+B48KlEt+RajGnErVszjsfxtt5S6Q8ZibJw6xaNce3m81NaHVTKhToQaNbh5jVo+OCIUBtVsNo3xpNzA0wcLCEnNzc6ysrfnjvpatR00WLNr072T6H2Dv4ETMrP5MN9rLgg7uXzTurKgXXL14llLtmuPl/m6fXkWOUv3+IWNjMDQABBpNNpp3Y7GhIe+2DBKzFNw7MhmffTLCYlVMqu3Nsi6mnJo/j6Wn75OTJ6w+S68vpRxqVGoleTbKjAzBSDd4p6S+Zc/h4exRJvM0yphVfWoztrGc3wdMZOvruHypb8OGG79ghRKlMt8EYWwMBgao1Sqe3DhDbJkJRPgNQJ78iBsPzuHSrCUf3zzNRqHIZzjNNHcmsyrDJN9LTPIF1BmcOHqI0OBoXL2KAuZ0mLWS2FkfSkrOziHy8iwan88iIj6bBJeabB1YDrlSTXbYDpo13k56WiKuLTQ0rD0EJ6sv03VTk8LYuGAQG3MSCU11ZGv3Ggypr1McHUu2Zt/tGK74zafV3HvcmO9NllKNIsyXZk22kJaaSNH2hjSoMRBb84/vY2W+eEv7dUH084QY3x85/FxJ2Sr/Ay38T9jT7T9X6Tz+NYu3r+PYvVJ083b56NOp2TnIAn+lSSsF0YmZBImy7B7tBahQKtXv229eHwGwpunE7UT2WciGjVNZfbosEzu8273SEhX4mLLSxrpdQPkrHp7z5/DKNQiTd+VZjxrjwSlgGT/PPURiRhTBWYdosMucmr2msWhEe4SQo8rXRTHN1Zo9+nFX2U/3f8oles04S6913T9DuX0aKlkSr5+d5shRY4YsasO7w2atVo4qv4b1Lr1kocjJ526u629ZKjXZL3fRrPFOZGkJODdT0aj2cMwyA5ja/VeC8gLY02rwFCYOaQhkoFTmk2Wmk5Weo0T5bAVNWywmPimd6kNcOTilOaGXtzJnui/heQFK8d2iWQxuVE6X3rzyNcjbXXoTFkzgjVQ27HvL+VpqNi2eQ8iEuXh+VOHVoFEr0L5bZxgagrGunl88uU9IQlV2XIyjfql0fDeuotjgsXiYAJTjhIgquLDzx6LNRv1uCDQw+OTdsM9FxL6l3LxhwdC+f970ab06ndb5fmsiNrJh/jpW7dyd62JJ/S6TaRV7HD95Sy6UswQs8enThloBiViYm2FmaoKBygAMDDEzt8DYUK4LamCIqbklVubG8F4vxcTcEgfHxtTo2RoXZ4BKlPVcS9jbOhhXbc7Yqlbsb1wUiWcFaoQIghSpvL6zhxV7H6CxebcS8mS8tAXdnC2oVN2bRq2b4iiB5s3LcEwjwMAYC2trzEzMsLS2/qSTJANDI8wtLDAxNsPaOn+IdIJ2r2T5kdtEpZtQ1tGE2lowMDLB3FQ3LxgYGWNhbk5hl+INjEyxMLfA3NwUa2tr/tgSXKp1YHW1Dp+Q2ve4Fy3Og+ld2bXyd/rX+Xum0//niqlrq4GMGbyTQ6EpNCvrVsjT5bBMvE9QRDWGdi7D3EknKNNQAjZ21K3XnLItezCkfrkPQiS9TMO0/GBOX/wPvA1h6e8HiYhKoYSTO5BDllyORgMx14/zLLU4Pl1qfPr9j/8BqSlJFPlx1xdWSuU8uXaGBw+ycW3Yg6aSMC6/yKJVBSsk7lZk3VMhBGSny1Ha2GFsa4uhcQ42LtZkpuSAvRnRL2OxqVQegHqTr3FjMpB0nUErE1nWRbcKbDdjJe1m/EXsdmaAIcpsDRqhJl2uxb2Irq18s+AG3wBEH6ThPCvGNtYdAw3eeZDBf5GT1KI2yB7qZrestEzU9o4YWVthaJpD+dpNMXN0wtTIgMzYLNLfZKLS8NFzBbcKDkSHpEEdG1KiErGo7KmLIyKCy8/Cad5MioWBmqjEeCyLvJsJ1IReOcexy+l0ndWbMrmuNYf7cWM4kP6YqZufM7OX7i5nsYZD2HNiCGiVXD69gzSb1l9MKQUYsOQGAwAid9N2pVueUhq4dy+ZDdrR2MOMciUg6sQLwBuPJqPwbzIKNHICTuxF69oqn1Kq4PbOPQS8dmHYrA55Jz2vr17DrO9owBoLy0ReBcVDFY8vlse/IjMhgbuPw6jRwBv7YhYUMU8jMyUVcAG0RNy/xpGTkbSa2gfP3MmgSv+N3OgPZL7ktx336N9TtyVi52aFPEKN0AqyM+QoLW0wkdihUam4fvo8pRo3w8PdggrOci7GxgO5iqkqjXsRZtRvkrsDYelKtTotsO3bgGGt/mCJuvUkjrSeBDcX0DaoD6dHls7zcq/oyNtoObhb8vJWMJJ6PQB4fOQIT4pVo1+d0sSnJJEsy/z3CvQPpCUEc/XkHZLsajN0bhkSHl4jpmwjitiAa1kHkmLl4GbJq7vPkXj1AqBETVdOB6dBRQlxoVE4NmsEQDHpIHYdGwRCzbUz20iwaIWLjTHYtGfdjfZ/GX8pL3euvMmAEjaEP3iJY5PhAFToupBLXYHsGLb4XaBeo7qAEeWbDGf3jeF/Kcu5pIT0+GxwseDNgzBsa/UGwL5Wa9pUvUvl4iaQIUdxL550BXzsYqiphQlm1mZky1RgY0JinAyr6iUBcPXuSNsUDcUcjSE1h6zHyWSqQKdJpLBnznasW3SmdYMyBc9fBuBQ3BZZggKczIl4Eo5d9T4FhfjslOj9I9KEcYTEZlLZteDdNSOPFnTrm02LSd/j6Zrvbn1GKJ6c4qkMqthmE/U0jGjey0pOSUOjcuDhjTtERBX/C8kfoswO503wGxrUL4WpaQop8fZ4fEynMrGiZNXm9PPozrC+rfK9vAUaRXqB8ahUqWRnQ3rYVY4HKOgyudUnKakfkHqWTbtgzq7LFDGK4PDsNuSPNTEllRyZmstn7pFjWMj7GwAoyMgUaAW8OnucGONy1Gte8U9K6qcSG/2WWgsO07/O3xQAIL4CHi5vIX45GftJz27v4yL6zzoicrJuih/c6olNoTr3jJi7YtP4nkIqlQppt25i4NwTIloIEXzmupj83QDh06SRqNe4mfju113ibYpSCCFE2tvHYv6gtqJRPalo2GOiOH8nXqj/pTx+Ll74TxATD7z6spGmBYoJTSsL99K1hFQqFV6VPMSg3VE6P1WmeHzwd9GwQQPRtGMfsfXCS6FQCyG0GhH/+KoY07e7kEql4of1V0WSPJ/I8Htiet8qwrlYBTHxcHTB8WsU4tXFQ6Jb29aiYdOWYuGBIJGR8947+vYu8W3bCsLWrbJYeTmhYFmqDPFo/yYhlUpFs84Dhe/lNyJHLYQQWpH19oFY9VNX0ahhfdF53HJx74VMaAqSlZMirq9dKKRSqWg98Cdx/lmyEEKI7PQ4sXfDTNG8qY9o1LSZ+HnzfvE2U5kbKF0cnz1IuNFJBPxBXHZqlFg2rLooWqK8GOwb+oHfpfn1RGXPMqLZmA0iMVNVcB4/MxGX14kezcoJp9L1xJabSUIIIeIuXBBTxvQSUmld0anvJLEvLOWDMGfn1BOVKpYRLSf9LtKz3/WqSLGiZW1hYPC9uJvv2aSwg2Lkd12EVCoV/UavEm8TFEIIIZ7tGyOk0vqiaoUSony1ukI6cO0XyK2OnNRUcWr9b6J9m2aiQUMvMW6JvwhLV+T6ysWV9RNEKVqKgxmKD8Kpc+Ri45haokTp8qLvmtxcqjPFk8PbReNGjUST9r3EpnNhIlslhFalEjd9N4re37QRUmktMXjKZhGYmJUnSxH7RGzZ4SteJb0flbISHoud0wfpxrmOHUWfmX4iXKN9n4Ab80WbdR+OD5nRT8WCkd8JqVQqesw/IaIzdO4JYdfF5NHfCKlUKtr3GyK2P3772cqvYDTi3r7JolqxUqJO3XqivreXaNV3lLgbo/OVRQSJ2cO/FVKpVPReeFrE5qZXKOLFkflThFQqFR1+WCqexik/kHr11/qiimcZ0XT0WhEvK7iPqGURYu2kUUIqlYpu03eLiPQP/fdMriPKlC0nui38Yy/9M2mvA8X0If2FVCoVA5acFXGZ73wUImjPTPFNWy8h/Wa48D3+VuQUJEirEm/vBIhB3ToJqVQqpmy/LVKzc0ssJ0UErBkj2rXwFtK+E8Wxqwnife4vifYUFYMXnxHvspH49IwY00sqpJWLCOdytYW00w/ibrBujk0OvSN+GtRHSKVSMWTFBRGfJb4oWrVS+C0fKfwfphb+rFYtnp5dL77r0lJIpVLRZNQksSHglZALIWKfBojpPfoLqbSDGLV0qejVbLUQQgjlm2ti/IDGor5PUzHg28Gifr0GYvCOMPE2aI/4TioVtcu7CrvStYRU2l0sP/JIKIQQS9o2Fr/8OkN0bikV0mEzxYXbIeLsmvGiglNJ0XrpZbFvdlfhM36zCFzZQXg26yNOPnojjq+YKBo2kAppy5ai65SN4m5spnj2+7eiYpniYuCSEyLj1lpRq2IxUaf/bPEkRleR+2Z+I5rVlYrabQcK3yNvhPLjWRexwXfFD22rCGfHkrr+3muMOPM0UYjsOLF1TFPh5SUV3UdMETunVRVNBqwUz2VCKB77i97tagnvFp3E5GF9hVv5OmJ+wCtxe+cC0UkqFTVL2ogiFesIqXS4OPxGN5YnPL8ifu7RUjSoLxWtv50pbj5OLnjeK4Tb82uIaZf+gQAhhIEQQhSuvv67ZDxYQpcxd5i85XfaeH7Zt83/v0TC4xOMnreKjv/ZzcCizoUH0KNHjx49er4mhIZb28Yx44I7vmt/opjkn10l0KqVKHKuM6n9I1acHZt3nP2pqBRylvUcQLXVu2hVzAxjo6/61Zuvmuf+k+j0ezJbT2+n0T+Q81Uopnr06NGjR48ePf8tsff3s2idH1EyY7y7Tuanfv/dGfKF30aw7k4iSCoydfJY6lR0LTyQnn8VvWKqR48ePXr06NGj56tAv2etR48ePXr06NGj56tAr5jq0aNHjx49evTo+SrQK6Z69OjRo0ePHj16vgr0iqkePXr06NGjR4+erwK9YqpHjx49evTo0aPnq+CrUEwTLvxEu64TuPkmn50w4tjUvQFG9Zfl/k7n3Oy2uEoa4hesey7t4BicPGqx5MCjvFCH14zi7POMv4wn8dUBejfsw5W7ASyp4k6xSs2ZuvE8oSfmI61fizpthnIrQv638pCRkEpS5l/ZpVVyZ+d0KlT+ltQMxd+S/Y7Ul9cYM7gNq0Ni/5Gcv0Ni2CGG9qyLT4N2DBi0hocRuXlVpHHPfyujRzWmbY9Z7L4ZQY4GEBpiAi/w65TeNGs2jBl775KUW7TRQZvo39Ubn/pd+H7MLt6kFRK5Sk7IOX9+Ht+OZq0msPpMCBm55gRjnvkxb9RA2vr40GfCDO4mKwsUlZERw8OAzYzoU4xJR2I+8NPIZTy5coTvh7fAp3V3lh19Qs5H5ACQGUfA2kUMGtSab0at5nLoe/sbqrREbp3aQf/+Pvh0Hsmhh1EU9PmLuLhHnNs2g55jR3Ll5XsLPGpZKKd+m4SPjw9tO/XD73wIqoJNo39WXj0LYN3MzjSff/IDd0XceVaN6IuPjw+9Bs8iLOV97nISIjm9dyXdu/vg02cuT2WFtXuBPOUpm77viOtg/z94ybm+42ekHX8iJObLWSZSyhPYu3YErVs0pEm9oazadp/0AhsDJCQ84/qeX+k7shdHHr9vC1lJz1g+szuNGzeiXcsf2XsqDIUalFkZjGtQDm8fH3x8fKhbuyrLLyXqAr1cRYPSNfHx8cHHZzr3PzXhsrc8jf2wvDPeBLJ65lDatRvAyPUXiX43PEbuRlqsWm4c4ziXnPVnef8SClkkvy/7jpbNGtK80Sg27g3K69PpYXdY+ctg2rYdyA+br5BX7ekRHFgynd69O9Nv2g6exuvsgGbEP2DB5I74NGpMx3bTOHwxXGexrQA0Cc/ZOm8MXbr0YsjSE0TkVpcy5T5bV//Ctz4+tO/Vn+33wgrNy6vgs2yY3ZUW845+mMe4C6wZ2Q8fHx96fjeTF0kFd1y1IpVDW8bQrmUDfLwGsXTjbVJzqzLt9REWTRxGJx8feoyezNWEghujPDWMtfP70qxJI1o3HY/vkRDkuWZeXwXuYtbgPrT08eG7GQsJSi14zPzsaNVcXD+cHhM2kZCR31ZuGFOKWVN/2L4vm54vSNyraP6ZFlA46bEnaF2iLnvOPv+XY/oz4edX0LxzB44UbACrUP7nJkkBYh4/pM6wnUhL5bdY74ZLCQlonHJ/29FycH/Kn/Yj+swVZB7lWXvbmUE+nenYvQZE32bWxlOYOtakg02+bOVk8ODyQU7ceo2JbWnq9eyAMxX5cesQYkJ60d/tFQfTW3H6RCP2rUuidglLSH3Nvj3bCY4H5/Je9O3fEZ0hxiweXTrBoUvPsHK0wsGhGgN6tCTzzXkWTt1BpLM9nu6O2BUtT9de/SktATDFSlIaS490MPhn6wD7so2Y1KUOa5/ngOc/EvVfE//chJ6LA2hV1Ion239la2AGNUtYkBZynQuiDKvWXsEo4zU7zwQSVcaNknZK7j+8S+MffJlWzIzIS0s4drcUg5s4E/XQlDFrz+MtMeL6b8NZG9ifpc0/Hrc8Jozr8SrGzD1OMYtsLgX48eBVMRp72pCTaUDbKSv4xcORUysasO/qSOp2LfpRWTY2RajZehhrNQ/4Kf94rFXy+t4lwpIdmLcgABfnj9t2f0fs5Z2c8OjP9tFTIPoS004/oUn5hqBMIfDseRKdqrNmzVUkH1jdU/Pi0lmOXkqj29y+lM11dXOrgVuvomSaH/ggjvRnV7nn/A1Xry4jM+wyay4/IEVeAVfrL7OmLFO5NaP6ybl30e4D99hjq0htv5OrG+yIPjyRH04kc3igE8gjCNgTgHnDTmzfPg7rT7C3p1ZkceXwBRxbtaH6VYsP/EKPrSYwtSyNW1pi/pHw/wbKLAPcKg5k74m62KUnsn3dSh7F16FxAZZSXVwq49KrLBrj1aTmc89MMqJq+zmMm1MJ2cMbbLtynVhpOTysLBg0fz/zmtbCFvCfNALzfGNgjdEbWDvJ+8NIMuM5d2Qb10LlWLuUoH2PblR2zWc78ekOJv/BJOnTU7/j2mcVp+Zawt1fmBlQnrndiwEg6b2CUwV1vn8JhcyQkl6jOTymJsbRr9i+5wDPk6vj5Q6Pz+3Fo/9aTs+zQH17JovOl2NGlyKEH/6N+3UWsG+yBF7uo9/+F+weWxlZnBFefZYz/beyxN84zbagQBp4l8TF6uPxv9gzi5x2WznyizUELWfEwXA2DC6JMkmGad0B+I6ZR9itLUy//pJBXuU+LggoU6kVZfopCLzwoXnN2BNrSGy7navr7Yg5OpkxpxI5OPDj38hUKQxw8OjB9qPLcVFksGPZLO7E1KNNaVAkZlJ/1HymlHXl4qZObDoTh8/AXNO1JLNr5u9Yt+pK24ZlMQPkKYZUaPYzp6dWRfn8EdtOXSAi3RNPJ1Cprem5YD1z3CX4r2jHsbuDqd76y327UwhBssKYXt/21JmOzaMcxT2NwCF/OQpS4p5yyP80kYmZFK9ZGk9nHxo2LA0pL9mzZwfPE8ClYj369m2HaWwwhw/sIywRKrf/nlKJpzlxNxKKtWTu4Do8v3WCo1eeIFcb4d2+N828KmAOBPrN5IKsOo0qufIs4BwKr1b07dAAh/RIDu3bwqNosC9ZhR59OlPMoiCjr4Kk6CAOHgggOjmL4jXKUsXdh/qVs9mybC+HT9+mdJt62APSQXNpUxogk/sBhzl2Iwwbm5L49OmGdzEJ8sRXHPPzJblsP5qYPuXcnSg8uzdAffAsjx1K4yhLoaJXMZ6fv4+2fjt6tdXJNTaphWNZczD/8sbVS7aYwPInR/B7CF2a/H05X8WO6cdwcYeqXtU/cLOq05dyDq/w27Sft1UHkjf8SkrRoWMHLOKu5NsxUPHs/mkCX1vTsm0HGlU149nduyQA2DvCo1tcu3WU2+vPERn/gjTXkpgChzbvpljjDnTo0IEmpYxYs1i3gkt7cJi1gfHU6tCBBlXcOHThFvIcNdZulahdw5s6Pk3p0KEDLRrWxSnf/GpjC541SmJkXLiyUxiW1hIMDb/8eqJKx460KmUP6jhuJ9nQuoau0aelynG0M8UAwMSErIho1OkytBot2RkKJLa65zRGJmSE6HYfvAcNwruIDShDOR3vSXevguOWy5WYGoKZmREYGqJIzUQRrds1LuXdBavgvfRo7s22iMGMb/I3LWKp5Lx6+YCrp9fRrbOU7jO3E1nIqi8+RkbZUrmDqIUlqfeDdP/LorkbGc69PT/SumNTJqw/Q3LeZrqasKsBrJi3n9efkCy7qrUwDfZj6NAGTF12nSLFS2NrYVB4wH+ZIl37EL1rNEOH9mP1BVtGtMzVAmKDOBkr5+aa3jT/pjurTjwtdPfqxf7JBGlq0qZuaYzzjUgJF5cx44wzvfu0xO1LaqWAtbMzTZtLcTA3RpN5kTdUo7zb35PlWrEiLb0rY2RgQGL6CwztS+FkA0YmxtTMVUqJOUaAUXtalLTMC/dg5WC8vb3x7vszd6N1bncuXMe4Yn06dOhAy9qluH7kLBptwTtx8dFpuDrlyrV3JO3Owzy/tN0/6OL4ZiRngr/cjrSkWDGa+dTB2tQIecZtEk09KZm7B5EUL8MldwAVdvak39OdiEW+SaFsydz+ZmVD4rmrABStXp1WtcoBWqLSopC4FsPG4o8xfsibl0kUL5K7arKTkHzpJgDW5ZsxwNuSZX28Gb30AUN8qv7tPBbp3IvY3T8wdGgfVp6zYljzgldpFhIJTVr54GJpAllneaqqReXcNbabd19KJl/guzberH7Ugjnt3POFTGHfvJUcv/kq74THqUwZWkirY2ZkSFpGEG26mdEAACAASURBVDnW5XDLLbqK3m1QXltDu8benErqz5B6Dn87j58bj1JQptL7hYDQqLh5civxRavSpkMHzOKvc+DmGwD81+/Ao0nuPO0hWL/MHzM7d8pZpXIlw4PaJSWUdLYgIlbQyrs0iTHxvIrPpknbDnRo1wbjqCc8e/RSF28lKWk39jNl5X2KVGlHPbtsNDII2H8M54a6OJpXsGP3+sMFpl+bk8XV0ztILVmDth06YBBznaN3I8DcjQYdOlKtVGWaddDJq5Tb3m//vpsbVND1ae+S3FkfQKQAU2tn6pS0YtO0OSw+paG6ZxVcFZZU8pRzZtVJtFamLJ56EqNq7ZFdP8rT3ANAIyMoW8kBiaP9xxP6L2In+ZsDZX7+mUXTf85b/2WivWtrcTfqE6yzRuwSbSYGiMCLa0SPlkNEUlKmWNtvtgjJ98jh5UPFrnu5drtzZOLMvv+IU8G5FoQViWL3yuXizp1wodWeEfN7zxKzt60S8zp2EXMWjxNzz8QJEX9GdHB2EhKJJO/PwXGCeCCEEOKFWDSsqpBIJKJMyepi4dYbIkets1N91/e0OBD4/DOWzF+jfbJL9CpTTAzcGfGvx/VH1Fmp4sbOBWLr6dsi14SzeHNhn9hw6rrQaIUQ8kixfuEK8fx5vFBmpom9y2eIJ2m6515fWi7+s+pKnixlSpjwXzhLHAiLynWJFbtHdhbu+cpdIukhzmq1IjH4jti2a6dIUAgh1Fni1PYV4kxA/loXQsTEiDVjGosJfhFCiBdiUf2qH9ShRDJC3M6fl5MjxMTD0Xm/VRnxYmGfCqLakDVCptCI+Lh74uiVKyJLKz7Kw41TxfIgme5H8m0xYvB/hBBCZL68Kvo1Ki4azL4ohFCJJ0HnxKXnLwq3P5yVIA7tWScuh2XkOWnir4nFF3XpzAwLFH5nL4u0ggws/xs8PyQGrbv2gZMqZK2Ye133f8yRlWLxM50998Sra4Snh4Po8fsbIUSGCDi1VzyUZYqC8BueW0e2VsLEzEqM3K+z2X5/bWedu52tsLC0FNJfCrdb/jnRqpUiK2yfGN9xsnj0qYHUCnF5/xJxOCjtA2eNUiEynq4RsyasFK/+FEgrQtd3F3NufETm272i7dgAITJeiIW9GglnO7t87bq7OK1Ui0f7JglPiURIrM2FsYWtkEgkov20XSJNIcThqb3ExfhcWaErxJhxB/8cR3yA6DzuyKfm8rOgVSlF5gtf8VPfWeJZPveDvwwU1xJ0/yuDl4sffzoqhBDiysweYuPL3IdiToiWrf6TF0ajVIiUByvEgllbRGSuW3L4btH2gzGgnBi28LRIFUKcGO0jjrwbet5sFd17bv8wcdnZ4u6uZaLjvBNCCLV4dHSeqPuBrHri15NP3vfp0KNi6PorH4hQPV8vZud2m9ijq8WSpzmFl4laJeSvDolxbcaL+3/1QHy82D61k+i39eVf+X4oS5UjMoM3ienfLxahf/VAZKRYOr6jmHsy+q98/zWerxwrhrT6UbxKLmBwzUMtHt9YIOqVlwiJra3o2m2qCHyrEiL2hGhpa/fBGO9W9Kfcfpog5vSeJF4oteKBv79Y6XddqLRCBPlNEOUtrfOFqS5+3n5TyIUQIjNO+O9eL669yjdWJd8UQ2uU+8M8MkzcLDC9ShF4cZaoU1aX3u69ZolH0ao83w1jln/Y/2UhYu7KvSIpTZHndPc/48Xy0NyyCTkgBqz9w8DwaoMYOHCnEK/OiBbTfYXQakTAxgni3OtPKM4vgObiNNGoeCXxn8sJf1vG/3zHtFj3icz/WcPxoIRPDGFEraaj8Tu7BUfHAs5qAAwNMTExQp4sQytAnZNGQmIauqs21Yh7cIcUpSXderkRsO8ulubm4FKRxs2GEfAojNTUVFJTU0lOWk5NIDHMgFbTzpOalMQDv4UE3b5OZta78+Ac5HI1CEHU/UBehiXwb1wFTEyIpcSyW/j2L+BM8bOjJDLkDsc37SDMvS9da9ryIka3K21lryE5IQshQCnPQe3ghJGtNQZGYGSRjSxFV9opSRlYVCgDZBMaeBG/ndewbDuSFibRBMUDuNF33RFicstc9+dHSwMDzCy1ZCuyycnWolVrkBuYYOKuO3p6fuM2URk54C6ha8uSyB4HA+X5+ebjfHJSSU1dj/df5k2HgbEp7lWaMaJNFSxMDDBM1JIWGk2m6uNhJEXUvMndZcpMlmFauSIARtb2lKrehmkdS4DWAOO36USHp6IVABpigh9yzO8G8Z9Q8m8fPcdUHQWAmbmKt2+iyZYXkKgvRKD/GZwcdJeGJfZZXA54BYCZc3E8a3VmentnUBthFhpFSOy79CoJvXIRf/9AUvLJ6rExt45e+NNi5D7W9dQdM9cedUTnHh3EwhWb2DVC+sXyp8iK4/ZRf9acd+Xnowtxef2YxLzr51oSXwVz0u8q0erCermWtMRXXN27iyU36jFqwUAMI96Qlb8Kc8LYf9OLHvmyF3bpEg/e6kopWavBLCYerF2oXK83vmfv5mvX/rQxMaJ6r6UEp6aSGjCDFssekpqayokF/bAzA1v3HJJidHtpcaFRWNWuBkDE3btce6VrhelaLSaxnzoG/3Oy0qO4eWgfKy+VYaLvVOzehJCSe9Bl7ZJDUpwuvfEvY7CsUQUA51Iq3oTkvl8Qm4yNT31AQ3LsCy7t3M7Kh00Z9mMnlJFR5KjBoURfTn0wBoSyaUobJIBLGSUx4boIE1/HYdNQd2wT8+QJgTHpYG6Cp1dRjF+FAkZU7zSDOx/IusXUdlUKPHJ8cCAAJ0ddo7Gzl3PlXMFnJEpFIndPHmRdgC0/nVxO8dcPicvdxH5x5Spv0hTgYkvbZiVIuxeUL2Qm1/yOc+9FXO7cJpClhHPNbzfLrlZj7MpRmIW/RJa7nRp85z7xWUoo7kib+q5khhR+j/ZzUn70Ulq3yeJBYUdSgNCAkUkbjj1MIPXlS8b5ZLLn8B1wq0Sz5t9z/vHLvDqJjVqM7nzVmZHDTdi66g7PIl5Rv2YVjA1AUqkNUxf5Eh6bkBvmEYu+rc9HN9cdSuLtM4ij95/nq/dN1C8gvRoVmNl04czjBFLDwhhWNw3/E+9viGs0WSiVII8I5urRIBTGNjioMgl/d9dWmUWyzBb3T7gC9bUSGf6SRjueMa7x3zy95Cu5Y/pJZIaxbeVBnp5TMW91FkN6luHQ4g3svRNEmp83lWLuc/JZBOFPrqG+Mo7LzvWZuPl7qlarwzG/1YzamYKRmQuqtDjubjtFA68ROFRIxMLGk3JNbSgx/hGlS9gBdvSdUIlNq2ayWaYCd3fKlO/JiP5VCD51k4Nxj1mXJENpaECxGt2wMDcBwLmslv1blnJluzEYF+fbIUPfXzP4jGTIktBov7BikhnG5mljOJJQinrPnnAu+hEW3x5lc68iOFduTZNXZxn5/XAwtaFO24G4OVpibKKhnnc7tq6bwba0FJwrt2HYoKKQdp15A/sR5t6Uqk9usvPlFYrOCKV6AVecbIpWoWGJeJbPGEeGSkOFRr3wKaM7pkh68oDNx/YhS0nA1MiVFmMKtpOc+PQ063wPEfnkBvc06Qy73YC5Pw7C3cmWTt17snXH74wM2Ill0Vp07/ANDqYfl1Wy2RhabjvKsGGBGNkUpXXfEQCYu1ZkZJ8mrNw1g8Mb7XAq2ZB+fTwxMgCQ88B/Ld/PTsS351Fa5coKPTKNJUcjCY94g9mRO+yq3ovN09riVqMWFoeOM8xvM6YmljRo0QuJxT+/EvKpnF49jENXw7kRa86wR3up234EwzpVpVKP3hzbN4th0WnY2rgx7TtdBdpUbMXigcEsmT0YrWERSpZpxdDi70bZRE4tmMLE87W406M2+Q8QU1/dZOualTw9L/j9tpTBuceLQmg5uWEK+47EE2XhyZIBtb5IvqPu7mL6PD+cPSsTem8H2Rotw+duz71jqiTk3DbGjAxiacZxulnrrqu8PrOIhf6hxIY/I0fyhJM1urJ5WgvuH17FL5ue4ln9Fj9fTkFbogGzf57Eu1sgsmfXiGrY5oNr40p5OL+v8GN9hhoTWzMaTZoKSGjYvio7dq3j0OYssLPDrUJbRg9phpvhx6931Ok0hc2bf2XY2hhMi9Rl5A+6m82q7Gj8NmxnR5oKYysTqg0f+6+U5Z8RhF3ZyrRFZylWuQLTbq1HaeHE2Jn/wcEdvNqNY8vWBQxbFYt58fqMHKUbST27/0aVdZsYdjQYY/uy/PB9b1Clc23XEhb4vaVGjftMDoiDyt34bdJ3uBQwu9UcuIH7a5cxbHs4Jq41GDW6EgDq+HhOndjLhtexGBkYUq3T94XmJmDNMA5cjeBajCnDHu6jTtsRfN+lGp7de3F032yGRaVia+3K5O8KvseZ+Hg/M2Zuw7ZiVZ4/2EdWZgoDFxykjTVkvghhf8ARUhMTMDG0p/MHi7THLO41EtfFW1nxkxsmWiVPTq1n6orblK1alinXM1E7V2bqtJnYmkFM4E02++8gMz0Rc6vStBr1968r/NtoVGoOLFxNVClrhEyBws6Rfv0qAfYMmFyJTf+ZwQaZGooUoULFXgzrUwk7wLnpWMr7T+NZld50KqG7H+9avDpOlpuYPuEMOVoDrDzr0619JxqUS2Tr6Hn4RYZjcfQ2vrYm9Ji6mVal3ek4uDKbN8xhZ5oKnJ3xKN+VUYO8ct85+TMquYIDi1cRXcwSkZlDjr0rA/tXzPO3tXvGoqHDyBGG1K09GC+LonRuVo5jx9ew4cFL7CyKUMKrFQPdDYgNPsWmWeu5FWPJsIeuuFSsz5AhLQlceJBbjyUceNAenhxm0flWlIp4yrVT56gzpCWSL3zt6Y+kJEZCqX8mw0AIUdDLwl+ElBsz6T4jnOkb19K8vM1fP6TNITk+iSyVFlMLWxztzUiLTyJbA5Y2tpio5aRn53+bxRIXDyfMtRqyZMmkZCgwMLLA0tyI7Bwo6u6ALDkWAwtHbCwFqdEyLNycMTcCUJORlESqXAkmJpiZ2ePkYI46Q45cmUlGlgKMTLCVOGJnpbtfqVUrSEtKJlOpwdTaHieJzQf35T4HScFnGT9nEQ0X7mVE6S93WR1tDinxyWSq3r9BaeVYFEcrnYKkyc4gJjEVA2Mz7J2csTLVZVyrUpKSnIxcqcLKsQiOVsagySY+OvGDt91tXTwK7UzaHDnxSSmoBdg6uWOnqyi0OQqS01LIzlFjZu2Ck4M5BaltaoWMpOQ0lO/uPRpb4O7iiImxIWg1ZKYnkZqZg5GlBBd720LrUJ2ZSkxKBkbmNjg7SjA1ylUQNCrSUxNIzxZY2NjjYGeVq5hqyU5PJSVdi6OHc94LPTnpMcSn53tD1UyCh6stoEUuSyUpLQtDYzMcHZ2wMPtyiqksMZK0d/djDQywsnXC0c4CUJOWlIRMrsTEwg5353wvR6lzSE6KJ0tjnNtHzHR3kFGTkZBEqsIUNw8H8uv8mpwskpOTUah531ZySU+MJD0bTG2dcZMUcnnwM6GSp5KYlMG7GjE2s8DR0RkzYwBBTmYaySkqJMWdsTTQ5S5HFk98Wr6WbWqHh6sNclkKKenyvBMUUys7nOzt8tqWRiEjQ1j9YcGhJjUxkYxsFSaWNjg72efuImhQpKWQIMsGIyNMzG1xcrTB5F2wHBmJKkucrd+Xn9BqSE9OQpadg5m9O642JnlxpCcnkZ6lxNjcCicnB0wLUHA/JzmZKSSlZPKuG5qYW+Po6ICpEQiNmrSUJDKylZjZF8E13wsyOenJxKdnYWJlj5uDDQZoyEpLITUjO698zWwccJJYY1RQVoQgMyWRlCwFprYuuL0bgDQaMmTJpGYoMDK1wsHJHotCBoE/9hFLWyec/qKPuDnbUVCS1NlpJCTK8tqckak5jk4umBuDUClJSU0iS6HG1MoRJ0erfLtKChIjkzGSOCKxNccQgUKWQnJaVl75mlra4uggwcQQ1Ao5KampKFQaLGxdcJAUPGZ+doSGKxtH8OvdCmxbMY4idiYff1QIZInJyDU5qFQajCxscXGQYPJunk5MJDVbBSYmmJvb42j/Pi8KWSJyIwkOVu/kC9TZGSSmyFBptBhaWCOxtcPKTE1yZDz5v8cjcfPA1hRAgzw5kaQsJRgbY2omwcnR8qM7ekIrkCUnI1fr0mtsaYezgx0muU0oW5ZISlo2GlNLXJycMDfWxZGZlkKKLBsjI3NsnR2wMTVGpZCRnJDGO63GxNwKR0db5HHxyIQhtrY2KOUyhJUrVqpEsrDGyd6m4Hb/LxN69Bd6rH/G4qOHaPMP3r36KhRTPXr06NGjR48ePXr+53dM9ejRo0ePHj169OgBvWKqR48ePXr06NGj5ytBr5jq0aNHjx49evTo+SrQK6Z69OjRo0ePHj16vgr0iqkePXr06NGjR4+erwK9YqpHjx49evTo0aPnq+CrUEzTbs2mccNenH2ekc81krWdvDGqvyz390uW+1TB1NqFZv0Wc+3YMiqWcsXRoyobbyb/rXi1ag05OSr+6ntZbx9tpL5Hcy7cj/xbsv8NEp+eotc3TdgU/ik2gz4vOZmX+K6JPU6O5WjbdxPRKblfV9OqeHV4Pe3buVCqzg/svJOQa+FIkPrsJjOGeOPu3pzhu0Lzvh2qUTxi9bieVHFyQtpnIk8UhRhTFxqiLx/gu57lcC/Rg0Vn3vLO4I7Qaol/fovRQ7xwcnKm44yTFGRPJC0tnBt+C2jTwppJR2LyxaEi/Mpm2tUqh5OTEyMXXnz/rdOPoVbweN0UfHxKUK3rUu5H6qzSaFSx7Fz6DSWLOlGiVG92nH6f3gKzqZVxcc1oyrWfQ1bOu8JScmHBCOztnShXqy3brr1F9f+XD7ypFQQuH4dUWoaafdfxPF7xv07R/y3U2VxfPIK6dSvgNWQbUWnqwsN8JrTqOPas6EnpYo4U9+jBthOReX1EHh3KijEtKFWqIR3XPEHxLlkqOZcWDqNOHU+8R+wiIVPXR4Q6jiv75tPayYky1eqx9nwgOYX0Ea08ld1Tv6FSpdo0nXOZ/MbUNIosjm2eTNWqTjg1msabQvISHOjPnB8a0mjWoQ/jyHnGxgE+ODk54d1lNunZBQ8CSmUWDy9tYVT/CkiXP//ATy1LYPtPnalY0YvmC66TXVhVZYQwr6cPro6OODmV47vZx/NZWxOoFEHMq1sRj58uFiLoX0BouLZxGM36LyQ6Lb+xmCdMdLSi/rB9nyxKkZXNXw3TORlyPocZmrv/aYmTY2tOxv2V7yPGWJrQ7IcDnyGm/xu8OPQzFVv24Nw/LPyvQjENv32DxtNW0qpi/o/re1C0nBNI3rmVZeLKoTSfdQ7/Xzsjs27Gw9CzjPIZRF+pI2SncO/8Pvbu3cuxs1eJl7/70LWK2NePOOC/H/9D/py7fofk5CzIeMHORSuY9ONstu/di/+hI7xJex+7mWVdnMqYgvHXYxzLuUo7fu1Xl9AH8sIf/swE7gmj2ZrnJEU/Ya7XW367qCusrODz7JJX4NiJBN5cmIBx9C3Ck1VoczK5ee86LWZcJjb2AjPdD7HvngyAxEtHsO23kKdJSSzpkMLP2yMKjDsnJpgTb5XM3hRC7MttSDXnufVa90VrWfg9Ll0NZ+SUiyQlJXJ8fnvsCpAlkZSkQc/pnJw44AN3dVYqD59EMufAE5KSkuhls4NDwTkfkaIj9coGljt+z9WrETxeWYMT10IASHqVjnHpkTx+HU/wiakk39rL4zxrjxpinj7gyN5r/HGsC710gBeKIjSs75nXMZUhR1mbVp/nz5MIu7mNcilxKGT/e5OkX4Lks0tYVmwqN2++4uH8YmwJePm/TtL/KRKPzfl/7J13dJTF14Cf9N7bpgEJCZAQem8CoXdBQUBUiiACgiA2FEGKAiogKgJKL6FJEem9kwSSkN577z2b3c3O98cGkggERER+fvuck3OyU+6dmfedmTtl97K92RL8/KLw/9iQZYcTn5vuvIQSNBu8TUBsFtFnFlN0axeB1evt0NO/YD/tMAkJ1zjcajffn1eZVDlHPudgi6+4fTsC3/fhk/0pAJQlRhFh2oXTubncOPwNUSH+ZBfV30eS98whc+ivhIff4eKQW3xyqLqDVqRxevX3KJpO4+bNXHKvfvVYJzae7UazaM5HNLO3rhOetPNz0kccIjc3l8OTynj3aP0uOHV1jWjT+23Wvz8LrT85OkjY/yklo7YTGenP+X4XWXg0p1ZsCZd9juIbkVHXGOs+g/CEdHJzY9i6eNh9T2uVRRn88csFPBe+Xe3C8/kilEoyy3WYMf9dHM1r/7h+Cxq31QYTo9qJKYjy5cQRH3x8ThEcX/OcLhzYz6zhU/jBxwcfHx/uZAKKEiJunGVu39dZWh1+KSRVtVkiqyDt7iUOH/Rh3/4LxKYX3FejkOZw+9wxfHx88DkbQYDvbfJk0PH9s3zWFhTFWVw/cxgfHx+O3UiodhDTGrf2GmBs+I+32f8KTUetZFffZC5d/3tyXgjD9FFYWEPjjq1rAqxs4HYAIVd3sWbRdpLi75Bn54kJEHD2DKmVFUilUirzkzly6DwA0oxQ9p78nciiUkoLM9iz34eQuFwQCuSVlcjlMqRSKVJpJVW1Vtk6OtCgmR2Gpo/wRPUvYWJui5bWoz1l/FN0nTaNN7zsgEKSNM3o6qHy25OTXYKDtT4aGoCuLkVJ6cgLi6lSKCktKMPGSuWpR65rSEGIynCTDFrMMNssvpk3mZ13GjG3d/0+dUuKpehrgaGBNmhqUlZUTnmKarczL+w4/jExbFk7hylf7SChoF5Rj0RTzwBTiSFHtnzE8uWbCSvzwP0xzrWS4vJo07y67MYmZN0KBMCuWTPGjeqLqZ4WlZoJCOuGSO5by3ICftvOu+O/JbiWrNyr69l8VsaA0cOQ1PKCJRBoaWqhoSEoKopkr88e/Ipqnyz8d4mLyqFjG4nqg4kZGZdv/bsF+o8RHZ5Juxa2qg9m5qSdufzcdNu4uzP2lf6Y62sj04hDYdUI++o+kpaUh7ODatwVNnbk3roDQERoRk1/M7Mg9YRqjDd268n0wW04uWwyn32zn6YNWmJpWL8vo7CgNJq4qtwaY21Lxtkrqv8Tz7M5zZbUs18ze9ESTofkPFrI4+r4Uj/yrvzA8uUL2ednQN/mTy2KqNB03BpV+7C1sSPz/LVasZl8M34mm44FU1E7U+Rp5s6YxuTp7/HTsduUVh9y3fl9G3n23Rjk+Ry9Bz4hEgdw9HSvFSKQluVSWCBFKpVxa9eH3EoDhBKZVIq8SkGlVIpUKq3ecRco5DLkSgWy6nDZ/eMqGcWFBZSWSCkvKeLi4R+Jrt5G9t+7jmuJuSpbIOUuO7/YSlxpTSkKM+LY/OMmroTnI5NX3T9ltXcEh2Zu/3Sz/E9hbdvob8v417cD0w//wJI1Wnx47UHjpOvsHVwXtfa/HJ1pnOdHmrYOzRxkXDjuS7HXx1AUwv6fvmVbWKaqQkoFJaV9aD5hMN1sLDEu8GXtr0HoaJsy4s0vaNrUCUy16DdUA4P4NIaP68efzU/zBl58vXItBkbGvEhY20hInuXNtIrzbBrr/HyVKyu5e3wn2U7tecPjEfuSFVKoUvDAq1VVBeU1R7Fmjq2Z9PZcDu78lh1+BfRrWs7+uXP47MC1WoOrNztSttPyzzpkMtUfEHnzFIcCW7BhxQKaNyjm2o2TWA5xZ0ufCXwXlVor06scTl1Lh0dUTVNDA/2GLenjMZEWtvpEHt2EQucv+lQrKa37OXU/a1eGMOzHz7G/70lTj77zlhD4tgKLWkkjz//Aj+tz2bNDk+JyBSEGXvwx0xO9ZsP5vNlcWrb8BMsGjfC07kS+9hPcC/gvUvz/wyD/1ygqfv46Uw/w7dJAhv68CMeHbTwJoPQRJ0SFtctrRo9pS7A4f5otkVEU9e1AZdZB3u4yD7/7aawZOfcbln3Q70FZ1XXPSojmvM96LFedYelQUy5dOUtSi9coOfEd701bR8z9DE14f8uPzOvv+cjdHWMDQ8z7z2RaJ8g9t4/Lhqb1NsVfok5fcGF76m00zSxq5jFjd95ftoqSChlCXsipKwFEJ7rS1t2Cq4eWs+raOhZryyjWsOX7wVeZ06v+zYFnSeymBZw/Z8j8Nx9sj6HrIumja1srRJCXco5Naw8Qmwet2ulh9Ap0dnRm4Btvkngtkz6TJlFjyprSoucQujS8QeNJk+hZW7iynOSQfXy77hoFUiXtB3aj2XBoYnmTs2cc+XDHWyr3s4pKioYNxKB6HSAvv8y6n1YwctZq5vRqioluzRMf/nMi/fVePAP/38S5oSs3pnVg/ZaTzOhu/fgMD+Ff3zF1GPkeX8yt4mTogytTHSOrOj6f0XJH484drsSkMezlhhz/zR9dAwMws8St9VtcD4wgNTWV1PRMiop30x2QSa0YNn0XCQmphB3ZgWF+GOEx9+4WVqGoqkIIqMhOJzO14L6/ZQ0tHUxNzdH5Nx3PPoTcnEwafH3hORulVRTlpHJp7decEsMYP8CLsjLVzR5d/WIyMosRAqrkVShtbdAwMkJDQ4lMmUlRoapFKyqr0HFRlTkvPp5ChQ7Wnp68Oa4NqYfOA3aMWbOXmNRU1TNMTSU1dQfeGhpo61RQWJxHpVQglAK5gSFaNlYq/TZNeG3Iy/Rq44qjqRvKwOskF7sx9/ytWnJSSa3HKAWoLC0n1S8Aeyc7bGwssDApICS8/rvL+qbZxEapjG1ZeSVazVTDo0xaRMSxXczaasa0zYtoKi+puScHyCvKKSwoq3Ps1n1xBOXFOaRGnGXm5z9z4O2mqghtfTwn/UxmZirBl7fzsncrvLVqban+hzEwyyQqXLUAqSyTotPS418u0X8LQ/N0YqNU7SstqUC33QNLwH8MmbSYiON7mL3NhHd2LMFDUXy/j2jqpZGTpRpfSvNL0PFQ7UgZWaQSF32vvOXoVZ+mVRQUkJFfv3Ep2AAAIABJREFUjrGtE+0HtMepNBtFSTmWzmM4VGcMCOKHD/phBhhZJJKarFJYVlCKXnXdNQ3NsfSawtfjW+Fo0whJpC+XUrTwGvwRF+vIusD8eoxSgOu/HqVhMwtsbGxxd1Fw6FhMPanrR98smfTU6vLml6DbxqtWrJLSgiLKpTXfl6gsk1JYqYGdvQP2zg6YKirRLikDDQ0+PlxGXk4mqb7f03PC+udqlAK4TfuKPn3LCUp5cCGkZ2aPuUHNbres6Ahb1mnx8/EIEqJCmNOl7higVMqoqgJ5US4J4RnUDLMyZHLVfeGM2HQqlYJov8Ncv9uNs/5xRAXeYoxXw+q02ig1ikmtVM1VMqWcMmkBldXCtLSM6GDriVZePBWadS8v65s71CmvGkhJiqfrJv+nNkrhBdgx/WvY49ktEL+qxXTuZYbP+5tp6WEPwIChlqz54VuczM3A1BQbpy4MH9ic9Ou32XrmDDZONlAlpdKpAU4S1W0bA3MFmcFnWJ8RTlFcIk06vMH4KR34i/tkz5WKsiKUysd9K+dZK43n5/lTOVnWjRGcYN3882T0+ZWfR9vj0GYQHVP9WLd2DQq5AiPXLthYG6OtK6frSyM58dsmbolyKuVGDJ7oCkDY7t2cMzPDXFFEaVIELSd9Wa968wYt6OxSxG9bfkRRJUPTvDGjGqtW1Z3HfUDsxp/45rtwDA2MkLi8hls9GxNFif78fuYq2beDuaPYxOq8trw1uj8WBvrYOepwZOs6TiqVGFZZ0r1j/QZgs8FzaL/zPKtXp1FZLqNDj/EglERc3MjnP/jToWdH9q68SXqJjAlzvqKtBKCMyz8vZuriTLaLo/SvJU9RUciVIzvxu5LNgW69eLOLLRRmcPTICVILS3C2Nse+XXuMLF+sXfx/ihavfE7bLb+xenUG0tJK+vZ/+98u0n+KNq9/jf+2A6yOyKKiRMqrI2c/J82C6Ku/sOD7G7R7qTN7V/mRUVDK2PdX0cEeur7yIftPbGH1qRKK87QY/K7qDLzdW6u5vW0/q8OyKS+W8vrYYQBkh4Sw784dtIVAUZpIrm1b9MwN6isA3WduJsJnJ6uvF1CSX8brk9oDYNNrGjsGvcOy75bRwNSSKu2BTH7MHsDto6u54htGSIwBq6VBNO0wjCHdXPAY3JOTJzewWi5HuzSXqS9Z1CtHXpbH5WPbCfa7Rlp8Oqt1mtDDexAdPCR0n/oj0Qd2svpKASV55Yyd0rZWzrvMbDESu5WbWfPRAEyBwrQEth/8DV19EzSVlaTrWeDpZHk/R370ZQ4fPEVSsATfxM50avRi3pPUKLfAxL2Ywzt+wcREg7yoJMptbzOkSXvMdcDILIpdX69GKz8ZaUVPPvt5JKaAc5siji1Zjb9mIflpEj5Y/w76Bhag78e2jT9hoCcn7m4YjZvG0cmxA/0HbWHjmp9wMKwiV6cYI6kBoyZ/jFncHm4WtGfMa/24tGoh82OCGPvqewz2fIa73/8xSoqyH5/oMWgIIf717/hmnv2Aqb/qsHDVF3RsWH8HyQg9S7Z+a1q56RN1KQqTTu1xMACoJDcsiNspBWBggImlG21aOCJyi0hNjSU5J48qtLBzbU7zRhJ0taBKVkpi2F3is0rQtHGho1dTTF5gq7Qw/iZLVyylwexfmePl8PwUywsI9QsmtaTmkN2hZS9aOqgMt8rsZC4FRqBlYIZnq3Y4mKnuwCrKiggNDiazqAyHlj1p6VA9WZSXEx4RQHJOKSZ2nrRp04DHDYuygiz87oZRroDGrbvR2Lr6QSkV5KZEEhqbSqWxM51bN8esnmdYnhtPYGg0JfduFRjY0b2jF8YG2pQWphEcHE1xuQynJp3xcjV/bNOUJ0dyJTwRfesGtPNqhom+BgUpYQSFpXLvq1PGNs609GqOqR6AnJzYCEJjFbQY2Jbaa8oqWTlRgVdILgDzJt3o7GoC5YWEBdwltawSxwYeuLk7o/8/tpz8O5QlhnE1MgUDu8Z09GqMgc6/fsjzn6IoLoSbMWkY2jeli1ej53ZCVJgaRmBoyv0+YmTtRMsWXpjpgVJWQXRIEIk5RVh6vFRnTsiPDcYvNh0jRw+6Nm+g+pKQXE5mciRBMWnoGJjTpEUrHC0N6j8OFEqSwwIIT83FtHEHurpb1cSV5xIQeJtsuRnNvFrRyLr+0Skh4BRR9+ZiDS0krq1p7W4DVBAdFEh8ZjHG1m50a+emuov/CKoqS4kMvEbKvS/hahvRxLMlrg5mCGUVSaEBRKbnYebWiS5utY3cXO6cCkWvqRfNXKyrd5sU5KbFERSehNDUwdWrNY3sLLi3t1eWGcntsEQqhW7d8fR5oFRwfsMMNid24fsv3qh7KvpnhJLksOuEp5Zhat+YhoZ5pJTb0dLLBUMtyEkMICwyG6mJLe3btOXeo6rIjyHQL45iPWMaN2uFm70JorKEyJA7JOdKsWzQFIuqLMoMXfFytUXICwgNDCGroBzMzWnt0RqJmT6F8Tfxj9fBo5UTmZFB5JaBfYuetHKsf+Hz/5WkSz/x7rrjTPn1BK9YPj79o3ghDFMQKJWgoanBi3Vw/qIhEEKAhqa6ndSoUaNGzf8mQqBEdbdfzX8IIVAK0NT8e8/1BTFM1ahRo0aNGjVq1Px/R30upkaNGjVq1KhRo+aFQG2YqlGjRo0aNWrUqHkhUBumatSoUaNGjRo1al4I1IapGjVq1KhRo0aNmhcCtWGqRo0aNWrUqFGj5oXghTBMS4LWMrTvBM5G1XazlsLm1wdiP+Tn6s9xrO3XGYnEiX5vfsO1Y2vwcnfGpWVXfr1Zv4eepyEtdAuDW7/K1btpz1z205ITepIJbwxnT0buv6DdnzkDJUgknox8Zw+FpTU+NjJPbmHEMAfcu8zlQGDh/fDS2CCWvtsNZ+f+zNif+id5BRxfNhXPKVueSHv+rT94Z7wHzm7jWH2xrpewwqS7fDCjKxKJPS9/cYKieiUlsXFBHyQSe9r1+IirITWpS6L8+WJaZ5ycBvL+occ/9+zsUC5t/pShE7zZ5V/wkBQ3edetBR/+FvkENUzh0NfT6SSR0O2194mU1bTv7R/nI5FI8Og4nJ230mp5N/nniQ3+gT6tJUgk3izenlQrJpn9S6fSQSKhx+sfElf94x75+bFc27OEoaM8+O7Ck/3QcnH+b4zqIkEi6cJ7a4LrxJ2bPwSJREKHofO5kVX2rKr1n+OHNyS0m/AlsbmVBK0diEQiQTJqEZlFlQ9NH3t8GZ09Jby+I4nSmEtMHtgciURC7+98n1OJ8/j9l4k0bSTBtckE9l+u6dOVOalsmD8Id/eevPxrQp1cd9bOoHNnL7rO/o0yWV3XvHLpKcZ2GMLWG38eax5EKGQc+fI1WrToRL+v/R6IP7/zM9q2lSDp9TmJj5GVELaefm0kSCS9Wbi1buqb302jQ4eWdP/gGApl/T+AI5OVEXRpC+9NbsfQDXW9RMnLiln6alckEgkDZv7G42pYWpqJ37E1jHnFhVkHH0ydF3OTaRNbIXF2Z/Kai5Q+RMY/hqjCb+c8hk75hrSi2v7vQvjc3YUhHxz5R9Xf/mEIY/70nF5kfFfPUvVnSXNeWXKRUtlTCEm6yKt9WmPv4Mjik5lPmElJxNlv6dVhMrGphY9PDkQd/pTWo97hxlMUsQ7iBSBwdV+x8HjGA+GH5w0Wmr1/qAnwWyUGrg0XZQXZIiI2TcgU4eKz178S+UIIISsTKTFBIigoSIRHx4sSmbw6U5UozksTIcF3RXBosIhJSBZlZZVCSLPFhZ2HxFcrNogbQUEiOCRM5FXUqMqKChBDe/QT5+6k/JNV/8tE7n9fzDsY99z1nli0SKy6mSJEWZm4snSBmLU/SwghRGXUabFg6xkhr1IKkR8t9h89JhLyFUIpLREnd34jzkSVCiGESD29TOwOkN6XF35ul1i/6mMx7ONDj9UtzwgV67fvFvF5lUJUFotrx7eI6wkyIYQQpSmhYs+PG8WtoIInqkfosWPim30XhRBCJB8/Ir74aq9ILxFCWZYnju5cKy7FlQkhhIg/tUIcuCutR1INYYe+EJuu59YJqyiIFOunzhQ/Hf1BrNwVUiumShRlporQoARRXCs07fAH4oPDt4UQQtz5/RPx0mpVHkXEIdF/6g8iOVkIUZYh/E+HidISxROV61mw6ZNF4lpKkRAZGWLDyIHi1yBVeOrB2eLTYwFCCCH8D80VXVdH1cmXf+x9sfjkg336YWx7Z4Y4Ep0rRG6u2DV6gFh6TRUuu7ZC2IzaJbKyhBD54eLE/qRnVa3/HLmRd8TnY0aK1dfChVBUiDM7Vos//ggVQgghy08XMeFBIigoUqRkF93Pc23pW+Ll0XPF5bxyITJPiaGDVj+38qYGBYm1P/uInDKZKA0KEF/PWy780lVxgbs/Edv8Vf1Zfu59sfpyuRBCiNLjH4s396aqEoVsEdP3Zd2XV5Z9W6x49S2xZMcmcfBi4mP1Z/tMEUvOZqs+3PhSzD9WovpfViRufrtAbDh6VxQWPlldfvloobiSXChERobYOKKf2BioCi/5fa6YeqC6UkEbxeS9+U8m0H+d6L4msk5Qus8U8frSq6K0VAiRel6cOFJbllTEB4WJ5Kxi8cDIcH6+eGNH3X5TEOUntq3fJoLCy56sPM8YpUIm9q9+VxwIfHDM/rGvqeg882Dt1KK8IENEhqnm9oSMPCG/H1cpUiMjRVBQmEjIzhXJd++KuMQ0kRgTKhLzKkWVXCpSY4JERHKuUCqFEAqpyEiKEkFBQSIup/K+lLyEcBEaGitSE2JESFCQCIpOFgUyhSjMSBShkQkiOfquiI1NEalxEeJuVJIoFUIIRaXISYkWd4OCREhYhMguLhNKIURZZrQIjYgQMRER4m5QkAhPyhRSIYSQFYqYu0Hi83HzxR9BqrqkldTfTvKKYpFwa4sY2n+cOB4UJIJCo0V+sWpOkuWliej7fVo1k8hLckREWLBILxFCVponYiOCRHRm3Wccsbq7mHc4rUZHaYY4tm6bWLlxt7gdFCRCI6JFYa1pL+7aMdHjpdEiIukJ310hxI0lLcWCi0+c/KG80D5kTMzAoVPrmgA7BwgI5I51DAs2FrJ1e3tKLZpjAcRcO8vl8OtEJ4G5tR3Onp14Y2h3ZHnR+BzYg398BVZaMuLzq3hvyof0cEni4qljBBSVkpUXh5GBCSOne2Kp8nCKtjbYutmhZ2byr9T9UVhYOaJdovvc9Q5avJhBALJ8KiVmtHRRvTrpqYU0sndS/VCyvj55SelUNi9CoatFUU4JXhIjAGSGpuQEhUKbdhTc8eHYrRJGjB6K786cRyutprCgHENtMDbSBS0FxSVSNJNToZEL2aGHiSmwoejyL1wNa82E4f2Q1OOxs/nQoagcHAqqLBVIGllgoAOV5QrKC8poaqNyHVKpa0huSAS0bP1oYY9AXpjK8e2HMZu8mF7ae9kVVTtWxpUNq5i6OLGOS1KHl79leWkSv//yDUHpmozuqfJEUymVYt/ICRMTQVllMocPHKPKYx6djOt3b/ismPr1YtU/xalUNnSjSbVbbcdXvmdhYTyHN31DSIY+43o/fXne2vCT6p+yBMqcXWnuqPpYXlaKu1czDA3l5BVEsXndHZqPXkqDp6/Ofxr3Tu5EHD1CkMfcOuGlMZc5fCyAnEpbbPQi6T3jV9pXj3Pdx3Ti7r7jNB/yfMc5x1atmNOqlap8ZsWYNJJgpRoqSIjKwm2AyuuacGxI+iFfeKkXd3yT6DGx+uWwsiXu6GkY8wbSjFB2bvidpkt/xSphK0+yT+93LYHWn1W/zPZOJO48D0NHQOIfrItvxmir02zae5fe/YfR3qV+D3Bvr1yi+qckHWlDN7xU3pK5fSOBbtOrG9rGjtjlx+G1CU/aRHWoqCjF2dURHZ0ykvP82fJTGB1HvIdqlEjmvdb967gkfTSCxLDz5BSbcfX0T1wN78hrA3tiY/RUxXrmWFiBdfOm9z8rFVXcOLqdW0l5FJWCi2cb2nfsSgfPhgTu38yZ8HLyyguxsNXkj598mbhkFhohG/Bvs54fhhnhd3AFW8qGcmDRePTlpQRfO8khny3EDTzE2ZmNAYi9coQvVuzBa9AQdKuUKNzcaWHfFFfNW8xfdJ2eI5uQG1CMgZ0BOXnpDP1hP/3Lwrl0+RC3Y6XoGRjh0qITL/d/idKgI3yyZj96tt1wsdUlvbCCCYtWMcgshTO7d+MXdYes3RqYAy9Na4WD26PborI4k6vnzxKflMml3bvByImxY8di0dSW4uhLHD4eRG6lLbZ6UXjP/IWm5ZHsWjIL+bQgFjSO5+wvn+Nj9xWXP2r7SB3S7GAuXzpDlJYWWbFBmFo78eokd8yqu4auLtg1c0LboH733LWxd2r2xGkfxb9umGZf8GHjTk1G7n1wYuswaRmHlE1qAmwlOKcHka5ZRXMrGdfO+JLrNRNKY/BZ/yNnCsFQQwNkZcRviMJraHda6Gsiy48k+m4+xlr6eHR+BadGdmDTkCnvWdM0Po3h4/rx52HZ1MGNBQsWYOP4YvklN7ewInP5VJbqbWPhQLvnq1wpJ/rSASL0vBjb0uzhaUrKQCGH+87vqlEooFh1YBS8ZxY//uHGubNKwpLlfNapM8uH6nLmm1X8cDaQmsPHjiw7vQzXP+uokKr+gHi/c/hcb8gHk0fTykWDm37X6eftzOFpn7EzMatWpr6sOfNRtVEKypRD/H42ja7TJmGqB7LyP+mQK1R1eQqKUoP57fCvpB4+y0ZpOtKG6QzotbDajZ0und+Ywb6uFffLcg8tHRMaNXAnJv4ysdmq+hk26cuYK8sYOvQnLCSG6JQ0pKVGFZ2eqmRPSXEoe77dh9GbH9OtlidcbT1TXBq4ERt3iZichx8ZPzHlSZzashf5iNkMaqQKMus0lbfPz2HIkGKsGjqgkJkQB2rD9FHYNmdS+yKWLD7G8A5wz9ao0s0lITqI2AKw4Rzaw2oMU0OvoTS4vp7Ld8xQPlLwP0jWWTavvYrHnDk0fJhFJQQUPOJyTpbqSlNW6Em2/34A4xs3KMhLx6qn4KX2k9ErvcDiN78l9H4Gc7wnzGPWm50flJWjug6WnxDDxZN70XNeyPhutoTduYyDy1DKr+1kxZI9JN/P0JAJX37KhC6uqvtwxeHsXbMPg7c+rdNH6pD5+EX4o3DsOx/txbMZ+Gsxds3bYWBgRg5UG6aOLD3jg56752NdOwNE3zrBjkgvPp04DAtJJf53b9Ora/snyvssSP7tB3xvGfDWuAfn1gFfHqG1WY21Jk86yHcrtiF1dkYb8LtyndtROrh9mMGqDamsObEcib6cIv9NHDo5lKlvDCX7fDjRZdroGlsxcvx0fE9XD+4GVvQfPwcPzVAm17r91/HNT+l74CIukz7iZQ9LtLTK+ePbL1AMGImnSwkz533KpU3LyfeYyDtxH3IwugTzoK1sOOiPtrExVMk5djAEw6ZejO45jQmRaej2WsyIluYEbX2fq/GlDOrpxYyVq9CavYZ+q+Y+OKc9BCNbd96Y9i5n795m1aq6i02FjqpPxxWArcZ5dEf8Qtv23Zk62Iv1gFnD9kx/czRHL9dv4hm79GfiJCNC9XUZ1bcDOn+Kt/XozLKPPHAyf3KXtXb2TgQtGc9+s/WMafN4t94P4183TG29x/HOG1s4FFtA/yaSOnGmzm3oUDtA3x2Nazu48JKCQcM82LTrBJaT9MFYYO48miv7pj7oCsuoCTMX7GfWAqi8c4NFvx4jJjELF9uGfyqJQAiN+76MtfVNaOzm8ayr+7cpLMhDMvuX52+UIghaPY/tZlP4cmrrWoZ8JqkZRghVEpDYgIEBIKe4NIaiYsAU0NMFB9VWQs/v8kj+Dsi9xsTvc1g+VDVL9v9wJf0/fFBzLoXk5KVTKUP1xpqbqf6AsipDhg9/m7df64EQSn5bOZ/otqt5Y9NO3nhETVIPrmHcBQ/2rZ9NzRwio6gkTmU7mwAG+qq6PAXWXoPZc2kwAOm3f2RXVK9avpU1sXZtQg8X6rqVFQItPUtaDniZli008X79CIyZC4Y2DJ79PYNnA2Sye9VJ+mj9efj45yhPjmTthgt0nP4hfRvUWr4JgY6BNa0HjqR1C0G3MQfglbmPFlQrnwA0arkiVJQWsvPbXWgNnsT0jvY1SxqzBkxaeZhJAETw5YSL9H5mNftvYtbpPT6+05tlAcN5sy/ARZa8fJnXTu6mp4cNMWu780et9Bq6RrzUrRVbTx6nRNrouZY159J+ZhyCVeuW4FIrXFoZorITrQANDWjkpCorQcQlwr3EGs1VmxYN+33IjcAPQSi4emor2Qb9Vf7Xjfuz+kx/HoYQvqRmANUGOk1Vu2eVlVKKnSaz9ZPxANxcOY3DcSOY2X0iv56Z+FBZFWkxrFt/htZvz2WsS+0FewDxSUBDAAFeTR+a/0nQc27P0s3Hqgt/gS/fSKNmX8qQ1n27g8aTufQu07DmrbFTGDeyHZVFuRzevoHkFu1p9pw2zRu88h6d0uYQlVlKC0ldw8Wqae9qY1uFhqMpw0as5N0Vw+sKyThGDtZI9AF0MJNYYcpDvnvxhI4ttXQssLC1REsLwBBDkwrKKwBjS5wNQddCD2MLA4yMAB0NDJ068f2379Oiq0sdOVXSIgyNzbCyMkdTAywsH23uCyHqjINPznmWj7nB+BN76NHUmug13ThVW24t+X8ZIQCN+5OTrrE1TY2t/5KIrIxUWn+xjzFt/rr6e/zrhulfowGePe4SXDWf7r0N2ffJBlp6qAzMgT2lTPzqJ17v4A4GBphYNKZNC0cST59n6xV/undvjaaiGAN3R+xtVLuzOoYVpEf7c/a4kuzzv1NhPYJ3FvR/bivHp0FWWYEQz3lvQ57Mjx9M54IYwztDszj59WSuNf2KH0ZJaNRxCF7Z0Zw9fRppQQ5yLWssrEzRMZDRre84gq6focRcEHMrhzaTawx9eVke4bf9SI8vIiBlIG2dDR6p3tq1FW0by7h98QzBGlLiUjTo10NlUvZ8ewExG7ez83ABtqKAfMNXGPioRZqyjEt7V7D+jDafj9Pg9o613Cm2ZPrEN7E3taLLSy8Tfu0M+aaCGP8C2k5s8ghBKkpS7+IbkUlCYBxhFhc5LZozoFtNHQtir3L5VgSJJQ3IL/fA0lALKOePL+czdXFanaP8MwsXcqVZe3rYKMm45YMY8b4qoryQy4HBVJZVYCDLxqRJUwwsH7Fb/awpv8lH73+Jfe+pVEXcZNO3S9Cacp0preDkxx9zs1VXullXkX59N1pjPgGgLCuagPAEsgOSiNO6xGkjT3p1bo6ejhaQw9oBw5l3rhW+yg2qRac0iI/HT0Oj8zz6FYSwa/bLpLzmx+fdgKIsDt0KwlxHA430SFq9Peb51Pt/kLSom4SEJGHdKhvvqQvRf+NrsukPmVI0e9qQFRLA0bvJ3LkaTqllBBmOWoQkpRN54wLZA1vQzHAXd+VPtxD76wiirm1i+S8hjBo5iIgj+9kfHoz3pGV0sIdeEz7nlO8ZTicIYs5G0+MdVV/oMWMdfgfOclqmJPPuHYa8Nr+O1OywM/gFhCNzbo5U3gB9nUdP+gM+3smvZ85wOkeQeDWUoWMmA2A/7EN8zgxjwWYHetrpE5zfjwmN66lK+S0+eu8LbHtOg2hffvnuC8TbvkxrDb3mbCTw0FlOVyhJDwhk1FsL622VqspSooKuk+IfSUGkIafPZ9PEoyUuDmbIMuM5dTcGC0MNyv0v0O2TFbVy3mWY5pA6R/mVRRmEhAST559Iet5lTl9qRvs2LbAy02fwG5PZcmA7B45lol+ah8J0EA1erBtr99HW7oulzWf8sFNKE1szNC1taOTUBFf7YczuOJuNR2/QSD+fvOCbpOEOgK6xDemXjnBC04k7f/hwJdcZ/97daGeVz12/KOLuppJXcpXTp9Np2NwLdycLKooDuLTXB4WbJcJKk7ySHjTXSiYnI4oLUXlQXkBCcjoyhSAp+C5WrSXsv7KX1OK2aOpoY2DVgObNXNBMvE1AWByNmqXRUb+MK0EJJDhHU9jREnMDLQThnP/tNDciLnDNtzFfH5vGoy5BSYvyCLnhR3pmDKdPnwYjK1q2aIF9hRStHtZkBt/haEASt69GILWJorhVUwwsnYm9tJ3Dedpc37mbNBspoRmuSKSJhEWnERtVQFLhJU4bNMazW2ucjfXQNykl/mYUZ+T5xB4/iUnLMbw+rStPvkf6p3JXFD9lzhq0Fi9evPhvS/mbyLNvsvdMFp5tW6tWuvVgYSdH4tmXVi2aYGfmQeuentjogVWz5rSRpXIlNJ6c0lIqNWxwc7PFUNsQc/0KouLiySmU4dW5P+2bOaCjBfqmeuhUZBMZnYhGqwGMn+CN2fPbjPrLlKSFssVnD0ZdhtDNsf6bRM8UWRmFRdro6xaSk5NDibYtXTt3xt1GD3Qtaahfxpkb/pRpmeI9aBCNLLVBQwszIzNSYgKJTEimyYiZ9HWredVlpbkE3Q3HwkwfDYdWeNjVc4dF2wiJoQZ3Au+Qnl9Cx2Gv09pB9aD0jSU4WhoRFRFJmp47o1/rheWjruAqFVQUVSCqysnIySG/XODavCMtG9ujq62DhZEJCZEBRCem4DHiXXq51t81i5LucNkvggo9e8woIqfShC6talbQeZEX8E0ywLmBLY1cXDHT1wKUaOvr0sCzJZ27NOOeDd24fXv0ckIIjEjDoMloPn+rK4aaGlBWQMwNX8JT0rFw7kwP7/YYP+2I8VcpyyE7VxN5VSHZ2dko7drSvUsH7IzAvWNHtDJDCIpIw9BjHIsndsJAA0ozwrjuG0SmRgMk2iVkl+vR1ssVXW0tQIGugSlNOnWiexdXjAHK88nN00NDu4Ts7GzKzb3o1b0rTqZAYQZB56+SUijFqd1QenZ0ROuF+B2RF4+kiKvky4zRsHChnVtLPNwckR9LAAAgAElEQVRdcWjgiq1zS5pa5+MbkYCGdVNeHtab8kKBjUkF6TIDDMsLsWjUiV6tvLC0b0h7T8fnUl5ZUQEV5TLyinLJLSjG2q0D7Zq7YawLhsYOlKQEEhQVj/3wD3nFq3psMG5MA0UUFwPC0WsxgMkvOaNV64QsI+h3ovJNsXRyxsPVCT3tRxummiZN0MkNxjc0GoveU3izw73FngFNu/alNMaPyEJ9er82iCYW9YxNZTnk5GohVxaRnZ2NwrYtPbp0xM4IMHbDXhrB5cAIDFoPZdpL9tS3QVZVWULIrTOEFFrQxkpKdkE51vYuONoYo0iLwvfaHfLK9Gj1ynQ6uNaeJyswMHGmTa9OuDmaowVIC1Lx971OjMwJd+MysksEbo1dMDfWw9jCGTsjCA2LpsiyOSNGdMH8Oc57GghSA//gbJQeXdu6oa/z6E6toamJq3tDcqIiiEpKI0+piamZE442hnj27UKJ7w3uJhYi6d0KzbNFDHqrI/qWDbCVRhCUUEDTbv1o56RNkYk7rvrp+F7wJ8vQlZYWFWRnl2Li0IgGdqYE/HYZp6G9yIsNJqXCluHjB0BqOpqGghxTd7o66lCCGV5NG1OUnU6THoN5yUbBRf9QsgoKKMUUZ2d7SPEjqtAEKzsnmhjkcile4GhjTmPXRpjoaWFuVUV8cBQFDq2ZvmB89Y7vwykvzOHO7XBsXazIzs4mu1zg3MgVG3sv3C1y8Y1IRMPGg5HDelFWBC5NG2Hn5IFprh/Rhbp4Dx+Ck0Y22o6emBZE4Xs7lGKrNjjrlZKdrcChhTt2hroYWxlCXhJhccmYdh3CyBFdMH7K9yEr8BBf7b9Jm9Fv0fpv7J9oiKfa7322KCtySEwvx8bJGRM99czzKBTSYtKycjF1aICFzv/YZrcaNWrUqFGDoDw/ncxSHZwdbdDReprj7BqSL6/nvUXfcT2wiglLtrF2Tq+/lP/Q3AHM3OKLQcvhbFn3Fb3aOP2t8vx/prIoncT8KpxcnPk736d7IQxTNWrUqFGjRo0aNWrU25Nq1KhRo0aNGjVqXgjUhqkaNWrUqFGjRo2aFwK1YapGjRo1atSoUaPmhUBtmKpRo0aNGjVq1Kh5IVAbpmrUqFGjRo0aNWpeCF4Iw7Q8ahezpi3gZmJtF5CZHP70XfrM2l/9OYVd70zA27sf73y2jcDLuxg1rD+DXn2TQ3cf4bLub5Ade4QZYz4gIOpJPC8/Hwpir7NgwWxO5BT+C9rDWPmuN97eL/P+0hOUlFfdj8m9dpg5s/sw7I1vOBNZcj+8PCWSTcveon//6Sw/U9s9qB8LJnnj7T2ORT/feSLtRcFXWPLJy/Qf8jE7/QvqxJVkRPHt8jfx9u7DnPVXKX2MrNzLB5g1y5vhE9dwMaZu6vxYXz78YBDeg19jzbFQ6nO0mZ8fi//hdcxa8DZ/hNX9UeHEC/sZPWwgA4a+wuZzCVQ8toZ3WTrNG2/vV/ho1QXkins/llFMuM/XeHt78/L42VwPfr7vY3F2ABs+mMpgb28++vl38qvDMzICObP9S2atXEV4pvR++qKiFAJPbGTWvJfZ7pf/cKF/Ql4Wxc/zJuDt7c27Ky7UjRSCK4e/Y/Rob7ynbiLjGdXrv4bPZ96MXbCBlAIZkbvexdvbG++568ktlT00fcrVTUx42ZtPjmVQnuzPF++Owtvbmyk7Qp5TiQu59NtChg/yZvCwTzlzu6ZPywqyOPDdDIYOncz7h9Lq5ArftZwJE0bx5opzVMjvORpJY9+ayXh792Hc5O8JinvcCABCIefCho945ZXXmbY59IF43z9+4LXXvPGe8iPpj5FVmZuGzzfvMGTIFD48WpP6xBdjVc+h+m/mvqTHlqs0JoA1i8bi7T2LdZdrPBkpKys489MHjBo1genbIx8rh/Jkdi58l/7e3nh7j2DxxivcmyXjwk6zfuXbzNp+6/Fy/gmEktBj3zJr0TaySxS1ImL4ceggZn534ZFZnwVhPjOZf+RxT/XFIWTH19Xv0EjmbfSnXP4UQtL9+GDqaLz79OXnaw/xkPVQBPG3tjN5/BckZ5U8PjmQeOF7Rs9dyt2nKGJd1S8Agav7ioXHMx4IPzxvsNDs+l1NwPXlYuD6WKGsqhJyuUIoRZxY8PqXIkcIIZRKoZDLhEwmU8Upa7IpqxRCJquOUyiEUqkUQlklYq8Fie07T4o8mUzIZHJRVStPVlSAGNrFW5zzT/7H6v00hO2ZIeYeiHnuen2mThUfnIsToqREnP30EzFzb5YQQghlwjkxf9MpIa9SCpEXKQ6dOCESC4UQlaXizN7V4nhYkRBCiLQTi8W+MFUDf9+zp1jrlypEbq7YPW6s+ODcY5TnhIsft+0WMTlSISqLxI0TW8StVJUsaVaS2L3mW3H+Zu4T1UMZe1K8t7FaYXaI2Hv8nEgvUX0sDLkm1qz5VYSEyf5K04iwQ1+ITddr6c8MEjNnfyHOXisQQlYukvyDRUZGzculeh8VotbrJra+9ppYeDlRiMJCcey9WWL60XIhhBC5N34Ri9ecFEIIURJ9Ufy4+7DIKftLxftb/L52gtjlHyeEEOLg6v5i0Yla/bQ4Tfjs2iRuJjxYoPxj74vFJx/s0w8jcPUgsfVUphBCiLifB4mlV6tbRlklwr+bLlbuvi0KCv5ePf7r5EbeER+OGCl+CUsQQlEhzuxYLf74I1QIoXrf5HLVGKeoNchdW/qW6DdkngioUgqReUoMHbT6uZU34eZNsWDJepFeUilKfH3F4hnLhV+6Ki78t4ViQ3V/kp+cIX7wV5VZeWmhGLU5QZUocJOYc7xUCCGE77ZtYt6m40IolSJu3z7x8ZKDIqu0fv1lx2aIT49VK7z8uVhw8V67VImodbPF0u23RF7ek9Ul8OCXYquvKnH5yffFxjsqWZtf/UxcrU6Temi+6Lk2on5BJeli766N4kZ1f4o4sVqcjFXJyv99dk1/uvCRWHy59uihFPI/PVtRHC6WfO8jcoukD9cVcUBM+OnGk1XwGaNUyMT+1e+KA4EPduof+5qKzlN96qavUgh59fytUFTVjhEKubz6va4Siur5XSGXVbeFyiaQ38+jFAqFXGUH1GqrKkW1jOo4mVwhqpRCVCkUQiZXyZPLFSpd8nvjtrI6n0zI5HJRVW1wKKvkQiaXC7m8Wo+iSpVeWSXkMpn4aeY3IupeXWo/woc2lFIoMi6I11+dWZ2ntp6H9OlqHQqlEEpllZDL69ZTCCEiVncX8w6n1X4YIujIZbH75A1Rdr8uNdFx146JHl1HiojEJ+wMQojLC5uIBRefOPlDeaF/pV3fECw61XK46tQQtgVx02cfczblsn9PF+RGnlgDmQHn2LH3e65EgI2LJ0PGTuDVbi1RlCazb89Gth8PxkhXidzQmU9nfkpXx0CWfryGu+WV7Nn7I0bGFry7Yid9G6lUaWmBqYsEHbMXy1ebtZ0LOiX1uIv4hxi7aRNjARRlmLcwx8VBtdmeFJ9HkwZOaGpogIEhWYkZSJsVILfVJD+9EK9BKg9VlaZWZNwJBs9WzL50SSVUlo9texsaPsYVb25OKcY6YGaiB1pVFJbJ0ExIAccGZIbsI1fLHbviW5y40ZBubb0wq6d5EmJyaN7YU/XB0IjM2GQqWxWDHgSGBmBv05CUxDPkyprSwdMNo0d5kaoHqbSchk0b0cjViCqNPG75ncY4X4dBkmZoIOX40o+ZujixjkvSiXv3qv5RFGPZ2hIXO1X76lpYoWlQwY0bJ1Fkl1Aq1UCDKqjxKP+PMmzONvKTwjl/+jgpUleVt69njEGDhmTnRXDjRiKlRVZoynMBG4jfw7Job95vl8n1wBu0aNmWBlbP/93/X8Grsx03Nh+j3+KpdcLzLmxkybYTxBc607aTPZPe+wKXapdj/V514fyvZ3Af8nzL2qhzZ5Z37gxAhbMuzl5m9z2aRd5NxaunymO6aORO0rHr0L47Vy/EMGhiI1UiOwfC1x2HwWPo+NZbdFSlRt/NkEZKbR7nf+TiqUi6fGav+tDAhejvT0GvQZDwG19HdWPmmFxuBl3Ds0VbXGzqd1IdF56BR29LAKocG5Fy0RfadmbygWWqBPJiztxuwqov3euVU1pSiaKsAkm1vjItPXLCoqBxM66fj6bjJ5LqxmtMzM9n4aV7o0csL+v2ruOSFIC8BM6fPomRiRH2bi3wcpGg+3yGjafGyBhMvJre/yyqFFzfs5Ltp2+SUQhtBoxl3KiBeDpak+h7lG0bz3I7u4CmvVsRvnIv7efOQi96M/F99vDzMD22fD6KfbrvcGrlW+hLM/H5eQVbfQ6jOeUiZ2eqfM2eWzmNzzcH061vS1KTsqlo3o3xw4cgid3DnO8j8e6kJDPFHhvLAgJzNZm/dy99SiI44rOaA9cyMTCzxnv0W4wf0JXMw/N566crWJg1RVujHKltMxZ+9xU9xB0WTPqKUyHxHEy8hCEwcvkfTGn16LYoTg3ip2Wfcel6EYUjR4KZOx98MI/ebZ3JOfczS3ecIqHQmXadHZj03kIsUv5g1uy5OHwex0f2F/h28QdcabOZ65+0f6SOovC9fL1sPdFaGuz60RxzBzfeW7SWLtUO4LS1wczdGS2DJx93G7i0fuK0j+JfN0wL7pzlyClNWvV50ABs8+o0flbWenIWltgmhJPRq4xWJjJuX/QnvcWbUJHCrvW/Em7cGDc3DajIYvW8rbT0XUMjWSGZ+RlIGjbCWlMDLYtmWNhbouH4Ml9+14Rr8WkMH9ePP2s3sXVi1szJNJYY/7MN8BcxMTEjb8sKttotYVJny+erXChI8T/GtRI3xrR7hEvUgiKQyYA/vchyOeTXuoIgLyD41EHuWL/M9FYARfju3s1B/2hqTio8mLbmHWz/rKO0HMpU1z5SAi6x7UIQw0rbYNW4FIES7652XF6xgVOZtY/8OzBn7esPlje/EORylHJBzO3jbE9qyMiuHuiVSdHW1aSTpyt/1Tubvo07zXQvsmLBPIzNS8lJ1ae9azn9AW20aT5wFEvNi2n254xVFcRePcot0YFJ7VRaTZxd0BWRpKamQbEVbo1dMdB7nrOLQFqUQ+Lt28RlWdDU8NnrlrTvTPnhJFK1TRBSF7q0VvlsL4qN5OKNq+ia9KG1pxNZheWMGNkXq2degv8ITl2Y3jydFT9eo69TTQ/UcjbD3tkNTWso9l/MkegvmKuy5DDqNBGnqz9xNVSC8pGC/0Hy/Ti0+RQmAybS+GHDmRCQnffwvMl1j/mrMi5w8mICHiPGYaYHZXm+bF7qQ/z9FMa0GzCWVwZ5PSgrVXVJpDgxhis3TqPQ86Z9cycyiyoYMbIP0rsn2bn1LDUXkiQMmPIGA1v8yYWrUEJO3fJWpPiS5NqQNzT+4s25ikoofsQRanpmrQ82TFv7JYbdm9WMunp2DOjggl9cElUaVdxJyMFo2AiaOv0dfzzPhqyLBwgL02PwKwYPxHm/vwJne7f7n+UZF/hl63kMW7bEzRqybxzl10IjvpzjzlefXmD+7z+x2FhK5rm19G0xhZOfTiH7fB7flumiZ2bPux+uIOl0uUqYsT0TPvyens7lTK71iPov2ELQtW7YT1zCqvZO6OgUcmj5SgxeHUbHAzImf7WMgPWLyfGYw+SkBfx+txyj6P2cD5Xi6uaGhlzK8Z/24NykCQNHLWNG6seI7ot4vbM9N3+awZ2QInr07MKq34/RePYa+q2bi+sTtJOpcxs+Xb6SiMLb7Ng3t06clrM59k5uaFlDkd9ifo9ZyOz2w1k2cT/rASuPvny9YDaDLte/s2LW/HUWLmpEqL4uo/p2eGCus2ncnPnTrZCYPvmGhKW1DTFbFnHeYT59mjzdxt6/bpgau7ehS3tBcG4F/MmJlV2rEYyuHWDSFIM7h7nWV07vAQ3Zv+8SeqNngq4MDd02fPTOcDSqnRG/gwmOgK6lJ1PeXkxWbhmy8BB2XYwgN78EnOtvMF0TG7p07fMMa/psqKgow7THGPo1e/47uZFbv8ZH2Yu3x7fHyfDeC59DZo4p992HWVuCnh5QRWl5EiVlgCmgqwu2NSbFhV83E+HgzZSxLVC51DWiWe+hvN22rNYEaYyzBkgpIb8wG5kc1RtragwmqgVDfrGcjj3H8ekHg9HTlnNwzRJivRbRfszrNKysfRnHDAmQQTYZ2Q1qgm2tQFcXpbKCvApDxo6dxoxR7ShOCefElcs0dnXF/q9u0hlaM3jcdDxeykYhZET4BmCnb1S9x6mNS6eevN3pwWwBW9dwWr83b41rg7V29Y70zRBMPNozpqcHyvQAvr+QTHG5AkOT59V1tXFo6c0Ujx4kXl3Btt/vMMiz9zPVcHvHaTpM3sMQR5CfvMH7FzPoPcqe0tJisnW6seKLBdiZaHDhq3c53aEv49UeAx+Jfe8ZvBL0Oj7h3ozqDuDLuokn8PxyJi87W5B94CoBtdJr6hnRuYMn+69eoazS4bmWtcD/FF8eL+KNt6fj5WTLvRGlsjJatYa1AjQ0wMGuOiaSlHTApfpj44b3ZWWe2sJH12345L0JuNtaoAnomzZjxDvvUH4/lTZm1vboAUIEk5UDVG+a4uIMQFlpCRlanfhm0QIkpppcWT2PP5L7Mta1I6+941rrzrke1k5WaABSaSwFRYAloKkJ9rWX0nLiQ/Jp4tYUzce63pRSXJJGhRTVVGhoANqqre0qZSh5uUD1pikNa3cCc4bPmVJXlK4lHYeOVe0ki2JO+vyOIisfXgDD1KJVDxrevEFOiQyoa/A06PkuDWoHmJbSpPGrjHrn3pijibGFBIOyK8ThQhNjAH0kTV2wI+epy6Sj74STmxM6OgDmmFsXq56plTOtzCHS0RgrR1MsigGtKjQMJYwe3I3G992XGmDnYguUY25lh1UDe7Q0wdHZnCf7FsVf4RY/Tj2N16J3GelkQfaBK3//TucjMLB2oae1y+MT1qKkuAiHAe/T2vHBhceT8q9/+UnH1Bo7a0GJVPH4xLji1iKY0oqe9OnXBOXN4P9j77zDsqz+x/9iw8N42AKyBGW4t+KeOVIzTdPKbJlZoZXNT2V+bGnDzJy5V+6BA3ELgqAMlSUi+2HvvXnO748HGWlgaubv871f1/VcXJzxPuM+6z7nfZ837h0cQMOZUX0qWHg8HAMDAwyMjTFpY4IOcPPUBb5bexyltgxZJ2fM2xthUL8tra5ZSlZqAknxCrw/n8fiBftb/XDm36a6qhItq3bYGv/dfbyHQJnJli+f46fM4bwxxpHco4v5wEu1d+DYexg26jqkpiiIDIulQinDwMwYLT19eg6ZSFHcbRQKBX7Ho3Du0xnqEvl+Vh981YcyqacF8ete4MNzAJrIbexxdXfHveFnhwFg7uhKB3tXspMSSbidRFJcCZbOqolk4KsLaVvgxdVbcSiunCC1aDD2RtqYO7VvIscdd3cb9AAnj1FY1YFCoSA8JIY6LTkyuSGaBqZMmTyMtLjTxCUlExcaiVB2waSFRWlNaR6pqQoyc4vJz05DcWeHtq4WRUUtGnr66KvlUldYgU0nV1TTUgXH/+uJtdoznG6o3zTWvD+OrUXDeWmoLRl7F/LuCdXnUkam6hRkRaNQKIhPUiArKubRH6b/Nb/MeZf9V2+iyAzj/L6t5DiqFglVheko0tLJy88nOyMVRbZqZ6e2opCMNAVpOSUU56SjyMijTnnntSWPFU8NRF39LYKbpNGmrRJFfAQKhYLrt5NxVVO9mrSd+h/W2mxm2+XrKCKDCLjtwWBpUXpPygqzyM/PJ6dMiwEL5pB7dT/ZAIp4Eh3tcGljR1X6dY5ciqa0sIDysiLyS8sozExH170XbapjCa28vw8cHh5BfOhOvtoZwqypfTArTeePVUsIrv+ybdDzb1MeG4NCoeDg6ot0Hqk68h8y5z+oR15HoVBw9uBV+kwdA6Ic/0Pf8uV5db59szsasedZuXU/2WWgoSXHodkY0AEbCwM0gKfeX0ZNTBQKhQKvjZfoO2U0ANYT32eNwx42+l9DER1MUGwPhturoWtogVMzWU5YGKoGhwHPvk7Z7VsoFAqObryM+9A+jSWtKia6oox25natTrYG5lZ07jaIvIR4FAoF1y4rsOuiOv4f9c7XVN9S5ffwej96PzOiScybTFCz5fUfTnHnE8w43wu88dH3RN5O4FZkJEfiYsgzUr3MF+coUGTkUlaQhSI1jfziSh4n2qZWGBgoqaipazWsht7TWFhHEJJRioGBAYZmphgZydCwnsisNpfZfi0ThSKa07vPEnUnjpYeCdEhJNy+yYqlq/HziyC7pIbaqhKyFArS88qoLMhAocigsLQKAZQVBnBh3wnibytQZIWRlNgFJ8tSKsoLSSushNoqSkrLUCqhJL8MBzsbTiZGoCfTx8DICGMLE2RaGtSU5JCbX0xRSRnKykIycksoKSqiuv5j1urq28RGKriy9iumdfm6xaV0XXUl2ZnZlJUXolAoUGTkUF5dBylxJDvY0d7Sjqq0MA773aS0sJBqJWjqGnDrxmVuhvqx8KON5KamkF9eQ2VxPukKBZmFVZTkpqNQZFNaX/8a2kUo4pJISVawd8E7rPj+FA/TIirLS9Fv2x4z/QffPNFYvHjx4ofIwyOhLPEsJ6N06dHVBbley0eFWmphaLSbxNBBbmhkmdFtsgd2MrDq0YPuCWdYtu0wvjduEJtjTJee9mhXqlGXd5M9hw7heyUKh76TGNHbGW0N0DNSo+CmL7v3HyOx3Wg8F07D/HHO+n+TivxkvI7sotJtFEMd5I8v4bJMbgQmkJISiK+vL8GJFfQYPJZednqgY4lTbSKLfl7NtbQyxk+fRcc22qCmiYmOHuePbGbPkRNYP/8dM7vJoDiRgAupJKeF4OvrS1iWLkPGTKKTRQvpaxlhQzEbNq3ndEAYvV9YyFAn1YOSGdpirlHM3l27OZVnw1zPqVi1tMOpa4VzTSyf/7SGiJw6Jk6fiYuFFqCOmY0L2lnX+H37YZJMuvLC9GEYt3ASkha0naWrd3NdUU1+7BV8Y+qYNLwLlOZxZcdmNu07THapHWNeeRn7hmPKGiqKc6jTd2DopL4qNYXSNEL8k0hRXMHX15cQRR39R0ygh7UmetbO6KaEsHztTq4rlDz93Eza2Ty+XQ/XDjZc9NrGwaOXMRy5io9mdEQXiDu+mO+3B5CZlc+tawH4JsqZNNiZ7PDjrFyzifPxUJUcjG9UCcM9uqCrrQGUU5JTgLZtV8ZN6ka9miNyt96EH97GHwe9yXOaz0cvuNf7GNBzxFOEHFzN/mslTPScRTdzScf0Xlw+tAzf8GxSNZwY3d0DZ2tTTNq6YO8yAGcCWPnHURTY8eLknlwPzcFYK5mzEamkXw9G22kMU/p0IE9YMMajfeuJPQIK4m8QFnwD/yuX8Lt8lRrTzgzu1wNjXdDTtyHm3HY27/NC47kVvONR396NOmGTeozvNuwip93TfPmsK5rKChSRUdyMCuGcry+Xr8dh7Nwfjy7taEnjRV3ehdKQP/htxwEqh37Ef0bfGYD06T7sKcIPr2ZvcB4j57xArzYt9zcDPUtunN7G1gNH0Zu2nDf7Noavq6qgsqKcti6dafU0VEMXC00lh3Zv5NBxH1xeXMxEd9Wuk6bcnfygXazZdZDqUV/wyYimeg9Z5KbW4jJ8KN3aW6IJmDpa46Sfy7r1Owi6Ec+Eaa8ztLMtGgjObFzI+rPp6BXG4nspiDJdJ3q43KUw9Q+iJCnUm+sF1vTpaIt2CzvJ6hoadGhvSdChPew7fhp/RTYaug442RrR+7lhRK9bw5ZjwWiNHIpVQCnjZvdFZmqL1s3dbD4ahFWv4ThqJHODznTUCGP9t2u4kKmFeeF1fH0jqLN0xtXBjOuHLmHi0Y6z+7fhc1uHWe/NpDTIj/jUGC4pXRkmzyQkXYNeTnIuX7yI68TZjNZN5rs127kYGMSNLDUc2rejMmgDuwKyqTOwpqdGON8djEEIgat7J0xlGmirx+O1ZR+XNTrw+eoPcWihaRWkxLJ1ww7KNEvw9fXFNzqdtu07YevYF4e6S6zafQyFuiMvPdOD62H5uPTqjJ2dK6UBq9h/JZPhE8dSe/s8RVa90Iv1Zu3aHVwtaYNIDcHXNwmLft1wNNRF31SNzEBvdhz2pqTnJN54fVyL815LFCYEsmHfQayeeoM+rXw70hJqQgjRerB/lpr8aPxC8nDv1x8b+WPcCfz/jMrCNIIjbtG290Cc9J7gFbSEhISEhMQ9EeTGh3AjUw+PPh2RaT/cwW1m6AF+/H0dx46W8NbyNXwws9ffin9huScfLPfCeNSr/PTZO/RyfZyL9P8tilPCuBhfRf/hHnd/G/I3eCIWphISEhISEhISfxdlTSVlFZXUKUFLVx993b+3uVVdVkx5jRLUNdGXydDS/Nc1HP/PIy1MJSQkJCQkJCQkngikVwMJCQkJCQkJCYknAmlhKiEhISEhISEh8UQgLUwlJCQkJCQkJCSeCKSFqYSEhISEhISExBPBE3GPaWXKKVauO4uhc2csGyza5OO7dhU/+1UyfoDKgFfCqWUsXnsUYdcPq9wLLP5hFV7nAqk074i79aMxHVoc7c2ipauo6zCO9iaN7tV5ieze8BMbdh3h5MmTql9ILkP7dURb81GbaUzlwEeLOZlnzoAujdZYSlLD2fLHH9S074Kd7gNeNPbAJLLzx0Vs2OPH7Sx9unZsi5am6v65onBf1u5azqHT+Ri3a0/b+sv/q7KSOXHgN9ZtvUKWqXsTSxA5XNq7gw3rt3ElvQr3nu60bI0aSuOvs2vvL2zbexvsXGlfb7P98PeerNlX/zxO+lDZdgDuLVxkWl6eS9K1c2zbu4ZM/QG4t2ketjg1ig3blrJjnz8l+o642pv8pVX64uJUEoJ82OFzFKVZT+xNmj+T/LggVm5Yxl7vGAzs22Nvps9f39gXx5ZlX9Df77sAACAASURBVLF5rz+JBcb07GSNuroaUEZi6Fk2fb8Sr6s3kNk609bU8LG9UWalnGHVjyvYe/gGlUbuuNvfeVJ5XPHazYbVWwhILsatdyf0662uJfjsYNGvG/ELicPAwRUbY90Wyg21FWV4rf2eNTsPEpXXho7dVMYQoJCo84f5ffnvnItJxbajG2aPvd3/m5QTfmwnK/yKGNXLscH19tHfWbxqKwHXUzF1dsXasGmdJLDj/W+5ZtSR7nYqs8FVZYmc3rqFDVv/ILxIl45d2jUxGFxHcshRVh64SY+uHdDRelwtq5Swi9v4ZeVWfM6lYGznim39JdK1JflcPLSKNdsvEq3tTn/Hxssek05t49dde/FTyOnfyQZNdTWgnKSwc2z87le8rlxHz9aJtmZGLfYRUVdLmNdaVu3wJqTcnkGuqsE+4ugGvl+9lRPeqjHlerk1gztatyAJ0pOCOe+9E+9kAzxcrBrcL29YxA9bDzXMFzd1ejLAqeV5qkJxi4P7V7J+SxhlNh3pVD+WZWWEE3R6H0eii+ni3A5tzZatSFVWFpEc4csf+9cQo9aHbk2s8GQknWLVj7+y70g41XJ33OxbG30fMUJJwuXdbDmdgpubM3oNbe7e8x5ARsg5lv7yG0eOneJasiZOrk4Y6UB5biInz53D0KoDhroPMw9Xc9vvAL/uCGfwwE71Y6/E3yUjdB/L9l/Frn+PhzId/UTsmMZ7ryHd2oN2Zk0HWEOyo8+x5uD1BhfrPjPpkOrL8aPeFDv05Y2nLUiJNWZw0xXk3yDtRhzHjgdQ1sRN5tCPcSY3CMloHlbTyJpedlrEGfbD09MTz1fHIdLSqa1q3XrFX7Htpf82WKtojgWpQRs5cP52M1eZhRPualEc9c9+4DQflOP/+Y1gu8l4vvYCbSJPsuxMvsojLYhVIcU8O/Vd5j7jjOLWVdJLgZpyrgaepMb5Wd55ZwY9srdxMl4VJXnbPLyqHXjN0xO3uuN8uEfRcuIF8Ry8chP3Qa/wzmsj0U7y4UZ9FaTc0GCCpyeenp5MNAzAP6Fl2106OnJs3TyYYpmDf0JZM7/S22HsO3GVjl3m4DnvVYZ3sW7RZq9MZoF9t2H00M0jOqO5rYz8oOOsP53C4MGeeL4xja5tjVtcnB2cv4wY5yl4vvI8Rpf3suRiNQCF14+x/HIy0z09mTLMmUNnzpFXej9W0h4Ne5Ydwnb0y3g+N5zYnxZyIEblnrrvEzblWPKKpyfd9YKYty1J5ZFwmnnbEpk82ZM5UwahnlZGbXXLaeSfX8aeOCdee82T593yiK23mZl16hc+C9fiJU9PBjvk8+3+8H+snE8imdGX8QsKIPhmk/4ee4QXN2Uydaonr0/sQVVCBY33qhRw7LOfSHKVcSs6tyHKtT1LuGXZk7menlgpfuCXU40W3yuLb3Jy50GuZxVRXf3gY9nfJfVaDEcvFfDs7Ld4ub8DZzdvJ6LeDE5ywBZuGY9h7twXmVy0gp2R9ZFCVvJ1UidefvkNXra9wY8BKgOhRTdOsCIggemenkwd4cqRM2fILq65d8L1VF/6lmPVA3jjjdnM0NzLiqsq96TAYjrNeQtPT09mDbbiRkJ6q2Uxs3JloLMl15MKmrlHe+fjUT82Pe9ewZEbBX8hoZ7yHM5duYxJ1+fx9JyGfdp+LtUPjSZmTvRycyYnp4DKWmXLcgBtbX1s2vdhsnUJZ281GROFYO/PR3EYMxvPqUOJWf4xh261Ku6RIpR1XA/xx9CpE4a6TZcg9573KE/hyMnzdJ88A0/Pt3lxUi8s6t9VdOVWDPAY8lBWhlRoUpKRxoFj55tYqpP4u5i5DKOLYjn7rj6cnCdiYVpTUY7MvA36zS7a1UJXpoFuj84NLnqm9jia62IoUggLK8LJ3gJDfTMsDLUpz49mxSfP4eTkxOABs9l4NYlaIOv6EV4abEGPhSdY+/HrDOj9FCtDbiESNzFr/DBef+05Ojk50alHfw7EgKa+GfbmMiJ2fUw/Byfa9n+WPcU1qGvpYm5mgra2FhWl/lw4qcmq9Z8il+tCSQ4XfnyVfl2ccG4/jdX7zlJRv3bIT/HhpWcG4ujkxIR3hzDr9T+g6AaLnh3GBweX85STE05OTnjuSWhSdh1khmpouzo3qycNHQPcO7ihrHv8u0YTvlvOrzNG4tLNnT5DZaCt6rxJt1KwbGuGvb0L7V3bkpOcTEluITXVNaQnZuDerTMdOthjaKZN7FXVDOMw+wBLpw9GpqeFhpom6q0MBLmZ+YDA2cWdDq52VFUUkxmfCsCCPSsY4+KCi1NbggOH8sqzbVuUpaGhhZ6ROXamf7KcVVPCtRvBODr1wMlRF5ncFBNDvRYXk5qaOugbW9JG/ifzHSVxeIfl8eyQbljb6CA3McGw4W69So7/d0Fzk6TA1JUbWPbccFx6uNN3qDY1aqo6Me4+g98852BkoIWmhhbqQg0e47i5YPVaXhraB5eBnenvUUZ1fdq20zey9pWRqmeorola/ZqmIDOBzuMnMXSoC46ucq4cP0J+SdlfJwBkJUcwdMZzdOvmjIVbKYd/2koN0GbMfzn63jMYyLTQVNdEvfX5+H+GmuIMju8+Q+epr+Jg2HgvY25qLL2mv8igQR2wdzXg4u7dlNUpEbXVXNuzixt9P2D+AHOajhD9X9/MO6O7oaPTvL/Vluaw/4tvMX3hc3q0aXlX+1Fj26M3i7/8GI9unXAf5oZzh0ruDAPhgVF07duV9u0daetqwY2zVwDwOxaIx1O9adfOGUc3a/z2+AAg7zaNFZ5vIjfQQlNTU9VHWuHsAT96DemBk1M7HNzbEHDwHAATv1/InC6dcOngTGVJZ156ulOrsnR0jTA3NUPnTydnbxxexQsuLri0dyQtuRdLPF1alFNaVEZRfjEunTrh4mKPpk4dSRGqRZq2tgEmJubo69zrjs7bd5kkVVfXRM/QFFsz4+ZB1dR477fVvDCkNy6DutC3Xyk1/8I6rE4JJqbG9Tved7h73lPWVPDL3IF8sXwdC2c+z9hJz7PxxE2VVa9L/8W5fQeGzVlKbHZVQ5xYry/o52LCyK9Os2TWZLoPnYF3aTV1pbkc++VNendxooOLG59vOkZO5Z23ZnU0tbXRdXMANWm39EHRNrSkX6eOlJc/nJyHfc14aErjrhEYqka7gXp3+XUdO47Fdd2aO2rJ6D5oEMlRgaQZ16/+qnLZ+vMxOn+wn4RlalCayeaP13HZbTFDuk9m5+oCun7oj+Y7n3H6Q2Nq0UXN8nW2HPLAPyGNSTNHY/jnfIlhHI36gYpjn/PS5iRmvKeyWZwdtJ8VijpsnOY1BpbpYj34aebK+1OjrEMRtILAvqMY4QjZN46j1W0UH4y3QTfvBtHG7UHejSWHL2I69B0G+67mXnYqBr/yKrJ2d5sH1NPTp+Tkfs64vcFo1z/n+h9G1JETfQavBDtmvf4XaefkQ1UV8Kfj9KpqyM5r+Lc4M5Ldy9dxrcyWmR8YA+XcunAB/9hUGvcD7Rk3d9zdx/zFJaDf3K53WfgWrox5nc8BKCR0vzch+U3DuPDM3OFYcW+UNdUkRpxle8QFnCzkGHUZyPRxT9HT2epvd5KaogKiIo+zz+8kNuaWWPccxowJI3GxlKOGBg69BjBrrht3mX1XVpNxzZvDaV1459mmE1AJQduWciAaOo5/GQOdx/w+WZlJ2LHdeMvm84V7o3NFYTyHfl1OUEEbXlqgOrUwceqH1sHdLEsJxFA/gVMB+bR5fxbTWxBv12sSEdu/Y1WIEaUFkYRmdyABcAWEyMNn3TecSzNi+Oy/enr/e0SsGMHOm5OZaeLFrdASvKNHMr6jEeauQ9A4sIYfU5zR04njXHAxnYVgaGoYO094I+9Yx9ZrgUSV6pFS0LFevaSOzJu+bN5wkDj6M2+qqu/G7nyNH262592gvYRcTsW75yBmDbqrVf6zlMZyYd8BSh0mc0+DO0JAWua9495ObPJPCUHbl7I/SuA+7mUMdTSoLLnF6T8u0nj4JaNDryEM7O1wt6yE5Gb/1hUlE6dVyABjS0CQmxjC+dNhNO55mtJrzAh6OZq1uqCvTgsk0tGBr9T/Zr8tq4DiwvsIKGfs3Jcw6m7HfW9ZVGYQ6rWbM/rv8pnb38vWw1IY7k9yshZ9De+2XvjneU9dS4/3116kzvEoM+a+iq1tk4X24K+4GTiFlXtPNpPh8sw3XDEWuC0Npfuna/jEvZbick2S4v0JiNfm1Xc/QVMoSbl+EW9LG16c2AtNwLZjZ+Zra/xpsSzxdzE0kpN+ZhfXO0xpor739/jXF6bqOnroy6Ci9u7XNofh7/LRPeIYt+tCu2Q/9oepAQZQkUKcoTNv3RnYDKxwtUkkMheGGNXLmvg8c565fzvQHi+Np40B4GwOjSdf2I55l9/fdiU9sXGQyUnwx3tbIOaDeiPX0aSmoHHXzumpj3lVO5ic1EKqC6FMu4r7wX36Ctzv4a5UKlHXN8awJUPQ/xBJRzdxKM+WMc+PpZ3hnYVnAXkFJo2beMZGoK2aDCsqMyivAIwALS0wadylNHXoz/s/9iQlcCVvLT/HuI3j0DU0wtzcvMnC1Kh+oC2juCSfmlpULVZfpvo1UMrVE9lMfvPO7oYGMhMTzNWbDnyGtGQPRKmsIz2zlAETPuXL2UMozYjidOAFHO1mYvk3N6irqypRZNUyff4PvDTUgfggb4JjYnC26IemmhZdJjzPDxPujhdzZBunS+2ZPGsYbbWaPl8Txn66jkHJwXy/8QqFI7sjs2zZfvejojo3jWPHzlHXpj8fenpg1MTPwLwL877/nWdCNjHtm5NM3jcTrHqwaEEdJ4OT0TGwYHDPNHpqtDwhy3u9yPtqF4hQlGIywIHqxELuaJipqVnx0n9/Z2zkYeatvsjLw9r9Y2V9kmg76Xs8O9VByS10ZGB0R3+ubX+WfSzwCU1HV27JoJsp9FRTQ8fcmemvvE5qIZQn66Nbq9/EBrkm9r0ns7jTGOIuLGLlzqsMXDScNsPeY7FFIVSkIdMvwkjv8U4HxVGX+f18Mt16T2KaR8eGV9nqmhSKSwAzVLtXFne01RLJzAHuNAG7prqfJoz5dD2DkkNYuukyBfndaGOki9zcnMZDfV0MZdqoA0LcJq8AuCPCpvlLT0FWJppKA0wtZYBAU1uGibl5E31zI2Ta91NftSRFZuHs0v4+9BarKCvLVr3X6wO6OnDXlsm9sOTddUvvI1x9KjkKjh67ANYD+OD5/s369ONAQ08fbW1BrfLuI5C/mvcehK7TZzJpqGoksQDyY7MwELZYmauMuJsPa0f7zg4NLxamrsN4xfURJf5/GGVdHVqGJsgeQl/9Xz/Kl9m50dVdkFZY2XrgO2ga0m/GU2QcXkEEgLwbA3KusDa+fnmUdxu/6D6McGxNUCk5eXlUVUPY0gV8+dYuWtZQVKGlY42DWxtOf7sNn+Iy8pNvUNF2AM89O5OuBhncvN34jr5mxkLS7AYz9bXX6DtKh9qqxsFJiJukZUCu30FedFpA8r0S+xNVVRXo9xhNf8fHqbCez/6f32BN2hDemTUWi5tbWeStUgiz79YL/To9EIL81FzKarXQNTVGS1cPt75DqclT7VqGHr+KVa+uAKx56ilWh6aDdgnpQbu4ZmgA6OLQezDPTJ3K1IbfQKwAMztHrNo4oayoprq8itS4HOSO9o3ZK4zlmHpnXm5zx8EQ91HjmsiZytSpvVtUxtbUN2Hc+EFUFUZQoxSUxMRTnm+LwQNoTcjadWNWPwPCMhKhpoqMyBIM6kxQzUuV+Cz9mPZGMzjfECOHHV/PZE/BUObOHI08eAUfnVL1h6vbtvHJ1jOgJigvDCM8N46qx/ZGH8+KH79Bz20sU8f2J3vdVLZHqHy2Pv88SwMVoFVG5rUDXJU3TqB59r2ZOnUyvcyqsHTrgLXBnUV0IWueeQq5fAFhTVJRampj3HcMU6cOQv3wDpxfeRVDwOujj3jvbDxoVJEXf5ow7u+l7n+BNt0nq9rtxKE4unswyKnxRSTX0YOpUyfSRSsP6/59sVJXR9vQgn4jVW190qhuODt1xMpI9Sq2fMbLHL6VC3qFJJ1aQ0z9S52Z20hVGs88RcdufRn0gLr6fx9BcrQXPx24ztTnnmFolzb47fiJsPqN0T4Tp1GVrtJhP7/2GPbDPAAYOOt1yiJVo2T4yau0nzQWgJCdO/l0sw8gKC++RkT2bao01NHWd2BoszHgafp0tEYLGDHXk4oEVYL+287QYdKYZjnMyIyk1qwLFloAahi37cToZrJG09FG3rr6Q00JEcUVtLdoS2vdVt/UjHZuPaktVp2Dxly+hXmnlo//VcQzzciNd1aco6S1oCKOX39ehmGncUwZ24+MddPZFdlapEeLYYceWFvXkl/Wsh7wo8bCqh8VpmV0HDSq/hmOpVs787/8uFXiwSgrK8Wi/3hcLO/eEb9vxBNA9MapYv5af5FfVttiuBtbZgsPDw8x9pUPRUBCqRAhq8SLi73rfbPFnmVvCg8PD/Hssx+K4ykFQohqEenzm5ju4SE86n+zPvtNJBSoYlQUJIhNn74khnt4iDHvrxK384TIvbxRjBkxSIx9bra4cDlIeL48SXgMGCiW7b4gvnl7QoMc1c9TnC0sF1V5SWLlwsnCw8NDzF32h9j0/RzxyfqzoqhaiJ3zvhHz5j2nCv/a1yI8s7E8iX7fiRkeHsJjypvC61peq/VUXZonvH+dLT4/mfBgFf2gFN4Q3740uVnZv/LOavDO8d0vBg0cIEZNe0N4RxU1uJclRYvPXn++PnxGozyFQvywcGb989gv0u4jCwXXzosZE8eIwSPHis2Bzeuq+KaP2Ho++r6Kkhq4Xcya2OQZTvlEJKTX57k0S3itmCeGDPIQ07/aKpILW5Z168jnYsSQJrJe/LnRMz9BrP9kovAYMlJ8sNZH5JU35Fb4b1osnvb4WFxpCBss/jN5bLP6/fZifYSiInFm43+Fh4eHGDNlrjhyLVPU3FdJHwGKveKFJnkaOmqsOBpb75eWJlb9Z5bw8PAQMz/YLJKV9e5J18WSqRPF4MHDxNKVx0R2aVOBaWLP/NnCY8Ay0fRpFfpsFNM8PMS0ae+K8zFljR7Z2eKP7+cIDw8PMWXOUhGaUyb+L1GUEia+nK2q+wUHU1WOcVfEJ+NGi2HDRotfNpwV+RXN44RvfUU1Rs6uHyOFEIURoeLjOVOEh4eHmPN9gMhuEr66rECseleVxqsbwx9PwYRSRHh9LyY0aVvPL/hWROeofKvyMsSvC18THh4eYt5eRbOYYb9/JTw8PMT0JXtFWXWdyrGoSJzd/LXw8PAQTz37hjgUmtFqH1HWVIuD3ywQHh4eYva64Lv8Qw8tE/6Ke0S8B7s+ajIGDBwqPl8f0OBXU5QhzpzYLeLy709W8a1g8fZM1Vj78/nGJ3VmiUez8aFx3hNCiECx0GOS+HZnkLjT3XIifYTn9CZxJr4jrkZnCGXKbjGziZzhYyaI47fvL2+PCmVttTi84i2x8li0qKxRthi2tqpCfPt8k3KMnCCW+cQLIWLE8hFDm9XJ0BHLRYzIEz7LPhAjm7gv+N1XqJpKpUi5tEPMGD9CeAwcKMa8/604cv0xjqf/ByjPSRAbF3QXy8IeTo6aEOJf/wStKt2PHUcVDJny3MOtsv/HKc2Mwev8ZdwnPE9Po8dzlCshISEhIfHIEEpSQo9zOt6Qac8MQf5Q1zxJPEnkRJxge2g5U1+ZhuNDyHkiFqYSEhISEhISEhIS/7qOqYSEhISEhISEhARIC1MJCQkJCQkJCYknBGlhKiEhISEhISEh8UQgLUwlJCQkJCQkJCSeCKSFqYSEhISEhISExBOBxuLFixf/25mozg7Fy/saMmtHjPXuXB1RQsSJYxyKrKaPuxVQSez5Axw6n4SFmwtyLSAtkDV7zlOtbYl9G9UF35EBhyjUdcJM/26rHGV5kRzfH4iBjRbXtu3BOzic3DpDjEuusW2/D5HJeZhbOyDXe5TXV9SRcTOQo2du4+rmgGYrVnBaoiI3kTMXL1Jr7YiFdkt2jP4JMjl/YDsnL0aQVqBLO3szNOsty5QlRnDi4iECwkrRt7LBvL7uawqzuXrJC++ztyg0tMPJvOlVYJUkBJ7jcHQFPdq3uUd6zanMSOC872HO+qWBuS02clX5q0uL8Du2n5MXA0gtb4O9o7wVs3zF3LjkxaETfsTElWNmbY2RTJOailLO79vIKf9ggoODuX4zAd027bE0+GvrLuXluWTGhHIuJAhh1B6L+rA1NRXkJEfg6+9NorID7S3u7wq0zJAzHDl/iag8A9wdTFCvt9mcee0i2w97E3ErFR0LO8wMtR+bXfPCnDCOHjiM7+UEamT22DVc51ZM1CkvDpz2JS5bnc4uNs3ylBMfgpfPES6FF2HnYo+B5l+3++ADa/C6qKr34OBgSuTutDPTBrK5eGgb3hfCUeRqYW9njnYLcv7XqK0q5XrwKY77nONauh5urpYN1svSbwXh5XMU/6gy2ndyQKuuipyUSPwDThJT49zs2r26yjKiLh/n+NnrJGnY4W7V1FywkqzYII76K3B2skHrIcanv0cFceFnOex1htDr2RhY2GFe36frykuICDjO8bPhpGja4damMb9ZoWfxuuBHZI4MNwdTNJrcWq+sTeTErgtUW9hieQ9zl00RyjriA09w9Fwwt6ss6WRr0OCnuHSUXSfOcTO5CBPbtsh1WrbwVJR7nWMHDuEbkECVnj329XV/02cH+08HNLTrFK32dLT6axONdXU15KZFExR4mutl9rj/KWxNWSFXA4/jfeoisYVGtHcyb8GaXTV5KVGc2++F3/VIhLwNliaGqAO+u9fgfUmVp7AbkWDh2jCePh4EGdG+nAnNwc7OGm3NO88wF/+NuwgpNsLdsSVzKA9H5rVDnM9ri+v/J1dTZoScY8cRH4KDI0mvNcfZRs7f7qbFKRz1OsJ5vyBqzN2xM7kfyzGCvOQQjh2PwLadHbqt9AOA/NuX2Ocfi6Wb833ZLPsrnohRPsnnJ86kqKPTbNLRIPLoOt796Vz9/+rIam/y6wJPDp9X2UiO2LOKbXsvUqLfWMn6cnP0tO9dLHUtdVJjo8hOKsU40wufFG1MjfTQkplgbFhFyIVrKDUfbMq/fTGMwPi0e/plRl9l6fLtlFc+nKULdS1dSiMPsvdK9kPJeRD8Vv3OoXQNbEyNST1+kI0BRSqP7HB2+MViYmqNtayM8Ijr5JQDtZWEB/lwu9QQa2tzxM0DBKQ2ysuNC+HM8b1sOHofZkeKU/EJuEqllhnW5nqkR10kVmUYhmTfLfxxIQ9zcxvMyqNJjGtZVNzFS+wNTMTGxhrio9l38DIFlVBVUkmY3y30bGywsbEh6+pOLsWXtShLXV0LHX05FbfPEZDQGFZNTR1tPUPMMs+zITCv9fIBRO1ixdUa2rSxwiLPl01h9YZZM4JZtPYs6uo2WBlpkJtQQHX1/Yl8FBz+bRupGGGjrcb5Zd9xtt48edbpZRy7ATY2NmjG7mNdaOOtczm++9lxMREtLRts2hij3YrJG7/fz1BTX+8aEZvYHqx6uIEbtrEnRQ0bMxOyzhxns+/jb/f/JpHH9xB6uwZzcxuszfQbBuusMzvYF6BAV9cGG0tjNNVUbU5L1wDT7Eus9sttJic7eDcXUrWxsrLEPHYjR283+lWXJeCzdQM7L4RTVlHL4yL71m0OHAtCx8QS45I8vLYeIq7eEH1a8D78M3SwtrbE5NYmvOPrI0Xv5uegaiwt22BZ4M+Wa007Qh7HvljCschrhN8ZHFqgJnQD+2+pY2XVBouU/eyKqvdI8GH2j/7o6NjQRreSpJsVrco6vHIzKUpVH7m49GtO1/eRgPWnKaxv17qpZ/jlfGaLctTU1NDW0cc4P4Tl55u3dWV1JcEnDnFToU6bNjZYmshatFhUkXqDXadPo21igVwmOH76CHE5VSAEV46HoVmfr7LgDZyMbtVe1CNFKGsJObuX20Xqf1pgaRGwbiE/7gr9R9PXNjDHXP/fuTv19IajTS2ct05xNGvXH0DDxgYbGyvMjXRQe5AlioYuZhZWKEN+4+CNomZeKSEx+N+I4169Pz/xFiuW/05mfstz4R209OTknfqcfQ9rTezh7/p/eK4tHyW+PJFxl/vhD8YL9TeONjok7xRDZ38nNizeLNKyzohnPzgkVr64WNwUQojQ1cJAX19Ydx0hdocWNMYpThfb/zNemMllwtZ9upj31U4RdSVJKGN+Fu+t9BWHPn1LtH3xd1GYe0xsXnJSKIUQIuGCmNlXJmQymeg5ZYGIaxCWI3Z9+6KQyWTCoZuDGD75Y1FUVCFuHf1EdNDWETq6ukImkwnXwVPEheTGLEQc3Si6T/9E5JdVP3RdZZ79QXx85D5NkjxCaqqqRFWtykpH+slvxUIvleWn5PP7xLqT/qJOKYQoSxHrNu8UMclForq0UOz9ZZGIKFTFSbi8Svy6P6ZB3s5FC4T35Qvi5S8OtZp27s2rYuuuXSK7UghRUypOHtkkfK6kCyGECFgzW+yLVFmAUdZ6i98+9GpRVl1NjaiqUVkYK4kLEGt37BHpJUIIpVLUVNeIO3ZI1r7+tYiua9kqyR2iDi0Svwfk3u3h+4WYuinxT44VwvvbD0U72TRxtomr36LpYkNcfXppXmLk/JNCCCHyAjeKL/ddF0qlEEJkiF0/bhO56UXicVFdVSVqlUohlEoRtnys2Hhd5Z6wfqJY7KvKb+qh98WgFfUmoXL9xXdfHhRVNbX1eW6dmspqUW/DR/w+4X1xsd4aTG2TNpd1boX47PBjtnj2bxK3Wiz/KUDU1P6pErPOis8/Oiyqa+ruXb8B34ixa+KbOXl98aI4n1Uf+NZyMX9Fo6Wjox9MEhsvhIv//rpb5BZWPuJC/DXKujpRXd/faooykLQezgAAIABJREFUxYEN34qrqi4tDn/1mvDLVuW3Ovpn8dEalRkZ///OFOsa+sgxMea9RutHV3/xFJ7HSsWFE7+LAxeSWk3/5PyR4nBqvayEjWL6Ij8hhBAZxz4Tc48Uq+pWGSt+mPd7q7KqKxv7yPWfR4v111TuTdv10Y9XiiPl9zn+B68Ug36JaeZUEr5abNoQKmr/3B6EEELEiSmy9uKt5WdEcb2Lsq5WVNdUC6UQojjntvhy+dfiarLKclpNVeM4t+qZhSLsnjL/OZS11WLf8nli/7WCu/xWjTIS/b8LaBpY3Ni/RPRqp5qPpy3e1sRyWbxY2Lu3kMk6iOm/bhZzDY3FxBc/FbOHO4rZ2xNEWXa8eG+kTHR/63eVhamCePH1KwOETCYTT69r7CNbZ7oLe/sx4r2ZI4WNTCZkQ+eJg6n54tjil4V9nxlizmBjMXr0u2LBpO7CeOCrwl8IIQqTxdr5g4WBvkxYOXcRK0+HiEohRMjSwcKuc2cxvFs3YSyTCddXvxUxQgiR7iVGGhgIbU1toSdTleXTCy3XU+7Nc+KFvrpCU0NTFcd+kNh9RtUuFNs/E0NdZUIm6yk8fzslhBAi59Jq0bWdmfj8ohBpQTvEmM4yMWhpc6tmN5cPEh8cbrS1mB3wteiooyt0dFRrF/sugxqt+wkh4v2PicFT5oqbGSUtZ7YJCZueE/9ppWyt0fre7D9MVY6CxBQ1zHrdfZTgNqAjc2u7NnPTk3fGqXMcqxbdYMC0RWhsCVd59HybktK3OfLLHMqU9bs3opIAPy+UPb8nI68rNblXWPTpdjIZhLtMhtaNqyS5aPB0QCxXIwtJdZ6AWnUB3y3awNSfT/E2QM5NPnz2e3Yc/oza696cqnNl66lTmBfGs/FiEUp1dVwmLmXXhmGkdG7H1J6ud5XD0rENM8YaoaP58G9p2to6VMaHEZNl3uyI659GU1sbhJLS5MvsDLPklXmqoy+lEA1HzqiByMiGigpAFyFUuwAAVFUj0jIBVyK+78bhgnd5Lz+aHEUhUZnj6GSlTlZsLAnZhdQ1pGpKp0EdaWYCQg1EQRFquoWANeY2buzYvgXTp0yJC9qCV/wonqYCjWtRpJRVNoloSddBLhhpaqINiPJU/PyuYuQwHnMDlWBNLVV3qAz9hogez/DWP2KTXh25tS1dempi1MRVWadEXeNOPaohwm8CYzG1dUOx7RD7lMUY6gSx+2g4ddPGM+sfyNm90NLWhppiFIF/8FvaXH7qpnJv9/JbpL/2Gm/9ITDTduWnpe0BqMlQEKLw45XJ36OgHWNeeId3pw3GWOuvD2c0derVMuL34dNrMnPqTy00tLXRAMpTr7InRI8ps0z/0bI+SVRGBLPX7yrnfBZSZDOQj+cvZEwva9QUiQSlXuelZ74lXcuFybM8mTelH7IWtlGUdU37qBoiPhnoze1N0/gufQQ/VocTlBBHZHopQ+WP53hTTV0dLXV1qMom/Mw2krRHM85a5SeEQL2h76khElKAHtTVicajezU1lBExwDiy/dezLESX93qFcONKHJVtu1NVa496bTYxIbdp3B/SxsK+Pc72pnfLir4NDMbKpS9Rny3jcN0I1CrOsf9COt15A4+8FGJvKihvkCXDvqMrdqb6aOloQ20xqYF7+EUxj5+7q0Lcade1mYEE2tizRPvBp9uSiCC2HLvE/t3JlLYbzpcLFjC8yx3VDh2ce3bBtI1Rwy6qmroGWupFHP3kZZZfrmb8G4sa5gvN+nxURazEr98LvKPxuBSDVFSkxZOfr4Gj7t310XdCf8o6tW/4v6ZYwcmgIr7ZfgoDoCgmkF1rT/LO6/34btwnjDsRzE+WxURtWcToPl+TvvNdss+Z8FOZDjILG37Z7M2np8oRAMZOfLElgNlj5vBaXuOkMvuPaFJHd0D32b3EbeqJnl4q2z9eQ88FbzLKZw1jtqWRvfwTUt02cDjzG8741qKW54dGrzc4Oe07qCrG7+xZop3a0n3BMf5TMof8novweaYz3otfxsc3B9ehkzhbUsL6+b8weuX7ON1HPZm5jWDXidNovBPC9r3vN/MzHjuJJdbjUdeFqPVDWdm/jvmD3ubo4susqQObfi/hs7OKcb4tH9lbDPiCfQeGE6mrzZRRfe5SDTGxMuW5cb0xlt3/WkNPT5+imGBSu3fH1vjBVET+/YVpVjJxSWq0Nbh7QHSb+iNr/uyoqYtbjwFkFzsyycOArVtaEF5TQ2lpFZZdHdHSAC1jZ3r2aI8BgG0P1GI2k9bXncE9A9m5O4v2z74M1VHcCi+n7sIFouvF9O7dixLAuvt4Xk/6A99z59DMycXYuP996YxadpnAJ13uqzpaRVtbh8rYq0RmDHmsC1OAzIBjnIirYuC0MbiZyOpdSygqqaChmxvog6YWoKSqOo/Kqnp3TQ0wVJlRlXWbTrfaTC74p5CZXEZ4WgWdrDTJjLmO741EGhUe2mM1qCPGVFJWXkxtHaoWq6ur+gHOo9/kucqdXL6cjm2PaYzMU2JCGeFXA/HNLmyS+644DHLBCCiOusze4ASsbAcyfoTLnzpjKb7bYxj00RePtO4a0WbAqwvwevXP7hkUNM2upbnqr+1Afn23kF8PXURmok+Prt3oqPX4jqFqinK57HuepDwbvvxpEneWhgle5+j02Rbmd4GScyv54Hwe/SaYU1SQx83weBZtOM2MnvoEHNjIpYzuTLSXt5JSFVHnExg2ZWwz19zLR/GKraDH06Ppat2ajP8dUlMSKKzqxe9bz9O1bQ27lnxBpMtK2ubnEH0jjtW7z/JsVx0ubF/F+dw+TLD46zZRV5dJaXkTBxNVPeq6PsX49EwuXEog8XYm4YoShrr/c7p9f6YsMZJjgeGoafZi1st9uDOi1NZmUVYOmAFqgPGdV7gM8pv1EVVetaw6MrpXNhcuXiT59i20RAZVtUo0KzMJu3CBlIYIBnQZYoyDvSlCpFJcAtQvhjGvb9kukzn6aQmrfAKQ21gzpLMezghKcxK5euESOQ2yLBhi2RY7U31qivMIuniOhLw2LPrlGZrXYB2KKAXtXJ1Qe4gXXUVSPLX6Y/lt41baW1Twx/Ll3HZaQkd9AFt+uHToHrFMmbTsOKOSolj5x3Fi4t3o07F+XKGcoAOxjHp1/gPn6UEpU8SSl6dBl3ssTPssOEWfJv8ryy4SczWTavmFehcdOvSyozovAD8xgK8sAYzoNMoD9505d8m7X2SGPek+rCd6egC22Dqnk5IGOPVmqi3s7WaBtrsVDjcBUUZ++i1iw8vJTE6uF9CWWplKJ7htO3e69u2MtgZ062VL8gPn6q9I4PjXm7lpbIamlgw9PbtWvqt4cEycBzDfecDfiqOrp0dBwGVSCjr+/7swNeo8iNFDlBzKLAUMWg0P6tg49WPG/bxyaGlhaKBDbFQiNS7dqCmMIzQsDqv+oEZX6iqT0NYbz1Pjs1n/+j4GzjEFg55MGqRHVJ9nWDS2+W5t2N5zBBsO4stFPSiO9+PTzVHU1inrfQvIzLZCKJVcWPYD+U6jeOb53i0opz8YZWUlGI97i+e6Gz9iyS1RxOltywkpeYoXp/dAlrSfNZcmMn+wKdauHdC4IEAIijILqFDXQ8dEjqZ2JQ4dO1OVVwYW+kT7RWM+dg4AzuM/58vxQK4/8b/mMLOXCQDdJr1Et0l3p15rZYmxPJe6ihpqlNVkpRfh0r8tAEqZKb2en89Icri89B1kT63HGBOGzPVkyF2SqokOOsTxAHUmTJ2IrXYK50+dZdCQUZjf+c4gL5StlePYYPtP1KMqD/6bVvHdhgy+CvqRfvWuPZ4Zy5noDOhuzS3fcBwmvtEQo6LT03zZaTx5t7w5RiXOhkb3Fv3IUbB9/e8Yd3+ZyS86kbPvfY72+IVJHaA6+zbl7TIBKyorM6i6nQ+YY9x9FK+47SZbWQ7ltaSFq2M9sPGDxj3zF7Ii2IktgZ/i3jSpMgXnim15vl3jx1Xnd6/iUtZgXp4xEsP042zy1WHeUJvHVPZ/F9vpnzMpeA2logaykrkV1ob+umDadyJvOu8jV1kBJeUkX9fGfWrLsjqPGk54WiE4GBP4x3lshqjalt2gOXw5CCiJgS3XeaGfdcuCHiHp8efZf/g2fZ+aTLf22lw9tpU8j1dwNwf3IYOJSy8COzlX9vpiPexNAHpMHMPJqHToYUOsfyT241TnBibtBzP3/cEgarnks4VsvW4Y6WqAbjdmf9ntnun3nTaJg4m54GLONa9AHMb93OBX1mcWX/apQnFpO0drRuKEOrgN460vh91DUio71q3FqOtsJr/gTN7e+RzpsZLJLvXeNaVE5lXSwcWah9mYdH7ufYal+VBBLaTHkRRlwaCGvRwFC/u/jem7X/DeS/3QB5KCgjh2O4/XZoxFTS+H7OwYSpXKRoGFUewv9+A7xwfP04Ni3n8cHa76kF5YCbS8uaJhPp7ufSPoNmMOwzpYNXrUtGWY2jbOZL/PaMsiIk8HEI1Lg3dKaga1lUYc27Gfa9k9W81TeXEooRdC6T+xF3p6qSjibOg94a8yZUCHDp3xV1bzn3dfavYBXl1l0V9EUlFZmU5RMWRd3sJ3K0pY5DOfv/0qmHaJE4nmfLdhCbr5l1j9yU80PUtKSk2nLKeKjb8cpNT13u2/OSXk5umgVMKV35YSo+3BjHlDedCzk8KCfByfW8CAdg8oAJ4MHdMbK8eKzw4m3K1P1ZTcy2JeP3chl5uJIc9/J27GnRMz2tsJudxBvPifFeKbKUOFsVwu5A2/WeKiEEIUp4udX0wSVuZy4dj1BbHA01O4931PCKVS/Ph6b/Hb/mtCiMtiofPz4mzWncQSxfpZA1Ry+vUTT71/RqQLIfzXHhYfvTVB5e7cS3y1O1RUq9QVRUHiGfHOAFchNzYRw99fL5ILH309KWurRcjWueLDQ3GtB36U5AWJdzw6NalbuXhjd2qDd/rx9cLM1ETY9RjZTL+3JDZUzBrRSxX+j5TmIm9dFLMHqWQ9d5ce5t3kBniJPq7thHlbJ7Gs8UGJuN+/EJ3lctG37zRxprVqqcwWe76YLuyalGP0gjUio7QxSOapb8UnPsV/LaMJN7a8ImwsmrS5/h8JIYTIjjghnu/XxL3DaOF16Y5OU6HwWTpHdJDPFOf+JO/ikteEXC4Xvd/eICqq67XT4q6I+X26CFNTc/HOx5uF4vGplwoRv0b0a1JXlrZOYnv4Hc8ksejlgUIul4u+z/0glE0VHhWBYu4wuZA79RCf77oqqmob46yZPFgYG78nQv+UVHHMabHm4DlRUlXvUBAmPhrds1mbm73p5j9Z2ieOuJMrxGB3uZB7vCguNFWvTfITrwySC7mLh1h6JEoolULkx9a73akvp8Fip4+qvqryMsSSF0YLuVwuRv0W2yyNqpIc8eVEVZyhS4MeT8GUdeLKtvnCpcmz7f3sOyK0/jODyqwU8Z9pw4VcLhfj1jbXl/X/9g0hl8tFr7fWipLKumZ+x99Vyeo66zuRWtiyPmdddZXY8PazQi6Xi8FLLjZ6XPcWEy0tRNu2HcTiX31EYUUrZYlfJ/o3KYeFtZ3YcqPRuzo/RRzctVpE5rRWKUKUZsSIBaObPEO7HmL5nvqeUlstQnYvEr2c5UI+dI643Gw4PSOmyd3EOyvONeiYiuJicXbtF6KtlbmwduwqfvCKFeVNYuT6rxNLjv87OtvK2mqx/5d5YldQlmhdjV8pssMPiun9OqjGoPHPiSV7o4VqyE4QH/fvL+TyjmLmbxuF54jfVFGyo8WSmS5Cbmkrpr+5QIzy6CJG/hIp4gNXiiHN1ghdxcdbLotyIcTyCRPEf7//QHR2kAv5yHdFcFq+OL7kVeEslwuHD0+Ig4snie6v/iyCV08X9h37iIMxhSJs/fvC1MRYyO3sRKcXvxbnU4pE6I+qdvv0ZztF4elFQi6XC9fxbzfo9x7/ebpwk8uFfMAscTGx5ZKnhJ4XE1yb5LfnJLE3WKWI7f1F/dg77X1xatVo0WfcZ+J6gRAi5bKYM1S1Pln06QJha20p5u2NFmeWv61Kt+E3WmyOUXW44rQg8dn47sJMLhc9X/9J3M57oMcqhBCirrpcnPzMTSy69OAyhBBCTYhmGnz/ChXxh/h2fSzPei6gl91fX6fxf52ipGDW7jlG3zkfMsLsce2aSUhISEhIPCKEkpizv7PzhinvzZvScL3gg1KaEU1AyBF+/TyJL3YtZkCXv3eqknjZm/++/y2O879h7pi+WJvrP1R+/i+TGrCJr8+UsGDxe3R8CDlPxMJUQkJCQkJCQuLvUpwSxulLoRRUaNCu2yhG9bH/W/Fvnd2DX2IJyKwYM3IY9lYPcwOnxKNAWphKSEhISEhISEg8ETwRF+xLSEhISEhISEhISAtTCQkJCQkJCQmJJwJpYSohISEhISEhIfFEIC1MJSQkJCQkJCQkngg0Fi9evPjfzkRdSTLXIxRoy82Qad9ZK1eSFnGDa2l1ODax+KKsKyUm4hpRMXHkVVRQlKvEwuJ+Lua/P6rzkwgKuYEwdsS4yd2/dZXFxEaGERkTT1JSkuqXXUHbNmbNLth9NJQS53+FpAq9ZldX/L/27js6iqp94Pg3vW56QpKlhSK9BxCpIhBAqqIoioII4msDQZAqSJEIAoqIAgLSe5cOobcAIYGQBum9t012s+X+/tgQgmBAVMj7e+/nHM4hMzt37p2d8sydu/OUFGZyKyICg5Mbin8gvelfk0/4tQvcjEgit8gCNxf7srSBmswkbkQEcSdeg5WjE/ZWxu9QX1RA7O1gboSlUmTlgrt9+deCaMmMDicoWUt1j0e/+kqbl0FE5HXConLB3hknG2P79ZpiokKucjPiNjklDri42jwya4QmI5GQiGvcSSzB2tERO0tTEHqyEsIJCgolOjaWtCxTXLwdK0yQUFJSSF5qHGFxMWDjjsLKWKfivExuXrtMxB3jfpKcU4TCyQXrCtJyGhnITb7N9Zh8vNydStNIasmPj+RCUChJaTnYKlywfUjGlH9LVOBJbkQZ2xGXkAQKz9JtryY1OoKbwbdILijBuYrrI5JJGFAXZBAVHEJo1B1KzO1xdLDFFDDoCogOuU5I+G2y1LZ4l+7zGVHBBN4ILzveMg0OeDv/r7xOrpjkqHBu3ggjrVCHs4fLfds3Ny2a6zeDuZ2swcPbFQsTE7R5mURGBXErMgcULmXHSPSVkwRHxpZtR62dF6525oCGjLjb3Lx+k6TcYhzdXLAyfVp9FVrSE8MICr5FXEIBVgpn7EvrayhRk3QnhJCwRLJNXfB0uNfy/LgwrkdEkVxoiaeL3b1Uq4AwZHLjUjg6e2ccHnWMCAPp0TcIDo8lXafA2/neyT4nKphLN8JJySrGztkZm0cctwZNMQl3QggJSyLXvFx91SlcOXuVyNhYYmPzUdTwqDB1LOjJSb9NcNANbkdnY27ngkPpq5SEQU/6nRuEhMeRrnfE2+lxX3+eQ+i5YApsXHCxu7cdtUW5RERcIzQ8jkLscXWyeYq9VIK85EhuxRfi4uKIedn18+HXvX9afvw1wgud7tuvKrO8uDAuXg8lNjaJPL097k42/OWQozib4ODrhEdFo7f3wsX28a4hqqxYgkMScXZzwcL80XuIKj2Kq1FpKDzdH5E6oWKVIjCN3zeeb46a0rZ1E1zK3mmmYvfE93hlnZavRtxLiZV06jt+O5RISnIsifFBbN2SwyuvPE52gwflJqQTHpuCs6dLWTCjTr7BmrmjCa31EZ3KvXVCr8rk1LpZfLk1AieTQhJuX2XN1psM6NMJmycMFM6t2ItZq3o8GJblsLRXW75PaML7/RqXTVXnJLJ71UwuK9rTsdrTTc8YvPMXlp4IJD8+i9ATIWR6NaWRtxXk3GHnofMkpdwgKiKPbMyp6lkFa5MSwi8c4Pj1MO5E5VKoSsTEvQFVSs83eUnX2f3LQmYEwOi+j/j+itI5dSKAG3dCiQzPJ1+vwsmjBo5WEH92E/N+OUlOXiYlxQbsXOvgVlGcmx3J1gMXSUm7ye2IPLJNrKju5YEVRZzY8TO7j0eRm5dOXpEL9VpUo6IwqLg4h6zYMA7sWUa84iVaVTMmVYwPvMKqdetJKSgk8fYtDp48i3fjLtR0rThxnDr/DvuW+jPnWCFDerbCwtyUovjz7Nx6ktDYWBJvh5FaYkddn6o8raykP334ETeFCZkJCVzZ4U+E5yC61LUnJ3AZPxyJojAmhqAbx7lq0YaO1W3/tBy9KoPjh34j6FosUfHxBEVdR1GtFUoHCxJPLmTb4QTikuNIuhaAunZ3fJzg0MxZbMvJoyghgYjTW1mTUJ13OtV+Og1/xrLOL2LZ8VjyYmO4FnyYUNt2tKtq3Btzrhxmx7mbRISHEZdrRdOWdbEtzuJMwHGCb4cSGVFAga4Axyo1cbSCn4e/zzUzc7ITEri+ZRoXXN6kV0MHcq+vZcGBUIpjorkeepqrNKCjj/NTaV9OfBTrN6wiLDaNhKvxRMbmU7XRczhYQeq1Pew6H0FcTAaFWeEUuzanqgMQe4zv94SRnR5NWkI8ibaNaFCWijWPM8vmsnTfFajSjGY1K86Mpw3fza9HI0lNSiIn9TaZji2o7QwkX2L0F7+Slp2HqiAPYV2bml4VX2ITr+xl76Vw4qIzKcyJosStKUoFkLCFYeMPYWZRQEKCnlrtG+JaQURRlJPB1jVLCIxKITUkhZshCXg0bYKrDahD97DmRATJCcnkpkWS49QCn0cm/yvk8trFrNx5lHirpnQsTUeqzU3nfMAxzgeFEh2TBE4+1K3uzNPq6hAGPQFrp7M/zoP2zX2wKgt4Hn7d+6dl3jrCleLaNPF++je5l/edw6Ze9QqvK/dRxfLTzPlcyy0gMyEDraIGDWo48xiZ0P9QTgonAk4R8OuXXHF7E7/6916JlRYeR0xuIW4uDn+4ORHEXNjB+x8vp2s/P9ycHl3r/Lgr/PLdRDKaDafl3zmV/L338/8zghZ2E9N+T3lg+q7PewvTt7fdN+3awpfE5AM3RaEQQp2fLqKjM0vnpIuNc98Tvr6+ok+fsWJvXLbQFeeJdVMHig8W7xeFJUJsm+Aren4wS9xMLhaGuA2iX4NGwqfWc6KFr6/o0LWn2FuaFOXOsl5i5KxFoo+vr/B9bYw4f3cNJxeLQQsDRH72KbFv+QmRFJ8qdDq9EAVZ4txPn4menX1F6zYjxJaAW2X1VeXdEJNGDRC+vr7inRnviK+/PiRE3k0x790BoprCQzTw9RW+vr5i0q7Y+9r5YzcH8fyMk+KPkg7NFl/sin9g+r8tKyZGxOephdDpRMz2WWLsbmP2peSzO8QPe08LnUEIURgrVqzdJCISC4RWlSe2/zhTXMswpv2JObNYLN0XU1bezvmTxa4ju8VbU3Y+ct05kVfEqvUbRIrKIIS2UBzZ86s4ei1dCCHE+WXDxarzBUKvF8JQdED8OutEhWUlBmwUi36/ZPwj/7ZYunqLiE1TCaEtEPt2/iqOXk7+y9smdOd0sfxcZtnf6gKVyMrOF3ohRH5quvj12xUipixLjVqcWT5f+Pl+Li78oZzD8z4Sa/YdFmPmbRFFauN2yzy/QszYZMz+UhAZIL5askqk5Gn/ch2fVHpcqlCX/v/XwR+KgNKMOur0KBGdWSCEECJw51jxwsKICssxaNUiLTVeFGq0QgiDWLJwlNh4JVsIIUTQ933E6ivGcu8s6yVGbTWeC7LjUsXdBGoXl68Xv157NplqngV1WriIyzbmtzm34T3RY2lpWrOsi2LBlI0iMaNAaMvtBrm3g8TqdWtFkkovhK5IHN+3UhwMNB6jadFJ4m4Co9V93hUHso3ptTSZ0SIy3ZhKLPjQ16L7wstPpW1CCKEuKBAJSWmiRG8QmvQEsX7JHHH30DvwzQfiaKKxcdrgb8Tk1cbz6bUFw8SC4NK9MX6X6Df1VFl5N9bOFJ+vvin27lkutgfcfy59mNOTe4uNUaXZoSJ+Em/7G4+xjIPTxeCVcUKjEUJoI8XSiVseWdb+bz8RAUnG+hZe/VZ8vT7cOCN6hXhj+qkKlryfVq0WifFJokirF0KtFnvmfywOlia+Cpg2QGy7U1rfsB/EiIVB5ZaMF5/59hJf/3ZBlEtiJyL3/iQmLA8UlwKWiiXb72VNizq9QezfEyQKVDrxLBh0JWLrwg/FtqCcB+Y9cN0z6EXE4WXiNT/jdfLzpXvEvcRECWL+4MHC1/dlMW79TjGzTTvx0cRFYvJ7PcTkvYmiODte+I/wFa9+vU1otAYh8uLFz1PeFr6+vuI/WxPKStn9RV/RvfsHYt4XI8SLvr7Cd9gscTQtT5xcOkl0f2O8mPFOOzFy5Bwx7+NXRbu3p4prQgiRnyy2fPOOaN3aV3TuOVBsOHdTaIQQob++I7oNGCCGv/qqaOfrK/pMXS5ihBAiPUCMaNNa1PCoJpqUXvMXPeJwy4m+KCa8Vk+4OnsYl+k2VBw4HyOEECJ172IxrI+v8PV9TczdeM74+aubxCt+HcT3gUKkBe8THwzwFe+svHlfmWELO4jPdyWV/Z0d9Ivwq1Nf1HqugWjl6yu6DRwqAuLuff7O2X2iY98RIiz58bIhCiFExLI+YnLAY3/8oZ75GFNDSTFFxSZYPiSRcM369vi1uz9ffeNRC/H8ZRgtXV3xG7uUIo09CB1bx80n97WVBAYGsm/Nh4ROWs9tSwf6D/mAhlVM0Rtg0NTdDO3oiarEgEn1IfyweiuzZv/IqcBAzhw/SN+699Zzbq+eRYcD+aWj4IvFUWXTb/4wmBr132RvuhbvalUwMzMFO1vqDhzLqo2HObh/DjnHvuBErPHzoeumUNJrHDsOH2ZcC2eOpxWCQyMmrtnF5y0GsS4wkMDAQOYOqHFfOxu1dqZtkzoPbBNLSxtEcT6FGsMD8/5NLjVrUs3BEl3eLTYHOTLkBWPvmEZDmKozAAAgAElEQVSjw9rSDBMAU1N0CSmIQhVCCHQleiwtjffhQmdAeycOgIiFz3NQ8yKdfCzQqwsp0BgAAxpVATnZ2WSX/StAC+h0BkxNwMzMBExAl52HPj0TAHuFGxcPnyUlJZSdP/qz4uINYtBTnJdbrpxssrNV6ACNWodN6SN3TE3RxiYhiooBEyzjzvNhz8a4urrS8r1vCE3VP9G2srK3xcVZgSmQH7OB7GrtqWl191ATqHKyiItOo7jcMtErX2Fpuh99G9sgNIUUaIzrdn2+E9Znf6BnT0+Gf3mExk1b4urw9B7lu1evghVgiF7DzpqD6eJofPxl5V4Hx4ILvN3MhQ/WOHFgdMU9mSbmVnhUUXBiRj9cnV24w1BebWbs8vF5cyhHv2xHz54DWBjUhYmvGnNiO1evgiMgCqO5hAkvenr8m02tVKw86mGeeJBXGrkwdlcjto8wJp42JIZxMiuSz/tWo0rT9szZfh2dKD1GEMbzESboc/LRp2UA4OHjjTVgiN/Gap+36eVs7Lm3dPWhqmUUo31dGLowjxVvNXp67bO3p6q3BxaUkHprCxEl7WjgZZynLi4pewolLKwoCY0EoCBfjaOi9BG2uQXFF64CkHXhV/wvKJjS1x1TtYoidQkGAcKgIf++c0AuhcVaBJCfp8b+7qNtSyvUgdcBcPOuyZnNG4mMTObaqa0s27afo4C+pJi8+8rKo7jEeIyq1dp79TU3pyT8trFcMytSfhyIq6srrm0GsO16+SP+QeZWViireWNjqkMVtpTDGd15vpZxXmG+Gjvb0vpaWaG+GlJuSS1p0fFk5BVx96qQf+sgy46nMapHVczURajVanQGAQjSIy+wfOUXNKnrTu3XpxGUZNwmT4teraJEa4L5Q675f7zuadWFnA0p5NuNhzl8+DCj6xWy57ejGAxaFr00ktrfbSYwcB1vZPzOIvsh/DhvDJ8NeQmtMMHauRoTpi+gjqedcbs4VOOD2evYOa45kemasnX0/3YvHXX70NR/l/2nAglc/RYxs3/Ga9DLVAuPQjn5GE30CWRUH8cM7xvsOS24cj4Ihw4jOXjoMDtXzkd/9RzxsWnUG/IDfevo8Og/gYALgbypOs6eUxng3oWVly4zafBYdpde88e0rng7Ofm0xf+nFfTu/iUhgYEEHl1Lr3Y1AXDs2ovp3x/m8OGfqXe8Iz9cAaeWb7BwSA2S8sGjaR9+njGadFXF1zDn5qP4btFK5i79jQuBgRzduZYu5Z4UOzhb0qFdbexsHv/BvI2tPdrCXNTaJ49Rnt4V7k/kBB5mxwETXhz44KPp5iO3cOAP0yzsmvLJ7kA+AdJDF/H2+FVsX9+Wi+5tWHD32uhal44NZnMyFoY8Yb3eXDSOOi5A2xpw/t70xp9u4coIBVeP3xufUpQRzsEfF3MiVoVGb4q7twN3Y9yGb4/H4aulTFxTTBVLdwYN932s9XeZG0uXh0xXODiSuWgWK7yWMLaL+xO27snkhl3i+OWbNHulB83KxvWqKSouufchayswMwMEWl0BWm3pdDNTKN251Y61KQj8lY+uZnApUsNPPf2Y2M2Ci2t/YtXpm9wrrTkTN06kKiVoNMUY7u7nlhZgYdz+9ft+Tudf5jB+fCZ1u75Nn+fAnlQOzJ7H9sTMcrXvyIxN/8GCYoqKtfcm21iDqRmY29FjzEqixqwEIOryas6dvEWjN5r8jS2m4uaBYBqMHFNumjV+E74hbML9n9QoqmObvJGPxuUSHJ2PbdOuzB1Qk4LIaCwGzeBQlzWoY6+xJSSdArUBF+uneU+pIWh3IF3eHnbfVJea3Vl/PoHAffPpPeUM5xZ2eUQ5TvSde4CsT1JYsmYhO87W5M0uVcm4fIu+S6/wxnOQvmE864KKGNfq3rCAnIQk7O1ssHf+30oV6N1kEDsv+nFu59cM+voCh+e0JyMthauH9zJpTRRbOtlwZONqzuY3oQlaNCXFGPQYz+oWFsbjpEwJoYeC6DZ89n3rsHFsxc9nkgg+/BMj55/iyPxeT619mvR4rgSdJviGN++Pf5G7ZxS9Pg/N3bjBBLC7+wgxh0JVuQIcjY8jddbOeIpjfPTRRTJSY3Bo50zvjj5Yqi6y6LOfCb+3AO1fHcnwQa1AZFFUPk5UlK696XCujZ/NmDnjcPWpRecmNfHEQPz1vSxdtJuksgWq8sq4j3nVt4axvmUnLROwLa1v9aGczBpaWvUj9Pt4L69tGFzhNinJSSMk6BRnTzkw1r8fd5/WC5FNsfoh9QWgFpuybt5Xjt5SgatJBFO/HEtBZhSaWjDQrwG13SyJuB5IcY13uLjhIAqTWPYf2o6y/5t4PKUhl6nHt3DzhhWvv/Xg0J8/XvcMqZvYvWovR69eLZ1iQ/Nu71GQdoj9ogfHlQDO+L7anZb7Mp64TvZOHWjetyO2tgA+1G4Ux+3Y9tCwM+/Xgi3tvLBtUI26YXBen0fSjUOsOxzDb253v4fauPcxwwfwqd8S3xfbYGUO7TrVYu8T1+rPpHFmyffsCEshr8QKT+GKzz++DiO3hj2Y27DHX1rGxa0Kkb9M4UjNufRr/GRDDp95YOrafgBDX13Kzphc+jTwfMSnb7Puo700/3IETao54uHhRQ13Uwy2Naibf4RjadDDEyhMJTypFo3cgUTIzstHbzAQduEox0/foU6Hu+WpyS8oRKeDmANruZJRm74j2j+yznYOreg0EEJ2n0b4tcUu/CQx6i4sWvY26uijrN6wvuyzp1ddo9v4X5juasGdA5P44nQEH/cy9o4KksjJhYLUy6z9OZzBi9/B7RHrzsvLwWPEgqcclBZy6feNXI32pFWPV6iju8Cu61683twBtxruaM8LhABVVgEaawUWjg6YWZTgXt2LouxicLUhJjgOp5bvAtBsxAY2jQAyzzLs+wwmdjP2hHX+cAqdP3xw7WpXByytbNEW69AJLdk5Gqq3NuZDNnHwpN8XSxhCDiG/TSWk7QTcUfLq/CW8+pCWFNTyRH1JZ/x/Zh46hTPmCjvUBQXs3LSb5v360dDTkdDbYeSYtPp7my3zDPuyuzOrWvmJWoL3bmPNnize//UT7vZRNRi8mE2DgbwQJq0IZ1ov40IFyYnoimyBmphQTG5CMjqNHp5mYFoYyc6kFnxUbtjXqR9+IK/XW/Sra4O7bRp3ElPKLZDFyhFTyHn+bd4f2QFnoCA9nWMBl3j+ZT+8vEyw18aTW1gIQFpwICbP5QMOmJgkkxaeCa3u3rYLElITsHFsfN+PEf+/O+bvj/61UfjVsqCKTQoxyWkAODTsyICGx6juaQJFxeTcUOPWC+xdFFhZ26Mt1qI31ZGZVYRnC+W9AoviOJhch3eb3euluvjrr8S90I/BDRS42meSkJL81NqXmXSFQ3uDsavbibc+9uTO2d8xNHmZmo5Qo1ltklIKwdue0GNBuLY1BnfPdWjEwVuZ0NiN+OA7eHY3BtFVWrzC/GWvgNBx5tBq0m26GH/cZdeZrzZ1fuj6G77UjEMxuVDLiYjTN/DsPrFsnonfVDb5aUm7vpMtx91ogim0GcyCTQ8PKqs28iEnVQWedoSfvoGLr7G+p3/8kbAWPfig/XPExt4mWl/xoFBVXgT7twZgWq0jw2c0IvnUBm42fIvG7lCvUxPOxOVBTUfCA4Kp8uL0ckum8f2Ib3EYNJw3ezXGGnCu04Epi4wXutvnf+JQSldquxl7m+t37EX7RDMsLcAQn0XeHT1P8/mb8uX3aHnnM+5kqGihrHibmHn3oPvLKbzw6Se0quZ6b0ZRAi1NdnA5G9q4qLhzKYQYvMpmp6Znoi9x4szB40TG1H1IyfdTq8IJvxrOCy/Wx8oqnbQEd+r9WTxmbk+thi/Q1rkr497rf98P8PTqvArXU1KSiUoF2Tf2s2azihGLB/OXQ7eME2w8Zs2U3zbiWhLK+qkn7+vxTknPoDhHy95NJyh2bv4YBRaRm6fHYIDQrWuJtWxC91daUPEvIiqoXloKjcZu4W8NE/57IwH+GX82xvRBZ8UomxdEv4HthFKpFMru74lD+cbxUkW54WLRuP5CqVSKNr5viZVX4oRWCGHIiRXLJ/YVPjWUosWA0eLdPh3EC+M3CyGEKEi5IWa90V7U8laKuv3HiQsRKpF64jtRz9te1PD1EwdOBIjBXeoJK2cvMXH57+KzPs8JG0c347qVSuGq6CO2ZhWKwsQg8cXAJsLbWyn6fLZATH+/vXh77l6RUyKEf+d3Ra9+zwulUimqvDRcHA3XlLXm2oZ3RRtPpfBq0UMs2RUpHmfEz63Nn4jPt93+6xv578i+KD5sU0fYO1URSqVSeLk5iKHrSsfo6EvE7Z0/i+rVqonn2vqJ1WeThE4vhBAGkR16Xrzr10EolUoxYmWIKCo3Ji476oz44CV3YatwEW+vjXvYWu8x6ETiyR2iQ/NGokbdRmL23jtCU7qx7qz+WvgqlaJLl7fEgWvpokhTcVFCrxGRW5cIpVIp6rXvKzZcSBE6gxAGvUZcOrxMdG7TUCiVSjFszkoRW1zxWM6b60eLuj5K4eGiEE7uXkLZdep98xM2DBUTDqn/sFSu2DfjHeFJP3H4D3OKMmPFlP4eQuHoIl7+MbS0uoli3YJRQqlUioate4kdxyKFXm94RCP/WVkXVojJW+4fq1R47ZqYOKyrUCq9xAsDp4jT2cXl5l4QQ7ERL779q0gsnaJXqcSZNYtEuxb1hVLpKT5ccEQklo6jzU0+Lob3Nx7TPd7/VeSXH/tm0Isjv04Qh6OezXi4Z6Xg8mXx6ZBOQqn0Eh1fnysu5N7dj/SiMGiHGNLZUyibdRaz1l8RJQYhhEEnkk7vEp1bNhbVa9cXM3ffLjtGhBAiN3i7mLPprCi/66hu3BAzR/cQSqW3aNP7M3Ew7sExf/8Kg15c/O1jUVvhJDy9vIW3t5do3X9k2RhTVVKEmDS4l1AqlaL3gsuisHRopdCpxOGZo4VSqRTPj1wkEnPv3ycOjfMWbq5Oovk7/iIpt0RURF+ULZb+Z7BQKpWiy5Q9Iu/u5g05Il6pVVPUq9dMfL1wl0jKrrgcIYQoiLspPn+1h1AqlWLA4itl9S3MChLj3+kslEqlaPfqKHEyU1VhObFHp4uGCoXwqOItlEqlaPRCj7IxptqCNLFo1CChVCpF168Oivz7znNHxMsoxXv+h0TeH8o8O6u5qOLuJOr1GSOCEouEEELochPEhpmvi/q1vUWD16eIy3eKxdM8o1Q0xvTBD+tFzLk14vUOTYRSqRS1Xh0q5u0MF4VCiMKMK2J8565CqWwp3l6wRIzoukQIIYQ+8YqY8FpD4e3znHj1nfdFu5aNxcs/3hIxl38WPZVK4eliJ6ycqgilsp2Ytv6iKBZCfNe7h5g2+3PRuoFSKPuMEWduJYj9c0eIaraOouHkQ2Lz1N6i+YjF4vKiPqJqs85i541UcfL7T0T1qlWFsn590WaEvziVmC+CFvcSrk4K0XfaFpF3Yo6o4qIQz/X5TFyJN2777bP6iyZeSuH5whti98XcCq/5iUGnxWvN3YStjaMx5ugwWOy4liqEtlBsHtNWeHkpRcc3PhPbZ7cSrfrMECG5QugiD4khnaoIr0btxISPhgtXz6pizM5wEfDjWNFSqRRVHC2FvYunUCr7iXWRxjHo2dFnxLherUR1pVK0fvtrcT327+0PZ2c0/NtjTE2EEE9zeMlDFd5czgczrjNq3rd0rvPPvfrp/5us8BNMX7KGl6Yv5pUqLs+6OpIkSZL01wg917bP5LtzVfju61F/+7VNJQUZxCcfZcawML7ZPYFqVRSPXqicnIQo5g3/lPqzfmJQMyUK2yftK5TuHJjDyG05+K9ewCOG0FaoUgSmkiRJkiRJf1Vm6GF+3XKYNJUZTboOY/jLf+1HfJdWz2LLjRxQ+DBi2BAa+bg+eiHpXyUDU0mSJEmSJKlSeOavi5IkSZIkSZIkkIGpJEmSJEmSVEnIwFSSJEmSJEmqFGRgKkmSJEmSJFUKz/wF+wBCpyI3X4etgwNW5ndfVqunODefAmGFh7MtoEeVnYtKp8fcyg57a8jPL0KYmGLv6IyNxT8bY+t1xeTnarBzUmBpbvaPlv2kDDoNBaoirBSOWJs+7XsKLfk5Oai1plhY2+GksOHue4UNmmLyigrQGaxRONhjXfpdCL0WlSqfYo0JVgpHHKzLb0cDmsICCvSWuDnaPLi6PzBoNRSqCtBozbF1dMDO0rgOvaaQ3LwijInXbHD2UFDxy0f0FBXkUVisw8zcBoWDPZbmJoBAV6KmuLgInYUjzraPc2joKMzNoagEzC3tcHSwwczUBCEM6ErUFBWrwNoFR+vH3X8E2uJC8jWmuDjaGbevQUtBbj7FOj1gho3CAXsbCx5M5vfv0GnVqIuL0JrZ4WxndW+GvpjsrAKMqQoscfJwKnshs1aVT45KjamZJfYODmX7w58RwoAqL4eiEj0W1g44OFhzd4uVFOSQW6zFzMIGhaM9lqZPq+X/XYry0inGFieFHYbiXHJUWrC0xc3R7r4XgN+l1xSSW1CEmZ0rjpZ68vPz0WgNmNs542L3NFIAGdAUFVCg0iCwROHogHXpMS0MeopV+ajUAnN7R5xt7h0/WlU++eoSsLDHRWHNfU0TGnKzi7BSOGBj+ahjTqAuzKNQrcfUxuFemw0acrPyKRECMMfe2RFbi4rL0uuKyMstRGcwx1bhiH1ZfUvIy85FozPF0kaBk8KqwnIAhK6EQlUBxRpTbBwdUViVP3YMqPPzKcAad4dHZZswoFblU1BUgomJFQpHBValx6FBX0JRQSHFJTosbBU42Ns89R4qbXEBhSWmODjYcS8zqY7CjBy01gqcFf9eNg1tUQ4qEwecbCrHdf1R7p5PwRRLWwcc7Sx5yCFdMX0JuXn5lOgM2Dq6YW/1eN+4TqMiv1CHo5OiNN3xIz6vLiBXLXB0cnjEdbhiZjNmzJjxN5b/R6QcGs/oRaE0bNMGr7J3mmWzdvgAuiwt5Kv3XwDSODhmKP0WHUVTYovSKpZvF8xl3rxNVOs6kHpujz7o/0iVmUdSeg72Tgr+uIumhO7kNb+J+LTvSi3vJ0ur9U/LTwjmu9mfcUPZhXaeDk913bEXNzBt/rf8vvsC5wPisavXhJpulqBK5cSevWw/8Au7DyShdvKglpcrliY6YgOPsH7LatZvvkaiwRRlVZ+y7D2qrHC2+3/J8G0qPh7QouKVa/K4evx3Nu9ZwabtUeTb2lNd6YWtBdw5/g2jPv2FM5dOcfRoMS0HtsC5gqKyYgJZsmQWG7ccJmB/BCprD+rWdsdU6EiIOsf+NZOZdL0Bw1/wqqAUo6Tg/Xy9YA57dp3h7NFoTJV1eU5pT0lJAXE3Ati0dDRL03rweouKs5vcVVKUxO8/TGXU6liG9mmDhbkpZF/mk+GT+P1UAEeOXKXErTYNfdwe2F//LYkxFzm2cQ7Tzit4u+O9HNbErabXy3O4GHyOI0eSqTuwHZ4mJpAfz5KvZrNk7R6uBIdh4lKfWkoHHpIWu0xBRADjx8xh9+GjRKVYoqxbHzc7ICuMLz+YwPp9xwiOSMFe2YSa7vIdgw+z95vXGbv0EvU6dUScXcCwT79mW6gp/bu2wOYhgVXa9V2MHz6E3+Lr061hCesXfM67Hy2jsF5XujV4VP65v68wI4a1K75m5bo9HN11k/RiW2o3qI6tBWSHnuS3DWvZvOMcEXkaPGvUw80GSA9hzaot7Dywm3O3crGr3ojqTnfbVsTNA4uZMO03iqu2pkXNio85XfxFfl2zgW17jhGUpMK1RiM87YHUg7zcbSIXQs5x5EgEDs2bUNel4lS4AZtm8t3ydRzcfpWQG3lU922Cqw3cPrWCrxYu5sDuS1w8nYhTc1+qOVZwIOiKCTt7iI07VrFu400yLayoWrUaCksAQX7KdTbM+oKh+8wZ27/iVyLlJYex8uev+W3jfo7tvkWOwZHaz3ljbQ5h51ayZvk2tu3aw9mwGzjWe4HqiqfYR2XQcWLlZyw8rqVjm/rYWt4NeBKY1eQ5ZkU9x/t/K21QxaIP+bMupTEdaj39FMdRgWFYKd0fP6uSJp21Uyfw3a4DnDxynlhRkzYNqmD+V+8kMkNZtGghy2Z9SojXW/jVv/eu19ykDNKK1DjY2/6hw0MQceIXBg5eTJd+PXBzenQHUkrgZj6bMg1Dp6E0+RuvpK8UPabpEWE0fm0yLaqWb7gbrt4OoL8bIHjRf+wr/Ly5KcPb5fHL8RzmLP6cRaOu06O+AnJiWPPjTAJuC1xrNWfEJ+/TyEUBqLlxZjc/rj2CwcKM6vXb8FafgdSyvcKX7y3jemER1Xy8sbNz5J1JP9CxNH2khdVzOPjYG3O/VxKONVoxsmcrfojRweNkGvsHCUMdRs1ch6+bNeGb5vJLmIou9e3IDL1EkGVNpkxfi1lhLGv2B5JSuyo+TjqCg6/TYfh8xnlZEH9qIYcv12Nkd2Mq0XPbd2HZugfNrz76ZciFydEEZ+l4d8zPeFsVcfzQVm7c8eHFxs5g787Ln83no1fqPWZD3Ok5dA5T61Uj6+pxfgu8Qa66IV72Fvg07MqIkmi2nX68ez0hqvPWhJW0VToQe2AFK2+n8nKbKlhZOVDXty/jii4z6PYfl9JyffcWVu3KZNRvYyh/+g3cuJzsal14HrP7TxCt3mLdV688Xvv+YdXrdKB6nwyOnHjwLFP1lWms+6rDfdMKIo4RrOzH+q+7YW+VzN41IWgauWHh8OfHUfLZ5VR9eyE/vuyNheY4K78/T/0pL5BzeR1Braaz9+MG2JqG8cs3Z+k8s+c/3sb/D7oMmUVi1mw27LvKsg+mMbHAjRKXzjjbWpB7bgtLdh7gdqYXnd94k/d6NcPLdzAf+B1ka+4hDt7+nDHjRnP85i2+GfiYx9HfpqBNjzG8O7YupqmxrN+0mejc9rjaQPCxXdR+fQGf1rJCd+VrZh9twozBNYnYuZTEF77ju3b2ELON1zeH0H6iMW3wnQNr2BDWjH7D3HicM3bIhvlY9t3Aj41tIPQHRmwP59eP6htndv6MdT++/Ngt8ajWi1nfT0NpquPIVwMJiHuTus4gRH0+nj2UZs4WhPw6kWUhetpV+/OIQp2bQXB0In1GL2aCqznBR5dyLqQOr73ggU5dRMDuE3h2702j438MENJY+O43OA4ewZDeTTDOdaJj/y/5qEEtNNEhrPv9DMkFvjhagb1bI4ZMfgsfV3u2LepNwI08Ong/vXy/QghyNeb0GtDTmDq2TA08a5tBlXLvERUG4i/vZtmGPSTnQYu+I3hvUCeM3TLprJ/yPUcTi2j5Zn/sNq8jx7cb9jnnoct0RjQzsPmHCYR6vsPs4V2xUKezc+1S9lyMo9HQe6s49cM4tkW60aaengtXoiiq3YmPPn4D8xO/sSpIRzOLYDIsO6C0iOB0YU0mzBxNvaJMjm37kfUnYrB28mDAiA95qWktEvbO4LszKjxNTYlJTcWp3QDGjx6Id85VZo9dwu+XQvFq0xAF0HPib7zZ8M+3U2FyKKsXjWPxzjiadWqDqcKDLo3dsDaH7DObWbLrINFZ3rw45E2G+TWlIPwIs37aRqvRK+hheYaff1mJpsNXzOhfCzyaMmnOEsLdrrOi3DryI3bxxX+WE2lmSnUvNxyr1GT45zNp5QlggpWdD3Y1r4LF44WKynbvMv3KejaGAVUea5GHqtRjTL2qgW/rpvcm2NpD4BWibx8jav9F4sKvElerIdbAgW2HaP7hN/j7+zNpSEf2/7wNgMKo82y+FsOrk2cwffxH5KTeJjpTBW4dGfHxON58cyRf+/sze8ZUfMt1kllZQ6NmHjgoKlcmKisbe0xNn/4jCJ8XXsDXSwEl8Ry6rWBAa+OJrLBQg6Nd6aNlczPUccno8wswGAxoikqwL31EpseUoog7AMSs6M/hwvYMaF/rsVK+q9U6zE3BwsIUTE0oyc6nJDndODMnnp9GdMDLywvvfhO4nlpxWa61auFbrxoIA9GJYVg518L5CW+cqzZvTtvqzqDL4kKMBt/6j5ONS09icCDb1gZQPjN5wuaR/BzTjrd6NuKBzotDM/Dy8sKrYVumrL9Ise7J6vtPC1/Q31ivTm9x/I7xdch29grCrt4gK0tPauxplv+2gcPFmgrLUSicuHUtEo0mnTM7l/L9nlPcARycXLh04iz5+UVEBe1l8ZodnHsK7fpv5ezbi44p2/gt7v7p1k2a8sZIf/z9x+PyezeWB92bV2vweKyCNhJZ8HTrau/uTstm9bAxN6Ug7Qix+mbULb2Q5eWocHI0hpfCToEq6AYAaSn5KD1Lz8fWtuQGnAcg99pmvjsumPRxD6o9ulMHgJSkPDxcSz9sZ0/+2cv3Zm5+z7hft/LjlxNxDy+gnCad2qNUWEHeUZZF9KRHaWdm3S5daFbFDtSR7IioyvtdKj7Z6bQGDDo9NtbGE4BOrUUdkwBA2Kp3CTbrSK+Wyof0luVzYu12zt9MRls6xdHbm1aNa2NhZkJGyjlyLRtStfT0VL1BK9J2T6d5LS+2pX3I2C7uj2zj01LrOajf4F5ue51Wx6WgZEZO9cff35++ntkc2XkGgFWvjUYMHou//4c0ClnPpDt1eP/tPnRv6sqdrBIs7N0Y0G8AmpJi9AKwcaPHm5/xWTs9RyPu7fBt3vkS++AlRBqaMvErf/w/8iV43m/YtalL7r4jFPpNw+zWRYKKOtEt5zA7LsLNK6GY1+/GPH9/Zo4bReG1i6QlZqJsPwwvVTDpVbswY64/dW5uZe+FLHBsxH/mzeOV9n2Z6G9sS586f2z9/Ww96jJ05GhaNn2Tn/z98Z/+CS2e8wDApmlzhnzgj7//OBz3dmXldbCr1YEh9XO4lgoONXz5oE8zLsZWfGDb+3Tn3WH/Ycj7nzDX35/pEz6lUbkHJnb20KS5Emvrx79xsbP/+3O76fIAABAQSURBVFkpn3mPaeqBlSz42ZSRhx58fNR2zO9cKj+hel3qZh/htrCmQaMS9m6/iK5+P8gP5tTOjRxa+nO5D3ejy2RoW7cxbaw3M21QX4TWnE4DxlCvjheYW+Ls6oZjnoYqnp78sd/OsXoL5n27gsrGxdWDpC9fYZzYzXcDvJ/quovTYjh3ZC+eL73I81XvDiXQodXq733I1JS7A2AMBg16A/fPA5LT4jm27VOOrVKRkKnjo6atWfqaFXumTmHuvkuoyxbowNLrS6mPHp1OS1kqCFNjgApQt888QnPmASDifuLL9edpPt6Ln1/9kGW3U8qtvC+/Bc+mOaDNyyT25lbO33bltXGt+Tt9BSVZyVw7sx21shkvt6z2GEtY0+er70n56v6paZnJhOz/krZ7iknJ1hDn3IyNI+qBazuWXwgxfqgomoWrLpCX0xQbd9u/Uet/gM8orhSMMv4/fT/dJuzhpTUDMG3wGrvemkrPfi1xrl6XOl4NcHjEWcaz3zx6BL1N+/YJNOr7Ln0a6jADzNqN58aQofj5/Yh3sxfoUM/pb41b+n/P3IqXRvRjwjh/2vg5UBOAQiL2LGfm6iPcyTKnnncx7bT3FrFydqOGtyNnTl5Ha3i6wyR0qjySwvaybp2ad75/mbsP3w0GNbryN19lN+LFlJSrO6Vj/wtU+aReX07Htr+gKsihSvciOrT6CKv83xnbezrXyhZwoffoGUz6sDNQhLZ8WWal6/Dqy/HMNOP/8wL5eP4l6FqVsGPLmDRuBTFlC9Tmg8XfMPrFeqDVkHXnDBtXhjFx36TS7W6kSg7nxL4jNB/Wj5Z2j+pQMKDXl2C4e840MSk7zyUlR7Fj3yh2fF9AbLpgUhdfvul7tyelLvtF4gOl6QpySAjbxdbDZrwxp2u5a5wNz49YyPXeX/DL0s9YdKAJ0wbWfGD5f0vMurmcPmXLR28/+LSs19I8epX7Wx+zjO+nL6Zg2d1rsR0dXpvCi+32sSGrI8ebugFueL7ZnaaHM3B2UqC1t8VUZYKJqRkOTi5YWxQZFzU1w97JFXcnG8i6tw4bJ3equHek+ZB+1HQH8KR27eXcSW2GVZOXGOvrwZYuStwaNOX5MEFEUQ6RF9Ywd/VFtHZ3j5nGTGzzIoPdnGnWqh2ufr2oroRe3XzYW2IAU2tcPD1xsFXg7umJ52NsJ1NzS5xcXLGxVuDpWX6JQsJ2L2PWmmNEZ5tTX6mhvQ5MLW1xtjdezcwsbHBxcsTkEYNRTS3tcXZ2wcnaEk9PzwfOr1Wa9WFpsz6PUdt7vKvWIPDzHqxetpnhbZ8sSH3mgaln7/cZH7GFnWGZdPZ51Nf1HNbJcwmKbcDwAbWZPfEgPm0dwEFB6+dfplmf1xniW+u+JbJji3Bq8SmnLzeEuFvMX7WD6LhMqrl4AyUUFRej10Pq5aNE5HrRrlfjxx//8QxkZ6WjnLIT//5PMygtJuzSCa5dzEDx/GB6eCZw8U4RnWvb4uhhRf41DUKAOr8YrYMT5o4KTM1LsHWxpDCrBJwsSY3LwL70Trj91CCCpwKZZxn2fQZLX6sKQP/Zy+k/+8G1qxwsMAhBSbEePXoKNAIPb+O+cn7HHmzbdqR5VRdiMtIoKSwCfBi94xCjHyhJT2rsdS4eCSbJ7SXefl9BUlgEjnXq8dd/76EhOuQ8gSfvoG/cj34NCgmNyqBd3Uf1PuiIvnCaw+fy6TV+QNlFzPfj3wn+GMgLYdKKcKa/bbydTr5xg0t5goEdmqLSqMnOysZgMPxZ4U9NyK5dJNZrQ++GSlLzcijKuVcnu5dnE/zyLApTLrJ1YzzPW94N/dVc3b6Lk3FuvDWue9nJ2cTGidfn7Wf4PBXxJ5ew51qPsu3i+M46gt/Rkh3xOys3WtHmKbbxv5JXb2Z9eISPVyYydGgPyDvCD0vVfL35MjWtk9n3tR/3PVQwtaZ157bcXLOQmOImT62aeZmRnD9wnljLpoyeX5+cm5dI9WmLpx241bQjJ6UYqtgQF3QbB9/XAKja2JGDt/LgOUfSo5NxfrE9ANU6jmLn8VEgdJw5tJp0mx5UUZiDoj+rg/s/dP3VmztxNlYF1e1IuBGDS+fhANw5c4ZAay/eaF2HHFUh+Tk5gBkNun3M7uCPH1JSLmd/309EdhV6Th6D67XthFQdRFOPIm6cOUxwcBEeHd6ivX04x6Nr063Wn/eaWtiYYWFjSnGBFhQWZGUUYtuwBgA9ZwfTczaQdph+35aUC0oBcti5YCt2nf14sXVNLBFkp9ziwqHLxNr5MmJqdTJCg8iq1QJXG7h44Che7TtSw8uOVrVM2BSXCPeF0/8un6GT6ZTzGTeTCqjvXvFYYNOaL/HGMB1+X4ykrnu531Xk36IuRwgvgPoKNcnh0aSWC71zcvMwaF25cTmIxJRHh4El6gTiI+PROlXHwiKXnAxHlH9WNQs7ajT14z+z32LY4Jfu+3GhXp1X4Xp02jzUasiPuciRADW9/tOFv/zALu8wPy3XM2fjZapbJbF3Zk8yy83Oys2jpFDH+YDraHSP+P0GABoKVQIhIPbUUdLMfWjVoc4TB4fJiXG0XniE4W2fsAAqQWD61zjRsN1lThiG0aKTOzUynWlc3/hTlx7vdWLd91/hNyUdPDzwaTqUr77oQW5EEr9v+xX/1FS0woyaHV7n3erG4MHRy5SMFat4c9NSdG6NGP+f8ZV7bAOQl5OKnpKnu9L8CFZNm8y2RAfqHdjEoqwYfMYF0Lm2Lc71e+AXsZM+vXti5uDFwJGTULpaY2ZmSdtW3Zg/ZyQzk1Jp2H8CX7bxuFdkwnV+mPk5RwO0TH3+eWa//Oc/NrLzbESXagl8OfI1stQGurwzDb/axpOUlX02309+n+Q0FR6NW/LOZxWELto8zm/6gamrQqhWawu7Fufi9MIwlkyth4Umk1Uz3mLX+USu5jjid7wWb4ya9Od5l1UJ7Fw4ix8vqKlXcxsr85JQDl1Bu7ru5EZfYOG8GVy6fpvgolP4HW7JtMlf0KGZEiji1pH1fD0ji9rlAlMATV4KK6eNZsthFQVVW/HjG7WxdTEndt/P+M0Kx8rBiTZvjsLB5TGfV/4Dtkz3Y9WJdG5mW+C3z4sX35zKl0Nb41LTml+XjuP72zk41qjNyLkzjQsk3OT7aXO5kJ5PlxdfpWf/vtiW9SpkcGb5Qr441opO5QLTghPr+dB/HVbeDRgwaBCD3mtpnBFxhomfzibL3oXufq8yYKTfU2v3f5uDyz9i/tFCThbUYcXwMXQ6PItCAMs2tGvzM58Mf4WqjVvxkoMt+5f9RNNsK5bsOkr06UHYzfmRfq0aMf3w08pOLbgdsJppM3djX6Mqu1bosKraiOnzjIFpi27/4YcFY1kWGYNn5/8w+2PjjWutPt/QevFC/JZdxKF+dyZPvH+A3vlFvRm3IQmXTtDJdzju9n9+eWv42o+c+WYafnNCcWk9hFnjjB0aDp6W3FwxG7+pKdh5eNJpxLiKm5J8kJmfTSTLqx5bt1igTgvnrTWDaGoZwpKx4ziuqUqdfWvRpEfy3KwIutX6824PKwdv2jdowtwJ7xCTkU3rN6Yxpum98ZZZEQHMnzWZi2cF/r3aMrHb3fNpCKu+mEUV/5q0a10TS4OGGweWM+Wb47jW9Gb3smLs6r/IN7OMganIiGXmp8tJSk2jaqOBDBvfrOI2PkPmFg3o+OIpFnz6DrHZxVg0ac2g3iMZ3LUhU77twcqPP+Biag4Ne/jSoHQZJ5822K4fi99mC6pWcSc6ag/j67VlcuOrzPl8BTdTQwnVhuO3txb9P/uCEb0bYybMuXNmNe/OP09WjU58MehNVCfXcTFgL6/+3JrXc2+wOfIYLavq2TXvPzw/ZxJOAcvo3Ws+wsYWj+b9Gfvha9gd+ZKvFh2hVWF7mr6QwLszN6NvqaBH/bE0qGKNq3soE3r7UaDw5p03JlUYgKVHXGPBlHEcO5uPn98hUDZnwoQJvFSjLW1a/sJHw16hWpPWdHWwYf8vv9Cr/gdUa/oyqhl96fWbF63cTYm4NIYFLdfSJWMHC1cdIT7uJok2Q7i5rDmfrpjOy9VdcK9txu3Z39J36SyslW0Z/3Gzv/XWl/SU2+DzNwoATIQQT+ts9Kfyr8yh56gLTF63kT6Nnu6vzf+bpF3fzYhp3zFw2Q5GVPV49AKSJEmSVJkIPWeXf8CEI0q2rJxKNed/YoDORT596Qo/HH9Yr/ajLXplMM1/2cKLlWe47X+lW5s+pvvyTDYEbKbL3yinUgSmkiRJkiRJf1XypfXMWLSe+HwL2r82hWnDn/9Lyx+e9S6LzqWBcyNmTh1P20aPflWg9O+SgakkSZIkSZJUKVT2IZWSJEmSJEnS/wgZmEqSJEmSJEmVggxMJUmSJEmSpEpBBqaSJEmSJElSpSADU0mSJEmSJKlSkIGpJEmSJEmSVCnIwFSSJEmSJEmqFGRgKkmSJEmSJFUKMjCVJEmSJEmSKgUZmEqSJEmSJEmVggxMJUmSJEmSpEpBBqaSJEmSJElSpSADU0mSJEmSJKlSkIGpJEmS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data-image-state=\"image-loaded\"\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function f = plotOutages(T)\r\n f = figure; % gets the figure handle\r\n \r\n \r\nend","test_suite":"T = readtable(\"outages.csv\");\r\ng__ = plotOutages(T);\r\n%% Is there a histogram?\r\nassert(isequal(g__.Children.Children.Type,'categoricalhistogram'))\r\n%% Are the XTick labels rotated by 30 degrees?\r\nassert(isequal(g__.Children.XTickLabelRotation,30))\r\n%% Is the y-axis labeled correctly?\r\nassert(isequal(g__.Children.YLabel.String,\"Number of Outages\"))\r\n","published":true,"deleted":false,"likes_count":2,"comments_count":6,"created_by":140016,"edited_by":140016,"edited_at":"2022-10-10T14:27:44.000Z","deleted_by":null,"deleted_at":null,"solvers_count":217,"test_suite_updated_at":"2022-10-10T14:27:44.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2022-09-02T17:58:22.000Z","updated_at":"2026-04-03T09:09:12.000Z","published_at":"2022-10-10T14:27:44.000Z","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\u003eCreate a function that takes power outage data as an input and creates a histogram of the number of outages as a function of Region. Note that the Region column of the power outage table contains a cell array of character vectors.\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\u003eRotate the \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003ex\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e-axis tick labels by 30 degrees and label the \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003ey\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e-axis with \\\"Number of Outages\\\".\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 function should return the figure handle as output.\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=\\\"308\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"678\\\"/\u003e\u003cw:attr w:name=\\\"verticalAlign\\\" w:val=\\\"baseline\\\"/\u003e\u003cw:attr w:name=\\\"altText\\\" w:val=\\\"\\\"/\u003e\u003cw:attr w:name=\\\"relationshipId\\\" 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Digit Probability","description":"Assume that the next digit of pi constant is determined by the historical digit distribution. What is the probability of next digit (N) being (n). \r\n\r\nFor example if we consider the first 100 digits of pi, we will see that the digit '3' is occured 12 times. So the probability of the being '3' the 101th digit will be 12/100 = 0.12.\r\n\r\nRound the results to four decimals.","description_html":"\u003cp\u003eAssume that the next digit of pi constant is determined by the historical digit distribution. What is the probability of next digit (N) being (n).\u003c/p\u003e\u003cp\u003eFor example if we consider the first 100 digits of pi, we will see that the digit '3' is occured 12 times. So the probability of the being '3' the 101th digit will be 12/100 = 0.12.\u003c/p\u003e\u003cp\u003eRound the results to four decimals.\u003c/p\u003e","function_template":"function y = pidigit(N,n)\r\n y = x;\r\nend","test_suite":"%%\r\nN = 101;\r\nn = 3;\r\ny_correct = 0.1200;\r\nassert(abs(pidigit(N,n)-y_correct)\u003c0.0001)\r\nassert(~any(cellfun(@(x)ismember(max([0,str2num(x)]),[101,201,202,203,1001]),regexp(fileread('pidigit.m'),'[\\d\\.\\+\\-\\*\\/]+','match')))) % modified from the comment of Alfonso on https://www.mathworks.com/matlabcentral/cody/problems/44343\r\n\r\n%%\r\nN = 201;\r\nn = 6;\r\ny_correct = 0.0750;\r\nassert(abs(pidigit(N,n)-y_correct)\u003c0.0001)\r\nassert(~any(cellfun(@(x)ismember(max([0,str2num(x)]),[101,201,202,203,1001]),regexp(fileread('pidigit.m'),'[\\d\\.\\+\\-\\*\\/]+','match'))))\r\n\r\n%%\r\nN = 202;\r\nn = 6;\r\ny_correct = 0.0796;\r\nassert(abs(pidigit(N,n)-y_correct)\u003c0.0001)\r\nassert(~any(cellfun(@(x)ismember(max([0,str2num(x)]),[101,201,202,203,1001]),regexp(fileread('pidigit.m'),'[\\d\\.\\+\\-\\*\\/]+','match'))))\r\n\r\n%%\r\nN = 203;\r\nn = 6;\r\ny_correct = 0.0792;\r\nassert(abs(pidigit(N,n)-y_correct)\u003c0.0001)\r\nassert(~any(cellfun(@(x)ismember(max([0,str2num(x)]),[101,201,202,203,1001]),regexp(fileread('pidigit.m'),'[\\d\\.\\+\\-\\*\\/]+','match'))))\r\n\r\n%%\r\nN = 1001;\r\nn = 9;\r\ny_correct = 0.1050;\r\nassert(abs(pidigit(N,n)-y_correct)\u003c0.0001)\r\nassert(~any(cellfun(@(x)ismember(max([0,str2num(x)]),[101,201,202,203,1001]),regexp(fileread('pidigit.m'),'[\\d\\.\\+\\-\\*\\/]+','match'))))\r\n","published":true,"deleted":false,"likes_count":18,"comments_count":27,"created_by":8703,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":852,"test_suite_updated_at":"2017-10-21T07:59:48.000Z","rescore_all_solutions":false,"group_id":34,"created_at":"2017-09-11T06:41:07.000Z","updated_at":"2026-04-07T17:51:59.000Z","published_at":"2017-10-16T01:45:06.000Z","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\u003eAssume that the next digit of pi constant is determined by the historical digit distribution. What is the probability of next digit (N) being (n).\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\u003eFor example if we consider the first 100 digits of pi, we will see that the digit '3' is occured 12 times. So the probability of the being '3' the 101th digit will be 12/100 = 0.12.\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\u003eRound the results to four decimals.\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\"}]}"}],"problem_search":{"errors":[],"problems":[{"id":43604,"title":"make histogram","description":"You probably know the function hist(x,n) to get the histogram. Now try to write the function yourself!\r\nFor the cheaters wanting to use the function hist(), this will make the assertion fail!","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: 51px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 407px 25.5px; transform-origin: 407px 25.5px; 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: 310.5px 8px; transform-origin: 310.5px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eYou probably know the function hist(x,n) to get the histogram. Now try to write the function yourself!\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: 258.5px 8px; transform-origin: 258.5px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eFor the cheaters wanting to use the function hist(), this will make the assertion fail!\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function y = h_istogram(x,n)\r\n % do not use the function hist\r\n y = x;\r\nend","test_suite":"%%\r\nx = randi(20,100,1);\r\nn = 1:20;\r\ny = h_istogram(x,n);\r\nassert(isequal(y,hist(x,n)))\r\n\r\n%%\r\nx = (1:20);\r\nn = 1:20;\r\ny = h_istogram(x,n);\r\nassert(isequal(y,hist(x,n)))\r\n\r\n%%\r\nx = ones(1,20);\r\nn = 1:20;\r\ny = h_istogram(x,n);\r\nassert(isequal(y,hist(x,n)))\r\n\r\n%%\r\nassessFunctionAbsence({'hist'}, 'FileName', 'h_istogram.m');\r\nassessFunctionAbsence({'histc'}, 'FileName', 'h_istogram.m');\r\n","published":true,"deleted":false,"likes_count":0,"comments_count":1,"created_by":94929,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":21,"test_suite_updated_at":"2021-06-25T19:05:13.000Z","rescore_all_solutions":true,"group_id":1,"created_at":"2016-10-24T13:26:44.000Z","updated_at":"2026-03-28T21:33:04.000Z","published_at":"2016-10-24T13:26:44.000Z","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\u003eYou probably know the function hist(x,n) to get the histogram. Now try to write the function yourself!\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\u003eFor the cheaters wanting to use the function hist(), this will make the assertion fail!\u003c/w:t\u003e\u003c/w:r\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":46022,"title":"Let's create histogram data by yourself.","description":"We'd like to create histogram data, which first column shows the data, and second column shows the frequency.\r\ninput = [1, 2, 1, 1, 2, 3, 4, 1];\r\noutput = [1, 4; 2, 2; 3, 1; 4, 1];\r\nActually, useful matlab function exists to solve. Please try to solve it with and without the useful matlab function.","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: 111px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 407px 55.5px; transform-origin: 407px 55.5px; 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: 350.5px 8px; transform-origin: 350.5px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eWe'd like to create histogram data, which first column shows the data, and second column shows the frequency.\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: 89.5px 8px; transform-origin: 89.5px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003einput = [1, 2, 1, 1, 2, 3, 4, 1];\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: 94px 8px; transform-origin: 94px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eoutput = [1, 4; 2, 2; 3, 1; 4, 1];\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: 347.5px 8px; transform-origin: 347.5px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eActually, useful matlab function exists to solve. Please try to solve it with and without the useful matlab function.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function y = your_accum_count(x)\r\n\r\n\r\nend","test_suite":"%% Test 1\r\nx = [1, 2, 1, 1, 2, 3, 4, 1];\r\ny_correct = [1, 4; 2, 2; 3, 1; 4, 1];\r\nassert(isequal(your_accum_count(x),y_correct))\r\n\r\n%% Test 2\r\nx = [1:10, 2*ones(1, 50), 5*ones(1, 20)];\r\ny_correct = [ 1 1\r\n 2 51\r\n 3 1\r\n 4 1\r\n 5 21\r\n 6 1\r\n 7 1\r\n 8 1\r\n 9 1\r\n 10 1];\r\nassert(isequal(your_accum_count(x),y_correct))","published":true,"deleted":false,"likes_count":1,"comments_count":0,"created_by":415927,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":23,"test_suite_updated_at":"2022-02-21T09:33:13.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2020-07-04T13:52:51.000Z","updated_at":"2026-03-05T13:53:45.000Z","published_at":"2020-07-04T14:06:42.000Z","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\u003eWe'd like to create histogram data, which first column shows the data, and second column shows the frequency.\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\u003einput = [1, 2, 1, 1, 2, 3, 4, 1];\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\u003eoutput = [1, 4; 2, 2; 3, 1; 4, 1];\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\u003eActually, useful matlab function exists to solve. Please try to solve it with and without the useful matlab function.\u003c/w:t\u003e\u003c/w:r\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":1985,"title":"How unique?","description":"Sometimes, when we check unique entries of vector we would like to know how many times each value occurs.\r\n\r\nGiven vector of numbers *A* return vector *U* of unique values of A and corresponding vector *H* with occurrences.\r\n\r\nExample:\r\n\r\n in: A = [2 2 2 3 3 2 3 8 6 5 6]\r\n out: U = [2 3 8 6 5]\r\n H = [4 3 1 2 1] ","description_html":"\u003cp\u003eSometimes, when we check unique entries of vector we would like to know how many times each value occurs.\u003c/p\u003e\u003cp\u003eGiven vector of numbers \u003cb\u003eA\u003c/b\u003e return vector \u003cb\u003eU\u003c/b\u003e of unique values of A and corresponding vector \u003cb\u003eH\u003c/b\u003e with occurrences.\u003c/p\u003e\u003cp\u003eExample:\u003c/p\u003e\u003cpre\u003e in: A = [2 2 2 3 3 2 3 8 6 5 6]\r\n out: U = [2 3 8 6 5]\r\n H = [4 3 1 2 1] \u003c/pre\u003e","function_template":"function [U,H] = hunique(A)\r\n U = 1:5;\r\n H = ones(1,5);\r\nend","test_suite":"%%\r\nA = [2 2 2 3 3 2 3 8 6 5 6];\r\n[U, H] = hunique(A);\r\nU_ok = [2 3 8 6 5];\r\nH_ok = [4 3 1 2 1];\r\nassert(isequal(U,U_ok));\r\nassert(isequal(H,H_ok));\r\n%%\r\nA = [2 2 2 3 3 2 3 8 6 5 6 8];\r\n[U, H] = hunique(A);\r\nU_ok = [2 3 8 6 5];\r\nH_ok = [4 3 2 2 1];\r\nassert(isequal(U,U_ok));\r\nassert(isequal(H,H_ok));\r\n%%\r\nA = 100:-11:1;\r\nassert(isequal(hunique(A),A));\r\n[~,H] = hunique(A);\r\nassert(isequal(H,ones(1,10)));\r\n%%\r\nA = randi([-10 10],1,100);\r\n[U,H] = hunique(A);\r\nassert(sum(H)==numel(A));\r\nassert(isequal(unique(A),sort(U)));\r\n\r\n% number of test cases may increace in the future.\r\n% any proposals of test cases warmly welcome.","published":true,"deleted":false,"likes_count":1,"comments_count":0,"created_by":14358,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":137,"test_suite_updated_at":"2014-04-06T18:52:22.000Z","rescore_all_solutions":false,"group_id":21,"created_at":"2013-11-12T23:00:10.000Z","updated_at":"2026-02-26T16:00:10.000Z","published_at":"2013-11-13T23:40:01.000Z","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\u003eSometimes, when we check unique entries of vector we would like to know how many times each value occurs.\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\u003eGiven vector of numbers\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:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eA\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e return vector\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:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eU\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e of unique values of A and corresponding vector\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:b/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eH\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e with occurrences.\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\u003eExample:\u003c/w:t\u003e\u003c/w:r\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[ in: A = [2 2 2 3 3 2 3 8 6 5 6]\\n out: U = [2 3 8 6 5]\\n H = [4 3 1 2 1]]]\u003e\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":60421,"title":"Largest Rectangle Area in a Histogram","description":"Given a histogram represented by an array of integers, e.g., [2, 1, 4, 5, 1, 3, 3] :\r\n\r\nfind the maximum area of a rectangle that can be formed using the histogram bars. In the example histogram, the maximum area is 8 units.\r\n","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: 623.537px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 386.491px 311.761px; transform-origin: 386.499px 311.768px; vertical-align: baseline; \"\u003e\u003cdiv style=\"block-size: 21.0085px; 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: 363.494px 10.4972px; text-align: left; transform-origin: 363.501px 10.5043px; 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 0px; transform-origin: 0px 0px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eGiven a histogram represented by an array of integers, e.g., [2, 1, 4, 5, 1, 3, 3] :\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 263.991px; 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: 363.494px 131.989px; text-align: left; transform-origin: 363.501px 131.996px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" width=\"320\" height=\"264\" style=\"vertical-align: middle;width: 320px;height: 264px\" src=\"data:image/png;base64,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\" data-image-state=\"image-loaded\"\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 42.017px; 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: 363.494px 21.0085px; text-align: left; transform-origin: 363.501px 21.0085px; 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 0px; transform-origin: 0px 0px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003efind the maximum area of a rectangle that can be formed using the histogram bars. In the example histogram, the maximum area is 8 units.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 269.545px; 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: 363.494px 134.773px; text-align: left; transform-origin: 363.501px 134.773px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" width=\"320\" height=\"264\" style=\"vertical-align: baseline;width: 320px;height: 264px\" 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\" data-image-state=\"image-loaded\"\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function a = max_rectangle_area(H)\r\n\r\nend\r\n","test_suite":"%%\r\nH = [2, 1, 4, 5, 1, 3, 3]\r\nbar(H)\r\na = max_rectangle_area(H)\r\na_correct = 8\r\nassert(isequal(a,a_correct))\r\n\r\n%% ones\r\nH = randi([1,100])\r\nbar(H)\r\na = max_rectangle_area(H)\r\na_correct = H\r\nassert(isequal(a,a_correct))\r\n\r\n%% two \r\nH = [31, 96]\r\nbar(H)\r\na = max_rectangle_area(H)\r\na_correct = 96\r\nassert(isequal(a,a_correct))\r\n\r\n%% two\r\nH = [31, 61]\r\nbar(H)\r\na = max_rectangle_area(H)\r\na_correct = 31*2\r\nassert(isequal(a,a_correct))\r\n\r\n%% two\r\nH = randi([1,100], 1,2)\r\nbar(H)\r\na = max_rectangle_area(H)\r\na_correct = max(2*min(H),max(H))\r\nassert(isequal(a,a_correct))\r\n\r\n%% \r\nv = randi([2,5]);\r\nn = randi([2,5]);\r\ni = randi([1,n]);\r\nH = ones(1,n);\r\nH(i) = v;\r\nH\r\nbar(H)\r\na = max_rectangle_area(H)\r\na_correct = max(v,n)\r\nassert(isequal(a,a_correct))\r\n\r\n%%\r\nH = 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= max_rectangle_area(H)\r\na_correct = 355232\r\nassert(isequal(a,a_correct))\r\n","published":true,"deleted":false,"likes_count":2,"comments_count":0,"created_by":208445,"edited_by":208445,"edited_at":"2024-06-02T10:46:17.000Z","deleted_by":null,"deleted_at":null,"solvers_count":6,"test_suite_updated_at":"2024-06-02T10:46:17.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2024-06-02T10:37:17.000Z","updated_at":"2024-06-02T10:46:17.000Z","published_at":"2024-06-02T10:37:17.000Z","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 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Outages Histogram","description":"Create a function that takes power outage data as an input and creates a histogram of the number of outages as a function of Region. Note that the Region column of the power outage table contains a cell array of character vectors.\r\nRotate the x-axis tick labels by 30 degrees and label the y-axis with \"Number of Outages\".\r\nYour function should return the figure handle as output.\r\n","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: 424.667px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 407px 212.333px; transform-origin: 407px 212.333px; vertical-align: baseline; \"\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=\"\"\u003eCreate a function that takes power outage data as an input and creates a histogram of the number of outages as a function of Region. Note that the Region column of the power outage table contains a cell array of character vectors.\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=\"\"\u003eRotate the \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: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"font-style: italic; \"\u003ex\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: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003e-axis tick labels by 30 degrees and label the \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: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"font-style: italic; \"\u003ey\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: 0px 0px; transform-origin: 0px 0px; \"\u003e\u003cspan style=\"\"\u003e-axis with \"Number of Outages\".\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=\"\"\u003eYour function should return the figure handle as output.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 313.667px; 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 156.833px; text-align: left; transform-origin: 384px 156.833px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" width=\"678\" height=\"308\" style=\"vertical-align: baseline;width: 678px;height: 308px\" 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data-image-state=\"image-loaded\"\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function f = plotOutages(T)\r\n f = figure; % gets the figure handle\r\n \r\n \r\nend","test_suite":"T = readtable(\"outages.csv\");\r\ng__ = plotOutages(T);\r\n%% Is there a histogram?\r\nassert(isequal(g__.Children.Children.Type,'categoricalhistogram'))\r\n%% Are the XTick labels rotated by 30 degrees?\r\nassert(isequal(g__.Children.XTickLabelRotation,30))\r\n%% Is the y-axis labeled correctly?\r\nassert(isequal(g__.Children.YLabel.String,\"Number of Outages\"))\r\n","published":true,"deleted":false,"likes_count":2,"comments_count":6,"created_by":140016,"edited_by":140016,"edited_at":"2022-10-10T14:27:44.000Z","deleted_by":null,"deleted_at":null,"solvers_count":217,"test_suite_updated_at":"2022-10-10T14:27:44.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2022-09-02T17:58:22.000Z","updated_at":"2026-04-03T09:09:12.000Z","published_at":"2022-10-10T14:27:44.000Z","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\u003eCreate a function that takes power outage data as an input and creates a histogram of the number of outages as a function of Region. Note that the Region column of the power outage table contains a cell array of character vectors.\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\u003eRotate the \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003ex\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e-axis tick labels by 30 degrees and label the \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003c/w:rPr\u003e\u003cw:t\u003ey\u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e-axis with \\\"Number of Outages\\\".\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 function should return the figure handle as output.\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=\\\"308\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"678\\\"/\u003e\u003cw:attr w:name=\\\"verticalAlign\\\" w:val=\\\"baseline\\\"/\u003e\u003cw:attr w:name=\\\"altText\\\" w:val=\\\"\\\"/\u003e\u003cw:attr w:name=\\\"relationshipId\\\" 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Digit Probability","description":"Assume that the next digit of pi constant is determined by the historical digit distribution. What is the probability of next digit (N) being (n). \r\n\r\nFor example if we consider the first 100 digits of pi, we will see that the digit '3' is occured 12 times. So the probability of the being '3' the 101th digit will be 12/100 = 0.12.\r\n\r\nRound the results to four decimals.","description_html":"\u003cp\u003eAssume that the next digit of pi constant is determined by the historical digit distribution. What is the probability of next digit (N) being (n).\u003c/p\u003e\u003cp\u003eFor example if we consider the first 100 digits of pi, we will see that the digit '3' is occured 12 times. So the probability of the being '3' the 101th digit will be 12/100 = 0.12.\u003c/p\u003e\u003cp\u003eRound the results to four decimals.\u003c/p\u003e","function_template":"function y = pidigit(N,n)\r\n y = x;\r\nend","test_suite":"%%\r\nN = 101;\r\nn = 3;\r\ny_correct = 0.1200;\r\nassert(abs(pidigit(N,n)-y_correct)\u003c0.0001)\r\nassert(~any(cellfun(@(x)ismember(max([0,str2num(x)]),[101,201,202,203,1001]),regexp(fileread('pidigit.m'),'[\\d\\.\\+\\-\\*\\/]+','match')))) % modified from the comment of Alfonso on https://www.mathworks.com/matlabcentral/cody/problems/44343\r\n\r\n%%\r\nN = 201;\r\nn = 6;\r\ny_correct = 0.0750;\r\nassert(abs(pidigit(N,n)-y_correct)\u003c0.0001)\r\nassert(~any(cellfun(@(x)ismember(max([0,str2num(x)]),[101,201,202,203,1001]),regexp(fileread('pidigit.m'),'[\\d\\.\\+\\-\\*\\/]+','match'))))\r\n\r\n%%\r\nN = 202;\r\nn = 6;\r\ny_correct = 0.0796;\r\nassert(abs(pidigit(N,n)-y_correct)\u003c0.0001)\r\nassert(~any(cellfun(@(x)ismember(max([0,str2num(x)]),[101,201,202,203,1001]),regexp(fileread('pidigit.m'),'[\\d\\.\\+\\-\\*\\/]+','match'))))\r\n\r\n%%\r\nN = 203;\r\nn = 6;\r\ny_correct = 0.0792;\r\nassert(abs(pidigit(N,n)-y_correct)\u003c0.0001)\r\nassert(~any(cellfun(@(x)ismember(max([0,str2num(x)]),[101,201,202,203,1001]),regexp(fileread('pidigit.m'),'[\\d\\.\\+\\-\\*\\/]+','match'))))\r\n\r\n%%\r\nN = 1001;\r\nn = 9;\r\ny_correct = 0.1050;\r\nassert(abs(pidigit(N,n)-y_correct)\u003c0.0001)\r\nassert(~any(cellfun(@(x)ismember(max([0,str2num(x)]),[101,201,202,203,1001]),regexp(fileread('pidigit.m'),'[\\d\\.\\+\\-\\*\\/]+','match'))))\r\n","published":true,"deleted":false,"likes_count":18,"comments_count":27,"created_by":8703,"edited_by":null,"edited_at":null,"deleted_by":null,"deleted_at":null,"solvers_count":852,"test_suite_updated_at":"2017-10-21T07:59:48.000Z","rescore_all_solutions":false,"group_id":34,"created_at":"2017-09-11T06:41:07.000Z","updated_at":"2026-04-07T17:51:59.000Z","published_at":"2017-10-16T01:45:06.000Z","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\u003eAssume that the next digit of pi constant is determined by the historical digit distribution. What is the probability of next digit (N) being (n).\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\u003eFor example if we consider the first 100 digits of pi, we will see that the digit '3' is occured 12 times. 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