{"group":{"id":1,"name":"Community","lockable":false,"created_at":"2012-01-18T18:02:15.000Z","updated_at":"2026-04-16T00:12:35.000Z","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":"2026-04-16T00:00:00.000Z","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":60839,"title":"List the notes of a major scale","description":"If you have seen The Sound of Music, then you are familiar with the major scale: do, re, mi, fa, sol, la, ti, do. The C major scale, for example, is C, D, E, F, G, A, B, C.  \r\nNotice the pattern that defines a major scale: a whole step (two notes) from C to D, a whole step from D to E, a half step (one note) from E to F, whole step, whole step, whole step, and half step. The Ab (A flat) major scale would be Ab, Bb, C, Db, Eb, F, G, Ab, and the E major scale would be E, F#, G#, A, B, C#, D#, E. \r\nAlso notice on the image of the keyboard below that the black notes have two names. Thus, the G# (G sharp) major scale—G#, A#, C, C#, D#, F, G, G#--is the same as the Ab major scale but with the sharp names rather than the flat names. The major scales that use flats are Db, Eb, F, Gb, Ab, and Bb.\r\nWrite a function to list the notes of a major scale, starting on the specified note of the scale (or, if not specified, the first note). \r\n","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: 550.7px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 408px 275.35px; transform-origin: 408px 275.35px; 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: 385px 21px; text-align: left; transform-origin: 385px 21px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 53.2833px 8px; transform-origin: 53.2833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eIf you have seen \u003c/span\u003e\u003c/span\u003e\u003ca target='_blank' href = \"https://www.youtube.com/watch?v=drnBMAEA3AM\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"font-style: italic; text-decoration-line: underline; \"\u003eThe Sound of Music\u003c/span\u003e\u003c/span\u003e\u003c/a\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: 95.2917px 8px; transform-origin: 95.2917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e, then you are familiar with the \u003c/span\u003e\u003c/span\u003e\u003ca target='_blank' href = \"https://www.learnjazzstandards.com/blog/12-major-scales/\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"text-decoration-line: underline; \"\u003emajor scale\u003c/span\u003e\u003c/span\u003e\u003c/a\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: 128.317px 8px; transform-origin: 128.317px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e: do, re, mi, fa, sol, la, ti, do. The C major scale, for example, is C, D, E, F, G, A, B, C. \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 1.94167px 8px; transform-origin: 1.94167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e \u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 63px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 31.5px; text-align: left; transform-origin: 385px 31.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 372.975px 8px; transform-origin: 372.975px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eNotice the pattern that defines a major scale: a whole step (two notes) from C to D, a whole step from D to E, a half step (one note) from E to F, whole step, whole step, whole step, and half step. The Ab (A flat) major scale would be Ab, Bb, C, Db, Eb, F, G, Ab, and the E major scale would be E, F#, G#, A, B, C#, D#, E. \u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 63px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 31.5px; text-align: left; transform-origin: 385px 31.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 383.117px 8px; transform-origin: 383.117px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eAlso notice on the image of the keyboard below that the black notes have two names. Thus, the G# (G sharp) major scale—G#, A#, C, C#, D#, F, G, G#--is the same as the Ab major scale but with the sharp names rather than the flat names. The major scales that use flats are Db, Eb, F, Gb, Ab, and Bb.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 42px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 21px; text-align: left; transform-origin: 385px 21px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 367.4px 8px; transform-origin: 367.4px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eWrite a function to list the notes of a major scale, starting on the specified note of the scale (or, if not specified, the first note). \u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 304.7px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 152.35px; text-align: left; transform-origin: 385px 152.35px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" width=\"436\" height=\"299\" style=\"vertical-align: baseline;width: 436px;height: 299px\" 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data-image-state=\"image-loaded\"\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function y = majorScale(key,startDegree)\r\n   notes = {'C' 'C#' 'D' 'D#' 'E' 'F' 'F#' 'G' 'G#' 'A' 'A#' 'B' 'C' 'C#' 'D' 'D#' 'E' 'F' 'F#' 'G' 'G#' 'A' 'A#' 'B' 'C' 'C#' 'D' 'D#' 'E' 'F' 'F#' 'G' 'G#' 'A' 'A#' 'B'};\r\n   y = notes(key+startDegree:key+startDegree+8);\r\nend","test_suite":"%%\r\ny = majorScale('C');\r\ny_correct = 'C D E F G A B C';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('D',3);\r\ny_correct = 'F# G A B C# D E F#';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('F',5);\r\ny_correct = 'C D E F G A Bb C';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('Eb');\r\ny_correct = 'Eb F G Ab Bb C D Eb';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('Ab',4);\r\ny_correct = 'Db Eb F G Ab Bb C Db';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('B',2);\r\ny_correct = 'C# D# E F# G# A# B C#';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('Gb',1);\r\ny_correct = 'Gb Ab Bb B Db Eb F Gb';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('A#',7);\r\ny_correct = 'A A# C D D# F G A';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('Bb');\r\ny_correct = 'Bb C D Eb F G A Bb';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('G',5);\r\ny_correct = 'D E F# G A B C D';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('Db',5);\r\ny_correct = 'Ab Bb C Db Eb F Gb Ab';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('E',6);\r\ny_correct = 'C# D# E F# G# A B C#';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('F#');\r\ny_correct = 'F# G# A# B C# D# F F#';\r\nassert(strcmp(y,y_correct))","published":true,"deleted":false,"likes_count":2,"comments_count":3,"created_by":46909,"edited_by":46909,"edited_at":"2025-04-07T01:06:00.000Z","deleted_by":null,"deleted_at":null,"solvers_count":4,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":1,"created_at":"2025-04-06T03:47:16.000Z","updated_at":"2025-04-12T20:01:04.000Z","published_at":"2025-04-06T03:47:35.000Z","restored_at":null,"restored_by":null,"spam":null,"simulink":false,"admin_reviewed":false,"description_opc":"{\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eIf you have seen \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:hyperlink w:docLocation=\\\"https://www.youtube.com/watch?v=drnBMAEA3AM\\\"\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003cw:u/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eThe Sound of Music\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003cw:r\u003e\u003cw:t\u003e, then you are familiar with the \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:hyperlink w:docLocation=\\\"https://www.learnjazzstandards.com/blog/12-major-scales/\\\"\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:u/\u003e\u003c/w:rPr\u003e\u003cw:t\u003emajor scale\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003cw:r\u003e\u003cw:t\u003e: do, re, mi, fa, sol, la, ti, do. The C major scale, for example, is C, D, E, F, G, A, B, C. \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e \u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eNotice the pattern that defines a major scale: a whole step (two notes) from C to D, a whole step from D to E, a half step (one note) from E to F, whole step, whole step, whole step, and half step. The Ab (A flat) major scale would be Ab, Bb, C, Db, Eb, F, G, Ab, and the E major scale would be E, F#, G#, A, B, C#, D#, E. \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\u003eAlso notice on the image of the keyboard below that the black notes have two names. Thus, the G# (G sharp) major scale—G#, A#, C, C#, D#, F, G, G#--is the same as the Ab major scale but with the sharp names rather than the flat names. The major scales that use flats are Db, Eb, F, Gb, Ab, and Bb.\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\u003eWrite a function to list the notes of a major scale, starting on the specified note of the scale (or, if not specified, the first note). \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=\\\"299\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"436\\\"/\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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the notes of a major scale","description":"If you have seen The Sound of Music, then you are familiar with the major scale: do, re, mi, fa, sol, la, ti, do. The C major scale, for example, is C, D, E, F, G, A, B, C.  \r\nNotice the pattern that defines a major scale: a whole step (two notes) from C to D, a whole step from D to E, a half step (one note) from E to F, whole step, whole step, whole step, and half step. The Ab (A flat) major scale would be Ab, Bb, C, Db, Eb, F, G, Ab, and the E major scale would be E, F#, G#, A, B, C#, D#, E. \r\nAlso notice on the image of the keyboard below that the black notes have two names. Thus, the G# (G sharp) major scale—G#, A#, C, C#, D#, F, G, G#--is the same as the Ab major scale but with the sharp names rather than the flat names. The major scales that use flats are Db, Eb, F, Gb, Ab, and Bb.\r\nWrite a function to list the notes of a major scale, starting on the specified note of the scale (or, if not specified, the first note). \r\n","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: 550.7px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 408px 275.35px; transform-origin: 408px 275.35px; 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: 385px 21px; text-align: left; transform-origin: 385px 21px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 53.2833px 8px; transform-origin: 53.2833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eIf you have seen \u003c/span\u003e\u003c/span\u003e\u003ca target='_blank' href = \"https://www.youtube.com/watch?v=drnBMAEA3AM\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"font-style: italic; text-decoration-line: underline; \"\u003eThe Sound of Music\u003c/span\u003e\u003c/span\u003e\u003c/a\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: 95.2917px 8px; transform-origin: 95.2917px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e, then you are familiar with the \u003c/span\u003e\u003c/span\u003e\u003ca target='_blank' href = \"https://www.learnjazzstandards.com/blog/12-major-scales/\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"text-decoration-line: underline; \"\u003emajor scale\u003c/span\u003e\u003c/span\u003e\u003c/a\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: 128.317px 8px; transform-origin: 128.317px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e: do, re, mi, fa, sol, la, ti, do. The C major scale, for example, is C, D, E, F, G, A, B, C. \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 1.94167px 8px; transform-origin: 1.94167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e \u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 63px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 31.5px; text-align: left; transform-origin: 385px 31.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 372.975px 8px; transform-origin: 372.975px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eNotice the pattern that defines a major scale: a whole step (two notes) from C to D, a whole step from D to E, a half step (one note) from E to F, whole step, whole step, whole step, and half step. The Ab (A flat) major scale would be Ab, Bb, C, Db, Eb, F, G, Ab, and the E major scale would be E, F#, G#, A, B, C#, D#, E. \u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 63px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 31.5px; text-align: left; transform-origin: 385px 31.5px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 383.117px 8px; transform-origin: 383.117px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eAlso notice on the image of the keyboard below that the black notes have two names. Thus, the G# (G sharp) major scale—G#, A#, C, C#, D#, F, G, G#--is the same as the Ab major scale but with the sharp names rather than the flat names. The major scales that use flats are Db, Eb, F, Gb, Ab, and Bb.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 42px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 21px; text-align: left; transform-origin: 385px 21px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 367.4px 8px; transform-origin: 367.4px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eWrite a function to list the notes of a major scale, starting on the specified note of the scale (or, if not specified, the first note). \u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 304.7px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 385px 152.35px; text-align: left; transform-origin: 385px 152.35px; white-space-collapse: preserve; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" width=\"436\" height=\"299\" style=\"vertical-align: baseline;width: 436px;height: 299px\" 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data-image-state=\"image-loaded\"\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function y = majorScale(key,startDegree)\r\n   notes = {'C' 'C#' 'D' 'D#' 'E' 'F' 'F#' 'G' 'G#' 'A' 'A#' 'B' 'C' 'C#' 'D' 'D#' 'E' 'F' 'F#' 'G' 'G#' 'A' 'A#' 'B' 'C' 'C#' 'D' 'D#' 'E' 'F' 'F#' 'G' 'G#' 'A' 'A#' 'B'};\r\n   y = notes(key+startDegree:key+startDegree+8);\r\nend","test_suite":"%%\r\ny = majorScale('C');\r\ny_correct = 'C D E F G A B C';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('D',3);\r\ny_correct = 'F# G A B C# D E F#';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('F',5);\r\ny_correct = 'C D E F G A Bb C';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('Eb');\r\ny_correct = 'Eb F G Ab Bb C D Eb';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('Ab',4);\r\ny_correct = 'Db Eb F G Ab Bb C Db';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('B',2);\r\ny_correct = 'C# D# E F# G# A# B C#';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('Gb',1);\r\ny_correct = 'Gb Ab Bb B Db Eb F Gb';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('A#',7);\r\ny_correct = 'A A# C D D# F G A';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('Bb');\r\ny_correct = 'Bb C D Eb F G A Bb';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('G',5);\r\ny_correct = 'D E F# G A B C D';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('Db',5);\r\ny_correct = 'Ab Bb C Db Eb F Gb Ab';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('E',6);\r\ny_correct = 'C# D# E F# G# A B C#';\r\nassert(strcmp(y,y_correct))\r\n\r\n%%\r\ny = majorScale('F#');\r\ny_correct = 'F# G# A# B C# D# F F#';\r\nassert(strcmp(y,y_correct))","published":true,"deleted":false,"likes_count":2,"comments_count":3,"created_by":46909,"edited_by":46909,"edited_at":"2025-04-07T01:06:00.000Z","deleted_by":null,"deleted_at":null,"solvers_count":4,"test_suite_updated_at":null,"rescore_all_solutions":false,"group_id":1,"created_at":"2025-04-06T03:47:16.000Z","updated_at":"2025-04-12T20:01:04.000Z","published_at":"2025-04-06T03:47:35.000Z","restored_at":null,"restored_by":null,"spam":null,"simulink":false,"admin_reviewed":false,"description_opc":"{\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eIf you have seen \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:hyperlink w:docLocation=\\\"https://www.youtube.com/watch?v=drnBMAEA3AM\\\"\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:i/\u003e\u003cw:u/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eThe Sound of Music\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003cw:r\u003e\u003cw:t\u003e, then you are familiar with the \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:hyperlink w:docLocation=\\\"https://www.learnjazzstandards.com/blog/12-major-scales/\\\"\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:u/\u003e\u003c/w:rPr\u003e\u003cw:t\u003emajor scale\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003cw:r\u003e\u003cw:t\u003e: do, re, mi, fa, sol, la, ti, do. The C major scale, for example, is C, D, E, F, G, A, B, C. \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e \u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eNotice the pattern that defines a major scale: a whole step (two notes) from C to D, a whole step from D to E, a half step (one note) from E to F, whole step, whole step, whole step, and half step. The Ab (A flat) major scale would be Ab, Bb, C, Db, Eb, F, G, Ab, and the E major scale would be E, F#, G#, A, B, C#, D#, E. \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\u003eAlso notice on the image of the keyboard below that the black notes have two names. Thus, the G# (G sharp) major scale—G#, A#, C, C#, D#, F, G, G#--is the same as the Ab major scale but with the sharp names rather than the flat names. The major scales that use flats are Db, Eb, F, Gb, Ab, and Bb.\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\u003eWrite a function to list the notes of a major scale, starting on the specified note of the scale (or, if not specified, the first note). \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=\\\"299\\\"/\u003e\u003cw:attr w:name=\\\"width\\\" w:val=\\\"436\\\"/\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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