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Last change
on this file since 365 was 2, checked in by Rick van der Zwet, 15 years ago |
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Initial import of data of old repository ('data') worth keeping (e.g. tracking
means of URL access statistics)
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File size:
1.1 KB
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| 1 | echo on
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| 2 | % 1)
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| 3 | % see cramermatrix.m
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| 4 |
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| 5 | % 2)
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| 6 | % Matrix A
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| 7 | A = [1, 2, 3;
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| 8 | 4, 5, 6;
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| 9 | 7, 8, 9; ];
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| 10 |
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| 11 | % 3)
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| 12 | % Vector b
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| 13 | b = [ 10; 11; 12];
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| 14 |
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| 15 | % 4)
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| 16 | help cramermatrix
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| 17 |
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| 18 | % 5)
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| 19 | % test werking cramermatrix voor i=1,2,3
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| 20 | for i=1:3
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| 21 | cramermatrix(A,i,b)
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| 22 | end
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| 23 |
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| 24 | % 6)
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| 25 | % see cramer.m
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| 26 |
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| 27 | % 7)
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| 28 | % resultatencheck met rref(Ab)
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| 29 | Ab = [1, 2, 3, 10;
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| 30 | 6, 5, 4, 11;
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| 31 | 7, 9, 8, 12; ];
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| 32 | % little trick to input into newly created cramer function
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| 33 | cramer(Ab(:,1:3),Ab(:,4))
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| 34 | rref(Ab)
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| 35 | % klopt
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| 36 |
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| 37 | %
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| 38 | % Permataties van rijen van een matrix
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| 39 | %
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| 40 |
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| 41 | % 1)
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| 42 | A = [ 1, 2, 3, 4;
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| 43 | 5, 6, 7, 8;
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| 44 | 9, 10, 11, 12;
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| 45 | 13, 14, 15, 16; ];
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| 46 | % 2)
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| 47 | P4231 = [ 0, 0, 0, 1;
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| 48 | 0, 1, 0, 0;
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| 49 | 0, 0, 1, 0;
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| 50 | 1, 0, 0, 0; ];
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| 51 |
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| 52 | % 3)
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| 53 | T1 = P4231 * A
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| 54 |
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| 55 | % 4)
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| 56 | T2 = rowswap(A,1,4)
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| 57 | % Ze zijn gelijk
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| 58 |
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| 59 | %
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| 60 | % LU deconpositie
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| 61 | %
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| 62 |
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| 63 | % 1)
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| 64 | A = [ 2, 4, -1, 5, -2;
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| 65 | -4, -5, 3, -8, 1;
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| 66 | 2, -5, -4, 1, 8;
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| 67 | -6, 0, 7, -3, 1; ];
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| 68 |
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| 69 | % 2)
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| 70 | [L, U] = lu(A)
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| 71 |
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| 72 | % 3) Nee L geen onderdriehoeksmatrix, en U geen bovendriehoeksmatrix
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| 73 |
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| 74 | % 4)
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| 75 | [L, U, P] = lu(A)
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| 76 |
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| 77 | % 5) Ja, L is nu een onderdriehoeksmatrix
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| 78 |
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| 79 | % 6)
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| 80 | [L, U] = lu(P * A)
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| 81 | % Dit levert het gewenste resultaat op, als P gebruikt wordt
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| 82 |
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| 83 |
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