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Test | Status | Code Input and Output |
---|---|---|
1 | Pass |
%%
P = [1 0; 1 2];
m1 = eye(2);
m2 = ones(2);
M_correct = [1 0 0 0; 0 1 0 0; 1 0 1 1; 0 1 1 1];
assert(isequal(patchworkMatrix(P,m1,m2),M_correct))
ans =
[2x2 double] [2x2 double] [2x2 double]
|
2 | Pass |
%%
P = 2-eye(4);
m1 = eye(2);
m2 = ones(2);
M_correct = [1 0 1 1 1 1 1 1; 0 1 1 1 1 1 1 1; 1 1 1 0 1 1 1 1; 1 1 0 1 1 1 1 1; 1 1 1 1 1 0 1 1; 1 1 1 1 0 1 1 1; 1 1 1 1 1 1 1 0; 1 1 1 1 1 1 0 1];
assert(isequal(patchworkMatrix(P,m1,m2),M_correct))
ans =
[2x2 double] [2x2 double] [2x2 double]
|
3 | Pass |
%%
P = [2 3 2 3];
m1 = 1;
m2 = 2;
m3 = 3;
M_correct = [2 3 2 3];
assert(isequal(patchworkMatrix(P,m1,m2,m3),M_correct))
ans =
[0] [1] [2] [3]
|
4 | Pass |
%%
P = [6 5; 4 3; 2 1];
m1 = rand(2,3);
m2 = rand(2,3);
m3 = rand(2,3);
m4 = rand(2,3);
m5 = rand(2,3);
m6 = rand(2,3);
M_correct = [m6 m5; m4 m3; m2 m1];
assert(isequal(patchworkMatrix(P,m1,m2,m3,m4,m5,m6),M_correct))
ans =
Columns 1 through 6
[2x3 double] [2x3 double] [2x3 double] [2x3 double] [2x3 double] [2x3 double]
Column 7
[2x3 double]
|
5 | Pass |
%%
P = zeros(2);
m1 = rand(3,2);
m2 = rand(3,2);
m3 = rand(3,2);
m4 = rand(3,2);
m5 = rand(3,2);
m6 = rand(3,2);
M_correct = zeros(6,4);
assert(isequal(patchworkMatrix(P,m1,m2,m3,m4,m5,m6),M_correct))
ans =
Columns 1 through 6
[3x2 double] [3x2 double] [3x2 double] [3x2 double] [3x2 double] [3x2 double]
Column 7
[3x2 double]
|
6 | Pass |
%%
P = [];
m = cell(100);
assert(isempty(patchworkMatrix(P,m{:})))
ans =
Columns 1 through 16
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 17 through 32
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 33 through 48
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 49 through 64
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 65 through 80
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 81 through 96
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 97 through 112
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 113 through 128
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 129 through 144
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 145 through 160
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 161 through 176
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 177 through 192
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 193 through 208
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 209 through 224
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 225 through 240
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 241 through 256
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 257 through 272
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 273 through 288
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 289 through 304
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 305 through 320
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 321 through 336
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 337 through 352
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 353 through 368
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 369 through 384
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 385 through 400
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 401 through 416
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 417 through 432
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 433 through 448
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 449 through 464
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 465 through 480
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 481 through 496
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 497 through 512
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 513 through 528
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 529 through 544
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 545 through 560
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 561 through 576
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 577 through 592
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 593 through 608
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 609 through 624
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 625 through 640
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 641 through 656
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 657 through 672
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 673 through 688
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 689 through 704
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 705 through 720
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 721 through 736
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 737 through 752
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 753 through 768
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 769 through 784
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 785 through 800
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 801 through 816
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 817 through 832
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 833 through 848
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 849 through 864
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 865 through 880
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 881 through 896
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 897 through 912
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 913 through 928
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 929 through 944
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 945 through 960
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 961 through 976
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 977 through 992
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 993 through 1008
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1009 through 1024
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1025 through 1040
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1041 through 1056
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1057 through 1072
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1073 through 1088
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1089 through 1104
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1105 through 1120
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1121 through 1136
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1137 through 1152
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1153 through 1168
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1169 through 1184
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1185 through 1200
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1201 through 1216
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1217 through 1232
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1233 through 1248
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1249 through 1264
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1265 through 1280
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Columns 1281 through 1296
[] [] [] [] [] [] [] [] [] [] [] [] [] [] [] []
Colum...
|
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