----jGRASP exec: java PermuteR Welcome to the Permutation Machine Number of slots = 2 [1, 2, 2, 3] count= 1: 12 count= 2: 12 count= 3: 13 count= 4: 21 count= 5: 22 count= 6: 23 count= 7: 21 count= 8: 22 count= 9: 23 count= 10: 31 count= 11: 32 count= 12: 32 Number of permutations with duplicates = 12 [12, 12, 13, 21, 22, 23, 21, 22, 23, 31, 32, 32] at 1, 2 -- marking "12" at 4, 7 -- marking "21" at 5, 8 -- marking "22" at 6, 9 -- marking "23" at 11, 12 -- marking "32" Number of permutations without duplicates = 7 [12, 13, 21, 22, 23, 31, 32] Welcome to the Amazing Permutation Machine Number of slots = 2 Given "1223" 1223 1232 1223 1232 1322 1322 2123 2132 2213 2231 2312 2321 2123 2132 2213 2231 2312 2321 3122 3122 3212 3221 3212 3221 Number of permutations in all slots with duplicates = 24 [1223, 1232, 1223, 1232, 1322, 1322, 2123, 2132, 2213, 2231, 2312, 2321, 2123, 2132, 2213, 2231, 2312, 2321, 3122, 3122, 3212, 3221, 3212, 3221] at 1, 2 -- marking "12" at 1, 3 -- marking "12" at 1, 4 -- marking "12" at 5, 6 -- marking "13" at 7, 8 -- marking "21" at 7, 13 -- marking "21" at 7, 14 -- marking "21" at 9, 10 -- marking "22" at 9, 15 -- marking "22" at 9, 16 -- marking "22" at 11, 12 -- marking "23" at 11, 17 -- marking "23" at 11, 18 -- marking "23" at 19, 20 -- marking "31" at 21, 22 -- marking "32" at 21, 23 -- marking "32" at 21, 24 -- marking "32" Number of permutations without duplicates = 7 [12, 13, 21, 22, 23, 31, 32] Welcome to the Permutation Machine Number of slots = 3 [1, 2, 2, 3, 4] count= 1: 122 count= 2: 123 count= 3: 124 count= 4: 122 count= 5: 123 count= 6: 124 count= 7: 132 count= 8: 132 count= 9: 134 count= 10: 142 count= 11: 142 count= 12: 143 count= 13: 212 count= 14: 213 count= 15: 214 count= 16: 221 count= 17: 223 count= 18: 224 count= 19: 231 count= 20: 232 count= 21: 234 count= 22: 241 count= 23: 242 count= 24: 243 count= 25: 212 count= 26: 213 count= 27: 214 count= 28: 221 count= 29: 223 count= 30: 224 count= 31: 231 count= 32: 232 count= 33: 234 count= 34: 241 count= 35: 242 count= 36: 243 count= 37: 312 count= 38: 312 count= 39: 314 count= 40: 321 count= 41: 322 count= 42: 324 count= 43: 321 count= 44: 322 count= 45: 324 count= 46: 341 count= 47: 342 count= 48: 342 count= 49: 412 count= 50: 412 count= 51: 413 count= 52: 421 count= 53: 422 count= 54: 423 count= 55: 421 count= 56: 422 count= 57: 423 count= 58: 431 count= 59: 432 count= 60: 432 Number of permutations with duplicates = 60 [122, 123, 124, 122, 123, 124, 132, 132, 134, 142, 142, 143, 212, 213, 214, 221, 223, 224, 231, 232, 234, 241, 242, 243, 212, 213, 214, 221, 223, 224, 231, 232, 234, 241, 242, 243, 312, 312, 314, 321, 322, 324, 321, 322, 324, 341, 342, 342, 412, 412, 413, 421, 422, 423, 421, 422, 423, 431, 432, 432] at 1, 4 -- marking "122" at 2, 5 -- marking "123" at 3, 6 -- marking "124" at 7, 8 -- marking "132" at 10, 11 -- marking "142" at 13, 25 -- marking "212" at 14, 26 -- marking "213" at 15, 27 -- marking "214" at 16, 28 -- marking "221" at 17, 29 -- marking "223" at 18, 30 -- marking "224" at 19, 31 -- marking "231" at 20, 32 -- marking "232" at 21, 33 -- marking "234" at 22, 34 -- marking "241" at 23, 35 -- marking "242" at 24, 36 -- marking "243" at 37, 38 -- marking "312" at 40, 43 -- marking "321" at 41, 44 -- marking "322" at 42, 45 -- marking "324" at 47, 48 -- marking "342" at 49, 50 -- marking "412" at 52, 55 -- marking "421" at 53, 56 -- marking "422" at 54, 57 -- marking "423" at 59, 60 -- marking "432" Number of permutations without duplicates = 33 [122, 123, 124, 132, 134, 142, 143, 212, 213, 214, 221, 223, 224, 231, 232, 234, 241, 242, 243, 312, 314, 321, 322, 324, 341, 342, 412, 413, 421, 422, 423, 431, 432] Welcome to the Amazing Permutation Machine Number of slots = 3 Given "12234" 12234 12243 12324 12342 12423 12432 12234 12243 12324 12342 12423 12432 13224 13242 13224 13242 13422 13422 14223 14232 14223 14232 14322 14322 21234 21243 21324 21342 21423 21432 22134 22143 22314 22341 22413 22431 23124 23142 23214 23241 23412 23421 24123 24132 24213 24231 24312 24321 21234 21243 21324 21342 21423 21432 22134 22143 22314 22341 22413 22431 23124 23142 23214 23241 23412 23421 24123 24132 24213 24231 24312 24321 31224 31242 31224 31242 31422 31422 32124 32142 32214 32241 32412 32421 32124 32142 32214 32241 32412 32421 34122 34122 34212 34221 34212 34221 41223 41232 41223 41232 41322 41322 42123 42132 42213 42231 42312 42321 42123 42132 42213 42231 42312 42321 43122 43122 43212 43221 43212 43221 Number of permutations in all slots with duplicates = 120 [12234, 12243, 12324, 12342, 12423, 12432, 12234, 12243, 12324, 12342, 12423, 12432, 13224, 13242, 13224, 13242, 13422, 13422, 14223, 14232, 14223, 14232, 14322, 14322, 21234, 21243, 21324, 21342, 21423, 21432, 22134, 22143, 22314, 22341, 22413, 22431, 23124, 23142, 23214, 23241, 23412, 23421, 24123, 24132, 24213, 24231, 24312, 24321, 21234, 21243, 21324, 21342, 21423, 21432, 22134, 22143, 22314, 22341, 22413, 22431, 23124, 23142, 23214, 23241, 23412, 23421, 24123, 24132, 24213, 24231, 24312, 24321, 31224, 31242, 31224, 31242, 31422, 31422, 32124, 32142, 32214, 32241, 32412, 32421, 32124, 32142, 32214, 32241, 32412, 32421, 34122, 34122, 34212, 34221, 34212, 34221, 41223, 41232, 41223, 41232, 41322, 41322, 42123, 42132, 42213, 42231, 42312, 42321, 42123, 42132, 42213, 42231, 42312, 42321, 43122, 43122, 43212, 43221, 43212, 43221] at 1, 2 -- marking "122" at 1, 7 -- marking "122" at 1, 8 -- marking "122" at 3, 4 -- marking "123" at 3, 9 -- marking "123" at 3, 10 -- marking "123" at 5, 6 -- marking "124" at 5, 11 -- marking "124" at 5, 12 -- marking "124" at 13, 14 -- marking "132" at 13, 15 -- marking "132" at 13, 16 -- marking "132" at 17, 18 -- marking "134" at 19, 20 -- marking "142" at 19, 21 -- marking "142" at 19, 22 -- marking "142" at 23, 24 -- marking "143" at 25, 26 -- marking "212" at 25, 49 -- marking "212" at 25, 50 -- marking "212" at 27, 28 -- marking "213" at 27, 51 -- marking "213" at 27, 52 -- marking "213" at 29, 30 -- marking "214" at 29, 53 -- marking "214" at 29, 54 -- marking "214" at 31, 32 -- marking "221" at 31, 55 -- marking "221" at 31, 56 -- marking "221" at 33, 34 -- marking "223" at 33, 57 -- marking "223" at 33, 58 -- marking "223" at 35, 36 -- marking "224" at 35, 59 -- marking "224" at 35, 60 -- marking "224" at 37, 38 -- marking "231" at 37, 61 -- marking "231" at 37, 62 -- marking "231" at 39, 40 -- marking "232" at 39, 63 -- marking "232" at 39, 64 -- marking "232" at 41, 42 -- marking "234" at 41, 65 -- marking "234" at 41, 66 -- marking "234" at 43, 44 -- marking "241" at 43, 67 -- marking "241" at 43, 68 -- marking "241" at 45, 46 -- marking "242" at 45, 69 -- marking "242" at 45, 70 -- marking "242" at 47, 48 -- marking "243" at 47, 71 -- marking "243" at 47, 72 -- marking "243" at 73, 74 -- marking "312" at 73, 75 -- marking "312" at 73, 76 -- marking "312" at 77, 78 -- marking "314" at 79, 80 -- marking "321" at 79, 85 -- marking "321" at 79, 86 -- marking "321" at 81, 82 -- marking "322" at 81, 87 -- marking "322" at 81, 88 -- marking "322" at 83, 84 -- marking "324" at 83, 89 -- marking "324" at 83, 90 -- marking "324" at 91, 92 -- marking "341" at 93, 94 -- marking "342" at 93, 95 -- marking "342" at 93, 96 -- marking "342" at 97, 98 -- marking "412" at 97, 99 -- marking "412" at 97, 100 -- marking "412" at 101, 102 -- marking "413" at 103, 104 -- marking "421" at 103, 109 -- marking "421" at 103, 110 -- marking "421" at 105, 106 -- marking "422" at 105, 111 -- marking "422" at 105, 112 -- marking "422" at 107, 108 -- marking "423" at 107, 113 -- marking "423" at 107, 114 -- marking "423" at 115, 116 -- marking "431" at 117, 118 -- marking "432" at 117, 119 -- marking "432" at 117, 120 -- marking "432" Number of permutations without duplicates = 33 [122, 123, 124, 132, 134, 142, 143, 212, 213, 214, 221, 223, 224, 231, 232, 234, 241, 242, 243, 312, 314, 321, 322, 324, 341, 342, 412, 413, 421, 422, 423, 431, 432] ----jGRASP: operation complete.