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Windoku Killer 3 (WK3)
Posted: Wed Apr 16, 2008 5:56 am
by Jean-Christophe
Posted: Wed Apr 16, 2008 7:30 am
by Afmob
This was a fun puzzle, thanks JC!
You really had to look at the Windows to crack it.
Here are the key points to crack it:
1. Using R234C678 = 45(9) -> Innies C6789 = R5C67 = 13(2) <> 1,2,3
2. Using R678C234 = 45(9) -> Innies C1234 = R5C34 = 13(2) <> 1,2,3
3. Using Innies of C1234 + C6789 -> Innies R5 = R5C5 = 2
Puzzle is cracked though you probably have to use Outies R234C678 = R3C5+R5C7 = 7(2) = [16/34]. Afterwards is solvable without applying Windoku rules.
I think it was easily the hardest of all three Windoku Killers.
Posted: Wed Apr 16, 2008 9:58 pm
by Nasenbaer
Nice puzzle, Jean-Christophe, thanks! Not too hard.
Naming for the additional windows corresponds to this:
Code: Select all
1 2 2 2 1 3 3 3 1
4 6 6 6 4 7 7 7 4
4 6 6 6 4 7 7 7 4
4 6 6 6 4 7 7 7 4
1 2 2 2 1 3 3 3 1
5 8 8 8 5 9 9 9 5
5 8 8 8 5 9 9 9 5
5 8 8 8 5 9 9 9 5
1 2 2 2 1 3 3 3 1
Walkthrough WK 3
1. Preliminaries (and more)
1a. n1: 20(3) = {479|569|578} -> no 1,2,3 ({389} blocked by 19(3))
1b. n1: 19(3) = {469|478|568} -> no 1,2,3 ({289|379} blocked by 20(3))
1c. 11(3) @ r1c3,r8c6 = {128|137|146|236|245} -> no 9
1d. 10(2) @ r1c5, r1c6,r5c8 = {19|28|37|46} -> no 5
1e. n4: 7(2) = {16|25|34} -> no 7,8,9
1f. n47: 8(2) = {17|26|35} -> no 4,8,9
1g. n36: 13(2) = {49|58|67} -> no 1,2,3
1h. n8: 15(2) = {69|78} -> no 1,2,3,4,5
2. 45 on n1 (3 innies): r1c3 + r3c13 = h6(3) = {123} -> no 4,5,6,7,8,9
2a. -> 15(3) @ r3c1 : no 1,2,3 in r4c12, {456} removed
3. 45 on w7 (2 outies): r3c5 + r5c7 = h7(2) = {16|25|34} -> no 7,8,9
3a. -> r3c6 + r4c67 = h14(3) = {149|158|167|239|248|257|347} ({356} blocked by h7(2))
4. 45 on w8 (2 outies): r5c3 + r7c5 = h11(2) = {29|38|47|56} -> no 1
4a. r6c34 + r7c4 = h16(3) = {169|178|259|268|349|358|367|457}
5. 45 on r1234 (using h14(3) from step 3): r34c5 = h8(2) = [17]|{26|35} -> no 4 in r3c5, no
1,4,8,9 in r4c5
5a. -> no 3 in r5c7
6. 45 on r6789 (using h16(3) from step 4): r67c5 = h10(2) = [19]|{28|37|46} -> no 5,9 in
r6c5, no 5 in r7c5
6a. -> no 6 in r5c3
7. 45 on c5 (using h8(2) and h10(2)): r5c5 = 2
7a. -> n5: 28(5) = 2{3689|4589|4679|5678} -> no 1
7b. -> c5: h8(2) = [17]|{35} -> no 2,6
7c. -> c5: 10(2) = {19|37|46} -> no 2,8
7d. -> c5: h10(2) = {37|46} -> no 1,2,8,9
7e. -> c5: 15(2) = {78} -> 7,8 locked for c5 and n8
7f. -> c5: h10(2) = {46} -> 4,6 locked for c5
7g. -> c5: 10(2) = {19} -> 1,9 locked for c5 and n2
7h. -> c5: h8(2) = {35} -> 3,5 locked for c5
7i. -> h7(2): r3c5 = 3, r5c7 = 4, r4c5 = 5
7j. -> 28(5) = 258{49|67} -> no 3
7k. -> r5: 7(2) = {16} -> 1,6 locked for r5 and n4
7l. -> r5: 10(2) = {37} -> 3,7 locked for r5 and n6
7m. -> single: r5c3 = 5, r7c5 = 6, r6c4 = 4
7n. -> r5c46 = {89} -> 8,9 locked for r5 and n5
7o. -> single: r1c3 = 3 -> r12c4 = {26} -> 2,6 locked for c4 and n2
7p. -> n12: 15(3): r3c1 = 2, r4c12 = {49} -> 4,9 locked for r4 and n4 -> r3c3 = 1
8. 45 on c1234: r5c4 = 8, r5c6 = 9
9. n1245: 15(4) = 17{25|34} -> r3c4 = {45}, r4c3 = {27}, r4c4 = {37} -> 7 locked in r4c34 for
r4 and w6
9a. -> n1: 19(3) = 6{49|68} -> 6 locked for n1 and w6
9b. -> w6: r2c4 = 2, r1c4 = 6, r4c34 = [73], r3c4 = 4
9c. -> n1: 19(3) = {568} -> 6,8 locked for n1, 5 locked in r23c2 for c2 and n1
9d. -> w6: r4c12 = [49]
9e. -> r67c1 = [35]
9f. -> single: r1c2 = 4, 7,9 locked in r12c1 for c1 and n1
10. cleanup
10a. w2: no 3,4,5,6,8 in r5c2,r9c234 -> r5c12 = [61], r9c234 = [729]
10b. r89c5 = [78], r89c1 = [81], r6c23 = [28], r78c2 = [36], r678c4 = [715], r2c3 = 6
10c. w4: no 2,3,4,5 in r234c9 -> r34c9 = [76], r12c1 = [79], r12c5 = [91], r2c9 = 8
10d. r23c2 = [58], r12346c6 = [87516], r12c7 = 23, r2c8 = 4
10e. r4c78 = [82], r5c89 = [73]
10f. w1: r1c89 = [15], r9c69 = [34]
10g. r78c6 = [42], r9c78 = [65], r6c789 = [591], r78c2 = [94], r7c789 = [782], r8c789 = [139], r3c78 = [96]
Solution:
743698215
956217348
281435967
497351826
615829473
328746591
539164782
864572139
172983654
Cheers,
Nasenbaer
2818
2564
3589
5121:4870:4870
3849:5386:5386:7943:7943
3848
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6926:7180:7180:7180:5386
2575
7441:6926:6926:7180:5650:5650
3091
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2839
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2818
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5121:4870:4870
3849:5386:5386:7943:7943
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6926:7180:7180:7180:5386
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7441:6926:6926:7180:5650:5650
3091
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