Weekly Assassin, July 14, 2006 (walkthrough)
Posted: Fri Jul 14, 2006 6:06 am
Despite Ruud's warning, this one requires no combination tables, either. But it's a nice puzzle that takes a little finesse after the straightforward start (the lefthand nonets crack easily at the beginning).
1. R1C12 = {(15)|(24)} -> R12C3 = {(16)|(34)} -> R23C2 = {(18)|(27)}. Hidden killer pair on {12} in the 6(2) and 9(2) cages, so R12C3 = {34}, R1C12 = {15}, R23C2 = {27}.
2. 45 rule on C1 -> R6C2 = 4, R1C12 = [51], R789C1 = {234}, R56C1 = {19}, R4C1 = 7, R23C1 = {68}, R3C3 = 9. 45 rule on N4 -> R46C3 = 10 = {28}. R5C3 = {56}, R45C2 = {356}, R9C2 = {89}, R4C4 = {28}.
3. In N7 the 1 is locked in the 20(4) cage (since it cannot go in a 19(3) cage). In turn this means R6C3 cannot be 2 (because 20 - 2 - 1 = 17 which is too high for the remaining 2 cells since one contains {567}). So R6C3 = 8, R4C34 = [28].
4. 45 rule on N3 -> R4C9 = 9, R3C7 = 2, R23C2 = [27], R1C89 = [98]. The 8 in N6 must be in the 12(3) cage so that cage = {138}. 45 rule on N6 -> R46C7 = 10 = {46}. So R6C7 = 6, R4C67 = [54]. 45 rule on N789 -> R7C5 = 8.
5. R23C8 = {(47)|(56)}. R23C9 = {(16)|(34)}, which eliminates {135} in R789C9. So R789C9 = {2(16)|(34)}, locking 2 in C9 within N9. So R78C8 = {37} ({46} is blocked by the 11(2) cage in C8), R45C8 = [18], R5C7 = 3, R12C7 = [71], R23C8 = {56}, R23C9 = {34}, R789C9 = {126}, R56C9 = {57}, R6C8 = 2, R9C8 = 4.
6. 45 rule on N369 -> R79C6 = {23}. 45 rule on N7 -> R79C4 = 9 = [45]. R9C23 = [86], R78C2 = {59}, R45C2 = [36], R5C3 = 5, R56C9 = [75] R4C5 = 6. 45 rule on N2 -> R5C5 = 4. R9C67 = [29], R7C6 = 3, R78C7 = [58], R78C8 = [73], R9C1 = 3, R9C9 = 1, R9C5 = 7.
7. In N2 the 27(5) cage in N2 must contain {46}; it must also have {27} in it (because they are blocked from the 28(5) cage). The remaining 5th cell is 27 - 2 - 4 - 6 - 7 = 8. So the cage = {24678}, R2C6 = 8, R2C4 = 7.... and the puzzle more or less finished itself from this point on.
1. R1C12 = {(15)|(24)} -> R12C3 = {(16)|(34)} -> R23C2 = {(18)|(27)}. Hidden killer pair on {12} in the 6(2) and 9(2) cages, so R12C3 = {34}, R1C12 = {15}, R23C2 = {27}.
2. 45 rule on C1 -> R6C2 = 4, R1C12 = [51], R789C1 = {234}, R56C1 = {19}, R4C1 = 7, R23C1 = {68}, R3C3 = 9. 45 rule on N4 -> R46C3 = 10 = {28}. R5C3 = {56}, R45C2 = {356}, R9C2 = {89}, R4C4 = {28}.
3. In N7 the 1 is locked in the 20(4) cage (since it cannot go in a 19(3) cage). In turn this means R6C3 cannot be 2 (because 20 - 2 - 1 = 17 which is too high for the remaining 2 cells since one contains {567}). So R6C3 = 8, R4C34 = [28].
4. 45 rule on N3 -> R4C9 = 9, R3C7 = 2, R23C2 = [27], R1C89 = [98]. The 8 in N6 must be in the 12(3) cage so that cage = {138}. 45 rule on N6 -> R46C7 = 10 = {46}. So R6C7 = 6, R4C67 = [54]. 45 rule on N789 -> R7C5 = 8.
5. R23C8 = {(47)|(56)}. R23C9 = {(16)|(34)}, which eliminates {135} in R789C9. So R789C9 = {2(16)|(34)}, locking 2 in C9 within N9. So R78C8 = {37} ({46} is blocked by the 11(2) cage in C8), R45C8 = [18], R5C7 = 3, R12C7 = [71], R23C8 = {56}, R23C9 = {34}, R789C9 = {126}, R56C9 = {57}, R6C8 = 2, R9C8 = 4.
6. 45 rule on N369 -> R79C6 = {23}. 45 rule on N7 -> R79C4 = 9 = [45]. R9C23 = [86], R78C2 = {59}, R45C2 = [36], R5C3 = 5, R56C9 = [75] R4C5 = 6. 45 rule on N2 -> R5C5 = 4. R9C67 = [29], R7C6 = 3, R78C7 = [58], R78C8 = [73], R9C1 = 3, R9C9 = 1, R9C5 = 7.
7. In N2 the 27(5) cage in N2 must contain {46}; it must also have {27} in it (because they are blocked from the 28(5) cage). The remaining 5th cell is 27 - 2 - 4 - 6 - 7 = 8. So the cage = {24678}, R2C6 = 8, R2C4 = 7.... and the puzzle more or less finished itself from this point on.