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back to boardRecursion Posted by marat 26 Apr 2011 15:12 It's not difficult to prove that if you optimally solved the problem with n conductors, n-1 conductors should be solved optimally too. Let a(n,k) be minimal total number of fined fare dodgers and good conductors. Then a(n,k) = MIN i FROM 0 TO k OF { a(n-1,i) + (n+k-[n is not a good conductor])/10 - (n-1+i)/10 } Details: Given k friends we should divide them into two parts. The first part should go and safe n-1 conductors and the second should stay between n-1 and n conductors. All we have to do is to count amount of fined friends in the second part + a(n-1,the first part) + whether n-th conductors is fined(1 or 0). [logical expression A] = 1, if A is true 0, otherwise What concerns test try these ones: ------------------------ 10 2 1110001011 possible answer: 0 2 2 1 ------------------------ 10 3 0001111111 possible answer: 1 0 ------------------------ 10 0 0001110001 possible answer: 1 0 ------------------------ 20 5 11111001110001110001 possible answer: 0 3 3 2 1 |
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