Joyful
Time Limit: 2000/1000 MS (Java/Others) Memory Limit: 65536/65536 K (Java/Others)
Total Submission(s): 1243 Accepted Submission(s): 546
Problem Description
Sakura has a very magical tool to paint walls. One day, kAc asked Sakura to paint a wall that looks like an M×N matrix. The wall has M×N squares in all. In the whole problem we denotes (x,y) to be the square at the x-th row, y-th column. Once Sakura has determined two squares (x1,y1) and (x2,y2), she can use the magical tool to paint all the squares in the sub-matrix which has the given two squares as corners.
However, Sakura is a very naughty girl, so she just randomly uses the tool for K times. More specifically, each time for Sakura to use that tool, she just randomly picks two squares from all the M×N squares, with equal probability. Now, kAc wants to know the expected number of squares that will be painted eventually.
However, Sakura is a very naughty girl, so she just randomly uses the tool for K times. More specifically, each time for Sakura to use that tool, she just randomly picks two squares from all the M×N squares, with equal probability. Now, kAc wants to know the expected number of squares that will be painted eventually.
Input
The first line contains an integer T(T≤100), denoting the number of test cases.
For each test case, there is only one line, with three integers M,N and K.
It is guaranteed that 1≤M,N≤500, 1≤K≤20.
For each test case, there is only one line, with three integers M,N and K.
It is guaranteed that 1≤M,N≤500, 1≤K≤20.
Output
For each test case, output ''Case #t:'' to represent the t-th case, and then output the expected number of squares that will be painted. Round to integers.
Sample Input
2
3 3 1
4 4 2
Sample Output
Case #1: 4
Case #2: 8
Hint
The precise answer in the first test case is about 3.56790123.Source
Recommend
直接求好像不大好求,可以反着求
代码较挫,
1 #include <iostream> 2 #include <stdio.h> 3 using namespace std; 4 5 using namespace std; 6 7 #define LL long long 8 9 long long C(LL a,LL b) 10 { 11 return a * b * a * b; 12 } 13 int main() 14 { 15 long long T,m,n,k; 16 int cas = 0; 17 scanf("%lld",&T); 18 while(T--) 19 { 20 LL sum; 21 double ans=0, p; 22 scanf("%lld%lld%lld",&m,&n,&k); 23 for(LL i=0; i<m; i++) 24 { 25 for(LL j=0; j<n; j++) 26 { 27 sum = C(i,n)+C((m-i-1),n)+C(j,m)+C((n-j-1),m); 28 sum = sum - C(i,j) - C(i,(n-j-1)) - C((m-i-1),j ) - C((m-i-1),(n-j-1)) ; 29 p = sum * 1.0 / C(m,n); 30 31 double tmp=1; 32 for (LL jj = 1; jj <= k; ++jj) 33 tmp *= p; 34 ans=ans+1-tmp; 35 } 36 } 37 printf("Case #%d: %.0f ",++cas,ans); 38 } 39 return 0; 40 }