Sum of the Dice
Time Limit: 1.0 s
Memory Limit: 128.0 MB
You have N dice; each has \(K\) faces numbered from \(1\) to \(K\). Now you have arranged the \(N\) dice in a line. You can rotate/flip any dice if you want. How many ways you can set the top faces such that the summation of all the top faces equals \(S\)?
Given \(N\), \(K\), and \(S\), you have to calculate the total number of ways.
Format
Input
Input starts with an in integer \(T (\le 25)\), denoting the number of test cases.
Each case contains three integers: \(N (1 \le N \le 1000)\), \(K (1 \le K \le 1000)\), and \(S (0 \le S \le 15000)\).
Output
For each case, print the case number and the result modulo \(10^8 + 7\).
Sample
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Source:
Information
- ID
- 1127
- Difficulty
- 9
- Category
- (None)
- Tags
- (None)
- # Submissions
- 1
- Accepted
- 1
- Accepted Ratio
- 100%
- Uploaded By
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