#KDIV. K-Divisors

    ID: 3890 远端评测题 3000ms 1536MiB 尝试: 0 已通过: 0 难度: (无) 上传者: 标签>backtrackingsub-linearfast-prime-countingpruning

K-Divisors

The positive divisor function is defined as a function that counts the number of positive divisors of an integer N, including 1 and N.

If we define the positive divisor function as D(N), then, for example:

  • D(1) = 1
  • D(2) = 2
  • D(10) = 4
  • D(24) = 8

Calculating D(N) is a classical problem and there are many efficient algorithms for that. But what if you are asked to find something different? Given a range and an integer K, can you find out for how many N in the given range, D(N) equals K?

Input

In the very first line, you’ll have an integer called T. This is the number of test cases that shall follow. Every test case contains three integers, L, R, and K. L and R represent the range and are inclusive.

Constraints

  • 1 ≤ T < 31
  • 1 ≤ L ≤ R < 231
  • 1 ≤ K < 231

Output

For every test case, you must print the case number, followed by the count of numbers with exactly K divisors in the range.

Example

Input:
3
10 10 4
2 13 2
100 10000 100

Output: Case 1: 1 Case 2: 6 Case 3: 0

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