Alice, a student of grade 666, is thinking about an Olympian Math problem, but she feels so despair that she cries. And her classmate, Bob, has no idea about the problem. Thus he wants you to help him. The problem is:
We denote k!k!k!:
k!=1×2×⋯×(k−1)×kk! = 1 \times 2 \times \cdots \times (k - 1) \times kk!=1×2×⋯×(k−1)×k
We denote SSS:
S=1×1!+2×2!+⋯+S = 1 \times 1! + 2 \times 2! + \cdots +S=1×1!+2×2!+⋯+
(n−1)×(n−1)! (n - 1) \times (n-1)!(n−1)×(n−1)!
Then SSS module nnn is ____________
You are given an integer nnn.
You have to calculate SSS modulo nnn.
Input
The first line contains an integer T(T≤1000)T(T \le 1000)T(T≤1000), denoting the number of test cases.
For each test case, there is a line which has an integer nnn.
It is guaranteed that 2≤n≤10182 \le n\le 10^{18}2≤n≤1018.
Output
For each test case, print an integer SSS modulo nnn.
Hint
The first test is: S=1×1!=1S = 1\times 1!= 1S=1×1!=1, and 111 modulo 222 is 111.
The second test is: S=1×1!+2×2!=5S = 1\times 1!+2 \times 2!= 5S=1×1!+2×2!=5 , and 555 modulo 333 is 222.
样例输入
2 2 3
样例输出
1 2
题目来源
找规律, 打个表就发现永远输出n - 1就行了。
AC代码:
#include<cstdio>
using namespace std;
int main()
{
int n;
long long ans;
scanf("%d", &n);
while(n--){
scanf("%lld", &ans);
printf("%lld\n", ans - 1);
}
return 0;
}