传送门
题面:
Freshmen frequently make an error in computing the power of a sum of real numbers, which usually origins from an incorrect equation (m+n)p=mp+np, where m,n,p are real numbers. Let's call it ``Beginner's Dream''.
For instance, (1+4)2=52=25, but 12+42=17≠25. Moreover, √9+16=√25=5, which does not equal 3+4=7.
Fortunately, in some cases when p is a prime, the identity
(m+n)p=mp+np
holds true for every pair of non-negative integers m,n which are less than p, with appropriate definitions of addition and multiplication.
You are required to redefine the rules of addition and multiplication so as to make the beginner's dream realized.
Specifically, you need to create your custom addition and multiplication, so that when making calculation with your rules the equation (m+n)p=mp+np is a valid identity for all non-negative integers m,n less than p. Power is defined as
ap={1,p=0ap−1⋅a,p>0
Obviously there exists an extremely simple solution that makes all operation just produce zero. So an extra constraint should be satisfied that there exists an integer q(0<q<p) to make the set {qk|0<k<p,k∈Z} equal to {k|0<k<p,k∈Z}. What's more, the set of non-negative integers less than p ought to be closed under the operation of your definitions.
Hint
Hint for sample input and output:
From the table we get 0+1=1, and thus (0+1)2=12=1⋅1=1. On the other hand, 02=0⋅0=0, 12=1⋅1=1, 02+12=0+1=1.
They are the same.
Input
The first line of the input contains an positive integer T(T≤30) indicating the number of test cases.
For every case, there is only one line contains an integer p(p<210), described in the problem description above. p is guranteed to be a prime.
Output
For each test case, you should print 2p lines of p integers.
The j-th(1≤j≤p) integer of i-th(1≤i≤p) line denotes the value of (i−1)+(j−1). The j-th(1≤j≤p) integer of (p+i)-th(1≤i≤p) line denotes the value of (i−1)⋅(j−1).
Sample Input
1 2
Sample Output
0 1 1 0 0 0 0 1
题意:
给一个质数p,让你重定义加法和乘法,使得对于任意的n,m属于[0,p-1],满足式子,最后,对于1到p行,你将要输出第i行与第j列的数相加的结果(其中
);对于第p+1行到2p行,你将要输出第i行与第j列相乘的结果,(其中
)
题目分析:
这是一个被隐藏得很深的数论问题。题意相对来说比较难懂,但是明白题意之后,其实这个题目做起来并不困难。
首先题目要求我们满足式子,思考题目中给我们的p是素数,因此我们不难想到费马小定理,故对于等式两边同时mod p可得:
因此我们只需要在加法和乘法的过程中取个模数p即是最终答案。
代码:
#include<bits/stdc++.h>
using namespace std;
int main(){
int T,p;
scanf("%d",&T);
while(T--){
scanf("%d",&p);
for(int i=0;i<p;i++){
for(int j=0;j<p-1;j++){
printf("%d ",(i+j)%p);
}
printf("%d
",(i+p-1)%p);
}
for(int i=0;i<p;i++){
for(int j=0;j<p-1;j++){
printf("%d ",(i*j)%p);
}
printf("%d
",(i*(p-1))%p);
}
}
return 0;
}