codeforces 552 C Vanya and Scales

这个题的意思就是给出一个数m，以及一个以1为首元素，w为比例常数的等比数列，数列长度为101，数列中每个数字最多只能用一次。问是否存在xa+wb+……=wc+wd+……+we+m。
很显然，换句话说就是问，是否存在m=wa+wb+……+wf-wc-wd-……-we，再进行化简就可以得到，是在问，是否存在m=((((wh±1)wi±1)±1)wj±1)wk……。

那么很显然可以进行搜索，比如说用广搜，每次当前的m±1中若有因子w就全部约掉，然后丢到队列中，否则就不用管，只要队列中能够出现1，那么这种情况就是存在的，反之就是不存在。

#include<map>#include<string>#include<cstring>#include<cstdio>#include<cstdlib>#include<cmath>#include<queue>#include<vector>#include<iostream>#include<algorithm>#include<bitset>#include<climits>#include<list>#include<iomanip>#include<stack>#include<set>using namespace std;int cnt(int w,int x){while(x%w==0)x/=w;return x;}queue<int>qq;bool bfs(int w,int m){int t=cnt(w,m);if(t!=m)qq.push(t);elseqq.push(m);while(qq.size()){t=qq.front();qq.pop();if(t==1)return 1;int t1=cnt(w,t+1);if(t1!=t+1)qq.push(t1);t1=cnt(w,t-1);if(t1!=t-1)qq.push(t1);}return 0;}int main(){int w,m;cin>>w>>m;if(bfs(w,m))puts("YES");elseputs("NO");}

time limit per test

1 second

memory limit per test

256 megabytes

input

standard input

output

standard output

Vanya has a scales for weighing loads and weights of masses w0, w1, w2, ..., w100 grams where w is some integer not less than 2(exactly one weight of each nominal value). Vanya wonders whether he can weight an item with mass m using the given weights, if the weights can be put on both pans of the scales. Formally speaking, your task is to determine whether it is possible to place an item of mass m and some weights on the left pan of the scales, and some weights on the right pan of the scales so that the pans of the scales were in balance.

Input

The first line contains two integers w, m (2 ≤ w ≤ 109, 1 ≤ m ≤ 109) — the number defining the masses of the weights and the mass of the item.

Output

Print word 'YES' if the item can be weighted and 'NO' if it cannot.

Sample test(s)

input

3 7

output

YES

input

100 99

output

YES

input

100 50

output

NO

Note

Note to the first sample test. One pan can have an item of mass 7 and a weight of mass 3, and the second pan can have two weights of masses 9 and 1, correspondingly. Then 7 + 3 = 9 + 1.

Note to the second sample test. One pan of the scales can have an item of mass 99 and the weight of mass 1, and the second pan can have the weight of mass 100.

Note to the third sample test. It is impossible to measure the weight of the item in the manner described in the input.