1059 Prime Factors (25 分)
Given any positive integer NNN, you are supposed to find all of its prime factors, and write them in the format NNN = p1k1×p2k2×⋯×pmkm{p_1}^{k_1} imes {p_2}^{k_2} imes cdots imes {p_m}^{k_m}p1k1×p2k2×⋯×pmkm.
Input Specification:
Each input file contains one test case which gives a positive integer NNN in the range of long int.
Output Specification:
Factor NNN in the format NNN = p1p_1p1^k1k_1k1*p2p_2p2^k2k_2k2*…*pmp_mpm^kmk_mkm, where pip_ipi's are prime factors of NNN in increasing order, and the exponent kik_iki is the number of pip_ipi -- hence when there is only one pip_ipi, kik_iki is 1 and must NOT be printed out.
Sample Input:
97532468
Sample Output:
97532468=2^2*11*17*101*1291
思路:
1不是素数
#include<iostream> #include<vector> #include<algorithm> #include<map> #include<set> #include<cmath> #include<climits> #include<sstream> #include<cstdio> #include<string.h> #include<unordered_map> using namespace std; unordered_map<string,set<int>>mp; int main() { long long int n; scanf("%lld",&n); int num=sqrt(n); vector<int> primes(num,1); for(int i=2;i<=sqrt(num);i++) { for(int j=i+i;j<=sqrt(num);j+=i) primes[j]=0; } if(n==1) printf("1=1"); else { printf("%lld=",n); int state=0; for(int i=2;i<=num;i++) { int cnt=0; bool flag=false; while(primes[i]==1&&n%i==0) { n/=i; cnt++; flag=true; } if(flag) { if(state!=0) printf("*"); state=1; printf("%d",i); if(cnt>1) printf("^%d",cnt); } if(n==1) break; } if(n!=1) { if(state!=0) printf("*"); printf("%d",n); } } return 0; }