Bi-shoe and Phi-shoe
Bamboo Pole-vault is a massively popular sport in Xzhiland. And Master Phi-shoe is a very popular coach for his success. He needs some bamboos for his students, so he asked his assistant Bi-Shoe to go to the market and buy them. Plenty of Bamboos of all possible integer lengths (yes!) are available in the market. According to Xzhila tradition,
Score of a bamboo = Φ (bamboo's length)
(Xzhilans are really fond of number theory). For your information, Φ (n) = numbers less than n which are relatively prime (having no common divisor other than 1) to n. So, score of a bamboo of length 9 is 6 as 1, 2, 4, 5, 7, 8 are relatively prime to 9.
The assistant Bi-shoe has to buy one bamboo for each student. As a twist, each pole-vault student of Phi-shoe has a lucky number. Bi-shoe wants to buy bamboos such that each of them gets a bamboo with a score greater than or equal to his/her lucky number. Bi-shoe wants to minimize the total amount of money spent for buying the bamboos. One unit of bamboo costs 1 Xukha. Help him.
Input
Input starts with an integer T (≤ 100), denoting the number of test cases.
Each case starts with a line containing an integer n (1 ≤ n ≤ 10000) denoting the number of students of Phi-shoe. The next line contains n space separated integers denoting the lucky numbers for the students. Each lucky number will lie in the range [1, 106].
OutputFor each case, print the case number and the minimum possible money spent for buying the bamboos. See the samples for details.
Sample Input3
5
1 2 3 4 5
6
10 11 12 13 14 15
2
1 1
Sample OutputCase 1: 22 Xukha
Case 2: 88 Xukha
Case 3: 4 Xukha
题意:给出N个数Xi,求满足Φ (ki)>=x的最小的数ki,求所有ki的和,
Φ (n)为欧拉函数,但Φ (1)=0。对于质数p,Φ (p)=p-1.
分析:大于Xi的第一个素数就是最小的ki。
暂时证明不了这个:设素数y1<=x<y2,(则Euler(y1)=y1-1<x,Euler(y2)=y2-1>=x)
那么是否存在整数T(x<T<y2),使Euler(T)>=x
#include<cstdio> #include<algorithm> using namespace std; int a[1000005]; int p[1000000]; int cnt=0; void prime() { for(int i=4;i<1000005;i+=2) a[i]=1; p[cnt++]=2; for(int i=3;i<1000005;i++) { if(a[i]==0) { p[cnt++]=i; for(int j=i+i;j<1000005;j+=i) a[j]=1; } } } int main() { int T,N,cas=0; prime(); scanf("%d",&T); while(T--) { scanf("%d",&N); long long ans=0;int x; while(N--) { scanf("%d",&x); ans+=p[lower_bound(p,p+cnt,x+1)-p]; } printf("Case %d: %lld Xukha ",++cas,ans); } return 0; }