Mike has a sequence A = [a1, a2, ..., an] of length n. He considers the sequence B = [b1, b2, ..., bn] beautiful if the gcd of all its elements is bigger than 1, i.e. 
.
Mike wants to change his sequence in order to make it beautiful. In one move he can choose an index i (1 ≤ i < n), delete numbers ai, ai + 1 and put numbers ai - ai + 1, ai + ai + 1 in their place instead, in this order. He wants perform as few operations as possible. Find the minimal number of operations to make sequence A beautiful if it's possible, or tell him that it is impossible to do so.
is the biggest non-negative number d such that d divides bi for every i (1 ≤ i ≤ n).
The first line contains a single integer n (2 ≤ n ≤ 100 000) — length of sequence A.
The second line contains n space-separated integers a1, a2, ..., an (1 ≤ ai ≤ 109) — elements of sequence A.
Output on the first line "YES" (without quotes) if it is possible to make sequence A beautiful by performing operations described above, and "NO" (without quotes) otherwise.
If the answer was "YES", output the minimal number of moves needed to make sequence A beautiful.
2
1 1
YES
1
3
6 2 4
YES
0
2
1 3
YES
1
In the first example you can simply make one move to obtain sequence [0, 2] with 
.
In the second example the gcd of the sequence is already greater than 1.
分析:首先我们可以扫一遍看看 gcd是否已经大于1不大于1的话就需要继续构造,构造gcd为2,即全为偶数
连续的两个奇数进行一次操作就变成了 两个偶数;
连续的一奇一偶进行2次操作变成两个偶数;
代码如下:
#include <bits/stdc++.h> using namespace std; int c[100100]; int main() { int n,h,numa,numb,cnt; while(cin>>n) { cnt=0; numa=0; numb=0; for(int i=0;i<n;i++) cin>>c[i]; h=c[0]; for(int i=0;i<n;i++) { if(c[i]%2==1) numa++; else numb++; // cout<<" "<<c[i]<<endl; h=__gcd(h,c[i]); // cout<<h<<endl; } // h=__gcd(h,c[n-1]); if(h>1) { puts("YES"); cout<<"0"<<endl; continue; } else { for(int i=0;i<n-1;i++) { if(c[i]%2==1) { if(c[i+1]%2==1) cnt+=1; else cnt+=2; c[i]=2; c[i+1]=2; } } if(c[n-1]%2==1) cnt+=2; cout<<"YES"<<endl; cout<<cnt<<endl; } } }