poj 2356(鸽巢原理)
2017-08-02 11:46
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Description
The input contains N natural (i.e. positive integer) numbers ( N <= 10000 ). Each of that numbers is not greater than 15000. This numbers are not necessarily different (so it may happen that two or more of them will be equal). Your task is to choose a few of
given numbers ( 1 <= few <= N ) so that the sum of chosen numbers is multiple for N (i.e. N * k = (sum of chosen numbers) for some natural number k).
Input
The first line of the input contains the single number N. Each of next N lines contains one number from the given set.
Output
In case your program decides that the target set of numbers can not be found it should print to the output the single number 0. Otherwise it should print the number of the chosen numbers in the first line followed by the chosen numbers themselves (on a separate
line each) in arbitrary order.
If there are more than one set of numbers with required properties you should print to the output only one (preferably your favorite) of them.
Sample Input
Sample Output
思路
题目大意为给定n个正数,请你从中找出若干个数,使其和刚好是n的倍数。
实际上n个数 并且求n的倍数 条件比较特殊 并且只需要输出一组满足的数即可
可以这样想 modN 只有0~N-1种余数,我计算前i个数的和并计算modN,如果==0那直接输出这i个数即可
如果!=0则将其放在pos[]数组中,余数作为下标,i作为值。当有下一个前j个数的和modN等于前面那个余数时,它也找到了pos[]的相同位置,那么从i+1到j的数的和一定就是N的倍数了,输出得到结果。
下面证明一定有两个sumod[]相等或=0:
若sumod[]==0 直接输出
若不为零 还有1~n-1 n-1种可能
而一个数modN 有n种可能 由鸽巢原理 可知要么sumod[]==0 要么sumod[i]==sumod[j]
代码示例
时间复杂度为O(N)
The input contains N natural (i.e. positive integer) numbers ( N <= 10000 ). Each of that numbers is not greater than 15000. This numbers are not necessarily different (so it may happen that two or more of them will be equal). Your task is to choose a few of
given numbers ( 1 <= few <= N ) so that the sum of chosen numbers is multiple for N (i.e. N * k = (sum of chosen numbers) for some natural number k).
Input
The first line of the input contains the single number N. Each of next N lines contains one number from the given set.
Output
In case your program decides that the target set of numbers can not be found it should print to the output the single number 0. Otherwise it should print the number of the chosen numbers in the first line followed by the chosen numbers themselves (on a separate
line each) in arbitrary order.
If there are more than one set of numbers with required properties you should print to the output only one (preferably your favorite) of them.
Sample Input
5 1 2 3 4 1
Sample Output
2 2 3
思路
题目大意为给定n个正数,请你从中找出若干个数,使其和刚好是n的倍数。
实际上n个数 并且求n的倍数 条件比较特殊 并且只需要输出一组满足的数即可
可以这样想 modN 只有0~N-1种余数,我计算前i个数的和并计算modN,如果==0那直接输出这i个数即可
如果!=0则将其放在pos[]数组中,余数作为下标,i作为值。当有下一个前j个数的和modN等于前面那个余数时,它也找到了pos[]的相同位置,那么从i+1到j的数的和一定就是N的倍数了,输出得到结果。
下面证明一定有两个sumod[]相等或=0:
若sumod[]==0 直接输出
若不为零 还有1~n-1 n-1种可能
而一个数modN 有n种可能 由鸽巢原理 可知要么sumod[]==0 要么sumod[i]==sumod[j]
代码示例
//#define LOCAL #include<iostream> #include<string.h> #include<cstdio> #include<math.h> using namespace std; const int maxn=10010; int arr[maxn]; int sumod[maxn]; int pos[maxn];//n个余数 int main() { ios::sync_with_stdio(false); #ifdef LOCAL freopen("read.txt","r",stdin); #endif int N; int temp=0; cin>>N; memset(pos,-1,sizeof(pos)); for(int i=0;i<N;++i){ cin>>arr[i]; } for(int i=0;i<N;++i){ temp+=arr[i]; sumod[i]=temp%N; if(sumod[i]==0){ cout<<i+1<<endl; for(int j=0;j<i+1;++j) cout<<arr[j]<<endl; break; } else{ if(pos[sumod[i]]>=0){ cout<<i-pos[sumod[i]]<<endl; for(int j=pos[sumod[i]]+1;j<=i;++j) cout<<arr[j]<<endl; break; } else pos[sumod[i]]=i; } } return 0; }
时间复杂度为O(N)
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