Codeforces Round #540 (Div. 3)--1118B

Codeforces Round #540 (Div. 3)--1118B
Tanya has $n$ candies numbered from $1$ to $n$ . The $i$ -th candy has the weight $a_{i}$ .

She plans to eat exactly $n - 1$ candies and give the remaining candy to her dad. Tanya eats candies in order of increasing their numbers, exactly one candy per day.

Your task is to find the number of such candies $i$ (let's call these candies good) that if dad gets the $i$ -th candy then the sum of weights of candies Tanya eats in even days will be equal to the sum of weights of candies Tanya eats in odd days. Note that at first, she will give the candy, after it she will eat the remaining candies one by one.

For example, $n = 4$ and weights are $[1, 4, 3, 3]$ . Consider all possible cases to give a candy to dad:

Tanya gives the $1$ -st candy to dad ( $a_{1} = 1$ ), the remaining candies are $[4, 3, 3]$ . She will eat $a_{2} = 4$ in the first day, $a_{3} = 3$ in the second day, $a_{4} = 3$ in the third day. So in odd days she will eat $4 + 3 = 7$ and in even days she will eat $3$ . Since $7 \neq 3$ this case shouldn't be counted to the answer (this candy isn't good).

Tanya gives the $2$ -nd candy to dad ( $a_{2} = 4$ ), the remaining candies are $[1, 3, 3]$ . She will eat $a_{1} = 1$ in the first day, $a_{3} = 3$ in the second day, $a_{4} = 3$ in the third day. So in odd days she will eat $1 + 3 = 4$ and in even days she will eat $3$ . Since $4 \neq 3$ this case shouldn't be counted to the answer (this candy isn't good).

Tanya gives the $3$ -rd candy to dad ( $a_{3} = 3$ ), the remaining candies are $[1, 4, 3]$ . She will eat $a_{1} = 1$ in the first day, $a_{2} = 4$ in the second day, $a_{4} = 3$ in the third day. So in odd days she will eat $1 + 3 = 4$ and in even days she will eat $4$ . Since $4 = 4$ this case should be counted to the answer (this candy is good).

Tanya gives the $4$ -th candy to dad ( $a_{4} = 3$ ), the remaining candies are $[1, 4, 3]$ . She will eat $a_{1} = 1$ in the first day, $a_{2} = 4$ in the second day, $a_{3} = 3$ in the third day. So in odd days she will eat $1 + 3 = 4$ and in even days she will eat $4$ . Since $4 = 4$ this case should be counted to the answer (this candy is good).

In total there $2$ cases which should counted (these candies are good), so the answer is $2$ .

Input

The first line of the input contains one integer $n$ ( $1 \leq n \leq 2 \cdot 10^{5}$ ) — the number of candies.

The second line of the input contains $n$ integers $a_{1}, a_{2}, \dots, a_{n}$ ( $1 \leq a_{i} \leq 10^{4}$ ), where $a_{i}$ is the weight of the $i$ -th candy.

Output

Print one integer — the number of such candies $i$ (good candies) that if dad gets the $i$ -th candy then the sum of weights of candies Tanya eats in even days will be equal to the sum of weights of candies Tanya eats in odd days.

Examples

input
Copy

7 5 5 4 5 5 5 6

output
Copy

2

input
Copy

8 4 8 8 7 8 4 4 5

output
Copy

2

input
Copy

9 2 3 4 2 2 3 2 2 4

output
Copy

3

#include<iostream> using namespace std; int num[200005]; int main(){ int n; cin>>n; int evenPre=0,oddPre=0,even=0,odd=0; for(int i=0;i<n;i++){ cin>>num[i]; if(i&1) odd+=num[i]; else even+=num[i]; } int ans=0; for(int i=0;i<n;i++){ if(i&1) odd-=num[i]; else even-=num[i]; if(oddPre+even==evenPre+odd) ans++; if(i&1) oddPre+=num[i]; else evenPre+=num[i]; } cout<<ans<<endl; return 0; }
Ta

nn;njklya has $n$ candies numbered from $1$ to $n$ . The $i$ -th candy has the weight $a_{i}$ .

She plans to eat exactly $n - 1$ candies and give the remaining candy to her dad. Tanya eats candies in order of increasing their numbers, exactly one candy per day.

Your task is to find the number of such candies $i$ (let's call these candies good) that if dad gets the $i$ -th candy then the sum of weights of candies Tanya eats in even days will be equal to the sum of weights of candies Tanya eats in odd days. Note that at first, she will give the candy, after it she will eat the remaining candies one by one.

For example, $n = 4$ and weights are $[1, 4, 3, 3]$ . Consider all possible cases to give a candy to dad:
- Tanya gives the $1$ -st candy to dad ( $a_{1} = 1$ ), the remaining candies are $[4, 3, 3]$ . She will eat $a_{2} = 4$ in the first day, $a_{3} = 3$ in the second day, $a_{4} = 3$ in the third day. So in odd days she will eat $4 + 3 = 7$ and in even days she will eat $3$ . Since $7 \neq 3$ this case shouldn't be counted to the answer (this candy isn't good).
- Tanya gives the $2$ -nd candy to dad ( $a_{2} = 4$ ), the remaining candies are $[1, 3, 3]$ . She will eat $a_{1} = 1$ in the first day, $a_{3} = 3$ in the second day, $a_{4} = 3$ in the third day. So in odd days she will eat $1 + 3 = 4$ and in even days she will eat $3$ . Since $4 \neq 3$ this case shouldn't be counted to the answer (this candy isn't good).
- Tanya gives the $3$ -rd candy to dad ( $a_{3} = 3$ ), the remaining candies are $[1, 4, 3]$ . She will eat $a_{1} = 1$ in the first day, $a_{2} = 4$ in the second day, $a_{4} = 3$ in the third day. So in odd days she will eat $1 + 3 = 4$ and in even days she will eat $4$ . Since $4 = 4$ this case should be counted to the answer (this candy is good).
- Tanya gives the $4$ -th candy to dad ( $a_{4} = 3$ ), the remaining candies are $[1, 4, 3]$ . She will eat $a_{1} = 1$ in the first day, $a_{2} = 4$ in the second day, $a_{3} = 3$ in the third day. So in odd days she will eat $1 + 3 = 4$ and in even days she will eat $4$ . Since $4 = 4$ this case should be counted to the answer (this candy is good).
In total there $2$ cases which should counted (these candies are good), so the answer is $2$ .
Input

The first line of the input contains one integer $n$ ( $1 \leq n \leq 2 \cdot 10^{5}$ ) — the number of candies.

The second line of the input contains $n$ integers $a_{1}, a_{2}, \dots, a_{n}$ ( $1 \leq a_{i} \leq 10^{4}$ ), where $a_{i}$ is the weight of the $i$ -th candy.

Output

Print one integer — the number of such candies $i$ (good candies) that if dad gets the $i$ -th candy then the sum of weights of candies Tanya eats in even days will be equal to the sum of weights of candies Tanya eats in odd days.
Examples
input
Copy

7 5 5 4 5 5 5 6

output
Copy

2

input
Copy

8 4 8 8 7 8 4 4 5

output
Copy

2

input
Copy

9 2 3 4 2 2 3 2 2 4

output
Copy

3
相关阅读:
解决Uploadify 3.2上传控件加载导致的GET 404 Not Found问题
 Intellij idea的Dependencies波浪线
 Web.xml配置详解之context-param
The superclass "javax.servlet.http.HttpServlet" was not found on the Java Build Path(Myeclipse添加Server Library)
html5 video mp4播放不了问题
 切片优化小拾
 解决video标签的兼容性
 css module.css demo
Gnet 响应式官网开发总结
 前端小总结
原文地址：https://www.cnblogs.com/albert67/p/10410316.html