AtCoder Beginner Contest 102

A - Multiple of 2 and N

Time Limit: 2 sec / Memory Limit: 1024 MB

Score : $100$ points

Problem Statement

You are given a positive integer $N$ . Find the minimum positive integer divisible by both $2$ and $N$ .

Constraints

$1 \leq N \leq 10^{9}$
All values in input are integers.

Input

Input is given from Standard Input in the following format:

$N$

Output

Print the minimum positive integer divisible by both $2$ and $N$ .

Sample Input 1 Copy

Copy

Sample Output 1 Copy

Copy

$6$ is divisible by both $2$ and $3$ . Also, there is no positive integer less than $6$ that is divisible by both $2$ and $3$ . Thus, the answer is $6$ .

Sample Input 2 Copy

Copy

Sample Output 2 Copy

Copy

Sample Input 3 Copy

Copy

999999999

Sample Output 3 Copy

Copy

1999999998
代码：

import java.util.*;

public class Main {
    
    public static void main(String[] args) {
        Scanner in = new Scanner(System.in);
        int n = in.nextInt();
        if(n % 2 == 1)n *= 2;
        System.out.println(n);
    }
}


B - Maximum Difference

Time Limit: 2 sec / Memory Limit: 1024 MB

Score : $200$ points

Problem Statement

You are given an integer sequence $A$ of length $N$ . Find the maximum absolute difference of two elements (with different indices) in $A$ .

Constraints

$2 \leq N \leq 100$
$1 \leq A_{i} \leq 10^{9}$
All values in input are integers.

Input

Input is given from Standard Input in the following format:

 $N$ 
 $A_{1}$   $A_{2}$   $. . .$   $A_{N}$

Output

Print the maximum absolute difference of two elements (with different indices) in $A$ .

Sample Input 1 Copy

Copy

4
1 4 6 3

Sample Output 1 Copy

Copy

The maximum absolute difference of two elements is $A_{3} - A_{1} = 6 - 1 = 5$ .

Sample Input 2 Copy

Copy

2
1000000000 1

Sample Output 2 Copy

Copy

999999999

Sample Input 3 Copy

Copy

5
1 1 1 1 1

Sample Output 3 Copy

Copy

0
代码：

import java.util.*;

public class Main {
    
    public static void main(String[] args) {
        Scanner in = new Scanner(System.in);
        int n = in.nextInt();
        int max = 0,min = 1000000000;
        for(int i = 0;i < n;i ++) {
            int d = in.nextInt();
            max = Math.max(max, d);
            min = Math.min(min, d);
        }
        System.out.println(max - min);
    }
}


C - Linear Approximation

Time Limit: 2 sec / Memory Limit: 1024 MB

Score : $300$ points

Problem Statement

Snuke has an integer sequence $A$ of length $N$ .

He will freely choose an integer $b$ . Here, he will get sad if $A_{i}$ and $b + i$ are far from each other. More specifically, the sadness of Snuke is calculated as follows:

$a b s (A_{1} - (b + 1)) + a b s (A_{2} - (b + 2)) + . . . + a b s (A_{N} - (b + N))$

Here, $a b s (x)$ is a function that returns the absolute value of $x$ .

Find the minimum possible sadness of Snuke.

Constraints

$1 \leq N \leq 2 \times 10^{5}$
$1 \leq A_{i} \leq 10^{9}$
All values in input are integers.

Input

Input is given from Standard Input in the following format:

 $N$ 
 $A_{1}$   $A_{2}$   $. . .$   $A_{N}$

Output

Print the minimum possible sadness of Snuke.

Sample Input 1 Copy

Copy

5
2 2 3 5 5

Sample Output 1 Copy

Copy

If we choose $b = 0$ , the sadness of Snuke would be $a b s (2 - (0 + 1)) + a b s (2 - (0 + 2)) + a b s (3 - (0 + 3)) + a b s (5 - (0 + 4)) + a b s (5 - (0 + 5)) = 2$ . Any choice of $b$ does not make the sadness of Snuke less than $2$ , so the answer is $2$ .

Sample Input 2 Copy

Copy

9
1 2 3 4 5 6 7 8 9

Sample Output 2 Copy

Copy

Sample Input 3 Copy

Copy

6
6 5 4 3 2 1

Sample Output 3 Copy

Copy

Sample Input 4 Copy

Copy

7
1 1 1 1 2 3 4

Sample Output 4 Copy

Copy

6
先把所有的值减去对应下标的值，之后的序列是求都减去同一个值后，绝对值的和最小，那么就排序，找到中间位置的值，所有的数减去中间位置的值就可以了，中间位置的左边比他小，右边比他大，减去值后中间的变为0，左边的都增加，右边的豆腐减少，保证减少的小于等于增加的即可。
代码：

import java.util.*;

public class Main {
    
    public static void main(String[] args) {
        Scanner in = new Scanner(System.in);
        int n = in.nextInt();
        int [] s = new int[n];
        long d = 0;
        for(int i = 0;i < n;i ++) {
            s[i] = in.nextInt();
            s[i] -= i + 1;
        }
        Arrays.sort(s);
        for(int i = 0;i < n;i ++) {
            d += Math.abs(s[i] - s[n / 2]);
        }
        System.out.println(d);
    }
}


D - Equal Cut

Time Limit: 2 sec / Memory Limit: 1024 MB

Score : $600$ points

Problem Statement

Snuke has an integer sequence $A$ of length $N$ .

He will make three cuts in $A$ and divide it into four (non-empty) contiguous subsequences $B, C, D$ and $E$ . The positions of the cuts can be freely chosen.

Let $P, Q, R, S$ be the sums of the elements in $B, C, D, E$ , respectively. Snuke is happier when the absolute difference of the maximum and the minimum among $P, Q, R, S$ is smaller. Find the minimum possible absolute difference of the maximum and the minimum among $P, Q, R, S$ .

Constraints

$4 \leq N \leq 2 \times 10^{5}$
$1 \leq A_{i} \leq 10^{9}$
All values in input are integers.

Input

Input is given from Standard Input in the following format:

 $N$ 
 $A_{1}$   $A_{2}$   $. . .$   $A_{N}$

Output

Find the minimum possible absolute difference of the maximum and the minimum among $P, Q, R, S$ .

Sample Input 1 Copy

Copy

5
3 2 4 1 2

Sample Output 1 Copy

Copy

If we divide $A$ as $B, C, D, E = (3), (2), (4), (1, 2)$ , then $P = 3, Q = 2, R = 4, S = 1 + 2 = 3$ . Here, the maximum and the minimum among $P, Q, R, S$ are $4$ and $2$ , with the absolute difference of $2$ . We cannot make the absolute difference of the maximum and the minimum less than $2$ , so the answer is $2$ .

Sample Input 2 Copy

Copy

10
10 71 84 33 6 47 23 25 52 64

Sample Output 2 Copy

Copy

Sample Input 3 Copy

Copy

7
1 2 3 1000000000 4 5 6

Sample Output 3 Copy

Copy

999999994
如果是排着去找这三个位置，是O(n^3)的，可以采用折半枚举的技巧，先找到第二个位置，然后两边各自分为两块，用l和r标记，两块的差距尽可能小即可，随着i的右移，lr只需要初始化一次，然后跟着移动即可，i的移动必然会打破原来的平衡，lr只能继续右移，不需要从最初端开始，不然仍然超时。
java代码：

import java.util.*;

public class Main {
    
    public static void main(String[] args) {
        Scanner in = new Scanner(System.in);
        int n = in.nextInt();
        long [] s = new long[n + 1];
        for(int i = 1;i <= n;i ++) {
            s[i] = in.nextLong();
            s[i] += s[i - 1];
        }
        int l = 1,r = 3;
        long ans = s[n];
        for(int i = 2;i < n - 1;i ++) {
            long last = s[n];
            while(l < i) {
                long d = Math.abs(s[i] - s[l] * 2);
                if(d > last) break;
                else last = d;
                l ++;
            }
            l --;
            last = s[n];
            while(r < n) {
                long d = Math.abs(s[n] + s[i] - s[r] * 2);
                if(d > last) break;
                else last = d;
                r ++;
            }
            r --;
            long max = Math.max(Math.max(Math.max(s[l], s[i] - s[l]), s[r] - s[i]), s[n] - s[r]);
            long min = Math.min(Math.min(Math.min(s[l], s[i] - s[l]), s[r] - s[i]), s[n] - s[r]);
            ans = Math.min(max - min, ans);
        }
        System.out.println(ans);
    }
}

c++代码：

#include<iostream>
#include<cstdio>
#include<cstdlib>
#include<cstring>
#include<algorithm>
#define Max 200005
using namespace std;
typedef long long LL;
int main() {
    int n;
    int a[Max];
    LL sum[Max] = {0};
    scanf("%d",&n);
    for(int i = 1;i <= n;i ++) {
        scanf("%d",&a[i]);
        sum[i] = sum[i - 1] + a[i];
    }
    LL ans = sum[n];
    int l = 1,r = 3;
    for(int i = 2;i <= n - 2;i ++) {
        LL last = sum[n];
        while(l < i) {
            LL d = abs(sum[i] - sum[l] * 2);
            if(d > last) break;
            else last = d;
            l ++;
        }
        l --;
        last = sum[n];
        while(r < n) {
            LL d = abs(sum[n] + sum[i] - sum[r] * 2);
            if(d > last) break;
            else last = d;
            r ++;
        }
        r --;
        LL up = max(max(max(sum[l],sum[i] - sum[l]),sum[r] - sum[i]),sum[n] - sum[r]);
        LL down = min(min(min(sum[l],sum[i] - sum[l]),sum[r] - sum[i]),sum[n] - sum[r]);
        ans = min(ans,up - down);
    }
    printf("%lld",ans);
}