codeforce -602B Approximating a Constant Range(暴力)
When Xellos was doing a practice course in university, he once had to measure the intensity of an effect that slowly approached equilibrium. A good way to determine the equilibrium intensity would be choosing a sufficiently large number of consecutive data points that seems as constant as possible and taking their average. Of course, with the usual sizes of data, it's nothing challenging — but why not make a similar programming contest problem while we're at it?
You're given a sequence of n data points a1, ..., an. There aren't any big jumps between consecutive data points — for each 1 ≤ i < n, it's guaranteed that |ai + 1 - ai| ≤ 1.
A range [l, r] of data points is said to be almost constant if the difference between the largest and the smallest value in that range is at most 1. Formally, let M be the maximum and m the minimum value of ai for l ≤ i ≤ r; the range [l, r] is almost constant if M - m ≤ 1.
Find the length of the longest almost constant range.
The first line of the input contains a single integer n (2 ≤ n ≤ 100 000) — the number of data points.
The second line contains n integers a1, a2, ..., an (1 ≤ ai ≤ 100 000).
Print a single number — the maximum length of an almost constant range of the given sequence.
5
1 2 3 3 2
4
11
5 4 5 5 6 7 8 8 8 7 6
5
In the first sample, the longest almost constant range is [2, 5]; its length (the number of data points in it) is 4.
In the second sample, there are three almost constant ranges of length 4: [1, 4], [6, 9] and [7, 10]; the only almost constant range of the maximum length 5 is [6, 10].
题意是,找连续的并且任意两个数相差不超过1的最长串。
思路:题中说相邻的两个数相差不超过1;
那么cnt最小为2,cnt赋初值2;由于要相差不超过一,所以每个串的最大值最小值相差不能超过一,
那么从第三个元素开始,如果abs(a[i]-max)<=1&&abs(a[i]-min)<=1,就cnt++,表示该元素能加入上一个串,因为有新数字加入,所以更新max,和minn.
如果不符合的话cnt置为2就以a[i],开始向前找串。
1 #include<stdio.h> 2 #include<stdlib.h> 3 #include<algorithm> 4 #include<iostream> 5 #include<string.h> 6 using namespace std; 7 int a[100005]; 8 int main(void) 9 { 10 int n,i,k,p,q,j; 11 while(scanf("%d",&n)!=EOF) 12 { 13 for(i=0; i<n; i++) 14 { 15 scanf("%d",&a[i]); 16 } 17 int maxx,minn; 18 maxx=max(a[0],a[1]); 19 minn=min(a[0],a[1]); 20 int cnt=2; 21 int sum=2; 22 int x=maxx,y=minn; 23 for(i=2; i<n; i++) 24 { 25 if(abs(a[i]-maxx)<=1&&abs(a[i]-minn)<=1) 26 { 27 cnt++; 28 maxx=max(maxx,a[i]); 29 minn=min(a[i],minn); 30 } 31 else 32 { 33 cnt=2; 34 maxx=max(a[i],a[i-1]); 35 minn=min(a[i],a[i-1]); 36 for(j=i-2; j>=0; j--)//从后往前找 37 { 38 if(abs(a[j]-maxx)<=1&&abs(a[j]-minn)<=1) 39 { 40 cnt++; 41 maxx=max(maxx,a[j]); 42 minn=min(minn,a[j]); 43 } 44 else break; 45 } 46 } 47 if(cnt>sum) 48 { 49 sum=cnt; 50 } 51 } 52 printf("%d\n",sum); 53 } 54 return 0; 55 }
