题意:有一个公交车,如果人数小于2n的话,那么这些人就只会坐在边上,是先坐左边,然后坐右边这样的,如果大于等于2n的话,就会去坐中间,也是先坐左边,再坐右边,走的时候,就先走第二列,然后走第一列,然后走第三列,然后走第四列这样的,依次走一个这样。问你这些人走的样子是什么样子
思路:先走的奇数,然后再走偶数位置,先走大于2n的,再走小于的。
#include<bits/stdc++.h>
using namespace std;
int main()
{
int n,m;
cin>>n>>m;
for(int i=1;i<=2*n;i++)
{
if(2*n+i<=m)cout<<2*n+i<<" ";
if(i<=m)cout<<i<<" ";
}
cout<<endl;
}
Description
Consider 2n rows of the seats in a bus. n rows of the seats on the left and n rows of the seats on the right. Each row can be filled by two people. So the total capacity of the bus is 4n.
Consider that m (m ≤ 4n) people occupy the seats in the bus. The passengers entering the bus are numbered from 1 to m
1-st row left window seat, 1-st row right window seat, 2-nd row left window seat, 2-nd row right window seat, ... , n-th row left window seat, n-th row right window seat.
After occupying all the window seats (for m > 2n) the non-window seats are occupied:
1-st row left non-window seat, 1-st row right non-window seat, ... , n-th row left non-window seat, n-th row right non-window seat.
All the passengers go to a single final destination. In the final destination, the passengers get off in the given order.
1-st row left non-window seat, 1-st row left window seat, 1-st row right non-window seat, 1-st row right window seat, ... , n-th row left non-window seat, n-th row left window seat, n-th row right non-window seat, n-th row right window seat.
The seating for n = 9 and m = 36.
You are given the values n and m. Output m numbers from 1 to m, the order in which the passengers will get off the bus.
Input
The only line contains two integers, n and m (1 ≤ n ≤ 100, 1 ≤ m ≤ 4n) — the number of pairs of rows and the number of passengers.
Output
Print m distinct integers from 1 to m
Sample Input
Input
2 7
Output
5 1 6 2 7 3 4
Input
9 36
Output
19 1 20 2 21 3 22 4 23 5 24 6 25 7 26 8 27 9 28 10 29 11 30 12 31 13 32 14 33 15 34 16 35 17 36 18
