Tri Tiling

Time Limit: 1000MS Memory Limit: 65536K

Total Submissions: 9016 Accepted: 4684

Description

In how many ways can you tile a 3xn rectangle with 2x1 dominoes?

Here is a sample tiling of a 3x12 rectangle.

Input

Input consists of several test cases followed by a line containing -1. Each test case is a line containing an integer 0 <= n <= 30.

Output

For each test case, output one integer number giving the number of possible tilings.

Sample Input

2

8

12

-1

Sample Output

3

153

2131

Source

之前也写过这种堆方块，就是找递推的方程，还是比较简单的题目。但是这道题目却是一个升级，因为他的递推方程需要变形，所以以后遇到这类题目就又多了一点见识。

dp[n]=3*dp[n-2]+2*dp[n-4]+2*dp[n-6]+……2*dp[0];

如果只拿这个方程去解肯定麻烦或者还可能超时

变形

dp[n-2]=3*dp[n-4]+2*(dp[n-6]+dp[n-8]+…..dp[0]);

dp[n-2]-dp[n-4]=2*(dp[n-4]+dp[n-6]+dp[n-8]+….dp[0]);

dp[n]=4*dp[n-2]-dp[n-4];

就搞定了，

#include <iostream>

#include <string.h>

#include <stdlib.h>

#include <math.h>

#include <algorithm>

using namespace std;

int dp[35];

int n;

int main()

{

    dp[0]=1;

    dp[1]=0;

    dp[2]=3;

    for(int i=3;i<=30;i++)

    {

         if(i&1)

            dp[i]=0;

        else

            dp[i]=dp[i-2]*4-dp[i-4];

    }

    while(scanf("%d",&n)!=EOF)

    {

        if(n==-1)

            break;

        printf("%d\n",dp[n]);

    }

    return 0;

}