问题：arr[1] = 1; arr[2] = 1; arr[i] = A*arr[i-2]+B*arr[i-1];

          测试案例有若干项，每个案例给出A, B, n，输出arr[n]的值

          输入以0,0,0结束

    分析：这种有规律的序列都是有周期的，

          每输入一组数据，计算出一个周期内的所有的数，和周期大小

          输入n之后就可以找出第n项了
　　因为每一项只能是 1~7 之间的数字，而后一项又与前两项有关，所以周期为A(7, 2)
　　
　　分析到这里我们就可以介绍下面两种方法了
　
　　Ⅰ方法一，矩阵快速幂算类似于斐波那契数列
　　对于这样的数列:
　　f(1) = a, f(2) = b, f(n) = A * f(n - 2) + B * f(n - 1).    可以用以下方法求f(n)
　　我们注意到从第三项开始
　　aaarticlea/png;base64,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" alt="" />（可以在演草纸上算出）

　　从第三项开始，我们可以先算出aaarticlea/png;base64,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" alt="" />，然后用结果矩阵的上边的元素作为计算的f（n）
　　比如aaarticlea/png;base64,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" alt="" />

　　那么f（n） = a[0][0]*b + a[0][1]*a;

　　Ⅱ 方法二：
　　我们已经分析了这个数列是又周期的，周期为42，因为f(1) = 1, f(2) = 1
　　所以，当再次遇到1， 1的时候，就已经找到所有的答案了
　　用一个数组存储这个数列一个周期里的结果，输出即可

　　方法分析：如果我们没有算出这个数列的周期，而且我们不确定这个周期到底多大，那么可以采用第一种方法，
　　　　　　  因为这种情况如果采用第二种方法就可能出现开的存储一个周期内数据的数组太小的情况，
　　　　　　　现在我们既然知道周期了，当然是第二种方法比较简单
　　　　　　　但是我真心不知道为什么我用第二种方法的时候竟然和我开的数组大小有关，M = 50对，M = 10000对，还有一些数据对，但是M为其他数就不对了
　　　　　　  我就郁闷了，和我开的数组大小有毛线关系

代码1：

#include <cstdio>

#include <cstring>

#define N 2

struct Mat

{

    int arr[N][N];

}; //定义矩阵

Mat multiply(Mat x, Mat y)//矩阵乘法

{

    Mat res;

    memset(res.arr, , sizeof(res.arr));

    for(int i = ; i < N; i++)

    {

        for(int j = ; j < N; j++)

        {

            for(int k = ; k < N; k++)

            {

                res.arr[i][j] += x.arr[i][k] * y.arr[k][j];

                //res.arr[i][j] %= 7;

            }

        }

    }

    return res;

}

Mat cacl(Mat a, int n) //矩阵快速幂，算a的n次方

{

    Mat res;

    for(int i = ; i < N; i++)

    {

        for(int j = ; j < N; j++)

            res.arr[i][j] = (i == j);

    }

    while(n)

    {

        if(n & )

            res = multiply(res, a);

        n /= ;

        a = multiply(a, a);

    }

    return res;

}

int main()

{

    int A, B, n;

    Mat a;

    while(scanf("%d%d%d", &A, &B, &n), (A || B || n))

    {

        a.arr[][] = A;

        a.arr[][] = B;

        a.arr[][] = ;

        a.arr[][] = ;

        n %= ;

        if(n ==  || n == )

            printf("1\n");

        else

        {

            Mat tmp = cacl(a, n-);

            int ans = (tmp.arr[][] + tmp.arr[][]) % ;

            printf("%d\n", ans);

        }

    }

    return ;

}

方法二代码：

#include <stdio.h>

#define M 10000

int cacl(int arr[], int A, int B)

{

    int i;

    arr[] = arr[] = ;

    for(i = ; i<= M-; i++)

    {

        arr[i] = (A*arr[i-] + B*arr[i-]) % ;

        //printf("arr[%d] = %d\n", i, arr[i]);

        if(arr[i] ==  && arr[i-] == )

            break;

    }

    arr[] = arr[i-];

    return (i-);

}

int main()

{

    int arr[M];

    int A, B, n;

    int T;

    while(scanf("%d%d%d", &A, &B, &n), (A||B||n))

    {

        T = cacl(arr, A, B);

        //printf("T = %d\n", T);

        n %= T;

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

    }

    return ;

}