【矩阵快速幂】233 Matrix HDU - 5015
Think:
1知识点:矩阵快速幂
2题意:定义一个233矩阵,第一行形如233, 23333, 233333, 233…(即a[0][1] = 233, a[0][2] = 2333,a[0][3] = 23333, a[0][4] = 233…),现输入n列的第一个数(即a[1][0], a[2][0], … , a[n][0]),询问a[n][m](n ≤ 10,m ≤ 1e9)的值
3思路:
(1):由题意可知m范围可达到1e9,进而思考是否可寻找到第m列和第m-1列的关系
第一列:
a1
a2
a3
a4
则第二列
23*10+3 + a1
23*10+3 + a2 + a1
23*10+3 + a3 + a2 + a1
23*10+3 + a4 + a3 + a2 + a1
分析第一行和第二行可知,递推关系难点1在于如何找到23和3向下传递的传递关系,难点2在于如何找到ai累加关系的实现
脑洞——转化
新的第一列:
23
a1
a2
a3
a4
3
新的第二列:
23*10 + 3
23*10+3 + a1
23*10+3 + a2 + a1
23*10+3 + a3 + a2 + a1
23*10+3 + a4 + a3 + a2 + a1
3
转化关系?
图像来源博客地址——感谢博主
vjudge题目链接
建议参考博客——参考题意分析 & 思路
以下为Accepted代码
#include <cstdio>#include <cstring>#include <algorithm>using namespace std;typedef long long LL;const int mod = 10000007;struct Matrix{LL v[14][14];};Matrix multiply(Matrix x, Matrix y, int Matrix_len);Matrix matrix_pow(Matrix a, int k, int Matrix_len);int main(){int n, m, i, j;Matrix a, b, c;while(~scanf("%d %d", &n, &m)){memset(a.v, 0, sizeof(a.v));memset(b.v, 0, sizeof(b.v));a.v[0][0] = 23;for(i = 1; i <= n; i++)scanf("%lld", &a.v[i][0]);a.v[n+1][0] = 3;for(i = 0; i <= n+1; i++){i != n+1? b.v[i][0] = 10: b.v[i][0] = 0;b.v[i][n+1] = 1;}for(i = 1; i <= n; i++){for(j = 1; j <= i; j++){b.v[i][j] = 1;}}c = matrix_pow(b, m, n+2);a = multiply(c, a, n+2);printf("%lld\n", a.v[n][0]);}return 0;}Matrix multiply(Matrix x, Matrix y, int Matrix_len){Matrix z;memset(z.v, 0, sizeof(z.v));for(int i = 0; i < Matrix_len; i++){for(int j = 0; j < Matrix_len; j++){for(int k = 0; k < Matrix_len; k++){z.v[i][j] += x.v[i][k] * y.v[k][j];z.v[i][j] %= mod;}}}return z;}Matrix matrix_pow(Matrix a, int k, int Matrix_len){Matrix b;for(int i = 0; i < Matrix_len; i++){for(int j = 0; j < Matrix_len; j++){i == j? b.v[i][j] = 1: b.v[i][j] = 0;}}while(k){if(k & 1)b = multiply(b, a, Matrix_len);a = multiply(a, a, Matrix_len);k >>= 1;}return b;}
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傷城~
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