组合数学的卡特兰数 TOJ 3551: Game of Connections
这个就是卡特兰数的经典问题
直接用这个公式就好了,但是这个题涉及大数的处理h(n)=h(n-1)*(4*n-2)/(n+1)
其实见过好几次大数的处理了,有一次他存的恰好不多于30位,直接分成两部分long long 存了
这个只涉及到大数乘小数,大数除以小数,所以比较简单些
3551: Game of Connections
Time Limit(Common/Java):1000MS/3000MS Memory Limit:65536KByte
Total Submit: 5 Accepted:4
Total Submit: 5 Accepted:4
Description
This is a small but ancient game. You are supposed to write down the numbers 1, 2, 3, ... , 2n - 1, 2n consecutively in clockwise order on the ground to form a circle, and then, to draw some straight line segments to connect them into number pairs. Every number must be connected to exactly one another. And, no two segments are allowed to intersect.
It's still a simple game, isn't it? But after you've written down the 2n numbers, can you tell me in how many different ways can you connect the numbers into pairs? Life is harder, right?
It's still a simple game, isn't it? But after you've written down the 2n numbers, can you tell me in how many different ways can you connect the numbers into pairs? Life is harder, right?
Input
Each line of the input file will be a single positive number n, except the last line, which is a number -1. You may assume that 1 <= n <= 100.
Output
For each n, print in a single line the number of ways to connect the 2n numbers into pairs.
Sample Input
2
3
-1
Sample Output
2
5
Hint
The result may exceed 2^64.
#include <stdio.h> int a[101][66]; int main() { a[1][0]=1; for(int i=2; i<101; i++) { int c=0; for(int j=0; j<66; j++) { a[i][j]=a[i-1][j]*(4*i-2)+c; c=a[i][j]/10; a[i][j]%=10; } c=0; for(int j=65; j>=0; j--) { c=c*10+a[i][j]; a[i][j]=c/(i+1); c%=(i+1); } } int n; while(~scanf("%d",&n),n>0) { int t=65; while(a[n][t]==0)t--; while(t>=0)printf("%d",a[n][t--]); putchar(10); } return 0; }
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