hdu 1028 Ignatius and the Princess III(母函数入门+模板)

Description

"Well, it seems the first problem is too easy. I will let you know how foolish you are later." feng5166 says.

"The second problem is, given an positive integer N, we define an equation like this: 
  N=a[1]+a[2]+a[3]+...+a[m]; 
  a[i]>0,1<=m<=N; 
My question is how many different equations you can find for a given N. 
For example, assume N is 4, we can find: 
  4 = 4; 
  4 = 3 + 1; 
  4 = 2 + 2; 
  4 = 2 + 1 + 1; 
  4 = 1 + 1 + 1 + 1; 
so the result is 5 when N is 4. Note that "4 = 3 + 1" and "4 = 1 + 3" is the same in this problem. Now, you do it!" 

Input

The input contains several test cases. Each test case contains a positive integer N(1<=N<=120) which is mentioned above. The input is terminated by the end of file. 

Output

For each test case, you have to output a line contains an integer P which indicate the different equations you have found. 

Sample Input

4
10
20

Sample Output

5
42
627 解析:
母函数入门题,首先母函数
G(x) = (1 + x^1 + x^2..+x^n)(1 + x^2 + x^4 + x^6 + ...)(1 + x^3 + x^6 +..)(..)(1 + x^n)

其中(1 + x^1 + x^2..+x^n)中x的指数为1出现的次数 x^3 ==》 x^(1*3)
其余同理,比如第二个表达式 (1 + x^2 + x^4 + x^6 + ...) x^2 ==> x^(2*1) x^6 ==> x^(2*3)
乘法原理的应用:每一个表达式 表示的都是 某个变量的所有取值
【比如第一个表达式 表示'1'可以取的值(即n拆分后'1'出现的次数)可以为 {0,1,2...n}】
每个变量的所有取值的乘积 就是问题的所有的解(在本问题中表现为‘和’)
例子:4 = 2 + 1 + 1就是 x^(1 * 2)【'1'出现2次】
* x^(2 * 1)【'2'出现1次】
* x^(3 * 0)【'3'出现0次】
* x^(4 * 0)【..】
的结果
所以 G(x)展开后 其中x^n的系数就是 n的拆分解个数

# include <stdio.h>

int main()
{
int C1[], C2[], n; while(scanf("%d", &n) != EOF)
{
for(int i = ; i <= n; i++)//初始化 第一个表达式 目前所有指数项的系数都为1
{
C1[i] = ;
C2[i] = ;
} for(int i = ; i <= n; i++)//第2至第n个表达式
{
for(int j = ; j <= n; j++)//C1为前i-1个表达式累乘后各个指数项的系数
{
for(int k = ; j + k <= n; k += i)//k为第i个表达式每个项的指数 第一项为1【即x^(i * 0)】(指数k=0),第二项为x^(i * 1)(指数为k=i), 第三项为x^(i * 2)... 所以k的步长为i
{
C2[j + k] += C1[j];//(ax^j)*(x^k) = ax^(j+k) -> C2[j+k] += a 【第i个表达式每一项的系数都为1; a为C1[j]的值(x^j的系数); C2为乘上第i个表达式后各指数项的系数】
}
}
for(int j = ; j <= n; j++)//刷新当前累乘结果各指数项的系数
{
C1[j] = C2[j];
C2[j] = ;
}
}
printf("%d\n",C1[n]);
} return ;
}

出处http://acm.hdu.edu.cn/discuss/problem/post/reply.php?postid=21943&messageid=2&deep=1
上一篇:opencv笔记4:模板运算和常见滤波操作


下一篇:PHP SQL写法 积累(注:PHPSQL与LINQ SQL相似)