POJ 1775 sum of Factorial (数论)
2014-05-07 16:39
239 查看
链接:http://poj.org/problem?id=1775
Description
John von Neumann, b. Dec. 28, 1903, d. Feb. 8, 1957, was a Hungarian-American mathematician who made important contributions to the foundations of mathematics, logic, quantum physics,meteorology, science, computers, and game theory. He was noted for a phenomenal
memory and the speed with which he absorbed ideas and solved problems. In 1925 he received a B.S. diploma in chemical engineering from Zurich Institute and in 1926 a Ph.D. in mathematics from the University of Budapest. His Ph.D. dissertation on set theory
was an important contribution to the subject. At the age of 20, von Neumann proposed a new definition of ordinal numbers that was universally adopted. While still in his twenties, he made many contributions in both pure and applied mathematics that established
him as a mathematician of unusual depth. His Mathematical Foundations of Quantum Mechanics (1932) built a solid framework for the new scientific discipline. During this time he also proved the mini-max theorem of GAME THEORY. He gradually expanded his work
in game theory, and with coauthor Oskar Morgenstern he wrote Theory of Games and Economic Behavior (1944).
There are some numbers which can be expressed by the sum of factorials. For example 9,9=1!+2!+3! Dr. von Neumann was very interested in such numbers. So, he gives you a number n, and wants you to tell him whether or not the number can be expressed by the sum
of some factorials.
Well, it's just a piece of cake. For a given n, you'll check if there are some xi, and let n equal to Σ1<=i<=txi!. (t >=1 1, xi >= 0, xi = xj iff. i = j). If the answer is yes, say "YES"; otherwise, print out "NO".
Input
You will get several non-negative integer n (n <= 1,000,000) from input file. Each one is in a line by itself.
The input is terminated by a line with a negative integer.
Output
For each n, you should print exactly one word ("YES" or "NO") in a single line. No extra spaces are allowed.
Sample Input
Sample Output
简单数论;
代码:
#include <iostream>
#include <cstdio>
#include <cstring>
#include <cstdlib>
#define MAXN 10
#define RST(N)memset(N, 0, sizeof(N))
using namespace std;
int f[MAXN] = {1}, n;
int main()
{
for(int i=1; i<MAXN; i++) f[i] = f[i-1]*i;
while(~scanf("%d", &n) && n >= 0) {
if(n == 0) { puts("NO"); continue; }
for(int i=9; i>=0&&n!=0; i--) if(n >= f[i]) {
n -= f[i];
}
if(!n) puts("YES");
else puts("NO");
}
return 0;
}
Description
John von Neumann, b. Dec. 28, 1903, d. Feb. 8, 1957, was a Hungarian-American mathematician who made important contributions to the foundations of mathematics, logic, quantum physics,meteorology, science, computers, and game theory. He was noted for a phenomenal
memory and the speed with which he absorbed ideas and solved problems. In 1925 he received a B.S. diploma in chemical engineering from Zurich Institute and in 1926 a Ph.D. in mathematics from the University of Budapest. His Ph.D. dissertation on set theory
was an important contribution to the subject. At the age of 20, von Neumann proposed a new definition of ordinal numbers that was universally adopted. While still in his twenties, he made many contributions in both pure and applied mathematics that established
him as a mathematician of unusual depth. His Mathematical Foundations of Quantum Mechanics (1932) built a solid framework for the new scientific discipline. During this time he also proved the mini-max theorem of GAME THEORY. He gradually expanded his work
in game theory, and with coauthor Oskar Morgenstern he wrote Theory of Games and Economic Behavior (1944).
There are some numbers which can be expressed by the sum of factorials. For example 9,9=1!+2!+3! Dr. von Neumann was very interested in such numbers. So, he gives you a number n, and wants you to tell him whether or not the number can be expressed by the sum
of some factorials.
Well, it's just a piece of cake. For a given n, you'll check if there are some xi, and let n equal to Σ1<=i<=txi!. (t >=1 1, xi >= 0, xi = xj iff. i = j). If the answer is yes, say "YES"; otherwise, print out "NO".
Input
You will get several non-negative integer n (n <= 1,000,000) from input file. Each one is in a line by itself.
The input is terminated by a line with a negative integer.
Output
For each n, you should print exactly one word ("YES" or "NO") in a single line. No extra spaces are allowed.
Sample Input
9 -1
Sample Output
YES
简单数论;
代码:
#include <iostream>
#include <cstdio>
#include <cstring>
#include <cstdlib>
#define MAXN 10
#define RST(N)memset(N, 0, sizeof(N))
using namespace std;
int f[MAXN] = {1}, n;
int main()
{
for(int i=1; i<MAXN; i++) f[i] = f[i-1]*i;
while(~scanf("%d", &n) && n >= 0) {
if(n == 0) { puts("NO"); continue; }
for(int i=9; i>=0&&n!=0; i--) if(n >= f[i]) {
n -= f[i];
}
if(!n) puts("YES");
else puts("NO");
}
return 0;
}
内容来自用户分享和网络整理,不保证内容的准确性,如有侵权内容,可联系管理员处理 
相关文章推荐
- 1.m分解阶乘之和
- 2.几种递推数
- 3.欧拉函数
- 4.快速幂模m算法
- 5.扩展欧几里得&&中国剩余定理
- 6.数论_web
- 组合数求模总结
- [BZOJ1041][HAOI2008][数学乱搞]圆上的整点
- 【数论学习】奇素数分解为两个数平方和
- 【数论学习】数论分析证明
- 整数对
- Leftmost Digit
- POJ 3292.Semi-prime H-numbers
- NYOJ-954-N!
- HDU 1133 (数论 or DP、高精度;Java版)
- POJ 1061 青蛙的约会
- zoj_3621 Factorial Problem in Base K
- zoj_1657 Goldbach's Conjecture
- zoj_1526 Big Number
- poj_3210 Coins