首页 > 代码库 > UVA 10025(数学)
UVA 10025(数学)
The ? 1 ? 2 ? ... ? n = k problem
The ? 1 ? 2 ? ... ? n = k problem |
The problem
Given the following formula, one can set operators ‘+‘ or ‘-‘ instead of each ‘?‘, in order to obtain a given k
? 1 ? 2 ? ... ? n = k
For example: to obtain k = 12 , the expression to be used will be:
- 1 + 2 + 3 + 4 + 5 + 6 - 7 = 12
with n = 7
The Input
The first line is the number of test cases, followed by a blank line.
Each test case of the input contains integer k (0<=|k|<=1000000000).
Each test case will be separated by a single line.
The Output
For each test case, your program should print the minimal possible n (1<=n) to obtain k with the above formula.
Print a blank line between the outputs for two consecutive test cases.
Sample Input
2 12 -3646397
Sample Output
7 2701
先求出第一s=1+2+3+...+n>=k的第一个n,如果s-k为偶数那么此时n,就是最小值,否则最小值为n+1或n+2(因为连续的两个数里一定有一个奇数,就能改变s-k的奇偶性了);因为
首先n个数的和要和k奇偶性相同,因为不管怎么改变符号n个数的奇偶性不会变,奇偶性相同那么n-k就一定是偶数,n-k是偶数那么变号的数就应该是(n-k)/2,因为s》=k,s-(s-k)=1+2+...-(n-k)/2+....n=k;所以此时求出来的n一定可以构造出k,且为最小的,代码如下
#include<stdio.h> #include<math.h> int main() { int i,k,n,m; scanf("%d",&n); while(n--) { scanf("%d",&k); if(m==0)printf("3\n"); else { k=k>0?k:-k; m=sqrt(2*k); for(i=m;i*(i+1)<2*k;i++); while(1) if((i*(i+1)/2-k)%2)i++;//实际上两次之内就可以改奇偶性了 else break; printf("%d\n",i); } if(n)printf("\n"); } return 0; }
声明:以上内容来自用户投稿及互联网公开渠道收集整理发布,本网站不拥有所有权,未作人工编辑处理,也不承担相关法律责任,若内容有误或涉及侵权可进行投诉: 投诉/举报 工作人员会在5个工作日内联系你,一经查实,本站将立刻删除涉嫌侵权内容。