Problem Description
A frog has just learned some number theory, and can't wait to show his ability to his girlfriend.
Now the frog is sitting on a grid map of infinite rows and columns. Rows are numbered 1,2,⋯ from the bottom, so are the columns. At first the frog is sitting at grid (sx,sy), and begins his journey.
To show his girlfriend his talents in math, he uses a special way of jump. If currently the frog is at the grid (x,y), first of all, he will find the minimum z that can be divided by both x and y, and jump exactly z steps to the up, or to the right. So the next possible grid will be (x+z,y), or (x,y+z).
After a finite number of steps (perhaps zero), he finally finishes at grid (ex,ey). However, he is too tired and he forgets the position of his starting grid!
It will be too stupid to check each grid one by one, so please tell the frog the number of possible starting grids that can reach (ex,ey)!
Input
First line contains an integer T, which indicates the number of test cases.
Every test case contains two integers ex and ey, which is the destination grid.
⋅ 1≤T≤1000.
⋅ 1≤ex,ey≤109.
Output
For every test case, you should output "Case #x: y", where x indicates the case number and counts from 1 and y is the number of possible starting grids.
Sample Input
3
6 10
6 8
2 8
Sample Output
Case #1: 1
Case #2: 2
Case #3: 3
题意:每次只给出终点坐标(ex,ey),假设当前位置是(x,y),只能向右走或者向下走,下一步只能走到(x+z,y)或者(x,y+z),z=lcm(x,y) 问可以从多少个点出发可以到达终点。
思路:
设gcd(x,y)=p,x=np,y=mp,lcm(x,y)=nmp,那么下一步能走到(n(m+1)p,mp)或者(np,m(n+1)p),并且由于n(m+1)与m互质,n与m(n+1)互质,所以下一步的gcd依然是p。
所以先求p=gcd(ex,ey),然后求得x=ex/p;y=ey/p。转化问题到从(a,b)走了一步到(x,y),假设向右平移一步到达的,那么得出就是a=x,(a+1)*b=y,解出a=x,b=y/(x+1),那么且b必须能被整除。同理可以推出向上平移的情况a=x/(y+1),b=y;因为必须都是能够被整除,所以可以发现路径的唯一性。。。算了还是看代码吧。
#include
#include