Haoren is very good at solving mathematic problems. Today he is working a problem like this:
Find three positive integers X, Y and Z (X < Y, Z > 1) that holds
X^Z + Y^Z + XYZ = K
where K is another given integer.
Here the operator “^” means power, e.g., 2^3 = 2 * 2 * 2.
Finding a solution is quite easy to Haoren. Now he wants to challenge more: What’s the total number of different solutions?
Surprisingly, he is unable to solve this one. It seems that it’s really a very hard mathematic problem.
Now, it’s your turn.
Input There are multiple test cases. Find three positive integers X, Y and Z (X < Y, Z > 1) that holds
X^Z + Y^Z + XYZ = K
where K is another given integer.
Here the operator “^” means power, e.g., 2^3 = 2 * 2 * 2.
Finding a solution is quite easy to Haoren. Now he wants to challenge more: What’s the total number of different solutions?
Surprisingly, he is unable to solve this one. It seems that it’s really a very hard mathematic problem.
Now, it’s your turn.
For each case, there is only one integer K (0 < K < 2^31) in a line.
K = 0 implies the end of input.
Output Output the total number of solutions in a line for each test case.
Sample Input
9 53 6 0Sample Output
1
1
0
Hint 9 = 1^2 + 2^2 + 1 * 2 * 2
53 = 2^3 + 3^3 + 2 * 3 * 3
题意 给你一个k
解方程 X^Z + Y^Z + XYZ = K 其中x>=1 y>x,z>1 让你解出有多少种解
枚举所有x的可能情况 ,在每个x上z的可能情况枚举,然后用二分求出y,并且判断y是否符合方程。
代码:
/*
1.x 范围为1~sqrt(k/2) time:1~3w
2.z 范围为2~log2(k);//times:1~30
3.二分求 y y的范围为(x+1)~pow(k,1/z);times:log(3w);
*/
#include<stdio.h>
#include<cstring>
#include<string>
#include<algorithm>
#include<math.h>
#define INF 0x3f3f3f3f
#define N 10010
using namespace std;
typedef long long ll;
//int k,x,z;
ll k;
ll qucikpow(ll a,ll b)
{
ll ans=1;
while(b)
{
if(b&1)
ans*=a;
a=a*a;
b/=2;
}
return ans;
}
ll compute(ll x,ll y,ll z)
{
ll ans=qucikpow(x,z)+qucikpow(y,z)+x*y*z;
return ans;
}
int Slove(ll x,ll z)//根据此时的x z和y的范围找y 并且判断答案是否存在
{
ll l=x+1;
ll r,mid,ans;
r=(ll)pow(k*1.0,1.0/z);
while(l<r)
{
mid=(l+r)/2;
ans=compute(x,mid,z);
if(ans<k)
l=mid+1;
else
r=mid;
}
if(l!=r)//防止r比l小
return 0;
ans=compute(x,r,z);
if(ans==k)
return 1;
else
return 0;
}
int main()
{
int ans;
ll lz;
ll mid;
while(~scanf("%lld",&k)&&k)//优化数据范围
{
ans=0;
lz=log(k*1.0)/log(2.0);
for(ll x=1;2*x*x<=k;x++)
{
mid=x*x;
for(ll z=2;mid<k&&z<=lz;z++)//
{
if(Slove(x,z))
ans++;
mid*=x;
}
}
printf("%d
",ans);
}
return 0;
}