1057. Amount of Degrees
Time limit: 1.0 second
Memory limit: 64 MB
Memory limit: 64 MB
Create a code to determine the amount of integers, lying in the set [X;Y] and being a sum of exactlyK different integer degrees of B.
Example. Let X=15, Y=20, K=2, B=2. By this example 3 numbers are the sum of exactly two integer degrees of number 2:
17 = 24+20,
18 = 24+21,
20 = 24+22.
18 = 24+21,
20 = 24+22.
Input
The first line of input contains integers X and Y, separated with a space (1 ≤ X ≤ Y ≤ 231−1).
The next two lines contain integers K and B (1 ≤ K ≤ 20; 2 ≤ B ≤ 10).
The next two lines contain integers K and B (1 ≤ K ≤ 20; 2 ≤ B ≤ 10).
Output
Output should contain a single integer — the amount of integers, lying between X and Y, being a sum of exactly K different integer degrees of B.
Sample
| input | output |
|---|---|
15 20 |
3 |
Problem Source: Rybinsk State Avia Academy
数位统计的第一题。看的刘聪的论文:浅谈数位类统计问题http://wenku.baidu.com/view/d2414ffe04a1b0717fd5dda8.html
![[ACM] ural 1057 Amount of degrees (数位统计)](https://image.shishitao.com:8440/aHR0cHM6Ly9iYnNtYXguaWthZmFuLmNvbS9zdGF0aWMvTDNCeWIzaDVMMmgwZEhBdmFXMW5MbUpzYjJjdVkzTmtiaTV1WlhRdk1qQXhOREE0TURjeE56QXdNemN3TVRBL2QyRjBaWEp0WVhKckx6SXZkR1Y0ZEM5aFNGSXdZMFJ2ZGt3eVNuTmlNbU4xV1ROT2EySnBOWFZhV0ZGMll6TktaazFVYXpWTmVrRTBUV3ByUFM5bWIyNTBMelZoTmt3MVRESlVMMlp2Ym5SemFYcGxMelF3TUM5bWFXeHNMMGt3U2tKUmEwWkRUVUU5UFM5a2FYTnpiMngyWlM4M01DOW5jbUYyYVhSNUwwTmxiblJsY2c9PS5qcGc%3D.jpg?w=700&webp=1 "[ACM] ural 1057 Amount of degrees (数位统计)")
做完这道题。认为数位统计真的非常奇异。不须要一个数一个数的去枚举推断,在推断一个数的时候,把比它小的数全都推断了出来,效率高。当中也有组合的运用。当高位确定后,后面几位就随便取就能够。
题目中当B不是二进制时:
![[ACM] ural 1057 Amount of degrees (数位统计)](https://image.shishitao.com:8440/aHR0cHM6Ly9iYnNtYXguaWthZmFuLmNvbS9zdGF0aWMvTDNCeWIzaDVMMmgwZEhBdmFXMW5MbUpzYjJjdVkzTmtiaTV1WlhRdk1qQXhOREE0TURjeE56QTJOREUwTmpnL2QyRjBaWEp0WVhKckx6SXZkR1Y0ZEM5aFNGSXdZMFJ2ZGt3eVNuTmlNbU4xV1ROT2EySnBOWFZhV0ZGMll6TktaazFVYXpWTmVrRTBUV3ByUFM5bWIyNTBMelZoTmt3MVRESlVMMlp2Ym5SemFYcGxMelF3TUM5bWFXeHNMMGt3U2tKUmEwWkRUVUU5UFM5a2FYTnpiMngyWlM4M01DOW5jbUYyYVhSNUwwTmxiblJsY2c9PS5qcGc%3D.jpg?w=700&webp=1 "[ACM] ural 1057 Amount of degrees (数位统计)")
为什么这样做呢? 一个数能够化成题意中给的形式,其B进制数中系数中应该不是0,就是1,假设从左到右找到系数>1,那么这个数肯定是不符合题意的,应该使其化为1,这就使得原数小了一些,为了不漏掉一些数,应使改动的这一位后面的全部位都变为1,这样是最大的且不超过n的B进制中仅仅包括0和1的数。这样化完以后依照二进制做就能够了。
代码:
#include <iostream>
#include <string.h>
using namespace std;
int X,Y,K,B;
int c[40][40]; void init()//组合数
{
c[0][0]=1;
for(int i=1;i<=31;i++)
{
c[i][0]=c[i-1][0];
for(int j=1;j<=i;++j)
c[i][j]=c[i-1][j]+c[i-1][j-1];
}
} int change(int n)
{
int b[40];
int len=0;
while(n)
{
b[len++]=n%B;
n/=B;
}
int ans=0;
for(int i=len-1;i>=0;i--)
{
if(b[i]>1)
{
for(int j=i;j>=0;j--)
ans+=(1<<j);
break;
}
else
ans+=(b[i]<<i);
}
return ans;
} int cal(int x,int k)
{
int tot=0,ans=0;
for(int i=31;i>0;i--)
{
if(x&(1<<i))//第i位为1(从0開始的),那么后面还剩下i个数字,后面的第一个数字为0,从i-1个数字中随意挑k-tot个
{
++tot;
if(tot>k)
break;
x=x^(1<<i);//1变为0
}
if((1<<(i-1))<=x)
ans+=c[i-1][k-tot];
}
if(tot+x==k)//考虑x这个数本身
++ans;
return ans;
} int main()
{
init();
while(cin>>X>>Y>>K>>B)
cout<<cal(change(Y),K)-cal(change(X-1),K)<<endl;
return 0;
}