给定一个数N ,任务是找到仅由N的除数形成的所有可能子集的元素乘积之和。
例子:
Input: N = 3
Output: 7
Explanation:
Divisors of 3 are 1 and 3. All possible subsets are {1}, {3}, {1, 3}.
Therefore, the sum of the product of all possible subsets are:
(1 + 3 + (1 * 3)) = 7.
Input: N = 4
Output: 29
Explanation:
Divisors of 4 are 1, 2 and 4. All possible subsets are {1}, {2}, {4}, {1, 2}, {1, 4}, {2, 4}, {1, 2, 4}.
Therefore, the sum of the product of all possible subsets are:
(1 + 2 + 4 + (1 * 2) + (1 * 4) + (2 * 4) + (1 * 2 * 4)) = 29.
朴素方法:针对此问题的朴素方法是从其除数生成所有可能的子集,然后计算每个子集的乘积。计算完每个子集的乘积后,将所有乘积相加,以找到所需的答案。此方法的时间复杂度为O(2 D ) ,其中D是N的除数的数量。
高效方法:高效方法背后的思想来自以下观察:
Let x and y is the divisor of N.
Then sum of product of all subsets will be
= x + y + x * y
= x(1 + y) + y + 1 - 1
= x(1 + y) + (1 + y) - 1
= (x + 1) * (y + 1) - 1
= (1 + x) * (1 + y) - 1
Now let take three divisors x, y, z.
Then sum of product of all subsets will be
= x + y + z + xy + yz + zx + xyz
= x + xz + y + yz + xy + xyz + z + 1 - 1
= x(1 + z) + y(1 + z) + xy(1 + z) + z + 1 - 1
= (x + y + xy + 1) * (1 + z) - 1
= (1 + x) * (1 + y) * (1 + z) - 1
显然,根据上述观察结果,我们可以得出结论,如果{D 1 ,D 2 ,D 3 ,…D n }是N的除数,则所需答案将是:
(D1 + 1) * (D2 + 1) * (D3 + 1) * ... (Dn + 1)
下面是上述方法的实现:
C++
// C++ program to find the sum of
// product of all the subsets
// formed by only divisors of N
#include
using namespace std;
// Function to find the sum of
// product of all the subsets
// formed by only divisors of N
int GetSum(int n)
{
// Vector to store all the
// divisors of n
vector divisors;
// Loop to find out the
// divisors of N
for (int i = 1; i * i <= n; i++) {
if (n % i == 0) {
// Both 'i' and 'n/i' are the
// divisors of n
divisors.push_back(i);
// Check if 'i' and 'n/i' are
// equal or not
if (i != n / i) {
divisors.push_back(n / i);
}
}
}
int ans = 1;
// Calculating the answer
for (auto i : divisors) {
ans *= (i + 1);
}
// Excluding the value
// of the empty set
ans = ans - 1;
return ans;
}
// Driver Code
int main()
{
int N = 4;
cout << GetSum(N) << endl;
}
Java
// Java program to find the sum of product
// of all the subsets formed by only
// divisors of N
import java.util.*;
class GFG {
// Function to find the sum of product
// of all the subsets formed by only
// divisors of N
static int GetSum(int n)
{
// Vector to store all the
// divisors of n
Vector divisors = new Vector();
// Loop to find out the
// divisors of N
for(int i = 1; i * i <= n; i++)
{
if (n % i == 0)
{
// Both 'i' and 'n/i' are the
// divisors of n
divisors.add(i);
// Check if 'i' and 'n/i' are
// equal or not
if (i != n / i)
{
divisors.add(n / i);
}
}
}
int ans = 1;
// Calculating the answer
for(int i = 0; i < divisors.size(); i++)
{
ans *= (divisors.get(i) + 1);
}
// Excluding the value
// of the empty set
ans = ans - 1;
return ans;
}
// Driver code
public static void main(String[] args)
{
int N = 4;
System.out.println(GetSum(N));
}
}
// This code is contributed by offbeat
Python3
# Python3 program to find the sum of
# product of all the subsets
# formed by only divisors of N
# Function to find the sum of
# product of all the subsets
# formed by only divisors of N
def GetSum(n):
# Vector to store all the
# divisors of n
divisors = []
# Loop to find out the
# divisors of N
i = 1
while i * i <= n :
if (n % i == 0):
# Both 'i' and 'n/i' are the
# divisors of n
divisors.append(i)
# Check if 'i' and 'n/i' are
# equal or not
if (i != n // i):
divisors.append(n // i)
i += 1
ans = 1
# Calculating the answer
for i in divisors:
ans *= (i + 1)
# Excluding the value
# of the empty set
ans = ans - 1
return ans
# Driver Code
if __name__ == "__main__":
N = 4
print(GetSum(N))
# This code is contributed by chitranayal
C#
// C# program to find the sum of product
// of all the subsets formed by only
// divisors of N
using System;
using System.Collections.Generic;
class GFG{
// Function to find the sum of product
// of all the subsets formed by only
// divisors of N
static int GetSum(int n)
{
// Store all the
// divisors of n
List divisors = new List();
// Loop to find out the
// divisors of N
for(int i = 1; i * i <= n; i++)
{
if (n % i == 0)
{
// Both 'i' and 'n/i' are the
// divisors of n
divisors.Add(i);
// Check if 'i' and 'n/i' are
// equal or not
if (i != n / i)
{
divisors.Add(n / i);
}
}
}
int ans = 1;
// Calculating the answer
foreach(int i in divisors)
{
ans *= (i + 1);
}
// Excluding the value
// of the empty set
ans = ans - 1;
return ans;
}
// Driver code
public static void Main()
{
int N = 4;
Console.WriteLine(GetSum(N));
}
}
// This code is contributed by sanjoy_62
Javascript
29
时间复杂度: O(sqrt(N)) ,其中N是给定的数字。
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