Given an integer **N**, the task is to check whether the sum of digits of the given number is divisible by all of its digits or not. If divisible then print **Yes** else print **No**.**Examples:**

Input:N = 12Output:No

Sum of digits = 1 + 2 = 3

3 is divisible by 1 but not 2.

Input:N = 123Output:Yes

**Approach:** First find the sum of the digits of the number then one by one check, whether the calculated sum is divisible by all the digits of the number. If for some digit it is not divisible then print **No** else print **Yes**.

Below is the implementation of the above approach:

## C++

`// C++ implementation of the approach` `#include <bits/stdc++.h>` `using` `namespace` `std;` `// Function that returns true if all the digits` `// of n divide the sum of the digits of n` `bool` `isDivisible(` `long` `long` `int` `n)` `{` ` ` `// Store a copy of the original number` ` ` `long` `long` `int` `temp = n;` ` ` `// Find the sum of the digits of n` ` ` `int` `sum = 0;` ` ` `while` `(n) {` ` ` `int` `digit = n % 10;` ` ` `sum += digit;` ` ` `n /= 10;` ` ` `}` ` ` `// Restore the original value` ` ` `n = temp;` ` ` `// Check if all the digits divide` ` ` `// the calculated sum` ` ` `while` `(n) {` ` ` `int` `digit = n % 10;` ` ` `// If current digit doesn't` ` ` `// divide the sum` ` ` `if` `(sum % digit != 0)` ` ` `return` `false` `;` ` ` `n /= 10;` ` ` `}` ` ` `return` `true` `;` `}` `// Driver code` `int` `main()` `{` ` ` `long` `long` `int` `n = 123;` ` ` `if` `(isDivisible(n))` ` ` `cout << ` `"Yes"` `;` ` ` `else` ` ` `cout << ` `"No"` `;` ` ` `return` `0;` `}` |

## Java

`// Java implementation of the approach` `class` `GFG` `{` ` ` ` ` `// Function that returns true if all the digits` ` ` `// of n divide the sum of the digits of n` ` ` `static` `boolean` `isDivisible(` `long` `n)` ` ` `{` ` ` ` ` `// Store a copy of the original number` ` ` `long` `temp = n;` ` ` ` ` `// Find the sum of the digits of n` ` ` `int` `sum = ` `0` `;` ` ` `while` `(n != ` `0` `)` ` ` `{` ` ` `int` `digit = (` `int` `) n % ` `10` `;` ` ` `sum += digit;` ` ` `n /= ` `10` `;` ` ` `}` ` ` ` ` `// Restore the original value` ` ` `n = temp;` ` ` ` ` `// Check if all the digits divide` ` ` `// the calculated sum` ` ` `while` `(n != ` `0` `)` ` ` `{` ` ` `int` `digit = (` `int` `)n % ` `10` `;` ` ` ` ` `// If current digit doesn't` ` ` `// divide the sum` ` ` `if` `(sum % digit != ` `0` `)` ` ` `return` `false` `;` ` ` ` ` `n /= ` `10` `;` ` ` `}` ` ` `return` `true` `;` ` ` `}` ` ` ` ` `// Driver code` ` ` `public` `static` `void` `main (String[] args)` ` ` `{` ` ` `long` `n = ` `123` `;` ` ` ` ` `if` `(isDivisible(n))` ` ` `System.out.println(` `"Yes"` `);` ` ` `else` ` ` `System.out.println(` `"No"` `);` ` ` `}` `}` `// This code is contributed by AnkitRai01` |

## Python

`# Python implementation of the approach` `# Function that returns true if all the digits` `# of n divide the sum of the digits of n` `def` `isDivisible(n):` ` ` `# Store a copy of the original number` ` ` `temp ` `=` `n` ` ` `# Find the sum of the digits of n` ` ` `sum` `=` `0` ` ` `while` `(n):` ` ` `digit ` `=` `n ` `%` `10` ` ` `sum` `+` `=` `digit` ` ` `n ` `/` `/` `=` `10` ` ` `# Restore the original value` ` ` `n ` `=` `temp` ` ` `# Check if all the digits divide` ` ` `# the calculated sum` ` ` `while` `(n):` ` ` `digit ` `=` `n ` `%` `10` ` ` `# If current digit doesn't` ` ` `# divide the sum` ` ` `if` `(` `sum` `%` `digit !` `=` `0` `):` ` ` `return` `False` ` ` `n ` `/` `/` `=` `10` `;` ` ` `return` `True` `# Driver code` `n ` `=` `123` `if` `(isDivisible(n)):` ` ` `print` `(` `"Yes"` `)` `else` `:` ` ` `print` `(` `"No"` `)` |

## C#

`// C# implementation of the approach` `using` `System;` `class` `GFG` `{` ` ` ` ` `// Function that returns true if all the digits` ` ` `// of n divide the sum of the digits of n` ` ` `static` `bool` `isDivisible(` `long` `n)` ` ` `{` ` ` ` ` `// Store a copy of the original number` ` ` `long` `temp = n;` ` ` ` ` `// Find the sum of the digits of n` ` ` `int` `sum = 0;` ` ` `while` `(n != 0)` ` ` `{` ` ` `int` `digit = (` `int` `) n % 10;` ` ` `sum += digit;` ` ` `n /= 10;` ` ` `}` ` ` ` ` `// Restore the original value` ` ` `n = temp;` ` ` ` ` `// Check if all the digits divide` ` ` `// the calculated sum` ` ` `while` `(n != 0)` ` ` `{` ` ` `int` `digit = (` `int` `)n % 10;` ` ` ` ` `// If current digit doesn't` ` ` `// divide the sum` ` ` `if` `(sum % digit != 0)` ` ` `return` `false` `;` ` ` ` ` `n /= 10;` ` ` `}` ` ` `return` `true` `;` ` ` `}` ` ` ` ` `// Driver code` ` ` `static` `public` `void` `Main ()` ` ` `{` ` ` `long` `n = 123;` ` ` ` ` `if` `(isDivisible(n))` ` ` `Console.Write(` `"Yes"` `);` ` ` `else` ` ` `Console.Write(` `"No"` `);` ` ` `}` `}` `// This code is contributed by @tushil.` |

**Output**

Yes

**Time Complexity:** O(log(N)) **Auxiliary Space:** O(1)

#### Method #2: Using string:

- We have to convert the given number to a string by taking a new variable.
- Traverse the string ,Convert each element to integer and add this to sum.
- Traverse the string again
- Check if the sum is not divisible by any one of the digits
- If it is true then return False
- Else return True

Below is the implementation of above approach:

## Python3

`# Python implementation of above approach` `def` `getResult(n):` ` ` ` ` `# Converting integer to string` ` ` `st ` `=` `str` `(n)` ` ` ` ` `# Initialising sum to 0` ` ` `sum` `=` `0` ` ` `length ` `=` `len` `(st)` ` ` `# Traversing through the string` ` ` `for` `i ` `in` `st:` ` ` `# Converting character to int` ` ` `sum` `=` `sum` `+` `int` `(i)` ` ` ` ` `# Comparing number and sum` ` ` `# Traversing again` ` ` `for` `i ` `in` `st:` ` ` ` ` `# Check if any digit is` ` ` `# not dividing the sum` ` ` `if` `(` `sum` `%` `int` `(i) !` `=` `0` `):` ` ` ` ` `# Return false` ` ` `return` `'No'` ` ` ` ` `# If any value is not returned` ` ` `# then all the digits are dividing the sum` ` ` `# SO return true` ` ` `return` `'Yes'` `# Driver Code` `n ` `=` `123` `# passing this number to get result function` `print` `(getResult(n))` `# this code is contributed by vikkycirus` |

**Output**

Yes

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