# Problem B

Harshad Numbers

We’re all familiar with harshad numbers. For this problem,
you will ... what’s that? You *aren’t* familiar with
harshad numbers? They’re also known as Niven numbers – does
that ring a bell?? Anything???

Well, it’s a simple enough concept. A *harshad*
number is a number which is evenly divisible by the sum of its
digits. For example, $24$
is a harshad number: the sum of its digits is $2+4=6$ and $24$ is divisible by $6$. $156$ is also a harshad number, since
$1+5+6=12$ and
$156 = (12)(13$).
$157$ is NOT a harshad
number since it is not divisible by $1+5+7=13$.

OK, let’s start over.

We’re all familiar with harshad numbers. For this problem, you will be given a number $n$ and must find the smallest harshad number $\geq n$.

## Input

Input consists of a single line containing a positive integer $n \leq 1\, 000\, 000\, 000$.

## Output

Display the smallest harshad number greater than or equal to $n$.

Sample Input 1 | Sample Output 1 |
---|---|

24 |
24 |

Sample Input 2 | Sample Output 2 |
---|---|

25 |
27 |

Sample Input 3 | Sample Output 3 |
---|---|

987654321 |
987654330 |