# Home

Score : $300$ points

### Problem Statement

You are given integers $N$ and $K$. Find the number of triples $(a,b,c)$ of positive integers not greater than $N$ such that $a+b,b+c$ and $c+a$ are all multiples of $K$. The order of $a,b,c$ does matter, and some of them can be the same.

### Constraints

• $1 \leq N,K \leq 2\times 10^5$
• $N$ and $K$ are integers.

### Input

Input is given from Standard Input in the following format:

$N$ $K$


### Output

Print the number of triples $(a,b,c)$ of positive integers not greater than $N$ such that $a+b,b+c$ and $c+a$ are all multiples of $K$.

### Sample Input 1

3 2


### Sample Output 1

9


$(1,1,1),(1,1,3),(1,3,1),(1,3,3),(2,2,2),(3,1,1),(3,1,3),(3,3,1)$ and $(3,3,3)$ satisfy the condition.

### Sample Input 2

5 3


### Sample Output 2

1


### Sample Input 3

31415 9265


### Sample Output 3

27


### Sample Input 4

35897 932


### Sample Output 4

114191