Divide by 100...

Dividing two numbers and computing the decimals is an extremely difficult task. Luckily, dividing a number by a “special” number is very easy (at least for us humans)!

We will define the set of “special” numbers $S=\{ 10^ K\} $ for all non-negative integers $K$, i.e. $\{ 1,10,100,\ldots \} $.

Given a large numbers $N$ and a “special” large number $M$, what does the decimal representation of

\[ \frac{N}{M} \]

look like?

Input

The first line of input contains 2 integers $N$, $M$, where $1\leq N, M\leq 10^{10^6}$, and $M\in S$.

Output

Print the exact decimal preresentation of $\frac{N}{M}$, i.e. every digit, without trailing zeroes; if the quotient is less than $1$, print one leading zero (see sample input).

Sample Input 1 Sample Output 1
92746237
100000
927.46237
Sample Input 2 Sample Output 2
100000
100
1000
Sample Input 3 Sample Output 3
1234500
10000
123.45
Sample Input 4 Sample Output 4
1
10
0.1