Unnatural Conditions
Description
Let $s(x)$ be sum of digits in decimal representation of positive integer $x$. Given two integers $n$ and $m$, find some positive integers $a$ and $b$ such that
- $s(a) \ge n$,
- $s(b) \ge n$,
- $s(a + b) \le m$.
The only line of input contain two integers $n$ and $m$ ($1 \le n, m \le 1129$).
Print two lines, one for decimal representation of $a$ and one for decimal representation of $b$. Both numbers must not contain leading zeros and must have length no more than $2230$.
Input
The only line of input contain two integers $n$ and $m$ ($1 \le n, m \le 1129$).
Output
Print two lines, one for decimal representation of $a$ and one for decimal representation of $b$. Both numbers must not contain leading zeros and must have length no more than $2230$.
Samples
6 5
6
7
8 16
35
53
Note
In the first sample, we have $n = 6$ and $m = 5$. One valid solution is $a = 6$, $b = 7$. Indeed, we have $s(a) = 6 \ge n$ and $s(b) = 7 \ge n$, and also $s(a + b) = s(13) = 4 \le m$.