#P1110A. Parity

Parity

No submission language available for this problem.

Description

You are given an integer $n$ ($n \ge 0$) represented with $k$ digits in base (radix) $b$. So,

$$n = a_1 \cdot b^{k-1} + a_2 \cdot b^{k-2} + \ldots a_{k-1} \cdot b + a_k.$$

For example, if $b=17, k=3$ and $a=[11, 15, 7]$ then $n=11\cdot17^2+15\cdot17+7=3179+255+7=3441$.

Determine whether $n$ is even or odd.

The first line contains two integers $b$ and $k$ ($2\le b\le 100$, $1\le k\le 10^5$) — the base of the number and the number of digits.

The second line contains $k$ integers $a_1, a_2, \ldots, a_k$ ($0\le a_i < b$) — the digits of $n$.

The representation of $n$ contains no unnecessary leading zero. That is, $a_1$ can be equal to $0$ only if $k = 1$.

Print "even" if $n$ is even, otherwise print "odd".

You can print each letter in any case (upper or lower).

Input

The first line contains two integers $b$ and $k$ ($2\le b\le 100$, $1\le k\le 10^5$) — the base of the number and the number of digits.

The second line contains $k$ integers $a_1, a_2, \ldots, a_k$ ($0\le a_i < b$) — the digits of $n$.

The representation of $n$ contains no unnecessary leading zero. That is, $a_1$ can be equal to $0$ only if $k = 1$.

Output

Print "even" if $n$ is even, otherwise print "odd".

You can print each letter in any case (upper or lower).

Samples

13 3
3 2 7

even

10 9
1 2 3 4 5 6 7 8 9

odd

99 5
32 92 85 74 4

odd

2 2
1 0

even

Note

In the first example, $n = 3 \cdot 13^2 + 2 \cdot 13 + 7 = 540$, which is even.

In the second example, $n = 123456789$ is odd.

In the third example, $n = 32 \cdot 99^4 + 92 \cdot 99^3 + 85 \cdot 99^2 + 74 \cdot 99 + 4 = 3164015155$ is odd.

In the fourth example $n = 2$.