Takahashi has come to a party as a special guest. There are $N$ ordinary guests at the party. The $i$-th ordinary guest has a power of $A_i$.

Takahashi has decided to perform $M$ handshakes to increase the happiness of the party (let the current happiness be $0$). A handshake will be performed as follows:

• Takahashi chooses one (ordinary) guest $x$ for his left hand and another guest $y$ for his right hand ($x$ and $y$ can be the same).
• Then, he shakes the left hand of Guest $x$ and the right hand of Guest $y$ simultaneously to increase the happiness by $A_x+A_y$.

However, Takahashi should not perform the same handshake more than once. Formally, the following condition must hold:

• Assume that, in the $k$-th handshake, Takahashi shakes the left hand of Guest $x_k$ and the right hand of Guest $y_k$. Then, there is no pair $p, q$ $(1 \leq p < q \leq M)$ such that $(x_p,y_p)=(x_q,y_q)$.

What is the maximum possible happiness after $M$ handshakes?

Input is given from Standard Input in the following format:

```
$N$ $M$
$A_1$ $A_2$ $...$ $A_N$
```

Print the maximum possible happiness after $M$ handshakes.

-   $1 \leq N \leq 10^5$
-   $1 \leq M \leq N^2$
-   $1 \leq A_i \leq 10^5$
-   All values in input are integers.

202

Let us say that Takahashi performs the following handshakes:

• In the first handshake, Takahashi shakes the left hand of Guest $4$ and the right hand of Guest $4$.
• In the second handshake, Takahashi shakes the left hand of Guest $4$ and the right hand of Guest $5$.
• In the third handshake, Takahashi shakes the left hand of Guest $5$ and the right hand of Guest $4$.

Then, we will have the happiness of $(34+34)+(34+33)+(33+34)=202$.

We cannot achieve the happiness of $203$ or greater, so the answer is $202$.