$N$ bags are arranged in a row. The $i$-th bag contains $x_i$ yen (the currency in Japan).

Takahashi and Aoki, who have sufficient money, take alternating turns to perform the following action:

-   choose one of the following three actions and perform it.
    -   choose the leftmost or rightmost bag and take it.
    -   pay $A$ yen to Snuke. Then, repeat the following action $\min(B,n)$ times (where $n$ is the number of the remaining bags): choose the leftmost or rightmost bag and take it.
    -   pay $C$ yen to Snuke. Then, repeat the following action $\min(D,n)$ times (where $n$ is the number of the remaining bags): choose the leftmost or rightmost bag and take it.

When all the bags are taken, Takahashi's benefit is defined by "(total amount of money in the bags that Takahashi took) - (total amount of money that Takahashi paid to snuke)"; let this amount be $X$ yen. We similarly define Aoki's benefit, denoting the amount by $Y$ yen.

Find $X-Y$ if Takahashi and Aoki make optimal moves to respectively maximize and minimize $X-Y$.

The input is given from Standard Input in the following format:

```
$N$ $A$ $B$ $C$ $D$
$x_1$ $x_2$ $\ldots$ $x_N$
```

Print the answer.

-   $1 \leq N \leq 3000$
-   $1 \leq x_i \leq 10^9$
-   $1 \leq A,C \leq 10^9$
-   $1 \leq B,D \leq N$
-   All values in the input are integers.

90

If Takahashi and Aoki make optimal moves, it ends up being X=92 and Y=2.