Yo`nalishlar
Hozirda online

Statistika

Masalalar soni: 909

Foydalanuvchilar soni: 8819

Jo'natishlar soni: 714307

Muhokama yozuvlari: 4540

Yangiliklar soni: 97

Yangiliklar izohlari: 1174

So'ngi izohlar

Vaqt limiti: 1 sekund
Xotira limiti: 64 MB

Iahub has drawn a set of n points in the cartesian plane which he calls "special points". A quadrilateral is a simple polygon without self-intersections with four sides (also called edges) and four vertices (also called corners). Please note that a quadrilateral doesn't have to be convex. A special quadrilateral is one which has all four vertices in the set of special points. Given the set of special points, please calculate the maximal area of a special quadrilateral.

Input

The first line contains integer n (4 ≤ n ≤ 300). Each of the next n lines contains two integers: xi, yi ( - 1000 ≤ xi, yi ≤ 1000) — the cartesian coordinates of ith special point. It is guaranteed that no three points are on the same line. It is guaranteed that no two points coincide.

Output

Output a single real number — the maximal area of a special quadrilateral with precision 10-6.

Sample

 № Input Output 1 `5``0 0``0 4``4 0``4 4``2 3` `16.000000`

Note

In the test example we can choose first 4 points to be the vertices of the quadrilateral. They form a square by side 4, so the area is 4·4 = 16.