Let ABCD is a square with sides of unit ...

Let ABCD is a square with sides of unit lenghts . Points E and F are taken on sides AB and AD respectively so that AE =AF . Let P be a point inside the square ABCD. Let a line passing throught point A divides the square ABCD into two parts so that area of one part is double to another , then lenght of the line segment inside the square is -

`(sqrt(10))/(3)`

`(sqrt(13))/(3)`

`(sqrt(11))/(3)`

`(2)/(sqrt(3))`

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