Let a point P lies inside an equilateral `triangle ABC` such that its perpendicular distances from sides are `P_(1),P_(2),P_(3)`.If side length of `triangle ABC` is 2 unit then

In an equilateral triangle ABC, P_1 is length of altitude from A then

A point P is selected inside an equilateral triangle. If sum of lengths of perpendicular dropped on to sides from P is "2015" ,then ((" length of altitude of triangle ")/(2015)) is equal to

The P lies on side AB of an equilateral triangle ABC. Arrange AC, AP and CP in descending order.

A point P is inside an equilateral triangle. If the distances of P from sides 8, 10, 12 then length of the side of the triangle is

Let the point P lies in the interior of an equilateral triangle with side lengths 2 units, each. Find the sum of the shortest distances from P to the sides of the triangle.

The length of the perpendicular drawn from any point in the interior of an equilateral triangle to the respective sides are p_(1), p_(2) and p_(3) . The length of each side of the triangle is

A point P is inside an equilateral triangle if the distance of P from sides 8,10,12 then the length of the side of the triangle is