The vertex of an equilateral triangle is `(2, 3)` and the equation of the opposite side is `x + y = 2`. Then the other two sides are `y-3 =( 2 pm sqrt(3) ) ( x-2)`.

One vertex of the equilateral triangle with centroid at the origin and one side as x+y -2 =0 is

One side and are vertex of the equilateral triangle is 2x+2y-5=0 and (1,2) respectively. Find equation of other sides.

An equilateral triangle has one vertex at (3, 4) and another at (-2, 3). Find the coordinates of the third vertex.

In an equilateral triangle with side a, prove that, the area of the triangle (sqrt(3))/(4)a^(2) .

If a vertex of a triangle is (1, 1) and the mid-points of two side through this vertex are (-1, 2) and (3, 2), then centroid of the triangle is

If the equation of the base of an equilateral triangle is x+y=2 and the vertex is (2,-1) , then find the length of the side of the triangle.

In an equilateral triangle with side a, prove that, the altitude is of length (sqrt(3))/(2)a .

The base of an equilateral triangle with side 2a lies along the Y-axis such that the mid-point of the base is at the origin. Find vertices of the triangle.

An equilateral triangle has one vertex at (0, 0) and another at (3, sqrt(3)) . What are the coordinates of the third vertex ?

A point P is an arbitrary interior point of an equilateral triangle of side 4. If x, y, z are the distances of 'P' from sides of the triangle then the value of (x+y+z)^(2) is equal to -