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

An equilateral triangle has two vertices at the points (3, 4) and (-2, 3) , find the coordinates of the third vertex.

Delta ABC , shown below in the standard (x,y) coordinate plane is equilateral with vertex A at (0,w) and vertex B on the x- axis as shown . What are the coordinates of vertex C ?

In the given figure, ABC is an equilateral triangle with co-ordinates of B and C as B(-3, 0) and C(3, 0). The co-ordinates of the vertex A are

If one vertex of an equilateral triangle of side 'a' lie at the origin and the other lies on the line x-sqrt3 y = 0 , the co-ordinates of the third vertex are:

Two vertices of an equilateral triangle are (0, 0) and (0,2 sqrt(3)) . Find the third vertex

Two vertices of a triangle are (1,\ 2),\ (3,\ 5) and its centroid is at the origin. Find the coordinates of the third vertex.

If the coordinates of the centroid and a vertex oc an equilaterqal triangle are (1,1) and (1,2) respectively, then the coordinates of another vertex, are

A(3,2)a n dB(-2,1) are two vertices of a triangle ABC whose centroid G has the coordinates (5/3,-1/3)dot Find the coordinates of the third vertex C of the triangle.

On the line segment joining (1, 0) and (3, 0) , an equilateral triangle is drawn having its vertex in the fourth quadrant. Then the radical center of the circles described on its sides. (a) (3,-1/(sqrt(3))) (b) (3,-sqrt(3)) (c) (2,-1sqrt(3)) (d) (2,-sqrt(3))