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

Find the coordinates of one vertex of an equilateral triangle with centroid at the origin and the opposite side x +y-2 =0 .

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:

If a vertex of an equilateral triangle is the origin and the side opposite to it has the equation x+y=1, then orthocentre of the triangle is :

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=(2pmsqrt3)(x-2) .

Write the coordinates of third vertex of a triangle having centroid at the origin and two vertices at (3,-5, 7) and (3,0,1).

An equilateral triangle has its circumcentre at origin and one of the sides is along the line x + y -1 = 0 and cordinate of vertex A is (-1,-1). Find the equations of the other two sides.

A vertex of an equilateral triangle is 2,3 and the opposite side is x+y=2. Find the equations of other sides.

ABC is an equilateral triangle whose centroid is origin and base BC is along the line 11x +60y = 122 . Then

Find the area of an equilateral triangle, whose one side is a cm.

All the three vertices of an equilateral triangle lie on the parabola y = x^(2) , and one of its sides has a slope of 2. Then the sum of the x-coordinates of the three vertices is