The center of a square is at the origin and its one vertex is `A(2,1)`. Find the coordinates of the other vertices of the square.

The opposite vertices of a square are (2, 6) and (0, -2). Find the coordinates of the other vertices.

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:

Write down 2xx2 matrix A which corresponds to a counterclockwise rotation of 60^(@) about tha origin. In the diagram OB of 2sqrt2 units in lenth. The square is rotated counterclockwise about O through 60^(@) find the coordiates of the vertices of the square after rotating.

The two opposite vertices of a square are (-1, 2) and (3, 2). Find the coordinates of other two vertices.

One side of a square is inclined to the x-axis at an angle alpha and one of its extremities is at the origin. If the side of the square is 4, find the equations of the diagonals of the square.