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

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

If a vertex of a square is at the origin and its one side lies along the line 4x+3y-20=0, then the area of the square is

A square has one vertex at the vertex of the parabola y^2=4a x and the diagonal through the vertex lies along the axis of the parabola. If the ends of the other diagonal lie on the parabola, the coordinates of the vertices of the square are (a) (4a ,4a) (b) (4a ,-4a) (c) (0,0) (d) (8a ,0)

If the coordinate of one end of a diameter of a circle is (3,4) and the coordinates of its centre is (-3,2) then the coordinate of the other end of the diameter is .

ABCD is a square Points E(4,3) and F(2,5) lie on AB and CD, respectively,such that EF divides the square in two equal parts. If the coordinates of A are (7,3) ,then the coordinates of other vertices can be

If one of the sides of a square is 3x-4y-12=0 and the center is (0,0) , then find the equations of the diagonals of the square.

One diagonal of a square is 3x-4y+8=0 and one vertex is (-1,1), then the area of square is

The lien x/3+y/4=1 meets the y- and x-a x y s at Aa n dB , respectively. A square A B C D is constructed on the line segment A B away from the origin. The coordinates of the vertex of the square farthest from the origin are (7, 3) (b) (4, 7) (c) (6, 4) (d) (3, 8)

The area of triangle is 5 sq. units. Two of its vertices are (2, 1) and (3, -2) . The third vertex is (x, y) where y=x+3. Find the coordinates of the third vertex.