The ends of a diagonal of a square are `(2,-3)` and `(-1,1)dot` Another vertex of the square can be `(-3/2,-5/2)` (b) `(5/2,1/2)` `(1/2,5/2)` (d) none of these

The ends of a diagonal of a square are (2,-3) and (-1,1). Another vertex of the square can be (-(3)/(2),-(5)/(2)) (b) ((5)/(2),(1)/(2))((1)/(2),(5)/(2)) (d) none of these

If the extrremities (end points) of a diagonal of a square are (1,-2,3) and (2,-3,5) then find the length of the side of square.

ABC is an isosceles triangle.If the coordinates of the base are B(1,3) and C(-2,7), the coordinates of vertex A can be (1,6)( b) (-(1)/(2),5)((5)/(6),6) (d) none of these

The length of the diagonal of a square is d units.The area of the square is d^(2)( b) (1)/(2)d^(2)(1)/(4)d^(2)(d)2d^(2)

If the extremities of the diagonal fo a square are (1,-2,3) and (2,-3,5), then the length of the side is sqrt(6)b.sqrt(3)c*sqrt(5)d .sqrt(7)

ABC is an isosceles triangle.If the co- ordinates of the base are (1,3) and (-2,7) then co-ordinates of vertex A can be: (-(1)/(2),5) (b) (-(1)/(8),5)((5)/(6),-5) (d) (-7,(1)/(8))

A square is inscribed in the circle x^(2)+y^(2)-2x+4y+3=0. Its sides are parallel to the coordinate axes.One vertex of the square is (1+sqrt(2),-2) (b) (1-sqrt(2),-2)(1,-2+sqrt(2))(d) none of these

Show that A(3, 2), B(0, 5), C(-3, 2) and D(0, -1) are the vertices of a square.

Show that the points P(2,1), Q(-1,3) , R (-5,-3) and S (-2,-5) are the vertices of a square .

If (2,1),(-2,5) are two opposite vertices of a square; then the area of the square is