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

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

A B C 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 (a) (1,6) (b) (-1/2,5) (c) (5/6,6) (d) none of these

If (a, b) be an end of a diagonal of a square and the other diagonal has the equation x-y=a , then another vertex of the square can be

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 (a) (1+sqrt(2),-2) (b) (1-sqrt(2),-2) (c) (1,-2+sqrt(2)) (d) none of these

In A B C , if the orthocentre is (0,0) and the circumcenter is (1,2), then centroid of A B C) is (a) (1/2,2/3) (b) (1/3,2/3) (c) (2/3,1) (d) none of these

The range of the function f(x)=|x-1|+|x-2|,-1lt=xlt=3, is [1,3] (b) [1,5] (c) [3,5] (d) none of these

The minimum value of 2^(x^2-3)^(3+27) is a) 2^(27) (b) 2 (c) 1 (d) none of these

Show that A(4,-1), B(6,0), C(7,-2) and D(5, -3) are vertices of a 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.

Show that the point (3,-2),(3,2),(-1,2) and (-1,-2) taken in order are the vertices of a square.