The chord PQ of the rectangular hyperbola `xy=a^(2)` meets the x-axis at A. Point C is the midpoint of PQ and O is the origin. Prove that the triangle ACO is isosceles.

The chord P Q of the rectangular hyperbola x y=a^2 meets the axis of x at A ; C is the midpoint of P Q ; and O is the origin. Then DeltaACO is equilateral (b) isosceles right-angled (d) right isosceles

The chord P Q of the rectangular hyperbola x y=a^2 meets the axis of x at A ; C is the midpoint of P Q ; and O is the origin. Then A C O is equilateral (b) isosceles right-angled (d) right isosceles

Ifthe normal at P to the rectangular hyperbola x^2-y^2=4 meets the axes in G and g and C is the centre of the hyperbola, then

The normal to the rectangular hyperbola xy = 4 at the point t_1 meets the curve again at the point t_2 Then

The tangent at the point P of a rectangular hyperbola meets the asymptotes at L and M and C is the centre of the hyperbola. Prove that PL=PM=PC .

The tangent at a point p to the reactangular hyperbola xy=c^(2) meets the lines x-y=0, x+y=0 at Q and R, Delta_(1) is the area of the DeltaOQR , where O is the origin. The normal at p meets the X-axis at M and Y -axis at N. If Delta_(2) is the area of the DeltaOMN , show that Delta_(2) varies inversely as the square of Delta_(1) .

Tangents at P to rectangular hyperbola xy=2 meets coordinate axes at A and B, then area of triangle OAB (where O is origin) is _____.

If the normal to the rectangular hyperbola x^(2) - y^(2) = 4 at a point P meets the coordinates axes in Q and R and O is the centre of the hyperbola , then

If lx+my+n=0 is a tangent to the rectangular hyperbola xy=c^(2) , then

A, B, C are three points on the rectangular hyperbola xy = c^2 , The area of the triangle formed by the points A, B and C is