A rectangular hyperbola with centre C, is intersect by a circle of radius r in four points, P, Q, R and S, `CP^(2) + CQ^(2) + CR^(2) + CS^(2)` is equal to

A rectangular hyperbola whose centre is C is cut by any circle of radius r in four points P, Q, R and S. Then, CP^2 +CQ^2 +CR^2 + CS^2 = (A) r^2 (B) 2r^2 (C) 3r^2 (D) 4r^2

sum_(r=0)^n(-2)^r*(nC_r)/((r+2)C_r) is equal to

The line y=mx+c intersects the circle x^(2)+y^(2)=r^(2) in two distinct points if

P Q R S is a rectangle inscribed in a quadrant of a circle of radius 13 c mdot A is any point on P Qdot If P S=5c m ,\ then find a r\ (\ R A S)

P Q and R S are two perpendicular chords of the rectangular hyperbola x y=c^2dot If C is the center of the rectangular hyperbola, then find the value of product of the slopes of C P ,C Q ,C R , and C Sdot

If P + Q = R and P - Q = S, prove that R^2 + S^2 = 2(P^2 + Q^2)

Let the major axis of a standard ellipse equals the transverse axis of a standard hyperbola and their director circles have radius equal to 2R and R respectively. If e_(1) and e_(2) , are the eccentricities of the ellipse and hyperbola then the correct relation is

The vertices of triangleABC lie on a rectangular hyperbola such that the orhtocentre of the triangle is (2,3) and the asymptotes of the rectangular hyperbola are parallel to the coordinate axes. The two perpendicular tangents of the hyperbola intersect at the point (1, 1). Q. The equation of the rectangular hyperbola is

In Figure, there are two concentric circles with centre O . P R and P Q S are tangents to the inner circle from point plying on the outer circle. If P R=7. 5 c m , then P S is equal to (a) 10cm (b) 12cm (c) 15cm (d) 18cm

If the sum of the areas of two circles with radii r_1 and r_2 is equal to the area of a circle of radius r , then r_1^2 +r_2^2 (a) > r^2 (b) =r^2 (c)