Let P be a point on the curve `c_(1):y=sqrt(2-x^(2))` and Q be a point on the curve `c_(2):xy=9,` both P and Q be in the first quadrant. If d denotes the minimum distance between P and Q, then `d^(2)` is ………..

Let P be a point on the circle x^(2)+y^(2)=9 , Q a point on the line 7x+y+3=0 , and the perpendicular bisector of PQ be the line x-y+1=0 . Then the coordinates of P are

Find the distance between the points P(-2, 4, 1) and Q(1, 2, -5).

Let P be the point (1,0) and Q be a point on the locus y^(2)=8x . The locus of the midpoint of PQ is

Normals drawn to the hyperbola xy=2 at the point P(t_1) meets the hyperbola again at Q(t_2) , then minimum distance between the point P and Q is

Find the value of y for which the distance between the points P (2, -3) and Q (10, y) is 10 units.

Let P and Q are two points on the curve y=log_((1)/(2))(x-0.5)+log_2sqrt(4x^(2)-4x+1) and P is also on the circle x^(2)+y^(2)=10 . Q lies inside the given circle such that its abscissa is an integer. Q. OP*OQ , O being the origin is a. 4 or 7 b. 4 or 2 c. 2 or 3 d. 7 or 8

Find the values of y for which the distance between the points P (2, - 3) and Q (10, y) is 10 units.

Let P, Q are two points on the curve y = log_(1/2) (x-0.5)+log_2 sqrt(4x^2 4x+1) and P is also on the x^2+y^2 = 10, Q lies inside the given circle such that its abscissa is an integer. a. (1, 2) b. (2, 4) c. (3, 1) d. (3, 5)

Consider a curve ax^2+2hxy+by^2=1 and a point P not on the curve. A line drawn from the point P intersects the curve at points Q and R. If the product PQ.PR is independent of the slope of the line, then show that the curve is a circle.