Let `x^2+y^2=4r^2 and xy = 1` intersects at A and B in first quadrant . If `AB = sqrt(14)` units , the value of |r| is

Let x^2 + y^2 = r^2 and xy = 1 intersect at A & B in first quadrant, If AB = sqrt14 then find the value of r.

The lines x + y=|a| and ax-y = 1 intersect each other in the first quadrant. Then the set of all possible values of a is the interval:

Let the line y=mx and the ellipse 2x^(2)+y^(2)=1 intersect at a point P in the first quadrant. If the normal to this ellipse at P meets the co - ordinate axes at (-(1)/(3sqrt2),0) and (0, beta) , then beta is equal to

Let the line y=mx and the ellipse 2x^(2)+y^(2)=1 intersect at a point P in the first quadrant. If the normal to this ellipse at P meets the co - ordinate axes at (-(1)/(3sqrt2),0) and (0, beta) , then beta is equal to

Consider the circle x^2 + y^2 = 9 and the parabola y^2 = 8x . They intersect at P and Q in first and fourth quadrant respectively. Tangents to the circle at P and Q intersect the x-axis at R and tangents at the parabola at P and Q intersect the x-axis at S.

If the curves x^(2)-y^(2)=4 and xy = sqrt(5) intersect at points A and B, then the possible number of points (s) C on the curve x^(2)-y^(2) =4 such that triangle ABC is equilateral is

Portion of asymptote of hyperbola x^2/a^2-y^2/b^2 = 1 (between centre and the tangent at vertex) in the first quadrant is cut by the line y + lambda(x-a)=0 (lambda is a parameter) then (A) lambda in R (B) lambda in (0,oo) (C) lambda in (-oo,0) (D) lambda in R-{0}

The circle C1 : x^2 + y^2 = 3 , with center at O, intersects the parabola x^2 = 2y at the point P in the first quadrant. Let the tangent to the circle C1 at P touches other two circles C2 and C3 at R2 and R3, respectively. Suppose C2 and C3 have equal radii 2sqrt(3) and centers Q2 and Q3, respectively.If Q_2 and Q_3 lies on the y-axis, then

let A(x_1,0) and B(x_2,0) be the foci of the hyperbola x^2/9-y^2/16=1 suppose parabola having vertex at origin and focus at B intersect the hyperbola at P in first quadrant and at point Q in fourth quadrant.

AB is a chord of x^2 + y^2 = 4 and P(1, 1) trisects AB. Then the length of the chord AB is (a) 1.5 units (c) 2.5 units (b) 2 units (d) 3 units