The circle `x^(2)+y^(2)-8x=0` and hyperbola `(x^(2))/(9)-(y^(2))/(4)=1` intersect at points A and B.
The equation of a common tangent with positive slope to the circle as well as to the hperbola is

The circle x^2+y^2-8x = 0 and hyperbola x^2 /9 - y^2 /4=1 intersect at the points A and B. Then the equation of the circle with AB as its diameter is

The equation of the common tangent to the curves , y^2=8x and xy=-1 is :

A line through the origin meets the circle x^(2)+y^(2)=a^(2) at P and the hyperbola x^(2)-y^(2)=a^(2) at Q. Prove that the locus of the point of intersection of tangent at P to the circle with the tangent at Q to the hyperbola is a straight line.

The circles : x^2+y^2 - 10x + 16 =0 and x^2+y^2 =a^2 : intersect at two distinct points if :

The equation of common tangent to the parabola y^2 =8x and hyperbola 3x^2 -y^2=3 is

Find the equations of the tangents to the circle x^(2) + y^(2)=16 drawn from the point (1,4).

The equation of the common tangent touching the circle (x-3)^2 +y^2=9 and the parabola y^2 = 4x above the x-axis is :

The number of common tangents to the circles x^2+y^2-y=0 and x^2+y^2+y=0 is :

Equation of the common tangent of a circle x^2+y^2=50 and the parabola y^2=40x can be

The two circles x^2+ y^2=r^2 and x^2+y^2-10x +16=0 intersect at two distinct points. Then