Let `C` and `C_1` be two circles in the first quadrant touching both the axes. If they each other, then the ratio of their radii

Circle K is inscribed in the first quadrant touching the circle radius of the circle K, is-

A circle of radius 2 lies in the first quadrant and touches both the axes of coordinates. Find the equation of the circle with centre at (6,5) and touching the above circle externally.

A circle of radius 2 lies in the first quadrant and touches both the axes.Find the equation of the circle with centre at (6,5) and touching the above circle externally.

If the two circles touches both the axes and intersect each other at " (x_(1),y_(1)) " then the length of the common chord is

The two circles touch each other if

Consider circles C_1 & C_2 touching both the axes and passing through (4,4) , then the product of radii of these circles is

circle C_(1) of unit radius lies in the first quadrant and touches both the co-ordinate axes.The radius of the circle which touches both the co-ordinate axes and cuts C_(1) so that common chord is longest (A) 1(B) 2 (C) 3 (D) 4

A circle of radius 3 units touches both the axes in the first quadrant. Find its equation.

The differential equation of all circles in the first quadrant which touch the coordiante axes is of order

Find the equation of the circle which touches both the axes and the line x=c