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

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.

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.

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

A circle C of radius unity lies in the first quadrant and touches both the coordinate axes. Show that the radius of the circle which touches both coordinate axes , lies in the first quadrant and cuts C orthogonally is 2pmsqrt3 .

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.

A circle in the first quadrant touches both the axes and its centre lies on the straight line lx+my+n=0 . find the equation of that circle

Solve the following:Find the equation of the circle which lies in the first quadrant and touching both co-ordinate axes at a distance of 2 units from the origin.

Find the equation of the circle of radius a, in the first quadrant, which touches both the axes.