The radius of the circle having maximum size passing through (2,4) and touching both the coordinate axes is

The equation of the circle passing through (2,1) and touching the coordinate axes is

The radius of the circle of least size that passes through (-2,1) and touches both axes is

Show that the radius of the circle lying in the first quadrant, passing through the point (1,1) and touching both the axes is 2+-sqrt(2) .

The equation of circles passing through (3, -6) touching both the axes is

Find the equation of the circle passing through (0, 0) and making intercepts a and b on the coordinate axes.

Centre of circles touching both axes and passing through (2,-3)

Show that equation of the circle passing through the origin and cutting intercepts a and b on the coordinate axes is x^2 + y^2 - ax - by =0

P(α,β) is a point in first quadrant. If two circles which passes through point P and touches both the coordinate axis, intersect each other orthogonally, then

A is a point (a, b) in the first quadrant. If the two circIes which passes through A and touches the coordinate axes cut at right angles then :

If the radius of the circle passing through the origin and touching the line x+y=2 at (1, 1) is r units, then the value of 3sqrt2r is