Let `P(alpha,beta)` be a point in the first quadrant. Circles are drawn through P touching the coordinate axes.
Equation of common chord of two circles is

Let P(alpha,beta) be a point in the first quadrant. Circles are drawn through P touching the coordinate axes. Radius of one of the circles is

Let P(alpha,beta) be a point in the first quadrant. Circles are drawn through P touching the coordinate axes. Radius of one of the circles is

Let P(alpha,beta) be a point in the first quadrant. Circles are drawn through P touching the coordinate axes. Radius of one of the circles is

P(a,b) is a point in the first quadrant Circles are drawn through P touching the coordinate axes such that the length of common chord of these circles is maximum,if possible values of (a)/(b) is k_(1) and k_(2), then k_(1)+k_(2) is equal to

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

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

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

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

P is a point(a,b) in the first quadrant. If the two circles which pass through P and touch both the co-ordinates axes cut at right angles , then

The equation of the circle of radius 5 and touching the coordinate axes in third quadrant is