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. 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. 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. Equation of common chord of two 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

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

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:

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 :

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 :

P(a,b) 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

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