A variable circle is drawn to touch the x-axis at the origin. The locus of the pole of the straight line `l x+my+n=0` w.r.t the variable circle has the equation:

Equation of circles touching x-axis at the origin and the line 4x+3y+24=0 are

The equation of the circles which touch the y-axis at the origin and the line 5x+12y-72=0 is

A variable chord is drawn through the origin to the circle x^2+y^2-2a x=0 . Find the locus of the center of the circle drawn on this chord as diameter.

Find the locus of the centre of the circle touching the line x+2y=0a n d x=2y

The locus of th point (l,m). If the line lx+my=1 touches the circle x^(2)+y^(2)=a^(2) is

A variable circle passes through the fixed point (2, 0) and touches y-axis Then, the locus of its centre, is

A variable circle passes through the fixed point (2, 0) and touches y-axis Then, the locus of its centre, is

A variable circle C touches the line y = 0 and passes through the point (0,1). Let the locus of the centre of C is the curve P. The area enclosed by the curve P and the line x + y = 2 is

Form the differential equation of all circle touching the x-axis at the origin and centre on the y-axis.

Form the differential equation of all circle touching the x-axis at the origin and centre on the y-axis.