A circle touches the line `y=x` at point (4, 4) on it. The length of the chord on the line `x+y=0` is ` 6sqrt(2)`. Then one of the possible equation of the circle is :

A circle touches the line y=x at point (4,4) on it. The length of the chord on the line x+y=0 is 6sqrt2 . Then one of the possible equation of the circle is

A circle touches the line y = x at point P such that OP = 4 sqrt2 , Circle contains (-10,2) in its interior & length of its chord on the line x+y=0 is 6sqrt2 . Determine the equation of the circle

If the line 2x-y+1=0 touches the circle at the point (2,5) and the centre of the circle lies in the line x+y-9=0. Find the equation of the circle.

A circle touches the y-axis at the point (0, 4) and cuts the x-axis in a chord of length 6 units. Then find the radius of the circle.

A circle touches the y-axis at the point (0, 4) and cuts the x-axis in a chord of length 6 units. Then find the radius of the circle.

A circle touches both the x-axis and the line 4x-3y+4=0 . Its centre is in the third quadrant and lies on the line x-y-1=0 . Find the equation of the circle.

A circle touches both the coordinate axes and the line x-y=sqrt(2)a, a gt 0 , the coordinates of the centre of the circle cannot be

Centre of a circle of radius 4sqrt(5) lies on the line y=x and satisfies the inequality 3x+6y > 10. If the line x+2y=3 is a tangent to the circle, then the equation of the circle is

The length of the chord of contact of the tangents drawn from the point (-2,3) to the circle x^2+y^2-4x-6y+12=0 is:

The line 2x-y+1=0 touches a circle at the point (2, 5) and the centre of the circle lies on x-2y=4 . The diameter (in units) of the circle is