A circle of radius 2 units is touching both the axes and a circle with centre at (6,5). The distance between their centres is

Circle touching both the axes and radius 5 is

Circle touching both the axes and radius 5 is

A circle of radius 2 units lies in the first qudrant touching both the axes. Then the equation of the circle with centre (6,5) and touching the above circle externally is

A circle C_(1) has radius 2 units and a circles C_(2) has radius 3 units. The distance between the centres of C_(1) and C_(2) is 7 units. If two points, one tangent to both circles and the other passing through the centre of both circles, intersect at point P which lies between the centers of C_(1) and C_(2) , then the distance between P and the centre of C_(2) is

A circle C_(1) has radius 2 units and a circles C_(2) has radius 3 units. The distance between the centres of C_(1) and C_(2) is 7 units. If two points, one tangent to both circles and the other passing through the centre of both circles, intersect at point P which lies between the centers of C_(1) and C_(2) , then the distance between P and the centre of C_(1) is

Two circles intersect each other such that each circle passes through the centre of the other. If the distance between their centres is 12, what is the radius of each circle?

Two circle intersect each other such that each circle passes through the centre of the other. If the distance between their centres is 12 , what is the radius of each circle?

Two circles intersect each other such that each circle passes through the centre of the other. If the distance between their centres is 12, what is the radius of each circle ?

Two circles intersect each other such that each circles pass through the centre of the other.If the distance between their centres is 12,what is the radius of each circle?

A circle of radius 2 lies in the first quadrant and touches both the axes. Find the equation of the circle with centre at (6,5) and touching the above circle externally.