The centre of a circle is (5,3) and its radius is 5 units. Determine the length of the chord of the circle, which is bisected at the point (3,2) .

The centre of a circle is at (5,3) and its radius is 5 . Find the length of the chord which is bisected at (3,2) .

Find the equation of the chord of the hyperbola 25 x^2-16 y^2=400 which is bisected at the point (5, 3).

The length of the greatest chord of the circle , the radius of which is 2.5 cm is

The centre of a circle is the origin and (-5,12) is a point on its circumfernce. Then the diameter of the circle is

The equation of the circle having centre at (3,7) and radius 5 units is _

The radii of two concentric circles are 5 cm and 3 cm respectively . Find the length of the chord of the greater circle which is also a tangent to the smaller circle.

Two concentric circles of radii 5cm and 3cm are drawn. Find the length of the chord of the larger circle which touches the smaller circle.

A circle passes through the points (-6, 5), (-3, -4) and its radius is 5 unit, find the equation of the circle.

A circle passes through the points (3, 4), (-1, 2) and its radius is 5 unit, find the equation of the circle.