Point P (2,-7) is the centre of a circle with radius 13 units, PT is perpendicular to chord AB and T= (-2,-4). Calculate the length
AT

Points P (2, 7) is the centre of a circle with radius 13 unit, PT is perpendicular to chord AB and T = (-2, -4), Calculate the length of , (i) AT (ii) AB.

A chord bar(AB) is 3 cm. from the center of a circle with radius 4. What is the length of chord bar(AB) ?

O is the centre of a circle of radius 5cm. T is a point such that OT=13cm and OT intersects the circle at E, find the length AB.

In the given figure, the diameter CD of a circle with centre 0 is perpendicular to the chord AB. If AB = 8 cm and CM = 2 cm, find the radius of the circle.

If O is the centre of a circle with radius r and AB is a chord of the circle at a distance r/2 from O, then /_BAO=

The points P (-2,4) lies on a circle of radius 6 and centre (3,5).

The radius of a circle is 17-0 cm and the length of perpendicular drawn from its centre to a chord is 8 0 cm. Calculate the length of the chord.

In the figure given below, O is the centre of the circle. AB and CD are two chords of the circle. OM is perpendicular to AB and ON is perpendicular to CD. AB = 24 cm, OM = 5 cm, ON = 12 cm. Find the : (i) radius of the circle (ii) length of chord CD

As shown in the given figure, from an external point P, a tangent PT and a line segment PAB are drawn to a circle with centre O. ON is perpendicular on the chord AB, Prove that PA.PB = PN^(2) - AN^(2)

A point "P" is at the 9 unit distance from the centre of a circle of radius 15 units. The total number of different chords of the circle passing through point P and have integral length is