Prove that a diameter AB of a circle bisects all those chords which are parllel to the tangent at the point A.

Prove that a diameter AB of a circle bisects all those chords which are parallel to the tangent at the point A.

Prove that a diameter of a circle which bisects a chord of the circle also bisects the angle subtended by the chord at the centre of the circle.

Prove that, if a diameter of a circle bisects two chords of the circle then those two chords are parallel to each other.

If a diameter of a circle bisects each of the two chords of a circle,prove that the chords are parallel.

If a diameter of a circle bisects each of the two chords of a circle,prove that the chords are parallel.

AB is a diameter of a circle. CD is a chord parallel to AB and 2CD = AB. The tangent at B meets the line AC produced at E then AE is equal to -

AB is a diameter of a circle. CD is a chord parallel to AB and 2CD = AB. The tangent at B meets the line AC produced at E then AE is equal to

In the given figure,a diameter PQ of a circle bisects the chord RS at the point O.If PS is prarallel to RQ,prove that RS is also a diameter of the circle.

Circle described on the focal chord as diameter touches the tangent at the vertex