A chord that passes through the centre of a circle is___

The chord, which passes through the centre of the circle, is called a ........... of the circle.

DIAMETER A chord passing through the centre of a circle is known as its diameter. Note that a circle has many diameters and a diameter of a given circle is one of the largest chords of the circle.Also all diameters are of the same length.

In the given figure, TB is a chord which passes through the centre of the circle. PT is a tangent to the circle at the point T on the circle. If PT = 10 cm, PA = 5 cm and AB = x cm. then the radius of the circle is:

In the given figure, TB is a chord which passes through the centre of the circle . PT is a tangent to the circle at the point T on the circle . If PT=10cm , PA=5cm and AB=xcm , then the radius of the circle is :

Statement-1: The common chord of the circles x^(2)+y^(2)=r^(2) is of maximum length if r^(2)=34 . Statement-2: The common chord of two circles is of maximum length if it passes through the centre of the circle with smaller radius.

If a line segment joining mid-points of two chords of a circle passes through the centre of the circle, prove that the two chords are parallel.

A smaller circle touches internally to a larger circle at A and passes through the centre of the larger circle. O is the centre of the larger circle and BA, OA are of the diameters of the larger and smaller circles respectively. Chord AC intersects the smaller circle at a point D. If AC = 12 cm , then AD is :

Two equal circles intersect such that each passes through the centre of the other. If the length of the common chord of the circles is 10sqrt3 cm, then what is the diameter of the circle?

In the given figure, a straight line l passing through the centre O of the circle bisects the chord AB and CD. Prove that AB||CD.