Find the difference of areas of two segments of a circle formed by a chord of length 5cm subtending an angle `90^@` at the centre.

Find the difference between the areas of the major and minor segments of a circle formed by a chord of length 7cm subtending an angle of 90^@ at the centre.

Area of the circle in which a chord of length sqrt2 makes an angle pi/2 at the centre,

Find the length of the chord of a circle of radius 8 cm which subtends a right angle at the centre.

On a circle of radius 2 cm, find the length of the arc subtending an angle of 15^(@) .

Find the area of the segment of a circle of radius 12cm whose corresponding sector has a central angle of 60^@

In a circle of radius 5 cm,the distance of chord of length 8 cm from the centre is:

In a circle of radius 5 cm,construct a chord of length 8 cm .Measure the distance between the centre and the chord.

In the given figure, a chord AB of the circle with centre O and radius 10 cm, that subtends a right angle at the centre of the circle. Find the area of the minor segment AQBP. Hence find the area of major segment A angle lBQA.

The diameter of a circle is 10cm. A chord of length sqrt50 cm is drawn in the circle. Find the area of the major segment.

Recall that two circles are congruent, if they have the same radii. Prove that equal chords of congruent circles subtend equal angles at their centres