A chord of a circle subtends an angle of `60^@` at its centre. If the length of the chord is 100cm, find the area of the major segment.

A chord of a circle of radius 6cm is making an angle 60 ^(@) at the centre.Find the length of the chord.

A chord of a circle of radius 15 cm subtends an angle of 60^(@) at the centre. Find the areas of the corresponding minor and mojor segments of the circle. (" Use "pi=3.14andsqrt(3)=1.73).

In a circle of radius 21 cm, an arc subtends an angle of 60^(@) at the centre. Find the length of the arc

A chord of a circle of radius 12cm subtends an angle of 120^@ at the centre. Find the area of the corresponding segments of the circle.

A chord of a circle of radius 30cm makes an angle 120^@ at the centre of the circle. Find the area of the minor and major segment.

A chord of a circle of radius 28cm makes an angle 90^@ at the centre. The area of the major segment is

A chord of a circle of radius 15cm subtends an angle 60^@ at the centre. Find the areas of corresponding minor and major segments.

A chord of a circle of radius 14cm subtends an angle 120^@ at the centre. Find the area of the corresponding minor segment of the circle.

In a circle of radius 21cm , an arc subtends an angle 60^@ at the centre. Find (i) the length of the arc (ii) area of the sector formed by the arc (iii) area of the segment formed by the corresponding chord.