Find the area of the segment AYB shown in the adjacent figure. It is given that the radius of the circle is `21` cm and `/_AOB=120^(0)(Usepi=(22)/(7)` and `sqrt(3)=1.732`)

Find the area of the segment AYB shown in the given figure, if radius of the circle is 21 cm and angle AOB = 120^(@) . (Use pi = (22)/(7) )

Find the area of the shaded region in the given figure, if PQ = 24 cm, PR = 7 cm and O is the centre of the circle.

Find the area of the segments shaded in figure, if PQ=24cm, PR=7cm and QR is the diameter of the circle with centre O ( Take pi=(22)/(7))

In the figure, ‘O’ is the centre of the circle. OM = 3cm and AB = 8cm. Find the radius of the circle

Calculate the area of the designed region in the given figure common between the two quadrants of circles of radius 8 cm each.

Find the area of the minor segment of a circle of radius 14 cm. When the angle of the corresponding sector is 60^(@) .

Calculate the area of the designed region in figure, common between the two quadrants of the circles of radius 10cm each. (usepi=3.14)

Find the degree measure of the angle subtended at the centre of a circle of radius 100 cm by an are of length 22cm . (Use pi=(22)/(7) )

The area of an equilateral triangle ABC is 17320.5 cm^(2) . With each vertex of the triangle as centre, a circle is drawn with radius to half the length of the side of the triangle (see the given figure). Find the area of the shaded region. (Use pi = 3.14 and sqrt(3) = 1.73205 )

Find the area of the shaded region in the figure, in which two circles with centres A and B touch each other at the point C, where AC=8cm and AB=3cm