`oo` Q. 44 The boundary of the shaded region in the given diagram consists of three semi-circular arcs, thesmaller ones being equal. If the diameter of the larger one is 10 cm, calculate the length of theboundary -

The boundary of the shaded region in the given figure consists of three semicircular areas, the smaller ones being equal. If the diameter of the larger one is 14 cm, calculate (i) the length of the boundary (ii) the area of the shaded region

The boundary of the shaded region in the given figure consists of three semicircular areas,the smaller ones being equal.If the diameter of the larger one is 14cm, calculate (i) the length of the boundary (ii) the area of the shaded region

In Figure, the boundary of the shaded region consists of four semi-circular arcs, the smallest two being equal. If the diameter of the largest is 14 cm and of the smallest is 3.5 cm, find (i) the length of the boundary (ii) the area of the shaded region.

In Fig. 15.95, the boundary of the shaded region consists of four semi-circular arcs, the smallest two being equal. If the diameter of the largest is 14 cm and of the smallest is 3.5 cm, find (FIGURE) (i) the length of the boundary (ii) the area of the shaded region

In the adjoining figure the boundary of the shaded region consist of four semi-circular are, two smallest being equal. If diameter of the largest is 14cm and that of the smallest is 3.5cm . Calculate the area of the shaded region. (Use pi=22/7 )

In the given figure,the boundary of shaded region consists of foure semicirular areas two smallest beinequal.If diameter of the largest is 14cm .and that of the smallest is 3.5cm, calculate the area of the shaded region.

Calculate the area of the shaded region, if the diameter of the semi-circle is equal to 14 cm. (Take pi=22/(7) )

Find the area of the shaded region in the given figure, where ABCD is a square of side 10cm and semi-circles are drawn with each side of the square as diameter.

In an isoceles triangle, the difference between one of the equal sides and the unequal side (longest of the three) is 3//10 of the sum of the equal sides. If the perimeter of the triangle is 90 cm, then find the length of unequal side in centimetres