The length of diagonals of square garden $ABCD$ is $120\, m$. As shown in the figure, there are flower beds on two opposite sides of the garden in the shape of minor segment the centre of which is the point of intersection of diagonals. Find the area of these flower beds. $(\pi=3.14)$ (in $m^2$)

From a circular metallic sheet with radius $21\, cm ,$ a regular hexagon of side $21\, cm$ is cut off. Find the area of the remaining sheet. $(\sqrt{3}=1.73)$ (in $cm^2$)

Is it true to say that area of a square inscribed in a circle of diameter $p \,cm$ is $p^{2} \,cm ^{2} ? Why ?$

Points $A$ and $B$ are distinct points on $\odot( O , r)$ and point $C$ on the circle lies in the interior of $\angle AOB$. Then, $\overline{AB}\cup \widehat{ACB}$ is ........

The union of a chord of a circle and its corresponding arc is called $\ldots \ldots \ldots \ldots$

In a circle with radius $6.3\, cm$, an are subtends an angle of measure $150$ at the centre. Find the length of this arc and the area of the sector formed by this arc.