In the given diagram, $\Delta ABC$ is a right angled triangle in which $m \angle B=90$ and $AB = BC =14\, cm$ Minor sector $BAPC$ is a sector of $\odot( B , BA )$ and semicircle arc $\widehat{ AQC }$ is drawn on diameter $\overline{ AC }$. Find the area of the shaded region. (in $cm^2$)

Area of a sector of a circle of radius $36\, cm$ is $54 \pi \,cm ^{2}$. Find the length of the corresponding arc of the sector. (in $cm$)

In $\odot( O , r),$ chord $\overline{ AB }$ subtends a right angle at the centre. The area of minor segment $\overline{ AB } \cup \widehat{ ACB }$ is $114\,cm ^{2}$ and the area of $\Delta OAB$ is $200\,cm ^{2} .$ Then, the area of minor sector $OACB$ is ......... $cm ^{2}$.

Is it true that the distance travelled by a circular wheel of diameter $d\, cm$ in one revolution is $2 \pi d\, cm ?$ Why?

In $\odot( O , 4), \widehat{ ACB }$ is a minor arc and $m \angle AOB =45 .$ Then, the length of minor $\widehat{ ACB } $ is $\ldots \ldots \ldots \ldots$

The radius of a circle is $3.5\,cm .$ The area of the minor sector formed by two perpendicular radii of that circle is $\ldots \ldots \ldots . cm ^{2}$.