Tag: area between two concentric circles

Breadth of the ring is equal to the difference between the radius of the outer circle and the radius of the inner circle
Given the area of outer circle=616$\displaystyle cm^{2}$
$\displaystyle \Rightarrow  \pi r _{2}^{2}=616 cm^{2}$
$\displaystyle \Rightarrow r _{1}^{2}=\frac{616\times 7}{22}=196$
$\displaystyle \therefore r _{1}=14 cm $
and the area of the inner circle $\displaystyle =154 cm^{2}$
$\displaystyle \Rightarrow \pi r _{2}^{2}= 154$
$\displaystyle \Rightarrow r _{2}^{2}=\frac{154\times 7}{22}=49$
$\displaystyle \therefore r _{2}=7 cm.$
$\displaystyle \therefore $ The required answer $\displaystyle =r _{1}-r _{2}=14-7=7 cm.$

Consider the difference between circumference and radius.

Taking$\pi $ as $3.14$ will give an approximate answer. we can do it by taking $22/7$ as wel

Let, the radius be$ r cm$

Circumference will be,

$2r=2\times 3.14r=6.28r$

ATQ,  $6.28r-1.r=37$

$5.28r=37$

 $r=\dfrac{37}{5.28}$

$r=$approx. $7 cm$ 

Area$=\pi {{r}^{2}}=3.14\times 7\times 7=154c{{m}^{2}}$

Hence, this is the answer.

The perimeter of a semi circle is $= \pi r+2r$

Diameter $= 2 \times$ radius
radius $= \dfrac{4}{2}=2$ $cm$
Circumference of the semicircle $= \pi r+ 2r$
= $3.14 \times  2 +4= 10.28$ $cm$

Area of a semicircle $=\dfrac{1}{2}\pi r^2$
$=\dfrac{1}{2}\pi (20)^2$
$=628\ cm^2$

Area of a semicircle $=\dfrac{1}{2}\pi r^2$
$ = \dfrac{1}{2}\pi (2)^2$
$ = 2\pi  $

radius $= 2\ m$
Area of a semicircle $= \dfrac{1}{2}\pi r^2$
$ = \dfrac{1}{2}\pi (2)^2$
$ = 2\pi  $

Circumference of a semicircle $=\pi r$
$15.15= \pi r$
$r = 5.05$
Area of the semicircle $=\dfrac{1}{2}\pi r$
$=\dfrac{1}{2}\pi \times 5.05$
$= 7.575$ $cm^2$