Question

find the area of the circle inscribed in a square of side 28 m in diameter of the circle is equal to the side of the square

Answer 1

Let ABCD be the square.
AC and BD are It's diagonals.
Let DE be diameter of circle.

According to question,

DE = 28m

So Radius = DE/2 = 28/2 = 14m

Now, Area of circle = $\boxed{πr^2}$

= 22/7 × 14 ×14

= 616 m^2

Answer 2

☯Dear User!☯

Question: find the area of the circle inscribed in a square of side 28 m in diameter of the circle is equal to the side of the square ?

Answer: →

Required Area of Circle is 616m².

Method of Solution:→

In this Question, It is given area of the circle inscribed in a square of side 28 m in diameter of the circle is equal to the side of the square.

Diameter of Circle = 28 metres

We know that Diameter is double to it's Radius, So Radius of Circle is half of the Diameter.

Radius of Circle = 28÷2 metres

Radius of Circle = 14 metres

Now, According to the Question's Statement!

→ Statement: Diameter of the circle is equal to the side of the square.

Find the Area of Circle,

Area of Circle = πr²

Area of Circle = 3.14×14×14

•°• Area Of Circle=616m²

Hence, Required Area of Circle is 616m².✔✔