Question

If the area of a circle is equal to the area of a square, then the ratio of their perimeters is

Answer 1

Pi x r xr= axa
Taking square root
Root(pi) r=a
Ratio is 2pir/4a
=2pir/4root(pi)xr
=root(pi):2

Answer 2

Answer:

The ratio of their parameters will be √π : 2

Step-by-step explanation:

Let us consider the radius of a circle is 'r'

So the area of a circle is A = π*r²

and the parameter of the circle is 2*π*r

Let the sides of a square b x

So the area of the square is A = x*x = x²

and the parameter of square is 4*x

According to the given condition, the area of circle and area of the square is equal, so a relation generates;

π*r² = x²

Taking square root on both sides of the upper relation,

√π *r = x → (A)

Now taking ratio of their parameters,

2*π*r : 4*x

π*r : 2*x

Substituting the values of equation (A) implies;

π*r : 2*√π *r

√π : 2

Answer.