Math, asked by naishaaggarwal11, 7 months ago

Diameter of 2 discs are in the ratio 3:5. What will be the ratio of their areas?

Answers

Answered by sara122
0

Answer:

Radius =Diameter/2

And diameters here are in the ratio 2:3.

Hence, r1:r2 =2/2:3/2

Therefore ratio of radii is 2:3.

Ratio of two Areas = pie (r1)^2/pie (r2)^2

=( r1/r2)^2

=(2/3)^2

=4/9

|Peace|

Answered by Anonymous
5

Question :

Diameter of 2 discs are in the ratio 3:5. What will be the ratio of their areas?

Answer :

Given -

D of disc A : D of disc B = 3:5

Let the ratios be 3x and 5x..

So,

Radius of disc A = 3x/2

Radius of disc B = 5x/2

To find -

The ratio of areas of the two discs

 =  \frac{area \: of \: disc \: a}{area \: of \: disc \: b}

Area of a circle

 = \pi {r}^{2}

Ratio of areas =

 \frac{\pi {( \frac{3x}{2} )}^{2} }{\pi {( \frac{5x}{2} )}^{2} }

Cancel the π from neumerator and denominator

 =  \frac{ \frac{9 {x}^{2} }{4} }{ \frac{25 {x}^{2} }{4} }

Simplify, by cancelling x square and 4

=

 =  \frac{9}{25}

So,

the ratio of areas of the two rings would be

9:25

★Points to know

• Try to represent ratios in simplest forms

• Try to represent ratios in simplest forms• Try to write formula to avoid confusion

• Try to represent ratios in simplest forms• Try to write formula to avoid confusion•One major flaw can be that students forget to convert Diameter into Radius.

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