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The areas of two circles can be expressed as the ratio of 9 to 16. What is the ratio of their radii? O A. 81 to 256 O B. 4.5 to 8 O C. 3 to 4 O D. 18 to 32

User Rajasaur
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1 Answer

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We are told that the ratios between areas of two circles are 9 to 16, this means the following:


(A_1)/(A_2)=(9)/(16)

Since the area of a circle is given by the following formula:


A=\pi r^2

Replacing in the proportion:


\frac{\pi r^2_{1^{}}}{\pi r^2_2}=(9)/(16)

canceling out the pis:


(r^2_1)/(r^2_2)=(9)/(16)

Now we use the following property of exponents:


(a^2)/(b^2)=(^{}(a)/(b))^2

Applying the property:


((r_1)/(r_2))^2=(9)/(16)

Now we take the square root to both sides:


(r_1)/(r_2)=\sqrt[]{(9)/(16)}

Solving:


(r_1)/(r_2)=(3)/(4)

Therefore, the radius is at a proportion of 3 to 4.

User Ninesalt
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