the ratio of the radii of two circles is 5.6 find the ratio of their circumferences also find the ratio of their areas. About the author Daisy
ANSWER: Given: Ratio of radii of 2 circles = 5 : 6 To Find: Ratio of their circumferences Ratio of their areas Solution: Let the radii of the 2 circles be R1 and R2. Similarly, circumferences and areas of the 2 circles be C1, C2, A1 and A2 respectively. We are given that, ⇒ Ratio of radii = 5:6 That means, ⇒ R1 : R2 = 5 : 6 ⇒ R1/R2 = 5/6 We know that, ⇒ Circumference of circle = 2πr, and ⇒ Area of circle = πr² So, ⇒ Ratio of circumferences of the 2 circles: ⇒ 2πR1 / 2πR2 ⇒ R1 / R2 ⇒ 5/6 ⇒ Ratio of circumferences of the 2 circles = 5 : 6 Now, ⇒ Ratio of areas of the 2 circles: ⇒ π(R1)^2 / π(R2)^2 ⇒ (R1)^2 / (R2)^2 ⇒ (R1 / R2)^2 ⇒ (5/6)^2 ⇒ 25/36 ⇒ Ratio of areas of the 2 circles = 25 : 36 Reply
ANSWER:
Given:
To Find:
Solution:
Let the radii of the 2 circles be R1 and R2.
Similarly, circumferences and areas of the 2 circles be C1, C2, A1 and A2 respectively.
We are given that,
⇒ Ratio of radii = 5:6
That means,
⇒ R1 : R2 = 5 : 6
⇒ R1/R2 = 5/6
We know that,
⇒ Circumference of circle = 2πr, and
⇒ Area of circle = πr²
So,
⇒ Ratio of circumferences of the 2 circles:
⇒ 2πR1 / 2πR2
⇒ R1 / R2
⇒ 5/6
⇒ Ratio of circumferences of the 2 circles = 5 : 6
Now,
⇒ Ratio of areas of the 2 circles:
⇒ π(R1)^2 / π(R2)^2
⇒ (R1)^2 / (R2)^2
⇒ (R1 / R2)^2
⇒ (5/6)^2
⇒ 25/36
⇒ Ratio of areas of the 2 circles = 25 : 36
Answer:
25 : 36
Step-by-step explanation:
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