If the scale factor of two similar solids is 3 : 14, what is the ratio of their corresponding areas? What is the ratio of their corresponding volumes?
(1 point)
Responses
The ratio of their corresponding areas is 27 : 2,744.
The ratio of their corresponding volumes is 9 : 196.
The ratio of their corresponding areas is 27 : 2,744. The ratio of their corresponding volumes is 9 : 196.
The ratio of their corresponding areas is 9 : 196.
The ratio of their corresponding volumes is 27 : 2,744.
The ratio of their corresponding areas is 9 : 196. The ratio of their corresponding volumes is 27 : 2,744.
The ratio of their corresponding areas is 6 : 28.
The ratio of their corresponding volumes is 9 : 42.
The ratio of their corresponding areas is 6 : 28. The ratio of their corresponding volumes is 9 : 42.
The ratio of their corresponding areas is 3 : 196.
The ratio of their corresponding volumes is 3 : 2,744.
The ratio of their corresponding areas is 3 : 196. The ratio of their corresponding volumes is 3 : 2,744.
The correct answer is:
The ratio of their corresponding areas is 9 : 196.
The ratio of their corresponding volumes is 27 : 2,744.