Question

25.
If the scale factor of two similar solids is 3 : 16, what is the ratio of their corresponding areas? What is the ratio of their corresponding volumes? (1 point)

The ratio of their corresponding areas is 3 : 256.
The ratio of their corresponding volumes is 3 : 4,096.
The ratio of their corresponding areas is 27 : 4,096.
The ratio of their corresponding volumes is 9 : 256.
The ratio of their corresponding areas is 6 : 32.
The ratio of their corresponding volumes is 9 : 48.
The ratio of their corresponding areas is 9 : 256.
The ratio of their corr

Answer 1

is the scale factor is a:b, then areas would be a^2:b^2 and volumes would be a^3:b^3

Answer 2

none of the first 3 options you posted matching, and the fourth option got clipped off !

Answer 3

The ratio of their corresponding areas is 3 : 256.
The ratio of their corresponding volumes is 3 : 4,096.
The ratio of their corresponding areas is 27 : 4,096.
The ratio of their corresponding volumes is 9 : 256.
The ratio of their corresponding areas is 6 : 32.
The ratio of their corresponding volumes is 9 : 48.
The ratio of their corresponding areas is 9 : 256.
The ratio of their corresponding volumes is 27 : 4,096.

Answer 4

thnks :) check the last one,

scale factor is, 3:16
area , 3^2 : 16^2 = 9 : 256
volume, 3^3 : 16^3 = 27 : 4096

Answer 5

The ratio of their corresponding volumes is 27 : 4,096. is right
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