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Two cubes have their volumes in the ratio 1:64. Find the ratio of their surface areas.

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Answer:

1:16

Step by Step Explanation:

1. Let a and x be the sides of two cubes. We know that the volume of a cube is equal to (side)³.
2. The ratio of the volumes of two cubes is equal to 1:64. This means:
   a³:x³ = 1: 64
   => a:x = 1:4
3. The surface of a cube is equal to 6 x (side)².
   From step 2 we have the ratio of the sides of two cubes equal to 1:4, the ratio of their surfaces will be equal to:
   6a² = 6x²
   => a² = x²
4. Since a:x = 1:4
   We can say that a²:x² will be equal to 1:16. This means that the ratio of their surface areas willl be equal to 1:16.

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