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The volume of any solid is proportional to each of its three dimensions.

So if one dimension is doubled, the volume increases by the factor of 21 = 2 .

And if two dimensions are doubled, the volume increases by the factor of 22 = 4 .

And if each dimension is doubled, the volume increases by the factor of 23 = 8.

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Q: What are the changes that occur in the volume when the side lengths of the base of a rectangular prism are doubled?

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The volume would increase by a factor of 23 = 8

The volume is doubled.

The volume is quadrupled.

If length and width are doubled than the volume should multiply by 8.

To compute it, you have to know the lengths of the sides.

Because the volume of a rectangular prism is the product of its length, width, and height, if these linear measures are doubled, the volume will increase by a factor of 23 = 8.

well...if it's doubled then its doubled (just treat it the same)

The volume becomes 12 times as large.

It is quadrupled.

if length and width are doubled then the volume should mulitiply by 8

If one dimension of a 3-dimensional shape is doubled, the volume increases by 21 = 2. If two dimensions of a 3-dimensional shape are doubled, the volume increases by 22 = 4. If all three dimensions of a 3-D shape are doubled, the volume increases by 23 = 8.

It is not possible to answer the question. The volume of a rectangular block requires the measure of three lengths - not 2 as given in the question.

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