The side of a given cube is n units in length. If this length is tripled, how would the volume of the new cube compare to the volume of the original cube?

Question

asked Feb 11, 2022 152k views

1 Answer

Dccollie · Answer 1 · 2022-02-16T10:19:01+0000

Answer:

Option 4

Explanation:

Points to remember to solve this question,

1). Dimension scale factor of the cube =
$\frac{\text{Dimension of the image}}{\text{Dimension of the original}}$

2). Volume scale factor the cube =
$\frac{\text{Volume of the image}}{\text{Volume of the original}}$

3). Volume scale factor = (Dimension scale factor)³

Since, length of the cube = n units

Length of the cube after dilation = 3n units

Dimension scale factor =
(3n)/(n)=3

Volume scale factor = (Dimension scale factor)³

= (3)³

= 27

Since, Volume scale factor the cube =
$\frac{\text{Volume of the image}}{\text{Volume of the original}}$

$\frac{\text{Volume of the image}}{\text{Volume of the original}}=27$

Volume of the image cube = 27(Volume of the original cube)

Therefore, Option 4 will be the answer.