Question

To find the scale factor between the two similar cubes based on their volumes, we can use the relationship between the volumes of similar shapes. The volume of a similar shape scales with the cube of the linear dimension scale factor \( k \).

1. **Finding the scale factor from the volumes**:

The formula relating the volume scale factor \( k^3 \) to the volumes \( V_1 \) and \( V_2 \) of two similar objects is:
\[
k^3 = \frac{V_2}{V_1}
\]

Given:
- Volume of the smaller cube, \( V_1 = 512 \, \text{m}^3 \)
- Volume of the larger cube, \( V_2 = 1728 \, \text{m}^3 \)

Now, substituting in the values:
\[
k^3 = \frac{1728}{512}
\]

2. **Calculating the fraction**:
\[
k^3 = \frac{1728 \div 512}{512 \div 512} = \frac{3.375}{1} = 3.375
\]

3. **Finding \( k \)**:
To find \( k \), take the cube root of \( k^3 \):
\[
k = \sqrt[3]{\frac{1728}{512}} = \sqrt[3]{\frac{1728 \div 512}{512 \div 512}} = \sqrt[3]{3.375}
\]
\[
k = \frac{\sqrt[3]{1728}}{\sqrt[3]{512}} = \frac{12}{8} = \frac{3}{2}
\]

Therefore, the scale factor from the smaller cube to the larger cube is:
\[
\boxed{\frac{3}{2}}
\]