To calculate the volume of Lucy's ice sculpture, we need to first identify the shape of the solid based on the given dimensions (5 ft, 8 ft, 2 ft, 2 ft, 2 ft, 4 ft, and 6 ft).
Since no specific shape is described, let's assume these dimensions can be interpreted in a common way. For example:
- Rectangular Prism (Cuboid): If we assume the sculpture is a simple rectangular prism, we can combine dimensions to find the volume.
Let's group the dimensions:
- Length (L) = 8 ft
- Width (W) = 6 ft
- Height (H) = 5 ft
To find the volume (V) of a rectangular prism:
\[ V = L \times W \times H \] Substituting in the values:
\[ V = 8 \text{ ft} \times 6 \text{ ft} \times 5 \text{ ft} \]
Calculating the volume:
\[ V = 8 \times 6 = 48 \text{ ft}^2 \] \[ V = 48 \times 5 = 240 \text{ ft}^3 \]
Therefore, the volume of the solid is:
\[ \boxed{240 \text{ ft}^3} \]
If the solid is composed of more complex shapes, please provide clarification, and we can calculate the volume accordingly.