4. A cylindrical hole was drilled through a cylinder. Find the volume. Give answer in terms of t. 5in units 3 in 15 in

Transcribed Image Text:

### Problem Statement **4. A cylindrical hole was drilled through a cylinder. Find the volume. Give answer in terms of \( \pi \).** ### Diagram Description The diagram illustrates a larger vertical cylinder with a smaller, concentric cylindrical hole drilled through it. The dimensions provided in the diagram are: - The radius of the larger cylinder: 3 inches - The radius of the hole (smaller cylinder): 1.5 inches - The height of both cylinders: 15 inches ### Solution To find the volume of the solid remaining after the hole is drilled, we need to calculate the volume of the larger cylinder and subtract the volume of the smaller cylinder (the hole). 1. **Volume of the larger cylinder** \[ V_{\text{larger}} = \pi \times (3 \text{ in})^2 \times 15 \text{ in} \] \[ V_{\text{larger}} = \pi \times 9 \text{ in}^2 \times 15 \text{ in} \] \[ V_{\text{larger}} = 135\pi \text{ in}^3 \] 2. **Volume of the smaller cylinder (the hole)** \[ V_{\text{smaller}} = \pi \times (1.5 \text{ in})^2 \times 15 \text{ in} \] \[ V_{\text{smaller}} = \pi \times 2.25 \text{ in}^2 \times 15 \text{ in} \] \[ V_{\text{smaller}} = 33.75\pi \text{ in}^3 \] 3. **Volume of the remaining solid** \[ V_{\text{remaining}} = V_{\text{larger}} - V_{\text{smaller}} \] \[ V_{\text{remaining}} = 135\pi \text{ in}^3 - 33.75\pi \text{ in}^3 \] \[ V_{\text{remaining}} = 101.25\pi \text{ in}^3 \] Therefore, the volume of the remaining solid is \( 101.25\pi \) cubic inches.