Tutorial 6: Volume of Solids of Revolution
Tutorial problems covering volume calculations using disk, washer, and shell methods.
Sections
Disk Method (Problems 1-4)
- Revolution about x-axis
- Revolution about y-axis
- Single function revolution
Washer Method (Problems 5-8)
- Region between two curves
- Creating holes in solids
- Choosing inner and outer radii
Shell Method & Mixed Problems (Problems 9-12)
- Cylindrical shells
- Choosing appropriate method
- Complex regions
Method Selection Guide
Disk Method:
- $V = \pi \int_a^b [f(x)]^2,dx$ (revolve about x-axis)
- $V = \pi \int_c^d [g(y)]^2,dy$ (revolve about y-axis)
Washer Method:
- $V = \pi \int_a^b ([R(x)]^2 - [r(x)]^2),dx$
Shell Method:
- $V = 2\pi \int_a^b x \cdot f(x),dx$ (vertical shells, revolve about y-axis)
- $V = 2\pi \int_c^d y \cdot g(y),dy$ (horizontal shells, revolve about x-axis)
Problem-Solving Approach
- Sketch the region
- Identify axis of revolution
- Choose method (disk/washer vs shell)
- Determine limits of integration
- Set up and evaluate integral