Created on: August 6, 2010

Website Address: https://library.curriki.org/oer/Solids-of-Revolution

TABLE OF CONTENTS

- Limits
- Derivatives
- The Chain Rule
- Derivatives of Special Functions
- Implicit Differentiation
- Minima and Maxima
- Optimization Problems
- Indefinite Integrals
- Definite Integrals
- Solids of Revolution
- Sequences and Series
- Polynomial Approximations
- Partial derivatives
- AP Calculus BC
- Partial Derivatives
- Double Integrals
- Line Integrals I
- Vectors
- Line Integrals II
- Green's Theorem
- L'Hospital's Rule

- Proof: d/dx(x^n)
- Proof: d/dx(sqrt(x))
- Proof: d/dx(ln x) = 1/x
- Proof: d/dx(e^x) = e^x
- Proofs of Derivatives of Ln(x) and e^x
- Calculus: Derivative of x^(x^x)
- Extreme Derivative Word Problem (advanced)

- Calculus: Derivatives 1 (new HD version)
- Calculus: Derivatives 2 (new HD version)
- Calculus: Derivatives 2.5 (new HD version)
- Calculus: Derivatives 1
- Calculus: Derivatives 2
- Calculus: Derivatives 3

The video begins a discussion of solids of revolution by a simple example.

This video presents a second simple case of a solid of revolution.

This video presents the rotation of a circle around the axis.

This video presents the rotation of the area between two curves around an axis.

This video shopws the rotation of a curve around the y axis.

This video presents another technique for solving rotation around the y axis.

This video solves a more difficult problem of a segment of curve with some boundaries in rotation.

This video completes the rotation problem started in the previous video.