Created on: May 11, 2010

Website Address: https://library.curriki.org/oer/Radicals-and-Other-Topics-45497

TABLE OF CONTENTS

- Solving Equations
- Linear Equations
- Linear Forms
- Linear Inequalities
- Linear Systems
- Exponents
- Polynomials
- Quadratic Equations
- Using Models
- Radicals and Other Topics
- Statistics
- Rational Functions

- Asymptotes of Rational Functions
- Another Rational Function Graph Example
- A Third Example of Graphing a Rational Function
- Polynomial Division

- Graphs of Quadratic Functions
- Solving Quadratic Equations by Graphing
- Solving Quadratic Equations by Square Roots
- Solving Quadratic Equations by Completing the Square
- Using the Quadratic Formula
- Proof of Quadratic Formula
- Discriminate of Quadratic Equations
- Khan Academy Vision and Social Return
- Linear, Quadratic, and Exponential Models

- Radical Expressions with Higher Roots
- More Simplifying Radical Expressions
- How to Rationalize a Denominator
- Extraneous Solutions to Radical Equations
- Radical Equation Examples
- More Involved Radical Equation Example
- Pythagorean Theorem
- Distance Formula
- Midpoint Formula
- Visual Pythagorean Theorem Proof

IN COLLECTION

This unit discusses radicals and the Pythagorean Formula.

This video explores radical expressions with higher degree roots.

This video explores more techniques for simplifying radical expressions.

This video explains the important technique of rationalizing the denominator

This video explains how to deal with extraneous solutions to a radical equation.

This video combines the techniques just covered on a variety of radical equations.

This video extends the techniques just developed to apply to more complicated radical equations.

This video explores examples of right triangles, then uses a calculator to compute the Pythagorian Theorem.

This video applies the Pythagorean Theorem to the distance between two points.

This lesson applies the Pythagorean Theorem to the midpoint of a line segment.

This video provides a compelling visual proof to the Pythagorean Theorem