- 1 - Polynomial... or NOT?! Recognizing Polynomials, the degree and some Terminology
- 2 - Symmetry - A Quick Discussion for Testing if a Polynomial is Even / Odd
- 3 - Adding and Subtracting Polynomials
- 4 - Polynomials: Adding, Subtracting, Multiplying and Simplifying - Example 1
- 5 - Polynomials: Adding, Subtracting, Multiplying and Simplifying - Example 2
- 6 - Polynomials: Adding, Subtracting, Multiplying and Simplifying - Example 3
- 7 - Multiplying Polynomials - Slightly Harder Examples #1
- 8 - Multiplying Polynomials - Slightly Harder Examples #2
- 9 - Multiplying Polynomials - Slightly Harder Examples #3
- 10 - Multiplying Polynomials - Slightly Harder Examples # 4 - Cubing Binomials
- 11 - Multiplying Polynomials - Slightly Harder Examples # 5 - Cubing Binomials
- 12 - Multiplying Polynomials - Slightly Harder Examples #6
- 13 - Long Division of Polynomials
- 14 - Long Division of Polynomials - A slightly harder example
- 15 - Synthetic Division
- 16 - Synthetic Division - Example 2
- 17 - The Remainder Theorem - Example 1
- 18 - The Remainder Theorem - Example 2
- 19 - Factoring Trinomials (A quadratic Trinomial) by Trial and Error
- 20 - Factoring Trinomials by Trial and Error - Ex 2
- 21 - Factoring Trinomials: Factor by Grouping - ex 1
- 22 - Factoring Trinomials: Factor by Grouping - ex 2
- 23 - Factoring Trinomials : Factor by Grouping - ex 3
- 24 - Factoring Perfect Square Trinomials - Ex1
- 25 - Factoring Perfect Square Trinomials - Ex 2
- 26 - Factoring Perfect Square Trinomials - Ex3
- 27 - Factoring the Difference of Two Squares - Ex 1
- 28 - Factoring the Difference of Two Squares - Ex 2
- 29 - Factoring the Difference of Two Squares - Ex 3
- 30 - Factoring Sums and Differences of Cubes
- 31 - Factoring Sums and Differences of Cubes - Ex 3
- 32 - Factoring Using the Great Common Factor, GCF - Example 1
- 33 - Factoring Using the Great Common Factor, GCF - Example 2 - Factoring Out Binomia
- 34 - Finding all the Zeros of a Polynomial - Example 1
- 35 - Finding all the Zeros of a Polynomial - Example 2
- 36 - Finding all the Zeros of a Polynomial - Example 3
- 37 - Finding the Formula for a Polynomial Given: Zeros/Roots, Degree, and One Point
- 38 - Finding the Formula for a Polynomial Given: Zeros/Roots, Degree, and One Point
- 39 - Finding the Formula for a Polynomial Given: Zeros/Roots, Degree, and One Point
- 40 - Rational Roots Test / Theorem
- 41 - Descartes Rule of Signs
- 42 - The Conjugate Pair Theorem - Example 1

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- Polynomials
- Long Division of Polynomials - A slightly harder example