Factoring 1 covers the definition of factoring and introduces GCF factoring, including rational exponents and grouping to form a binomial common factor.

Factoring 2 reviews trinomials both with and without leading coefficient 1, as well as perfect square trinomials

Factoring 3 covers difference of squares and also discusses common difficulties, such as recognizing when an expression is prime.
 

Additional Resources:

Geogebra Practice: Factoring Trinomials (Slide 23)

Geogebra Practice: Copy of Factoring Trinomials (Slide 37)

Geogebra Practice: Factoring a Difference of Two Squares and Perfect Squares (Slide 16)

Factoring 4 introduces factoring a sum and difference of squares, again reinforcing the difference between that and (a ∓  b)³.
 

Additional Resources:

Geogebra Practice: Factoring Sum/Difference of Cubes (Slide 27)

Factoring 5 covers factoring a cubic expression by using a combination of trial and error and long division.

Additional Resources:

Geogebra Practice: Factors, Remainders and Cubic Graphs (Slide 27)

Lesson 1 explains how to simplify a single rational expression, and gives the rationale for stating restrictions on a rational expression.

Additional Resources:

Geogebra Practice: Sorting Rational and Non-rational Expressions (Slide 22)

Geogebra Practice: Simplifying Rational Expressions and Stating Restrictions (Slide 81)

This lesson covers adding and subtracting rational expressions in many different situations. It is intended to give a preview of partial fractions.

In addition to covering multiplication and division of rational expressions, some background is given as to why the usual division algorithm is used.

This lesson gives a visual definition of slope of a line, as well as a formula to calculate slope. GeoGebra is used to demonstrate the concept, to provide the student with practice, and to encourage the opportunity to explore independently.

Additional Resources:

GeoGebra: Demonstrating slope and its properties (as per slide 1)

Practice GeoGebras related to slope (as per slide 2)

Additional Resources:

GeoGebra: Demonstrating slopes of parallel lines (as per slide 1)

GeoGebra: Demonstrating slopes of perpendicular lines (as per slide 2)

GeoGebra: An Interactive investigation of  slopes of perpendicular lines (as per slide 3)

This lesson outlines a procedure for finding the standard algebraic representation of a linear function given various types of information about the line. Included are several worked out examples which progress from simple (given slope and y intercept) to more complex (given 2 points, or the equation of perpendicular line and y intercept). GeoGebra is used to provide the student with practice and immediate feedback.

Addtional Resources:

GeoGebra: Unlimited practice finding equation of a line given slope and one point (as per slide 1)

GeoGebra: Unlimited practice finding equation of a line given two points (as per slide 2)

GeoGebra: Unlimited practice finding equation of a line involving parallel and perpendicular lines (as per slide 3)

Outlines procedures for transforming an equation to/from the standard form
y = ax + k and Ax + By + C = 0.

Graspable Math and GeoGebra are used to demonstrate the concept, and to provide the opportunity to explore independently.

Additional Resources:

Graspable Math: An  interactive example of how to convert from general form to slope-intercept form (as per slide 1)

Graspable Math: An interactive example of how to convert from slope-intercept form to general form (as per slide 2)

GeoGebra: Unlimited practice converting linear equation forms (as per slide 3)

Exponent Boot Camp 1 offers an intuitive explanation of the two rules with which most students are already familiar:

x^n . x^m = x^n+m and xⁿ ÷ x^m = x^n-m

Several examples result in fractional, zero, and negative exponents, all of which are more deeply examined in later lessons.

Exponent Boot Camp 2 re-examines the quotient property, this time in rational form, in order to illuminate the meaning of the zero exponent and the negative exponent.  Several examples result in rational exponents, which are more fully developed in a later lesson.

Exponent Boot Camp 3 is an intuitive explanation of the power of a power property (xⁿ)^m = x^nm .

Examples involve applying this along with several of the properties covered so far, as well as performing a change of base in order to enable the power of a power property.
 

Additional Resources:

GeoGebra: Infinite Practice on Simplifying Expressions with Exponents

GeoGebra: Infinite Practice on Simplifying Rational Expressions with Exponents

Additonal Resouces:

GeoGebra: Infinite Practice on Rational Exponents

The unit circle is used to develop the basic Pythagorean identity, which is then built upon to develop and simplify other trigonometric expressions. Examples include combinations of Pythagorean, quotient, and reciprocal identities.

This lesson steps out of the pure algebra of identities to do some numerical calculations. Exact values for the trigonometric ratios of various angles in the unit circle are found using the Pythagorean, quotient, and reciprocal identities.

In this lesson, the traditional form and procedure of a proof of a trigonometric identity is presented. The examples are fairly simple in this lesson, but subsequent lessons will delve into more complex ones.

Proving trigonometric identities typically involves fairly complex algebraic procedures, which are addressed in this lesson and the next one. In this lesson, examples include combining fractions and factoring.

This second lesson on the algebra of identities covers multiplying numerator and denominator by a conjugate.

Additional Resources: 

GeoGebra:  Proof of Sum Identities

The sum identities are used to develop the double angle identities for sin and cos, which are then used to develop the half angle identities.

This lesson demonstrates visually, as opposed to algebraically, the trigonometric relationships between angles such as θ and θ + π.

Additional Resources:

GeoGebra: Related Angles

Additional Resources:

GeoGebra: Infinite Practice Simplifying Radical Numbers

This lesson includes multiplication of monomial and binomial radicals, as well as special cases of squaring binomial radicals and the product of conjugates.

Additional Resources:

GeoGebra: Infinite Practice - Multiplying/Dividing Radicals (Slide 24)

Graspable Math Examples - Multiplying Radical Binomials (Slide 26)

GeoGebra: Infinite Practice - Squaring a Monomial Radical (Slide 39)

GeoGebra: Infinite Practice - Multiplication of Conjugates (Slide 56)

In this lesson, rationalization of both denominators and numerators is outlined, and some groundwork is laid for its use in finding limits. 

Additional Resources:

GeoGebra: Puzzle with Extra Practice

This VoiceThread lesson introduces the concept and definition of a limit, as well as how to use a table, graph, or substitution to evaluate a limit.

In this lesson the properties of limits (additive, multiplicative, etc.) are outlined and explained.

In this lesson, factoring is added to the list of possible methods for finding limits.

In this video lesson, rationalization of numerators or denominators is reviewed and demonstrated as another tool to evaluate limits.
 

This lesson covers the decomposition of a rational expression into expressions with distinct linear factors.

Additional Resources:

Geogebra: Unlimited Practice on Partial Fractions