Date |
Sections |
Topics |
Prerequisite Skills |
Student Learning Outcomes
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Week 1
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Fundamentals
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- Basic mathematical symbols and terminology
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Students will be able to correctly identify the algebraic properties:
- Additive & Multiplicative identity
- Additive & Multiplicative inverse
- Commutative property
- Associative property
- Distributive property
Students will be able to correctly explain the algebraic properties of numbers and correctly apply these properties in procedural explanations of:
- Solving mathematical equations
- Simplifying/evaluating mathematical expressions
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Week 2
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Fundamentals
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Students will be able to add, subtract fractions:
- Common denominators and equivalent fractions
- Proper and improper fractions
- Simplify to lowest terms
Students will be able to multiply, and divide fractions:
- Proper and improper fractions
- Simplify to lowest terms
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Week 2
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Fundamentals
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Students will be able to:
- Identify factored vs non-factored forms of a polynomial
- Successfully factor binomials & trinomials and difference of squares into two binomial terms
- Factor out GCF
- Multiply and / or distribute to check their factors are correct
- Differentiate between factors and terms of a polynomial expression
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Week 3
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Module 0.3
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- Basic mathematical symbols and terminology
- Basic arithmetic skills
- Basic understanding of Order of Operations (Module 0.1)
- Basic understanding of factoring
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Review the following linear equation topics:
- Basic mathematical symbols and terminology
- solving linear equations in one variable
- finding a linear equation
- write and interpret a linear equation
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Week 3
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Module 0.4
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- Basic mathematical symbols and terminology
- Basic arithmetic skills
- Basic understanding of factoring
- Basic understanding of Solving Equations and Inequalities (Module 0.3)
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Week 3
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Module 0.4
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- Basic mathematical symbols and terminology
- Basic arithmetic skills
- Basic understanding of order of operations
- Basic understanding of factoring
- Basic understanding of solving Linear Equations (Module 0.4)
- Understanding of the Cartesian coordinate system
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Week 4
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Module 1.1
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- Solve systems of equations by graphing.
- Solve systems of equations by substitution.
- Solve systems of equations by elimination
- Identify inconsistent systems of equations containing two variables.
- Express the solution of a system of dependent equations containing two variables.
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Week 4
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Module 1.2
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- Solve systems of equations in three variables
- Identify inconsistent systems of equations containing three variables
- Express solutions of a system of dependent equations containing three variables
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Week 5
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Module 2.1
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- Determine whether a relation represents a function.
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Week 5
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Module 2.2
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- Basic understanding of Graphs (Module 0.4)
- Basic understanding of Functions (Module 2.1)
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- Find the value of a Functions
- Graph the functions listed in the library of functions.
- Determine whether a function is one-to-one.
- Use the vertical line test to identify functions.
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Week 5
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Module 2.2
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- Find the domain of a function defined by an equation.
- Graph piecewise-defined functions.
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Week 5
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Module 2.2
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- Find the range of a function defined by an equation.
- Graph piecewise-defined functions.
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Week 5
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Module 2.2
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- Basic understanding of Cartesian coordinate system (Module 0.4: Graphs)
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- Identify the basic toolkit functions
- Determine Domain and Range for the basic toolkit functions (Module 1.2)
- Graph the basic toolkit functions. (Module 0.4)
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Week 6
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Module 3.1
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- Basic understanding of power expressions.
- The student recalls the graphs and equations of Toolkit Functions, and their associated Domain and Range (Module 2.2).
- The student understands where the x-intercept and y-intercept are located given a graph.
- The student understands interval notation for Domain and Range (Module 2.2).
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- Identify power functions.
- Identify end behavior of power functions.
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Week 6
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Module 3.1
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- Basic understanding of a polynomial expression.
- The student recalls the graphs and equations of Toolkit Functions, and their associated Domain and Range (Module 2.2).
- The student understands where the x-intercept and y-intercept are located given a graph.
- The student understands interval notation for Domain and Range (Module 2.2).
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- Identify polynomial functions.
- Identify the degree and leading coefficients of polynomial functions.
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Week 6
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Module 3.2
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- Fundamentals of Polynomials (Module 2.1)
- The student understands the difference between a maximum and minimum.
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- Recognize characteristics of parabolas
- Understand how the graph of a parabola is related to its quadratic function
- Determine a quadratic function's minimum or maximum value
- Solve problems involving a quadratic function's minimum or maximum value
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Week 7
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Module 4.1
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- Basic understanding of multiplying and dividing fractions.
- Basic understanding of simplifying fractions by common factors.
- Basic understanding of Factoring Polynomials (Module 0.2)
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- Use long division to divide polynomials
- Use synthetic division to divide polynomials
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Week 7
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Module 4.2
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- Evaluate a polynomial using the Remainder Theorem
- Use the Factor Theorem to solve a polynomial equation
- Use the Rational Zero Theorem to find rational zeros
- Find zeros of a polynomial function
- Solve real-world applications of polynomial equations
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Week 8
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Module 5.1
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- The student understands that zero in the denominator of a fraction is undefined.
- Basic understanding of Polynomial Functions (Module 3.1)
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Week 8
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Module 5.2
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- The student understands that zero in the denominator of a fraction is undefined.
- The student recalls the graphs and equations of Toolkit Functions, and their associated Domain and Range (Module 2.2).
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- Solving applied problems involving Polynomial Functions. (Module 2.1)
- Use arrow notation.
- Solve applied problems involving rational functions.
- Find the Domain of rational functions.
- Identify vertical asymptotes.
- Identify horizontal asymptotes.
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Week 9
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Module 6.1
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- Recognize characteristics of graphs of polynomial functions
- Use factoring to find zeros of polynomial functions
- Identify zeros and their multiplicities
- Determine end behavior
- Understand the relationship between degree and turning points
- Graph polynomial functions
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Week 9
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Module 6.2
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- Identify and graph vertical asymptotes
- Identify and graph horizontal asymptotes
- Determine behavior of rational functions around vertical asymptotes
- Graph rational functions
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Week 10
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Module 7.1
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- Graph functions using vertical and horizontal shifts
- Graph functions using reflections about the x-axis and the y-axis
- Determine whether a function is even, odd, or neither from it's graph
- Graph functions using compressions and stretches
- Combine transformations
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Week 10
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Module 7.2
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Week 11
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Module 8.1
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- Combine functions using algebraic operations
- Create a new function by composition of functions
- Evaluate composite functions
- Find the domain of a composite function
- Decompose a composite function into its component functions
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Week 11
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Module 8.2
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- Verify inverse functions
- Determine the domain and range of an inverse function, and restrict the domain of a function to make it one-to-one
- Find or evaluate the inverse of a function
- Use the graph of a one-to-one function to graph its inverse function on the same axes
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Week 12
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Module 9.1
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- Understanding Order of Operations. (Module 0.1)
- Use the product rule for exponents.
- Use the quotient rule for exponents.
- Use the power rule for logarithms.
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Week 12
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Module 9.2
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- Evaluate exponential functions.
- Find the equation of an exponential function.
- Use compound interest formulas.
- Evaluate exponential functions with base e.
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Week 13
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Module 10.1
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- Rewriting from exponential form to logarithmic form and vice versa
- -y=b^x\equiv\log_b(y)=x
- Evaluate logarithms.
- Use common logarithms.
- Use natural logarithms.
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Week 13
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Module 10.2
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- Use the product rule for logarithms.
- Use the quotient rule for logarithms.
- Use the power rule for logarithms.
- Expand logarithmic expressions.
- Condense logarithmic expressions.
- Use the change-of-base formula for logarithms.
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Week 14
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Module 11
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- Solve direct variation problems
- Solve inverse variation problems
- Solve problems involving joint variation
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