Class assignments and homework
https://classroom.google.com/
To join our google classroom for PreCalculus: Click the link above, then click the PLUS sign (+) in the upper right hand corner of the screen to add the correct class code below for your student. By joining Classroom, you will be able to see all daily assignments, due dates, links, pdfs, etc. for PreCalculus.
Google classroom codes:
1st Period - vudcggm
3rd Period - yt6ien2
Unit 1
An Introduction to Functional Analysis – Part I
1 Review graphs of constant, linear, absolute value, quadratic, and radical functions as shifts, reflections and/or dilations of their basic functions.
2 Numerically understand shifts, reflections, and/or stretches of graphs of functions and graph piecewise defined functions.
3 Graphically understand what domain and range values of a function represent graphically and analytically.
4 Interpret graphs of functions identifying intervals of increasing, decreasing, and constant function values as well as comparing the function to F(x) = 0.
5 Interpret graphs of functions comparing two functions with one another.
Quiz #1 (completed as a review)
6 Determine domain and range of a function graphically and analytically.
7 Perform operations on functions, including the composition of functions numerically, graphically and analytically.
8 Understand what it means for a function to be discontinuous and classify discontinuities as removable (point) or non-removable (jump or infinite).
Quiz #2 (completed as a review)
Test #1: Unit #1 – Introduction to Functional Analysis
An Introduction to Functional Analysis – Part 2
9 Classify functions as even, odd, or neither numerically, graphically and analytically.
10 Determine if a function is a one-to-one function or not. If a function is a one-to-one function, find the inverse of a function numerically, graphically and analytically.
Quiz #3 (completed as a review)
Test #2: Unit #1 – Introduction to Functional Analysis
Unit 2
Analysis of Polynomial Functions with Real Roots
1 Solve polynomial equations by factoring and make connections between the solutions and the graph of the function.
2 Solve polynomial inequalities by the sign chart method.
3 Review polynomial synthetic division and learn and apply the Factor and Remainder Theorems for polynomial functions.
4 Understand the graphical connection between the factors of a function and the zeros of the graph, including the multiplicity of those zeros.
Quiz #4 (completed as a review)
Test #3: Unit #2 – Analysis of Polynomial Functions with Real Roots
UNIT 3
Rational Functions
Day # Lesson Objectives Note Handouts/Assignments
1 solve rational equations and inequalities note pages 280-283, Day #1 HW handout
2 discover graphical and analytical connections
including restricted values, domain, and intercepts
for rational functions note pages 286-289, Day #2 HW handout
3 discover properties of rational functions analytically
including point discontinuities and vertical asymptotes note pages 292-295, Day #3 HW handout
4 determine equations of horizontal and slant asymptotes
of rational functions note pages 300-304, Day #4 HW handout
5 develop graphs of rational functions note pages 310-312. Day #5 HW handout
6 understand the numerical behavior of rational
functions at discontinuities note pages 317-321, Day #6 HW handout
7 and 8 Review for test
9 Unit #4 TEST 2/3 and 2/6
UNIT 5
Exponential and Logarithmic Functions
Test: Thursday, April 11th
UNIT 6
Intro to Trigonometric Functions
An Introduction to Functional Analysis – Part I
1 Review graphs of constant, linear, absolute value, quadratic, and radical functions as shifts, reflections and/or dilations of their basic functions.
2 Numerically understand shifts, reflections, and/or stretches of graphs of functions and graph piecewise defined functions.
3 Graphically understand what domain and range values of a function represent graphically and analytically.
4 Interpret graphs of functions identifying intervals of increasing, decreasing, and constant function values as well as comparing the function to F(x) = 0.
5 Interpret graphs of functions comparing two functions with one another.
Quiz #1 (completed as a review)
6 Determine domain and range of a function graphically and analytically.
7 Perform operations on functions, including the composition of functions numerically, graphically and analytically.
8 Understand what it means for a function to be discontinuous and classify discontinuities as removable (point) or non-removable (jump or infinite).
Quiz #2 (completed as a review)
Test #1: Unit #1 – Introduction to Functional Analysis
An Introduction to Functional Analysis – Part 2
9 Classify functions as even, odd, or neither numerically, graphically and analytically.
10 Determine if a function is a one-to-one function or not. If a function is a one-to-one function, find the inverse of a function numerically, graphically and analytically.
Quiz #3 (completed as a review)
Test #2: Unit #1 – Introduction to Functional Analysis
Unit 2
Analysis of Polynomial Functions with Real Roots
1 Solve polynomial equations by factoring and make connections between the solutions and the graph of the function.
2 Solve polynomial inequalities by the sign chart method.
3 Review polynomial synthetic division and learn and apply the Factor and Remainder Theorems for polynomial functions.
4 Understand the graphical connection between the factors of a function and the zeros of the graph, including the multiplicity of those zeros.
Quiz #4 (completed as a review)
Test #3: Unit #2 – Analysis of Polynomial Functions with Real Roots
UNIT 3
Rational Functions
Day # Lesson Objectives Note Handouts/Assignments
1 solve rational equations and inequalities note pages 280-283, Day #1 HW handout
2 discover graphical and analytical connections
including restricted values, domain, and intercepts
for rational functions note pages 286-289, Day #2 HW handout
3 discover properties of rational functions analytically
including point discontinuities and vertical asymptotes note pages 292-295, Day #3 HW handout
4 determine equations of horizontal and slant asymptotes
of rational functions note pages 300-304, Day #4 HW handout
5 develop graphs of rational functions note pages 310-312. Day #5 HW handout
6 understand the numerical behavior of rational
functions at discontinuities note pages 317-321, Day #6 HW handout
7 and 8 Review for test
9 Unit #4 TEST 2/3 and 2/6
UNIT 5
Exponential and Logarithmic Functions
Test: Thursday, April 11th
UNIT 6
Intro to Trigonometric Functions