Pg20 #7 (Chapter 1) -Dilation and Translation of function graphs.
Pg13 #23-26, (Chapter 1)- Types of Functions
Pg 13 #29 (Chapter 1) P246 #T14 (Chapter 5)- Types of Functions
Pg19 figure 1-3g (Chapter 1)- Dilation and Translation of Function Graphs
Pg20 #1-6 part c only (Ch1)-Functions and Mathematical Models
Pg20 #5 (Chapter 1)-Functions and Mathematical Models
Pg 31 #7 (Chapter 1)- Composition of Functions
Pg 41 #13 (Chapter 1)- Inverse of a Function
Pg57 #T9 (Chapter 1)- Chapter Review and Test of Graph Transformations
Pg65 #18 (Chapter 2)- Measurement of Rotation
Pg 72. #7 (Chapter 2)- Periodic Functions and Right Triangle Problems
Pg 84 #13 (Chapter 2)- Periodic Functions and Right Triangle Problems
Pg 92 T 18-20 (chapter 2)- Periodic Functions and Right Triangle Problems
Pg 91 T6 (Chapter 2) – Chapter Review and Test of Sketching Reasonable Graphs
Pg.89 #R5:b.(chapter 2)- Chapter Review and Test of Application Problems
Pg91 #T1 (Chapter 2)- Chapter Review and Test of Sketching Angles w/ a Terminal Side
pg91 #T12 (Chapter 2)- Chapter Review and Test of Inverse Functions
Pg91 #T13 (Chapter 2)- Chapter Review and Test of Calculating Triangle Lengths
Pg92 #T18-T21 (Chapter 2) – Periodic Functions and Right Triangle Problems
Pg. 143 #1 (Chapter 3)- Rotary Motion
Pg. 143 #9 (Chapter 3)- Rotary Motion
Pg. 147 #17 (Chapter 3)- Rotary Motion
Pg153 #T4 (Chapter 3)- Chapter Review and Test of Radian/Degree Conversions
Pg153 #T6 (Chapter 3)- Chapter Review and Test of Sinusoidal Functions
Pg 154 #T19-23 (Chapter 3)-Chapter Review and Test of Rotary Motion
Pg. 161 #2 (Chapter 4)- Pythagorean, Reciprocal, and Quotient Properties
Pg. 161 #4 (Chapter 4)-Pythagorean, Reciprocal, and Quotient Properties
Pg. 167 #3 (Chapter 4)- Identities and Algebraic Transformation of Expressions
Pg. 167 #7 (Chapter 4)- Identities and Algebraic Transformation of Expressions
Pg167 #11 (Chapter 4)- Identities and Algebraic Transformation of Expressions
Pg168 #41 (Chapter 4)- Trigonometric Function Properties, Identities, and Parametric Functions
Pg180 #5 (Chapter 4)- Trigonometric Function Properties, Identities, and Parametric Functions
Pg194 #T10 (Chapter 4)- Trigonometric Function Properties, Identities, and Parametric
Functions
P194 #T15 (Chapter 4)- Trigonometric Function Properties, Identities, and Parametric Functions
P194 #T18 (Chapter 4)- Trigonometric Function Properties, Identities, and Parametric Functions
Pg 204 #22 (Chapter 5)- Properties of Combined Sinusoids
Pg211 #1 (Chapter 5)- Other Composite Argument Properties
Pg 212 #11 (Chapter 5)- Properties of Combined Sinusoids
Pg 211 #11 (Chapter 5)- isn’t this the same? Lol  Properties of Combined Sinusoids
Pg 213 #33 (Chapter 5)- Properties of Combined Sinusoids
Pg 220 #3 (Chapter 5)- Properties of Combined Sinusoids
Pg 228 #18 (Chapter 5)- Properties of Combined Sinusoids
P236 #1 (Chapter 5)- Properties of Combined Sinusoids
P241 #R2:c. (Chapter 5)-Chapter Review and Test of Trigonometric Expression
Myrissa Clark
*Extra credit – Go through this list and put a topic beside each problem shown here. Be as
specific as possible by using the title of the section, or the table of contents. The first 5 people
to do this well and email it to me at ruth.conway@k12.sd.us will receive 3 bonus points! I did
the first one for you.
Pg20 #7 (Chapter 1) -Dilation and Translation of function graphs.
Pg13 #23-26, (Chapter 1) – Types of Functions
Pg 13 #29 (Chapter 1) – Types of Functions
Pg19 figure 1-3g (Chapter 1) – Dilations and Translations of a Function Graph
Pg20 #1-6 part c only (Ch1) – Dilation and Translations of a Function Graph
Pg20 #5 (Chapter 1) – Dilations and Translations of a Function Graph
Pg 31 #7 (Chapter 1) – Composite Functions (from tables)
Pg 41 #13 (Chapter 1) – Invertability and Domain of an Inverse Relation
Pg57 #T9 (Chapter 1) – Dilations and Translations of a Function Graph
Pg65 #18 (Chapter 2) – Measurement of Rotations (Standard Position of an Angle, Reference
Angle)
Pg 72. #7 (Chapter 2) – Sine and Cosine Functions for Any Angle
Pg 84 #13 (Chapter 2) – Right Triangle Problems
Pg 92 T 18-21 (chapter 2) – Right Triangle Problems, Periodicity of Sine and Cosine
Pg 91 T6 (Chapter 2) – Sine and Cosine Functions
Pg.89 #5Rb(chapter 2) – Right Triangle Problems
Pg91 #T1 (Chapter 2) – Values of the Six Trigonometric Functions, Measurement of Rotation
pg91 #T12 (Chapter 2) – Inverse Trigonometric Functions
Pg91 #T13 (Chapter 2) – Right Triangle Problems
Pg. 143 #1 (Chapter 3) – Analysis of a Single Rotating Object
Pg. 145 #9 (Chapter 3) –Connected Rotating Objects
Pg. 147 #17 (Chapter 3) – Connected Rotating Objects
Pg153 #T4 (Chapter 3) – Radian-Degree Conversion (112)
Pg153 #T6 (Chapter 3) – Sinusoids: Amplitude, Period, and Cycle (95)
Pg 154 #T19-23 (Chapter 3) – Rotary Motion, Analysis of Single/Connected Rotating Objects
(141)
Pg. 161 #2 (Chapter 4) - The Three Pythagorean Properties
Pg. 161 #4 (Chapter 4) – Pythagorean, Reciprocal, and Quotient Properties
Pg. 167 #3 (Chapter 4) – Identities and Algebraic Transformation of Expressions (162)
Pg. 167 #7 (Chapter 4) – Transforming Trigononometric Expressions and Proving Identities
Pg167 #11 (Chapter 4) – Transforming Trigononometric Expressions and Proving Identities
Pg168 #41 (Chapter 4) – Transforming Trigononometric Expressions and Proving Identities
Pg180 #5 (Chapter 4) – Parametric Functions, Pythagorean Properties to Eliminate Parameter
Pg194 #T10 (Chapter 4) – Identities and Algebraic Transformation of Expressions
P194 #T15 (Chapter 4) – The Composite Function and its Inverse Function
P194 #T18 (Chapter 4) – Parametric Functions
Pg 204 #22 (Chapter 5) – Composite Argument and Linear Combination Properties
Pg211 #1 (Chapter 5) – The Composite Argument Property for Sin (A-B) and Sin (A+B)
Pg 212 #11 (Chapter 5) – Cofunction Properties: Functions of (90°-ϴ) or (𝜋/2 – x)
Pg 213 #33 (Chapter 5) – Composite Argument Properties for Sin (A-B) and sin (A+B)
Pg 220 #3 (Chapter 5) – Composition of Ordinates and Harmonic Analysis
Pg 228 #18 (Chapter 5) – The Sum and Product Properties
P236 #1 (Chapter 5) – Double Argument Properties
P241 #R2c (Chapter 5) – Sum of Two Sinusoids With Unequal Periods
P246 #T14 (Chapter 5) – Sum of Two Sinusoids With Unequal Periods
Yellow Wksht #3 (Chapter 5)
Yellow Wksht #12 (Chapter 5) – Double Argument Properties
Yellow Wksht #27 (Chapter 5) – Half Argument Properties
Sarah Johnson
Pg20 #7 (Chapter 1) -Dilation and Translation of function graphs.
Pg13 #23-26, (Chapter 1) - Determining a functions classification
Pg 13 #29 (Chapter 1) - making a reasonable graph from a story
Pg19 figure 1-3g (Chapter 1) - transformations of functions
Pg20 #1-6 part c only (Ch1) - substituting functions and finding new dilation and translations
Pg20 #5 (Chapter 1) - transformation of functions
Pg 31 #7 (Chapter 1) - composite function numerically
Pg 41 #13 (Chapter 1) - inverse relation
Pg57 #T9 (Chapter 1) - transforming functions
Pg65 #18 (Chapter 2) - reference angles
Pg 72. #7 (Chapter 2) - finding unknown angles
Pg 84 #13 (Chapter 2) - sin/cos relation with triangles
Pg 92 T 18-20 (chapter 2) - finding unknown angles
Pg 91 T6 (Chapter 2) - sketching graphs from story problem
Pg.89 #5Rb(chapter 2) - sin/cos of a triangle
Pg91 #T1 (Chapter 2) - reference angle
pg91 #T12 (Chapter 2) - reciprocal trigonometric functions
Pg91 #T13 (Chapter 2) - inverse trigonometric functions
Pg92 #T18-T21 (Chapter 2) - using triangle properties in story problem, T21 = function
transformations
Pg. 143 #1 (Chapter 3) - rotary motion, linear/angular velocity
Pg. 143 #9 (Chapter 3) - rotary motion, linear/angular velocity
Pg. 147 #17 (Chapter 3) - rotary motion
Pg153 #T4 (Chapter 3) - radian-degree conversion
Pg153 #T6 (Chapter 3) - identifying characteristics of a function
Pg 154 #T19-23 (Chapter 3) - rotary motion
Pg. 161 #2 (Chapter 4) - proving identities
Pg. 161 #4 (Chapter 4) - proving identities
Pg. 167 #3 (Chapter 4) - transforming trigonometric expressions
Pg. 167 #7 (Chapter 4) - transforming trigonometric expressions
Pg167 #11 (Chapter 4) - transforming trigonometric expressions
Pg168 #41 (Chapter 4) - proving identities
Pg180 #5 (Chapter 4) - parametric functions
Pg194 #T10 (Chapter 4) - proving identities
P194 #T15 (Chapter 4) - general arc(cos/sin/tan) solutions
P194 #T18 (Chapter 4) parametric functions
Pg 204 #22 (Chapter 5) - linear combination of cos and sin
Pg211 #1 (Chapter 5) - proving non-identities with counter-examples
Pg 212 #11 (Chapter 5) - proving identities, composite argument properties
Pg 211 #11 (Chapter 5) - repeat (above)
Pg 212 #33 (Chapter 5) - composite argument properties
Pg 220 #3 (Chapter 5) - harmonic analysis
Pg 228 #18 (Chapter 5) - transforming sums & differences of sin and cos using trig. properties
P236 #1 (Chapter 5) - proving non-identities with counter-examples
P241 #R2c (Chapter 5) - transforming trig. expressions
P246 #T14 (Chapter 5) - sum of sinusoids
Yellow Wksht #3 (Chapter 5) -half/double argument properties
Yellow Wksht #12 (Chapter 5) - half/double argument properties
Yellow Wksht #27 (Chapter 5) - half/double argument properties
Gillian Spangler
EXTRA CREDIT
[1] Pg13 #23-26, (Chapter 1)-Types of Functions
[2] Pg 13 #29 (Chapter 1)-Types of Functions
[3] Pg19 figure 1-3g (Chapter 1)-Dilation and Translation of Function Graphs
[4] Pg20 #1-6 part c only (Ch1)-Dilations and Translation of Function Graphs
[5] Pg20 #5 (Chapter 1)-Dilation and Translation of Function Graphs
[6] Pg 31 #7 (Chapter 1)-Composition of Functions
[7] Pg 41 #13 (Chapter 1)-Inverse of a Function
[8] Pg57 #T9 (Chapter 1)-Dilations and Translation of Functions
[9] Pg65 #18 (Chapter 2)-Measurement of Rotation
[10] Pg 72. #7 (Chapter 2)-Sine and Cosine Functions
[11] Pg 84 #13 (Chapter 2)-Sine and Cosine Functions
[12] Pg 92 T 18-20 (chapter 2)-Inverse Trigonometric Functions and Triangle Problems
[13] Pg 91 T6 (Chapter 2)-Types of Functions
[14] Pg.89 #5Rb(chapter 2)-Sine and Cosine Functions
[15] Pg91 #T1 (Chapter 2)-Values of the Six Trigonometric Functions
[16] pg91 #T12 (Chapter 2)-Inverse Trigonometric Functions and Triangle Problems
[17] Pg91 #T13 (Chapter 2)-Inverse Trigonometric Functions and Triangle Problems
[18] Pg92 #T18-T21 (Chapter 2) –“see previous #12”
[19] Pg. 143 #1 (Chapter 3)-Rotary Motion
[20] Pg. 143 #9 (Chapter 3)-Rotary Motion
[21] Pg. 147 #17 (Chapter 3)-Rotary Motion
[22] Pg153 #T4 (Chapter 3)-Radian Measure of Angles
[23] Pg153 #T6 (Chapter 3)-Transforming General Sinusoidal Graphs
[24] Pg 154 #T19-23 (Chapter 3)-Rotary Motion
[25] Pg. 161 #2 (Chapter 4)-Pythagorean, Reciprocal, and Quotient Properties
[26] Pg. 161 #4 (Chapter 4)-Pythagorean, Reciprocal, and Quotient Properties
[27] Pg. 167 #3 (Chapter 4)-Identities and Algebraic Transformation of Expressions
[28] Pg. 167 #7 (Chapter 4)-Identities and Algebraic Transformation of Expressions
[29] Pg167 #11 (Chapter 4)-Identities and Algebraic Transformation of Expressions
[30] Pg168 #41 (Chapter 4)-Identities and Algebraic Transformation of Expressions
[31] Pg180 #5 (Chapter 4)-Parametric Functions
[32] Pg194 #T10 (Chapter 4)-Identities and Algebraic Transformation of Expressions
[33] P194 #T15 (Chapter 4)-Arcsine, Arctangent, Arccosine, and trig equations-general solutions
[34] P194 #T18 (Chapter 4)-Find the Equation of an Ellipse
[35] Pg 204 #22 (Chapter 5)-Composite Argument and Linear Combination Properties
[36] Pg211 #1 (Chapter 5)-Other Composite Argument Properties
[37] Pg 212 #11 (Chapter 5)-Other Composite Argument Properties
[38] Pg 211 #11 (Chapter 5)-“see pervious #37”
[39] Pg 212 #33 (Chapter 5)-Other Composite Argument Properties
[40] Pg 220 #3 (Chapter 5)-The Sum and Product Properties
[41] Pg 228 #18 (Chapter 5)-The Sum and Product Properties
[42] P236 #1 (Chapter 5)-Double and Half Argument Properties-Comparing Transformed Graphs
[43] P241 #R2c (Chapter 5)-Composite Argument and Linear Combination Properties
[44] P246 #T14 (Chapter 5)-Sum and Product Properties
[45] Yellow Wksht #3 (Chapter 5)-Double Formulas for Sine and Cosine
[46] Yellow Wksht #12 (Chapter 5)-N/A; wasn’t an actual problem
[47] Yellow Wksht #27 (Chapter 5)-Half Formulas for Sine and Cosine
Maleah Hamilton
Bonus problems
Pg20 #7 (Chapter 1): Dilation and Translation of function graphs.
Pg13 #23-26, (Chapter 1): Names of functions
Pg 13 #29 (Chapter 1): Graphing story problems
Pg19 figure 1-3g (Chapter 1): Verbal explanation of Dilation and Translation of function graphs
Pg20 #1-6 part c only (Ch1): Verbal explanation of Dilation and Translation of function graphs
con
Pg20 #5 (Chapter 1): All aspects of Dilation and Translation of function graphs
Pg 31 #7 (Chapter 1): Finding values in composite functions
Pg 41 #13 (Chapter 1): Plotting function graphs
Pg57 #T9 (Chapter 1): Verbal explanation of Dilation and Translation of function graph.
Pg65 #18 (Chapter 2): Sketching angles on a graph
Pg 72. #7 (Chapter 2): Writing sin and cos equations for points
Pg 84 #13 (Chapter 2): Right triangle problems
Pg 92 T 18-20 (chapter 2): Length of triangle legs
Pg 91 T6 (Chapter 2): sin and cos graphs
Pg.89 #5Rb(chapter 2): Triangle graphs
Pg91 #T1 (Chapter 2): Periodicity of Sine and Cosine
pg91 #T12 (Chapter 2): Inverse tangent
Pg91 #T13 (Chapter 2): Pythagorean theorem
Pg92 #T18-T21 (Chapter 2): Length of triangle legs
Pg. 143 #1 (Chapter 3): Velocity of projectiles
Pg. 143 #9 (Chapter 3): Angular and linear velocity
Pg. 147 #17 (Chapter 3): Angular and linear velocity
Pg153 #T4 (Chapter 3): Unit circle
Pg153 #T6 (Chapter 3): Evaluating equations
Pg 154 #T19-23 (Chapter 3): Angular and linear velocity
Pg. 161 #2 (Chapter 4): Quotient Properties
Pg. 161 #4 (Chapter 4): Reciprocal Properties
Pg. 167 #3 (Chapter 4): Transforming expressions
Pg. 167 #7 (Chapter 4): Transforming expressions
Pg167 #11 (Chapter 4): Transforming expressions
Pg168 #41 (Chapter 4): Proofs
Pg180 #5 (Chapter 4): Graphing cones
Pg194 #T10 (Chapter 4): Proofs
P194 #T15 (Chapter 4): arccos
P194 #T18 (Chapter 4): Parametric equations
Pg 204 #22 (Chapter 5): Linear combinations of cosine and sine
Pg211 #1 (Chapter 5): Proofs
Pg 212 #11 (Chapter 5): Composite argument properties
Pg 211 #11 (Chapter 5): Composite argument properties
Pg 213 #33 (Chapter 5): Composite argument properties
Pg 220 #3 (Chapter 5): Equations for sinusoids
Pg 228 #18 (Chapter 5): Equations for sinusoids
P236 #1 (Chapter 5): Comparing graphs to determine differences
P241 #R2c (Chapter 5): Trigonometric expressions
P246 #T14 (Chapter 5): Graphing sinusoids
Yellow Wksht #3 (Chapter 5): Double Argument properties
Yellow Wksht #12 (Chapter 5): Double Argument properties
Yellow Wksht #27 (Chapter 5): Half Argument Peroperties
Thor Olson
Pg20 #7 (Chapter 1)
graphs.
-Dilation and Translation of function
Pg13 #23-26, (Chapter 1) -Naming types of functions from graphs.
Pg 13 #29 (Chapter 1) -Sketching types of functions.
Pg19 figure 1-3g (Chapter 1) -Transforming graphs.
Pg20 #1-6 part c only (Ch1) -Transforming graphs.
Pg20 #5 (Chapter 1) -Recognizing transformations of graphs.
Pg 31 #7 (Chapter 1) -Finding values of two dependent functions.
Pg 41 #13 (Chapter 1) -Parametric mode, inverses, and
function/not
function tests.
Pg57 #T9 (Chapter 1) -Recognizing transformations.
Pg65 #18 (Chapter 2) -Reference angles.
Pg 72. #7 (Chapter 2) -Definition of sin and cos.
Pg 84 #13 (Chapter 2) -Using sin and cos.
Pg 92 T 18-20 (chapter 2) -Using sin and cos.
Pg 91 T6 (Chapter 2) -Sketching graphs.
Pg.89 #5Rb(chapter 2) -Using sin and cos.
Pg91 #T1 (Chapter 2) -Ref angles, and using all 6 trig
functions.
pg91 #T12 (Chapter 2) -The meaning of tan inverse.
Pg91 #T13 (Chapter 2) -Using sin, cos, and tan.
Pg92 #T18-T21 (Chapter 2) -Using sin and cos.
Pg. 143 #1 (Chapter 3) -Angular and linear velocity.
Pg. 143 #9 (Chapter 3) - Angular and linear velocity including
belts/pulleys.
Pg. 147 #17 (Chapter 3) -Angular and linear velocity.
Pg153 #T4 (Chapter 3) -Radian/degree conversions.
Pg153 #T6 (Chapter 3) -Sketching graphs of trig functions from
equations.
Pg 154 #T19-23 (Chapter 3) -Angular and linear velocity
including belts/pulleys.
Pg. 161 #2 (Chapter 4) -Products of inverses.
Pg. 161 #4 (Chapter 4) -Transforming reciprocal properties.
Pg. 167 #3 (Chapter 4) -Transforming expressions.
Pg. 167 #7 (Chapter 4) -Transforming expressions.
Pg167 #11 (Chapter 4) -Transroming expressions.
Pg168 #41 (Chapter 4) -Proofs and identities.
Pg180 #5 (Chapter 4) -Parametric functions.
Pg194 #T10 (Chapter 4) -Identities, proofs, and domain.
P194 #T15 (Chapter 4) -Arccos's general solution.
P194 #T18 (Chapter 4) -Parametric equations.
Pg 204 #22 (Chapter 5) -Linear combination of cos and sin.
Pg211 #1 (Chapter 5) -Proofs by counterexample.
Pg 212 #11 (Chapter 5) -Composite argument properties.
Pg 211 #11 (Chapter 5) -Um, this is the same problem. It's
actually on page 212.
Pg 213 #33 (Chapter 5) -Composite argument properties and
special angles.
Pg 220 #3 (Chapter 5) -Adding sinusoids.
Pg 228 #18 (Chapter 5) -Multiplying sinusoids.
P236 #1 (Chapter 5) -Compare graphs to prove properties.
P241 #R2c (Chapter 5) -Adding sinusoids.
P246 #T14 (Chapter 5) -Adding sinusoids.
Yellow Wksht #3 (Chapter 5) -Double argument properties.
Yellow Wksht #12 (Chapter 5) -Double double (working out to
quadruple)
argument properties.
Yellow Wksht #27 (Chapter 5) -Half angle formulas.
- Dakota Nelson
Pg20 #7 (Chapter 1) -Dilation and Translation of function graphs.
Pg13 #23-26, (Chapter 1) - Determining a functions classification
Pg 13 #29 (Chapter 1) - forming a graph from a story
Pg19 figure 1-3g (Chapter 1) - transformations of functions
Pg20 #1-6 part c only (Ch1) - substituting functions and finding new dilation and translations
Pg20 #5 (Chapter 1) - transformation of functions
Pg 31 #7 (Chapter 1) - composite function numerically
Pg 41 #13 (Chapter 1) - inverse relation
Pg57 #T9 (Chapter 1) - transforming functions
Pg65 #18 (Chapter 2) - reference angles
Pg 72. #7 (Chapter 2) - finding unknown angles
Pg 84 #13 (Chapter 2) - sin/cos relation with triangles
Pg 92 T 18-20 (chapter 2) - finding unknown angles
Pg 91 T6 (Chapter 2) - sketching graphs from story problem
Pg.89 #5Rb(chapter 2) - sin/cos of a triangle
Pg91 #T1 (Chapter 2) - reference angle
pg91 #T12 (Chapter 2) - reciprocal trigonometric functions
Pg91 #T13 (Chapter 2) - inverse trigonometric functions
Pg92 #T18-T21 (Chapter 2) - using triangle properties in story problem, T21 = function
transformations
Pg. 143 #1 (Chapter 3) - rotary motion, linear/angular velocity
Pg. 143 #9 (Chapter 3) - rotary motion, linear/angular velocity
Pg. 147 #17 (Chapter 3) - rotary motion
Pg153 #T4 (Chapter 3) - radian-degree conversion
Pg153 #T6 (Chapter 3) - identifying characteristics of a function
Pg 154 #T19-23 (Chapter 3) - rotary motion
Pg. 161 #2 (Chapter 4) - proving identities
Pg. 161 #4 (Chapter 4) - proving identities
Pg. 167 #3 (Chapter 4) - transforming trigonometric expressions
Pg. 167 #7 (Chapter 4) - transforming trigonometric expressions
Pg167 #11 (Chapter 4) - transforming trigonometric expressions
Pg168 #41 (Chapter 4) - proving identities
Pg180 #5 (Chapter 4) - parametric functions
Pg194 #T10 (Chapter 4) - proving identities
P194 #T15 (Chapter 4) - general arc(cos/sin/tan) solutions
P194 #T18 (Chapter 4) parametric functions
Pg 204 #22 (Chapter 5) - linear combinations of cos and sin
Pg211 #1 (Chapter 5) - proving non-identities with counter-examples
Pg 212 #11 (Chapter 5) - proving identities, composite argument properties
Pg 211 #11 (Chapter 5) - repeat (above)
Pg 212 #33 (Chapter 5) - composite argument properties
Pg 220 #3 (Chapter 5) - harmonic analysis
Pg 228 #18 (Chapter 5) - transforming sums & differences of sin and cos using trig. properties
P236 #1 (Chapter 5) - proving non-identities with counter-examples
P241 #R2c (Chapter 5) - transforming trig. espressions
P246 #T14 (Chapter 5) - sum of sinusoids
Yellow Wksht #3 (Chapter 5) -half/double argument properties
Yellow Wksht #12 (Chapter 5) - half/double argument properties
Yellow Wksht #27 (Chapter 5) - half/double argument properties
Abby Palmer
Michael Rezich
Per. 2
Pg20 #7 (Chapter 1) -Dilation and Translation of function graphs.
Pg13 #23-26, (Chapter 1)- Naming function graphs
Pg 13 #29 (Chapter 1)- Producing reasonable function graphs from various scenarios
Pg19 figure 1-3g (Chapter 1)- Dilation and Translation of function graphs.
Pg20 #1-6 part c only (Ch1)- Recognizing transformations of functions
Pg20 #5 (Chapter 1)- Recognizing transformations of functions
Pg 31 #7 (Chapter 1)- Graphing and evaluating the composition of one function with another
function
Pg 41 #13 (Chapter 1)- Finding inverse relations and determining whether they are functions
Pg57 #T9 (Chapter 1)- Dilation and Translation of function graphs
Pg65 #18 (Chapter 2)- Drawing angles and reference triangles in standard position
Pg 72. #7 (Chapter 2)- Defining sine and cosine of any angle (given its terminal sides)
Pg 84 #13 (Chapter 2)- Finding angles of a right triangle, given two sides
Pg 92 T 18-20 (chapter 2)- Finding sides and angles of right triangles
Pg 91 T6 (Chapter 2) - Producing reasonable circular function graphs from various scenarios
Pg.89 #5Rb(chapter 2)- Finding sides and angles of right triangles
Pg91 #T1 (Chapter 2)- Naming six trig. functions for a given angle in standard position with fixed
terminal sides
pg91 #T12 (Chapter 2)- Understanding the meaning of inverse-tangent
Pg91 #T13 (Chapter 2)- Finding sides and angles of right triangles
Pg92 #T18-T21 (Chapter 2)- Finding sides and angles of right triangles
Pg. 143 #1 (Chapter 3)- Finding linear and angular velocities in a rotating object
Pg. 143 #9 (Chapter 3)- Finding linear and angular velocities in a rotating object
Pg. 147 #17 (Chapter 3)- Finding linear and angular velocities in a rotating object
Pg153 #T4 (Chapter 3)- Converting degree measurements into radians
Pg153 #T6 (Chapter 3)- Recognizing transformations of functions
Pg 154 #T19-23 (Chapter 3)- Finding linear and angular velocities in a rotating object
Pg. 161 #2 (Chapter 4)- Utilizing reciprocal, quotient, and Pythagorean properties
Pg. 161 #4 (Chapter 4)- manipulating problems using the reciprocal property
Pg. 167 #3 (Chapter 4)- Simplifying trigonometric expressions
Pg. 167 #7 (Chapter 4)- Simplifying trigonometric expressions
Pg167 #11 (Chapter 4)- Simplifying trigonometric expressions
Pg168 #41 (Chapter 4)- Proving that not all simplifications are identities
Pg180 #5 (Chapter 4)- Plotting and naming parametric functions
Pg194 #T10 (Chapter 4)- Proving identities
P194 #T15 (Chapter 4)- Writing general solutions for inverse relations
P194 #T18 (Chapter 4)- Writing parametric equations from graphs
Pg 204 #22 (Chapter 5)- Use composite argument properties to express combinations of sine
and cosine as a single cosine
Pg211 #1 (Chapter 5)- Using composite argument properties of cosine, sine, and tangent
Pg 212 #11 (Chapter 5)- Using composite argument properties of cosine, sine, and tangent
Pg 211 #11 (Chapter 5)- Using composite argument properties of cosine, sine, and tangent
Pg 213 #33 (Chapter 5)- Using composite argument properties of cosine, sine, and tangent
Pg 220 #3 (Chapter 5)- investigating the addition of two sinusoids
Pg 228 #18 (Chapter 5)- investigating the multiplication of two sinusoids
P236 #1 (Chapter 5)- Use double argument properties
P241 #R2c (Chapter 5)- investigating the addition of two sinusoids
P246 #T14 (Chapter 5)- investigating the addition of two sinusoids
Yellow Wksht #3 (Chapter 5)- Use double argument properties
Yellow Wksht #12 (Chapter 5)- Use double argument properties
Yellow Wksht #27 (Chapter 5)- Use half argument properties
Mike Rezich