Difference between revisions of "MAT1093"
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| Week 4 || 2.5 || [[Graphs of the Tangent, Cotangent, Cosecant and Secant Functions]] || '''Finding Vertical asymptotes of rational functions''' || Graph the basic tangent, cotangent, secant and cosecant functions using key points, vertical asymptotes, and reciprocal identities, as needed | | Week 4 || 2.5 || [[Graphs of the Tangent, Cotangent, Cosecant and Secant Functions]] || '''Finding Vertical asymptotes of rational functions''' || Graph the basic tangent, cotangent, secant and cosecant functions using key points, vertical asymptotes, and reciprocal identities, as needed | ||
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− | | Week 5 || 2.6 || [[Phase shift and Applications]] || '''Algebraic graphing technics and transformations''' || Graph sinusoidal functions of the form y = A sin (ωx – φ) + B and y = A cos (ωx – φ) using transformations and determine the amplitude,|A|, period, T, and phase shift, φ/ω | + | | Week 5 || 2.6 || [[Phase shift and Applications]] || '''Algebraic graphing technics and transformations''' || Graph sinusoidal functions of the form y = A sin (ωx – φ) + B and y = A cos (ωx – φ) using transformations and determine the amplitude,|A|, period, T, and phase shift, φ/ω''' |
|- | |- | ||
| Week 5 || || Test 1 Review Session. '''Common Test 1: Ch.1 and 2.''' || || | | Week 5 || || Test 1 Review Session. '''Common Test 1: Ch.1 and 2.''' || || |
Revision as of 15:02, 1 August 2020
Precalculus
1093. Precalculus. (3-0) 3 Credit Hours. (TCCN = MATH 2312)
Prerequisite: MAT 1073 or the equivalent course or satisfactory performance on a placement examination. Exponential functions, logarithmic functions, trigonometric functions, complex numbers, DeMoivre’s theorem, and polar coordinates. May apply toward the Core Curriculum requirement in Mathematics. Generally offered: Fall, Spring, Summer. Course Fees: DL01 $75; LRC1 $12; LRS1 $45; STSI $21.
Date | Sections | Topics | Prerequisite Skills | Student learning outcomes |
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Week 1 | Orientation |
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Week 1 | 1.3 | Functions and their graphs |
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Week 2 | 1.7 | One-to-one functions | Section 1.3: Functions and their graphs | Determine when a function or its graph is one-to-one |
Week 2 | 1.7 | Inverse functions | Section 1.3: Functions and their graphs |
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Week 2 | 2.1 | Angles and their measure | Elementary geometry and terminology |
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Week 3 | 2.2 | Trigonometric Functions: Unit Circle Approach |
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Week 3 | 2.3 | Properties of the Trigonometric Functions |
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Week 4 | 2.4 | Graphs of the Sine and Cosine Functions | Algebraic graphing technics and transformations |
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Week 4 | 2.5 | Graphs of the Tangent, Cotangent, Cosecant and Secant Functions | Finding Vertical asymptotes of rational functions | Graph the basic tangent, cotangent, secant and cosecant functions using key points, vertical asymptotes, and reciprocal identities, as needed |
Week 5 | 2.6 | Phase shift and Applications | Algebraic graphing technics and transformations | A|, period, T, and phase shift, φ/ω |
Week 5 | Test 1 Review Session. Common Test 1: Ch.1 and 2. | |||
Week 6 | 3.1 | The inverse Sine, Cosine and Tangent functions |
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Week 6 | 3.2 | The inverse Secant, Cosecant and Cotangent functions |
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Week 6 | 3.3A | Trigonometric equations involving a single trig function | Section A.4: Solving algebraic equations | Find exact solutions in the interval [0, 2π) and in general form for equations with single trig function |
Week 7 | 3.3B | Trigonometric Equations |
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Week 7 | 3.4 | Trigonometric Identities |
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Prove simple identities using the fundamental identities and algebraic technics |
Week 8 | 3.5 | Sum and Difference Formulas | Section 2.2: Trigonometric Functions: Unit Circle Approach |
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Week 8 | 3.6A | Double-angle formulas |
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Week 8 | 3.6B | Half-angle formulas |
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Week 9 | 3.7 | Product-to-Sum and Sum-to-Product Formulas | Basic algebra and geometry | Use product-to-sum and sum-to-product formulas |
Week 9 |
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Week 10 | 4.1 | Right triangle definitions of trig functions and related applications |
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Week 10 | 4.2 | The Law of Sines |
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Learn and use the Law of Sines to solve two cases of oblique triangles (ASA and SAA for case 1, and SAA for case 2, also known as the ambiguous case that can result in no solution, one solution or two solutions) and related applications questions including those with bearings |
Week 11 | 4.3 | The Law of Cosines | Section 3.3: Trigonometric Equations | Use the Law of Cosines to solve the other two cases of oblique triangles (SAS for case 3 and SSS for case 4) and related applications questions including those with bearings |
Week 11 | 4.4 | Area of a Triangle | Section A.2: Geometry Essentials |
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Week 11 | 5.1 | Polar Coordinates |
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Week 11 | 5.2 | Polar Equations and Graphs |
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Graph simple polar equations by converting them to rectangular form and then use Algebra to graph this rectangular equations |
Week 11/12 | 5.3 | The complex plane |
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Week 12 | 5.3 | DeMoivere’s Theorem | Section 2.2: Trigonometric Functions: Unit Circle Approach | Use the trigonometric form of complex numbers to multiply, divide, and raise them to natural powers |
Week 12 |
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Week 13 | 7.4 | Logarithmic and Exponential Equations |
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Find exact and approximate solution sets for exponential and logarithmic equations of any base, including those from application questions |
Week 14 | 7.6 | Exponential growth and decay models |
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Create and use exponential growth and decay models from two data points |
Week 14 | 7.6 | Newton’s law of Cooling models | Section A-4: Solving quadratic equations | Create and use exponential models based on Newton’s Law of Cooling |
Week 14 | 7.6 | Logistic growth and decay models | Section A-4: Solving quadratic equations | Use Logistic growth and decay models to find present and future values, and times for any future value |
Week 15 | Common Final Exam Review | All topics covered during the semester |