Difference between revisions of "MAT4223"
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(Added content for the prerequisites (9.1-11.1)) |
(Completed updated list of prerequisites) |
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* [[Power Series and Functions ]] <!-- 1224-6.1 --> | * [[Power Series and Functions ]] <!-- 1224-6.1 --> | ||
* [[Ratio and Root Tests ]] <!-- 1224-5.6 --> | * [[Ratio and Root Tests ]] <!-- 1224-5.6 --> | ||
* [[Comparison Tests ]] <!-- 1224-5.4 --> | * [[Comparison Tests ]] <!-- 1224-5.4 --> | ||
| + | * [[Taylor's Theorem ]] <!-- 4213-6.3 --> | ||
* [[Uniform Convergence of Series of Functions]] <!-- 4223-7.2 --> | * [[Uniform Convergence of Series of Functions]] <!-- 4223-7.2 --> | ||
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<div style="text-align: center;">9.2</div> | <div style="text-align: center;">9.2</div> | ||
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[[ The Heine-Borel Theorem]] | [[ The Heine-Borel Theorem]] | ||
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<div style="text-align: center;">11.2</div> | <div style="text-align: center;">11.2</div> | ||
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[[Differentiation of Vector-valued Functions]] | [[Differentiation of Vector-valued Functions]] | ||
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* The total derivative of a differentiable function | * The total derivative of a differentiable function | ||
* Determine whether a function if differentiable or not | * Determine whether a function if differentiable or not | ||
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| − | [[Rules for Differentiation | + | [[Rules for Differentiation and Tangent Planes]] |
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| − | * | + | * [[Differentiation of Vector-valued Functions]] <!-- 4223-11.2 --> |
| + | * [[The Derivative ]] <!-- 4213-6.1 --> | ||
| + | * [[Euclidean Spaces: Algebraic Structure and Inner Product]] <!-- 4223-8.1 --> | ||
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| − | [[Mean-Value Theorems]] | + | [[Mean-Value Theorems for Vector Valued Functions]] |
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| − | * Mean- | + | * [[The Mean Value Theorem ]] <!-- 4213-6.1 --> |
| + | * [[Partial Derivatives and Integrals]] <!-- 4223-11.1 --> | ||
| + | * [[Differentiation of Vector-valued Functions]] <!-- 4223-11.2 --> | ||
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| − | [[Taylor's Formula in | + | [[Taylor's Formula in Several Variables]] |
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| − | Taylor's | + | * [[Taylor's Theorem ]] <!-- 4213-6.3 --> |
| + | * [[Power Series and Analytic Functions]] <!-- 4223-7.3 --> | ||
| + | * [[Mean-Value Theorems for Vector Valued Functions]] <!-- 4223-11.5 --> | ||
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| − | * | + | * [[Inverse Functions ]] <!-- 4213-5.6 --> |
| − | * Cramer's | + | * [[The Geometric Interpretation of the Determinant|Cramer's Rule ]] <!-- 2233-6.3 --> |
| + | * [[Mean-Value Theorems for Vector Valued Functions]] <!-- 4223-11.5 --> | ||
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| − | [[Lebesque | + | [[Lebesque Theorem for Riemann Integrability on the Real Line]] |
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| − | * Riemann | + | * [[Continuous Functions]] <!-- 4213-5.1 --> |
| + | * [[Riemann Integrable Functions ]] <!-- 4213-7.2 --> | ||
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| + | * Define an almost everywhere continuous function | ||
* The Riemann integrable functions are those almost everywhere continuous | * The Riemann integrable functions are those almost everywhere continuous | ||
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| − | [[Integration in the Euclidean space: Jordan | + | [[Integration in the Euclidean space: Jordan Regions and Volume]] |
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| − | * Darboux | + | * [[Riemann Integrable Functions ]] <!-- 4213-7.2 --> |
| + | * [[The Darboux Integral]] <!-- 4213-7.4 --> | ||
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* Jordan regions: volume and properties | * Jordan regions: volume and properties | ||
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| − | * | + | * [[Integration in the Euclidean space: Jordan Regions and Volume]] <!-- 4223-12.1 --> |
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* Definition of a Riemann integrable function, characterization, properties | * Definition of a Riemann integrable function, characterization, properties | ||
| − | * Any continuous function on a closed Jordan region | + | * Any continuous function on a closed Jordan region is integrable |
* Mean-valued theorems for multiple integrals | * Mean-valued theorems for multiple integrals | ||
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| − | * | + | * [[Riemann Integration on Jordan Regions in Higher Dimensions]] <!-- 4223-12.2 --> |
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Revision as of 18:53, 5 August 2020
Topics List
| Date | Sections | Topics | Prerequisite Skills | Student Learning Outcomes | |
|---|---|---|---|---|---|
| Week 1 |
7.1
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| Week 1 |
7.2
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| Week 2 |
7.3 and 7.4
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| Week 2 |
7.5
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| Week 3 |
8.1
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| Week 3 |
8.2
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| Week 3 |
8.3 and 8.4
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The Topology of Higher Dimensions: interior, closure and boundary |
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| Week 4 |
9.1
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Limits of Sequences in the Euclidean space and the Bolzano-Weierstrass Theorem |
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| Week 4 |
9.2
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| Week 5 |
9.3
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| Week 5 |
9.4
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| Week 6 |
11.1
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| Week 7 |
11.2
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| Week 7 |
11.3 and 11.4
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| Week 8 |
11.5
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| Week 8 |
11.5 and 11.6
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| Weeks 8 and 9 |
11.6
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The Inverse Function Theorem and the Implicit Function Theorem |
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| Week 10 |
9.6
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| Weeks 11 and 12 |
12.1
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Integration in the Euclidean space: Jordan Regions and Volume |
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| Weeks 13 and 14 |
12.2
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| Week 15 |
12.3
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