Difference between revisions of "MAT3213"

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(Added content to the table (2.1 -2.2))
(Added content to the table(2.3 - 3.1))
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* The ordering properties of the real numbers
 
* The ordering properties of the real numbers
 
* Tricotomy property
 
* Tricotomy property
* If 0 <= a < x for each x in the real numbers, then a = 0.
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* If 0 <= a < x for each x in the positive real numbers, then a = 0.
  
  
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<div style="text-align: center;">4.3</div>
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<div style="text-align: center;">2.2</div>
  
 
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|Week&nbsp;
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|Week&nbsp;3
  
 
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<div style="text-align: center;">4.4</div>
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<div style="text-align: center;">2.3</div>
  
 
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[[Mean Value Theorem]]
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[[Suprema, Infima, and the Completeness Property]]
  
 
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* [[Functions|Evaluating Functions]] <!-- 1073-Mod 1.1-->
+
* [[Inequalities]] <!-- 3213-2.1 -->
* [[Continuity]] <!-- 1214-2.4 -->
+
* [[Absolute Value and the Real Line]] <!-- 3213-2.2 -->
* [[Defining the Derivative|Slope of a Line]] <!-- 1214-3.1 -->
 
  
 
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* Determine if the MVT applies given a function on an interval.
+
* Upper and lower bounds of sets
* Find c in the conclusion of the MVT (if algebraically feasible)
+
* Definition of the suprema and infima of a set
* Know the first 3 Corollaries of MVT (especially the 3rd)
+
* Thed completeness property of the real numbers
  
  
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|Week&nbsp;9   
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|Week&nbsp;
  
 
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<div style="text-align: center;">4.5</div>
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<div style="text-align: center;">2.4</div>
  
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+
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[[Derivatives and the Shape of a Graph]]
+
[[Applications of the Supremum Property]]
  
 
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* [[Functions|Evaluating Functions]] <!-- 1073-Mod 1.1-->
+
* [[Inequalities]] <!-- 3213-2.1 -->
* [[Maxima and Minima|Critical Points of a Function]] <!-- 1214-4.3 -->
+
* [[Absolute Value and the Real Line]] <!-- 3213-2.2 -->
* [[Derivatives and the Shape of a Graph|Second Derivatives]] <!-- 1214-4.5 -->
+
* [[Suprema, Infima, and the Completeness Property]] <!-- 3213-2.3 -->
  
 
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* Use the First Derivative Test to find intervals on which the function is increasing and decreasing and the local extrema and their type
+
* Bounded Functions
* Use the Concavity Test (aka the Second Derivative Test for Concavity) to find the intervals on which the function is concave up and down, and point(s) of inflection
+
* The Archimedean Property
* Understand the shape of the graph, given the signs of the first and second derivatives.
+
* The existence of the square root of 2
 
+
* Density of the rational numbers in the real numbers
  
  
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|Week&nbsp;10
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|Week&nbsp;3/4
  
 
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<div style="text-align: center;">4.7</div>
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<div style="text-align: center;">2.5</div>
  
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+
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[[Applied Optimization Problems]]
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[[Intervals]]
  
 
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* [[Mathematical Modeling]] <!-- 1214-4.1 and 1093-7.6 and 1023-1.3 -->
+
* [[Inequalities]] <!-- 3213-2.1 -->
* '''Formulas pertaining to area and volume''' <!-- Geometry -->
+
* [[Suprema, Infima, and the Completeness Property]] <!-- 3213-2.3 -->
* [[Functions|Evaluating Functions]] <!-- 1073-Mod 1.1-->
 
* [[Trigonometric Equations]] <!-- 1093-3.3 -->
 
* [[Maxima and Minima|Critical Points of a Function]] <!-- 1214-4.3 -->
 
  
 
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||
  
 
+
* Types of Intervals
* Set up a function to be optimized and find the value(s) of the independent variable which provide the optimal solution.
+
* Characterization of Intervals
 +
* Nested intervals
 +
* The Nested Intervals Property
 +
* Demonstrate that the real numbers are not countable
  
  
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|Week&nbsp;10
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|Week&nbsp;4
  
 
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<div style="text-align: center;">4.8</div>
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<div style="text-align: center;">3.1</div>
  
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+
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[[L’Hôpital’s Rule]]
+
[[Sequences and their Limits]]
  
 
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* [[Rational Function| Re-expressing Rational Functions ]] <!-- 1073-4 -->
+
* [[Basis Terminology|The Natural Numbers]] <!-- 3213-1.1 -->
* [[The Limit of a Function|When a Limit is Undefined]] <!-- 1214-2.2 -->
+
* [[Mathematical Induction]] <!-- 3213-1.2 -->
* [[The Derivative as a Function]] <!-- 1214-3.2 -->
+
* [[Applications of the Supremum Property]] <!-- 3213-2.4 -->
  
 
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* Identify indeterminate forms produced by quotients, products, subtractions, and powers, and apply L’Hôpital’s rule in each case.
+
* Definition of the limit of a sequence
* Recognize when to apply L’Hôpital’s rule.
+
* The uniqueness of limits in the real numbers
 +
* Tails of sequences
 +
* Examples of common sequences
  
  

Revision as of 12:35, 16 July 2020

The textbook for this course is Introduction to Real Analysis by Bartle and Sherbert

A comprehensive list of all undergraduate math courses at UTSA can be found here.

The Wikipedia summary of Real Analysis.

Topics List

Date Sections Topics Prerequisite Skills Student Learning Outcomes
Week 1
1.1

Basic Terminology

  • Subsets
  • The definition of equality between two sets
  • Commonly used sets


Week 1
1.1


Set Operations

  • Union, intersection and complements of sets
  • De Morgans Laws for sets
  • Infinite Unions and intersections of sets
Week 1
1.1

Functions (The Cartesian product definition)

  • The Cartesian Product
  • Definition of a function
  • Domain and Range in terms of the Cartesian product
  • Transformations and Machines


Week 1/2
1.1

Direct and Inverse Images

  • Definition of the Direct Image
  • Definition of the Inverse Image


Week 1/2
1.1


Injective and Surjective Functions

  • Injective functions
  • Surjective functions
  • Bijective functions


Week 1/2
1.1


Inverse Functions

  • Definition of Inverse functions
  • Criteria for an Inverse of a function to exist


Week 1/2
1.1

Composition of Functions

  • Definition of a composition function
  • When function composition is defined


Week 1/2
1.1


Restrictions on Functions

  • Define the restriction of a function
  • Positive Square Root function


Week 2
1.2

Mathematical Induction

  • Well-ordering principal
  • Principal of Mathematical induction
  • The principal of Strong Induction


Week 2
1.3


Finite and Infinite Sets

  • Definition of finite and infinite sets
  • Uniqueness Theorem
  • If T is a subset of S and T is infinite, then S is also infinite.


Week 2
1.3

Countable Sets

  • Countable and Uncountable sets
  • The set of rational numbers is countable
  • Cantor's Theorem


Week 3
2.1


Algebraic Properties of the Real Numbers

  • Algebraic properties of the Real Numbers


Week 3
2.1

Rational and Irrational Numbers

  • The Rational Numbers
  • Proof that the Square Root of 2 does not exist in the rational numbers
  • The Irrational Numbers


Week 2
2.1

The Ordering Properties of the Real Numbers

  • The ordering properties of the real numbers
  • Tricotomy property
  • If 0 <= a < x for each x in the positive real numbers, then a = 0.


Week 2
2.1

Inequalities

  • Using the order properties to solve equations
  • Arithmetic-geometric mean
  • Bernoulli's Inequality


Week 2/3
2.2

Absolute Value and the Real Line

  • The absolute value function
  • The Triangle Inequality
  • Distance between elements of the real numbers
  • Definition of an epsilon neighborhood


Week 3
2.3

Suprema, Infima, and the Completeness Property

  • Upper and lower bounds of sets
  • Definition of the suprema and infima of a set
  • Thed completeness property of the real numbers


Week 3
2.4

Applications of the Supremum Property

  • Bounded Functions
  • The Archimedean Property
  • The existence of the square root of 2
  • Density of the rational numbers in the real numbers


Week 3/4
2.5

Intervals

  • Types of Intervals
  • Characterization of Intervals
  • Nested intervals
  • The Nested Intervals Property
  • Demonstrate that the real numbers are not countable


Week 4
3.1

Sequences and their Limits

  • Definition of the limit of a sequence
  • The uniqueness of limits in the real numbers
  • Tails of sequences
  • Examples of common sequences


Week 11
4.10


Antiderivatives

  • Find the general antiderivative of a given function.
  • Explain the terms and notation used for an indefinite integral.
  • State the power rule for integrals.
  • Use anti-differentiation to solve simple initial-value problems.


Week 11/12
5.1

Approximating Areas

  • Calculate sums and powers of integers.
  • Use the sum of rectangular areas to approximate the area under a curve.
  • Use Riemann sums to approximate area.


Week 12
5.2

The Definite Integral

  • State the definition of the definite integral.
  • Explain the terms integrand, limits of integration, and variable of integration.
  • Explain when a function is integrable.
  • Rules for the Definite Integral.
  • Describe the relationship between the definite integral and net area.
  • Use geometry and the properties of definite integrals to evaluate them.
  • Calculate the average value of a function.


Week 12/13
5.3

The Fundamental Theorem of Calculus

  • Describe the meaning of the Mean Value Theorem for Integrals.
  • State the meaning of the Fundamental Theorem of Calculus, Part 1.
  • Use the Fundamental Theorem of Calculus, Part 1, to evaluate derivatives of integrals.
  • State the meaning of the Fundamental Theorem of Calculus, Part 2.
  • Use the Fundamental Theorem of Calculus, Part 2, to evaluate definite integrals.
  • Explain the relationship between differentiation and integration.


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