Difference between revisions of "MAT3213"

Basic Terminology

• Sets of Objects

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

Set Operations

• Basic Terminology
• De Morgans Laws in Logic

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

Functions (The Cartesian product definition)

• Domain and Range of a Function
• Basic Terminology
• Set Operations

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

Direct and Inverse Images

• Functions(The Cartesian Product Definition)
• Inverse Functions
• Set Operations

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

Injective and Surjective Functions

• Functions(The Cartesian Product Definition)
• Direct and Inverse Images
• Set Operations

• Injective functions
• Surjective functions
• Bijective functions

Inverse Functions

• Injective and Surjective Functions
• Direct and Inverse Images

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

Composition of Functions

• Functions(The Cartesian Product Definition)
• Direct and Inverse Images

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

Restrictions on Functions

• Domain and Range

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

Mathematical Induction

• Basic Terminology
• Set Operations

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

Finite and Infinite Sets

• Set Operations
• Injective and Surjective Functions

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

Countable Sets

• Injective and Surjective Functions
• Finite and Infinite Sets

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

Algebraic Properties of the Real Numbers

• Field Properties

• Algebraic properties of the Real Numbers

Rational and Irrational Numbers

• The square root function
• Functions(The Cartesian Product Definition)
• Definition of Even and Odd Numbers

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

The Ordering Properties of the Real Numbers

• Inequalities
• Algebraic properties of the Real Numbers

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

Inequalities

• The Ordering Properties of the Real Numbers
• The Algebraic Properties of the Real Numbers

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

Absolute Value and the Real Line

• The Algebraic Properties of the Real Numbers
• Inequalities

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

Mean Value Theorem

• Evaluating Functions
• Continuity
• Slope of a Line

• Determine if the MVT applies given a function on an interval.
• Find c in the conclusion of the MVT (if algebraically feasible)
• Know the first 3 Corollaries of MVT (especially the 3rd)

Derivatives and the Shape of a Graph

• Evaluating Functions
• Critical Points of a Function
• Second Derivatives

• Use the First Derivative Test to find intervals on which the function is increasing and decreasing and the local extrema and their type
• 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
• Understand the shape of the graph, given the signs of the first and second derivatives.

Applied Optimization Problems

• Mathematical Modeling
• Formulas pertaining to area and volume
• Evaluating Functions
• Trigonometric Equations
• Critical Points of a Function

• Set up a function to be optimized and find the value(s) of the independent variable which provide the optimal solution.

L’Hôpital’s Rule

• Re-expressing Rational Functions
• When a Limit is Undefined
• The Derivative as a Function

• Identify indeterminate forms produced by quotients, products, subtractions, and powers, and apply L’Hôpital’s rule in each case.
• Recognize when to apply L’Hôpital’s rule.

Antiderivatives

• Inverse Functions
• The Derivative as a Function
• Differentiation Rule
• Derivatives of the Trigonometric Functions

• 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.

Approximating Areas

• Sigma notation
• Area of a rectangle
• Continuity
• Toolkit Function

• 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.

The Definite Integral

• Interval notation
• Antiderivatives
• Limits of Riemann Sums
• Continuity

• 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.

The Fundamental Theorem of Calculus

• The Derivative of a Function
• Antiderivatives
• Mean Value Theorem
• Inverse Functions

• 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.