Difference between revisions of "MAT4213"

Continuous Functions

• The Definition of the Limit of a Function
• The Sequential Criterion and Divergence Criteria

• The definition of a continuous function
• Sequential criterion for continuity
• Discontinuity criterion

Combinations of Continuous Functions

• Continuous Functions
• Composition of Functions

• Sums, differences, products and quotients of continuous functions on the same domain
• Composition of continuous functions

Continuous Functions on Intervals

• Domain and Range of a Function
• Intervals
• Continuous Functions

• Bounded Functions
• The boundedness theorem on closed and bounded intervals
• Definitions of absolute maximum and absolute minimum of a function
• The maximum-minimum theorem

The Intermediate Value Theorem

• Continuous Functions on Intervals
• Continuous Functions

• The Location of Roots theorem
• The Intermediate Value Theorem
• The image of a continuous functions on a closed and bounded interval is a closed and bounded interval

Uniform Continuity

• Continuous Functions
• Continuous Functions on Intervals

• The definition of uniform continuity
• Nonuniform continuity criteria
• Uniform continuity theorem

Lipschitz Functions

• Uniform Continuity
• Functions(The Cartesian Product Definition)

• Definition of a Lipschitz function
• If a function is Lipschtiz, then it is uniformly continuous

The Continuous Extension Theorem

• Continuous Functions on Intervals
• Uniform Continuity

• Uniform continuity and Cauchy sequences
• The Continuous Extension Theorem

Approximations of Continuous Functions

• Domain and Range
• Continuous Functions on Intervals
• The Continuous Extension Theorem

• Definition of a step function
• On closed and bounded intervals, continuous functions can be approximated by piecewise linear functions
• Weierstrass approximation theorem

Continuity and Gauges

• Suprema, Infima, and the Completeness Property
• Intervals

• Definition of a partition of an interval
• Definition of a tagged partition of an interval
• Definition of a gauge of an interval
• The existence of delta-fine partitions

Monotone Functions

• Monotone Sequences
• Suprema, Infima, and the Completeness Property
• Continuous Functions on Intervals

• Monotone functions
• The left and right hand limits for interior points of monotone functions
• Defining the jump pf a function at a point
• For a monotone function on an interval, the set of points at which the function is discontinuous is countable

Inverse Functions

• Monotone Functions
• Continuous Functions on Intervals

• The continuous inverse theorem
• The n^th root function

The Derivative

• Continuous Functions on Intervals
• The Definition of the Limit of a Function

• Definition of the derivative of a function at a point
• Continuity is required for a function to be differentiable
• The constant, sum, product and quotient rules for derivatives
• Caratheodory's theorem
• The chain rule

Derivatives of Functions with Inverses

• Inverse Functions
• The Derivative
• Combinations of Continuous Functions

• Relation between continuous, strictly monotone functions and their inverses

The Mean Value Theorem

• The Derivative
• Continuous Functions on Intervals

• Relative maximum and relative minimum of a function
• Interior extremum theorem
• Rolle's Theorem
• The Mean Value theorem

Extrema of a Function

• Continuous Functions on Intervals
• The Mean Value Theorem

• Increasing and Decreasing functions
• First Derivative test for extrema
• Applications of the Mean Value Theorem
• The Intermediate Value Property of Derivatives

L'Hospital's Rules

• The Mean Value Theorem
• The Limit Theorems for Functions

• Intermediate forms
• The Cauchy mean value theorem
• L'Hospital's Rule for limits of the 0/0 form
• L'Hospital's Rule for limits with infinity in the denominator

Taylor's Theorem

• Intro to Polynomial Functions
• The Derivative
• The Mean Value Theorem

• Taylor's Theorem
• Applications of Taylor's theorem

Relative Extrema and Convex Functions

• The Derivative
• Taylor's Theorem

• Using higher order derivatives to determine where a function has a relative maximum or minimum
• Definition of a convex function
• Determining whether a function is convex using the second derivative

Newton's Method

• The Derivative
• Taylor's Theorem

• Description of Newton's Method
• Examples of Newton's Method

The Riemann Integral

• The Definition of the Limit of a Function
• Continuity and Gauges

• Partitions and tagged partitions
• The definition of the Reimann integral

Properties of the Integral

• The Riemann Integral
• Bounded Functions

• Integrals multiplied by constants
• The sum of two integrals on a common interval
• If the functions f is less than the function g on some interval, then the integral of f will be less than the integral of g on that same interval.
• The Boundedness Theorem

Riemann Integrable Functions

• The Riemann Integral
• Properties of the Integral

• The Cauchy Criterion
• The squeeze theorem for integrals functions
• A step function is Riemann integrable

The Additivity Theorem

• The Riemann Integral
• Riemann Integrable Functions

• The Additivity Theorem
• Interchanging the upper and lower bounds of the Riemann integral

The Bolzano Weierstrass Theorem

• Bounded Sequences
• Subsequences

• The Bolzano Weierstrass Theorem
• Examples using the Bolzano Weierstrass Theorem

The Limit Superior and Limit Inferior

• Bounded sets
• Bounded Sequences

• Definition of the limit superior and limit inferior
• Equivalent statements defining the limit superior and limit inferior
• A bounded sequence converges if and only if its limit superior equals its limit inferior

The Cauchy Criterion for Convergence

• The Limit of a Sequence
• The Limit Laws for Sequences

• Definition of a Cauchy sequence
• A sequence converges if and only if it is a Cauchy sequence
• Contractive sequences

Properly Divergent Sequences

• Monotone Sequences
• Divergence criteria of a sequence

• Limits that tend to infinity
• Properly divergent sequences

Introduction to Infinite Series

• The Limit of a Sequence
• The Cauchy Criterion for Convergence

• Sequences of partial sums
• If a series converges, then the sequence of coefficients for that series must converge to zero.
• Examples of common series
• Comparison tests for series

Cluster Points

• Epsilon neighborhoods
• The Limit of a Sequence

• Definition of a cluster point
• The cluster point as the limit of a sequence

The Definition of the Limit of a Function

• Cluster Point
• Intervals

• The definition of the limit of a function at a point
• The uniqueness of limits at cluster points
• Examples of limits of functions

The Sequential Criterion and Divergence Criteria

• The Limit of a Sequence
• The Definition of the Limit of a Function

• The sequential criterion for limits of functions at a point
• Divergence criteria for limits
• The signum function

The Limit Theorems for Functions

• The Definition of the Limit of a Function
• The Sequential Criterion and Divergence Criteria

• Functions bounded on a neighborhood of a cluster point
• Sums, differences, products, and quotients of limits
• The squeeze theorem for limits of functions
• Examples of Limits using the limit theorems

One Sided Limits

• The Definition of the Limit of a Function
• The Sequential Criterion and Divergence Criteria

• The definition of the right and left hand limits of a function at a point
• The sequential criterion for the left and right hand limits
• The limit of a function at a point exists if and only if its left and right hand limits are equal

Infinite Limits and Limits at Infinity

• The Definition of the Limit of a Function
• The Sequential Criterion and Divergence Criteria

• The definition of an infinite limit
• If the function f is less than the function g on a specified domain and f tends to infinity, then g tends to infinity on this domain as well.
• The definition of a limit has its independent variable approaches infinity
• The sequential criterion for limits at infinity