Jack R.
JuniorQ Specialties:
Primary: Math
Secondary: Statistics
Major(s): Mathematics (CLAS)
Topics by Course
MATH1011Q - Introductory College Algebra and Mathematical Modeling
Absolute Value
Algebraic Concepts
Exponential Functions
Logarithmic Functions
Mathematical Models of Lines
Polynomials
Rational Functions
Systems of Equations
MATH1020Q - Problem Solving
Externalization
Lateral Thinking
Problem Solving Strategies
Simplification
Trial and Error
Visualization
MATH1030Q - Elementary Discrete Mathematics
Combinatorics
Counting
Deductive Reasoning
Elementary Cryptography
Finite Geometries
Graph Theory
Number Systems
Number Theory
Probability
MATH1040Q - Elementary Mathematical Modeling
Algebraic Functions
Graphical Relationships
Numerical Relationships
Symbolic Relationships
Trigonometric Functions
MATH1060Q - Precalculus
Absolute Value Functions
Algebra Review (fractions, factoring, simplification, etc.)
Applications of Trigonometry (Periodic Motion)
Applications of Trigonometry (Triangles)
Basic Trig Functions
Exponential Functions
Exponential Growth and Decay
Function Composition
Functions
Graphs of Trigonometric Functions
Introduction to Periodic Motion
Inverse Functions
Inverse Trig Equations
Linear Functions
Lines and Planes
Logarithmic Functions
Modeling With Functions
Polynomial Long Division
Polynomials
Quadratic Functions
Rational Functions
Solving Trig Equations
Square Root Functions
The Unit Circle
Trigonometric Identities
Trigonometry
MATH1070Q - Mathematics for Business and Economics
Algebra
Basic Linear Systems and Matrices
Basic Probability Theory
Combinatorics
Exponential and Logarithmic Functions
Financial Mathematics
Linear Programming
Optimization
MATH1071Q - Calculus for Business and Economics
Algebra
Compound Interest
Exponential Functions
Exponential Growth and Decay
Financial Mathematics
Logarithmic Functions
MATH1110Q - A Survey of Calculus with Applications I
Applications of Differentiation
Applications of Integration
Compound Interest
Exponential Growth and Decay
Limits and Continuity
Minimum/Maximum Problems
MATH1131Q - Calculus I
Antiderivatives
Calculating Limits with Limit Laws
Chain Rule
Concavity
Continuity
Derivative as a Function
Derivatives
Derivatives of Logarithmic Functions
Derivatives of Polynomial and Exponential Functions
Derivatives of Trig Functions
Exponential Functions
Exponential Growth and Decay
Fundamental Theorem of Calculus
Horizontal Asymptotes
How Derivatives Affect the Shape of a Graph
Implicit Differentiation
Indefinite Integrals
Indeterminate Forms
Inverse Functions
L'Hopital's Rule
Limit of a Function
Limits at Infinity
Linear Approximations and Differentials
Logarithmic Functions
Mathematical Models
Minimum/Maximum Problems
Net Change Theorem
New Functions from Old Functions
Optimization
Points of Inflection
Precise Definition of a Limit
Rates of Change
Related Rates
Representing Functions
Riemann Sums
Substitution Rule
Tangent and Velocity Problems
The Definite Integral
MATH1132Q - Calculus II
Absolute Convergence
Alternating Series
Application of Calculus to Physics and Engineering
Applications of Taylor Polynomials
Approximate Integration
Arc Length
Area Between Curves
Area in Polar Coordinates
Calculus with Parametric Curves
Comparison Test
Curves Defined By Parametric Equations
Direction Fields
Improper Integrals
Integral Test
Integration By Parts
Modeling with Differential Equations
Partial Fractions
Polar Coordinates
Power Series
Probability
Ratio Test
Representing Functions as Power Series
Riemann Sums
Separable Equations
Sequences
Series
Taylor/Maclaurin Series
Volumes (Integration)
Work (Integration)
MATH1151Q - Honors Calculus I
Antiderivatives
Calculating Limits with Limit Laws
Chain Rule
Continuity
Derivatives
Derivatives of Logarithmic Functions
Derivatives of Polynomial and Exponential Functions
Derivatives of Trig Functions
Epsilon-Delta Calculations
Fundamental Theorem of Calculus
Implicit Differentiation
Indefinite Integrals
Indeterminate Forms
L'Hopital's Rule
Limit of a Function
Limits and Continuity
Minimum/Maximum Problems
Optimization
Precise Definition of a Limit
Substitution Rule
Tangent and Velocity Problems
MATH1152Q - Honors Calculus II
Absolute Convergence
Alternating Series
Applications of Taylor Polynomials
Approximate Integration
Arc Length
Area Between Curves
Area in Polar Coordinates
Calculus with Parametric Curves
Comparison Test
Curves Defined By Parametric Equations
Improper Integrals
Integral Test
Integration By Parts
Partial Fractions
Polar Coordinates
Power Series
Ratio Test
Representing Functions as Power Series
Separable Equations
Sequences
Series
Taylor/Maclaurin Series
Volumes (Integration)
Work (Integration)
MATH2010Q - Fundamentals of Algebra and Geometry I
MATH2011Q - Fundamentals of Algebra and Geometry II
MATH2110Q - Multivariable Calculus
Calculating Surface Area and Volume with Integrals
Limits and Continuity
Minimum/Maximum Problems
Partial Derivatives and Gradients
MATH2130Q - Honors Multivariable Calculus
Calculating Surface Area and Volume with Integrals
Limits and Continuity
Minimum/Maximum Problems
Parametric Equations
Partial Derivatives and Gradients
MATH2210Q - Applied Linear Algebra
Applications of Linear Algebra
Basic Linear Systems and Matrices
Cramer's Rule
Determinant of a Matrix
Dot Product
Existence and Uniqueness of Solutions (Linear Equations)
Finding the Inverse of a Square Matrix
Gram-Schmidt Process
Linear Equations
Lines and Planes
One-to-one Functions
Onto Functions
Row Reduction (Gaussian Elimination)
Systems of Equations
Vector Spaces
Vector Subspaces
MATH2360Q - Geometry
Deductive Reasoning
Euclidean Geometry
Geometric Transformations
Math Proof Writing
Non-Euclidean Geometry
Parallelism
The Axiomatic Method
MATHOTHER - Other
Algebra Review (fractions, factoring, simplification, etc.)
Basic Linear Systems and Matrices
Basic Probability Theory
Basic Trig Functions
Elementary Differential Equations
Exponential and Logarithmic Functions
Financial Mathematics
Functions
Math Proof Writing
Polynomials
Review Material in a Prerequisite Course
The Unit Circle
Trigonometry
STAT1000Q - Introduction to Statistics I
Binomial Random Variables
Confidence Intervals
Correlation and Regression
Diagrams (Pie Chart, Stem and Leaf Plot, Histogram)
Finding Sample Size
Hypothesis Testing
Normal Random Variables
Quartiles, Empirical Rule and Chebyshev's Inequality
Sampling Distribution and Central Limit Theorem
Uniform Random Variables
STAT1100Q - Elementary Concepts of Statistics
Binomial Random Variables
Confidence Intervals
Correlation and Regression
Diagrams (Pie Chart, Stem and Leaf Plot, Histogram)
Finding Sample Size
Hypothesis Testing
Normal Random Variables
One- and Two-Sample Procedures
Quartiles, Empirical Rule and Chebyshev's Inequality
Sampling Distribution and Central Limit Theorem
Uniform Random Variables
STAT2215Q - Introduction to Statistics II
Analysis of Variance
Binomial Random Variables
Chi-Square Test
Confidence Intervals
Correlation and Regression
Diagrams (Pie Chart, Stem and Leaf Plot, Histogram)
Finding Sample Size
Hypothesis Testing
Multiple Regression
Non-Parametric Procedures
Normal Random Variables
Quartiles, Empirical Rule and Chebyshev's Inequality
Sampling Distribution and Central Limit Theorem
Uniform Random Variables