teaching
Current and past courses taught at Tulane University.
In this page you can access all the material for the courses that I tought in the past few years. In the upcoming event, you can see my office hours and the course schedule.
Upcoming Events
Spring 2026: Complex Analysis
Course Code: MATH 4300 Tulane University
This is an introductory course on complex analysis. We begin by introducing complex numbers and their fundamental properties before exploring the theory of functions of a complex variable, specifically studying their analyticity. The core of the course focuses on complex integration, utilizing the Cauchy integral formula. We conclude by introducing the concept of conformal maps and proving the Riemann Mapping Theorem.
Grading Scheme:
- Midterm Exams: 45%
- Final Exam: 30%
- Homework: 25%
Course Material:
- 📂 Lecture Notes (PDF) (Last Update 01/25/2026)
- 📂 Work Sheets 1 (PDF)
Fall 2025: Calculus III
Course Code: MATH 2210 Tulane University
A comprehensive course in differential and integral calculus of several variables. We focus on both theoretical understanding and concrete applications. Topics include vector functions, partial derivatives, multiple integrals (double and triple), and the fundamental theorems of vector calculus (Green’s, Stokes’, and Divergence Theorems).
Grading Scheme:
- Midterm Exams: 45%
- Final Exam: 30%
- Homework: 15%
- Quizzes: 10%
Spring 2024 & 2025: Calculus II
Course Code: MATH 1220 Tulane University
This course focuses on three main problems: Integration (techniques and numerical methods), the solution of basic differential equations, and the approximation of functions via polynomials (Taylor series). We emphasize critical thinking and the application of calculus to science and engineering.
Key Topics:
- Integration techniques & Numerical integration
- Differential Equations
- Sequences & Series
Fall 2023: Calculus I
Course Code: MATH 1210 Tulane University
An introduction to the study of functions, limits, derivatives, and integrals. The course covers the instantaneous rate of change and total accumulation (area under a curve), linking them through the Fundamental Theorem of Calculus.
Key Topics:
- Limits and Continuity
- Differentiation (Rules and Applications)
- Introduction to Integration