Teaching

Below records my teaching activities: 

University of Washington (Instructor): 

• Summer 2024: Math 208 A, Matrix Algebra

University of Washington (TA and Grader): 

• Math 402, Introduction to Abstract Algebra (Grader, Summer 2023)

• Math 327, Introduction to Real Analysis (Grader, Spring 2024)

• Math 136, Accelerated Honors Calculus III (TA, Spring 2025)

• Math 135, Accelerated Honors Calculus II (TA, Winter 2025)

• Math 134, Accelerated Honors Calculus I (TA, Autumn 2024)

• Math 126, Calculus III (TA, Spring 2023, DC, DD, Autumn 2025, BA, BB)

• Math 125, Calculus II (TA, Autumn 2022, DC, DD, Winter 2023, EA, EB, Winter 2024, EC, ED)

• Math 124, Calculus I (TA, Autumn 2023, AG, AH)

I actively participate in the WDRP program and am very willing to work with people. I am also willing to get new ideas for WDRP. Please let me know if there are any suggestions regarding the topics. The followings are projects I conducted: 

• Spring 2025: Algebraic Curves, with Jamie Welsh, we used the book Algebraic curves by William Fulton to understand how to apply algebraic geometric methods in classical geometry problems such as Bezout's theorem, Pascal's theorem and Pappus theorem. 

• Winter 2025: Solving Polynomials, with Ryan Holbert, we studied basics in algebra and understood the theorem of sum of two squares. Solving Polynomials, with Azalea Ham, we used the book Galois Theory by Patrick Morandi, to understand the basics of Galois theory and how that applied to solving polynomials. 

• Autumn 2024: Elliptic Curves, with Karuna Petwe, we used the book Elliptic curves, number theory and cryptography by Lawrence Washington and read a paper in l-isogeny path problem to understand modern cryptography with elliptic curves. Logic and Turing machine with Bhavana Honavalli, we used the book Introduction to Mathematical logic by Elliot Mendelson to understand the basics in logic and Turing machine. 

• Spring 2024: A mathematical perspective through history, with Rowan Surkan, we used the book Mathematics and its History by Stillwell, with a focus in the history and ways of formulations of algebra, especially in Galois theory. 

• Winter 2024: Elliptic Curves, with Rashad Kabir, we used the book Elliptic Curves, Modular Forms, and their L-functions with other online resources to understand the works on classifying the elliptic curves and the Weil conjectures on elliptic curves. 

• Autumn 2024: Elliptic Curves, with Xiaobo Li, we used the book An introduction to mathematical cryptography by Hoffstein, Pipher and Silverman to understand the application of elliptic curves in cryptography. 

• Spring 2023: p-adic numbers, with Rashad Kabir, we first used the book p-adic numbers: an introduction by Fernando Gouvêa, then the book p-adic numbers, p-adic analysis and Zeta functions by Neal Koblitz to understand Dwork's approach to the Weil conjectures. 

• Winter 2023: p-adic numbers, with Mark Polyakov, we used the book p-adic numbers: an introduction by Fernando Gouvêa, with a goal of classifying the local fields. 

University of Notre Dame: 

• Fall 2019: Math 20810 Honors Algebra I (Grader)

• Fall 2019: Math 20750 Ordinary Differential Equations (Grader)