Girls Math Night: Difference between revisions
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Meetings can be in-person or virtual, depending on the needs of the mentor and students. | Meetings can be in-person or virtual, depending on the needs of the mentor and students. | ||
In-person or hybrid presentations are held at the end of each semester. | |||
'''Graduate Organizers:''' Bella Finkel | '''Graduate Organizers:''' Bella Finkel | ||
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'''Quaternions''' | '''Quaternions''' | ||
'''Definitions and Properites of the Trace''' | |||
'''Non-Euclidean Geometries''' | '''Non-Euclidean Geometries''' | ||
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[https://www.girlsangle.org/page/bulletin-archive/GABv14n03E.pdf Honk!: An Introduction to Parking Functions, Part 2] | [https://www.girlsangle.org/page/bulletin-archive/GABv14n03E.pdf Honk!: An Introduction to Parking Functions, Part 2] | ||
'''Sunzi's Theorem (The Chinese Remainder Theorem)''' | |||
=== Written Resources === | === Written Resources === | ||
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== Administrative Resources and Contacts == | == Administrative Resources and Contacts == | ||
Erin Bailey, Associate Director of Community Engaged Research in the College of Letters and Science | |||
Dr. Gloria Marí-Beffa, Associate Dean for Research | |||
Latest revision as of 20:30, 13 December 2024
What is it?
Why be a mentor?
When? Where?
Meetings can be in-person or virtual, depending on the needs of the mentor and students.
In-person or hybrid presentations are held at the end of each semester.
Graduate Organizers: Bella Finkel
Faculty Organizers: Tullia Dymarz
Topics and Resources
Topics
Cardinality of Sets
Bijections, injections, and surjections
Quaternions
Definitions and Properites of the Trace
Non-Euclidean Geometries
Parking Functions
Honk! Honk!: An Introduction to Parking Functions, Part 1
Honk!: An Introduction to Parking Functions, Part 2
Sunzi's Theorem (The Chinese Remainder Theorem)
Written Resources
Naive Set Theory by Paul Halmos
Mathematics and its History by John Stillwell (This is a versatile book. Some chapters are appropriate for students at all levels, most are suitable for students who have taken calculus, and a few at the end are ideal for students who have seen some group theory.)
Linear Algebra Done Right by Sheldon Axler (Most suitable for students who have taken linear algebra)
Most suitable for students with prior exposure to proof-based mathematics:
Primes of the Form x^2+ny^2 : Fermat, Class Field Theory, and Complex Multiplication by David A. Cox
Matrix Groups for Undergraduates by Kristopher Tapp (Suitable for students who have taken linear algebra and a proof-based mathematics course)
Past Projects
Administrative Resources and Contacts
Erin Bailey, Associate Director of Community Engaged Research in the College of Letters and Science
Dr. Gloria Marí-Beffa, Associate Dean for Research