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Department of Mathematics
The City College of New York
NAC 8/133
Convent Ave at 138th Street
New York, NY 10031

Phone: (212) 650-5346
Fax: (212) 650-6294
math@ccny.cuny.edu

CCNY :: Division of Science :: Mathematics

Department of Mathematics

Meet the Platonic Solids: Icosahedron

From http://commons.wikimedia.org/wiki/Main_Page

The Platonic solids have been known since antiquity, and they play a prominent role in Plato's description of the physical world. The planar faces of each solid are identical polygons. Only equilateral triangles, squares and regular pentagons appear.

Although the platonic solids seem to be purely geometric objects, they embody a number of deep algebraic features. Their symmetries, for example, relate to the solution of polynomial equations of low degree.

If you would like to learn more about Platonic solids, you can start here.

Math Club

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Welcome to the Math Club page!


Executive Committee, 2018-2019


Mission:


Contact:


How to Become a Math Club Member

Please join the Google Group and the Math Club group on Facebook. For any inquiries, email us at ccnymathclub(at)gmail(dot)com.

Announcement: Recruiting New Board Members

We are looking to put together a new set of executive board members to take over operations for the math club starting Fall 2019. For those interested, please get in touch with Pavel Javornik.

Prof. Daugherty's Advice for Applying to PhD Programs

Click here for some very comprehensive guidelines for continuing your education and really great advice for those interested in pursuing a PhD in mathematics.


Undergraduate Lecture Series:

The Math Department is organizing a student seminar designed to have faculty present accessible lectures to start conversations on advanced mathematics. These talks will be accessible to undergraduate students and cover a wide range of topics. For more information, please check out the seminar website or join the Google group to be notified!



Upcoming Events:

Stay tuned for more events in the Fall!


Past Events:

We will show how the basic question of how to lay tiles in a room leads mathematicians to interesting questions and new concepts in geometry.

On May 3rd we will be inviting Tai-Danae Bradley and Jozef Dodziuk from the Grad Center, and Anna Tao from CCNY as panelists on the Friday, May 3 Graduate Panel. We will be asking them questions about the most important things you need to know for getting into a graduate program, and then open the floor for any questions you might have.

The AWM, Math Club, and Women in Computer Science are hosting a data science panel, where we will have professionals and academics at various levels talking about what it is like to be a data scientist. We invite everyone to come listen and ask questions.

The math club and AWM, alongside with Dr. Alice Medvedev, will be hosting an REU Awareness Event. She will be talking about the kinds of REUs available this summer, where to apply, and how to strengthen your application. REUs typically admit first semester sophomores to first semester seniors and range in difficulty.

The Division of Science will be hosting a [Research Opportunities Fair] in the Marshak cafe. The Math Club and other organizations will be tabling there from 12:15 and on. So feel free to come by!

We will be having some students presenting the work they did over the summer with the Math department in NAC 7/312 from 12:30 to 1:50. So if anyone wants to come hang out and discuss about the type of research undergraduates get into, feel free to come by. We'll also have food and refreshments.

We will be hosting an event in NAC 6/114, 12:30 - 1:50. We will have the chair, Michael Shub, professors Bourabee, Wolf, and Santoro talking about things they find interesting and what to expect in higher level math courses, as well as what you might do with a math degree. There will be free food, and everyone is welcome to attend!

For $n$-dimensional Riemannian manifolds $M$ with Ricci curvature bounded below by $-(n-1)$, the volume entropy is bounded above by $n-1$. If $M$ is compact, it is known that the equality holds if and only if $M$ is hyperbolic. We show the same maximal entropy rigidity result holds for a class of metric measure spaces known as $RCD^*(K,N$ spaces. While the upper bound follows quickly, the rigidity case is quite involved due to the lack of a smooth structure on these spaces.

In 1736, Euler was given a problem to which he said there is no solution. This problem laid the foundations of graph theory and prefigured the idea of topology. We will talk about this problem and why it was so significant along with some fun explorations into the world of graph theory!

We're currently putting together a list of all the events we've created, or been a part of. If you're interested, check back later!


Opportunities: