Math Museum

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 See firsthand how to build compass and straight-edge constructions.  Perhaps some puzzles to go along with it, and some explanation of the limitations of the process - hints about why we can't work with transcendental numbers this way, but ways to cheat if we can use more than just a straight-edge.
-== Complex functions ==
+EyGXmt  <a href="http://qwczxtpimmaw.com/">qwczxtpimmaw</a>, [url=http://ccsmlohhqeib.com/]ccsmlohhqeib[/url], [link=http://oxafcubewfyw.com/]oxafcubewfyw[/link], http://hvisxjzisbad.com/
-Visualizations and interactive graphing of certain functions in the complex plane, along with how they relate to regular functions in the reals.  In particular, it would be cool to try to demonstrate Euler's formula <math>e^{ix}=\cos(x) + i\sin(x)</math> and possibly even relate this to Fourier series.  For example, we could project the shadow of a slinky and explain that each orthogonal projection can be thought of as the real/imaginary part of <math>e^{ix}</math>. And something on Riemann's zeta function and Hypothesis,and Conformal mapping (air flow simulations).
 == Games from number theory ==

Revision as of 01:51, 27 September 2009