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Irrational Numbers
Under the direction of: Paul Friedman
In Math 199 you proved that $\sqrt 2$ is irrational. Perhaps you also proved that $\sqrt 3$ is, too. In fact, so is $\sqrt p$ for any prime, and in fact so is $\sqrt{\hbox{non-perfect square}}$. But you also learned that the set of irrational numbers is uncountable(!) so that you can't possibly list them all.
This thesis would be a study of irrational numbers and some of their algebraic and analytic properties. One suggestion is to do a reading of (sections of) Ivan Nivan's book, Irrational Numbers.
This is a one-term thesis.
Prerequisite: None.
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