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For questions in Mathematics Education as a scientific discipline. For more hands-on questions on teaching Mathematics, please use the tag teaching. There is also a Stack Exchange community http://matheducators.stackexchange.com/

6 votes

Are there proofs that you feel you did not "understand" for a long time?

I'd also like to contribute an answer on the fundamental theorem of calculus. The standard proof (to my knowledge, the only proof) of the "first fundamental theorem" $$\int_a^b F'(x) dx = F(b) - F(a …
6 votes

Are there any books that take a 'theorems as problems' approach?

The little commutative algebra book by Atiyah and MacDonald is one such—the reason it's so little is that probably two-thirds of the results in it are in the exercises. I guess you know the subject i …
62 votes

How to memorise (understand) Nakayama's lemma and its corollaries?

It's easiest to understand for local rings, so let $R$ be one with residue field $k$. Nakayama's lemma just says that a finitely generated $R$-module is zero if and only if the induced $k$-vector spa …
Ryan Reich's user avatar
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2 votes

What are your experiences of handouts in mathematics lectures?

I provide my typed lectures to the students via my website. Looking at a nice, standard linear algebra course, I found that although many people told me they greatly appreciated the notes and used th …
2 votes

Making sure that you have comprehended a concept

I think I understand a theorem if I can reconstruct the hypotheses remembering only the conclusion. Likewise, I think I understand a theory if the axioms all seem reasonable and obvious. However, yo …