There’s more to mathematics than rigour and proofs

“People who learn (say) English as their native tongue, and French as a second language, are usually somewhat distinguishable from those who learned these languages in the other order.” Yes, the sociolinguistics and fMRI studies both show this noncommutivity. See also that Hoijer was also the first to use the term “Sapir-Whorf hypothesis” about the complex of ideas about linguistic relativity. The Strong version
http://www.mnsu.edu/emuseum/cultural/language/whorf.html
is out of style. But fun to explore in science fiction, the best being such as:
The Languages of Pao, a novel by Jack Vance, first published in 1958, in which the Sapir-Whorf hypothesis is a central theme. This novel centers on a fictional experiment in modeling a civilization by perturbing its language. As the mad scientist behind this experiment, Lord Palafox, says in chapter 9: “We must alter the mental framework of the Paonese people, which is most easily achieved by altering the language.”

Very nice articles which clearly unleash the learning stages. Transition from 1-2 is done by most of the people. But from 2-3 requires a lot, which also decides your field of interest.
Transition from 2-3 involves ‘Analysis’, patience really matters here.

Considering a simple example finding an area.
At rigorous stage is just applying the regular method to get the result.
In post-rigourous it’s more like how result is gonna change with change in the shape of the curve.
Heuristic is just an educated guess, to say whether its gonna increase or decrease based on the shape change….

Manjunath

Hi, Terence Tao. I always loved physics and mathematics, and I am an aspiring primary and secondary education mathematics teacher in Brazil. I’m studying plane geometry from a text book that uses Hilbert’s axioms. I can follow the given proofs I read, and sometimes even find alternative proofs with a similar strategy of the one I read. But often I study a chapter and five days after I can’t prove the theorems I studied the proofs, and then eventually I give up and look at the book. I never had this problem when my “proofs” where just intuitive arguments to convince me, because once I found one I would always remember it, at least slight and could reconstruct it at any time. I was really eager to learn how to really prove all those things, and because of that, I feel pathetic, because I know this is the basic of the basic of the basic in mathematics, and not even near the advanced stuff and if I become a teacher maybe I won’t use that kind of proofs. Because of that I would really like to know your opinion about this, because I don’t feel I’m advancing. Sorry about my English.

Relevant to these arguments is the notion of context. See our paper

“What should be the _context_ of an adequate specialist undergraduate education in mathematics?”, The De Morgan Journal 2 no. 1, (2012) 411–67.http://education.lms.ac.uk/wp-content/uploads/2012/02/Brown_and_Porter.pdf

A mathematics education should not just be about learning to write neat answers to exam questions!

More discussion is on my popularisation and teaching page.

http://www.bangor.ac.uk/r.brown/publar.html

We discover via inductive thinking and prove via deductive, is that it?

I always wondered how people discovered/conjectured the Pythagorean theorem. Was it by empirically measuring the sides of many right triangles?

Or how can someone conjecture the inscribed square problem “Does every plane simple closed curve contain all four vertices of some square?”? I can’t get how people discover those things…

Also, the axioms themselves are experimental facts, why can’t I start with the Pythagorean theorem as an axiom? Or use other axioms?

Or, are transformational proofs in geometry also considered synthetic geometry? (like the one in http://www.google.ru/books?id=qwyBPybT4oMC&printsec=frontcover&redir_esc=y#v=onepage&q=%22examine%20the%20midpoint%22&f=false ,pg 101)

My (philosophical!) two cents:
http://m-phi.blogspot.nl/2013/03/terry-tao-on-rigor-in-mathematics.html

One analogy I like is that between describing a route to the station in terms of the landscape (e.g. turn tight at the oak tree and left at the traffic lights) and in terms of listing all the cracks in the pavement. One task in mathematics is to build language and notation in which to describe the “landscape”, i,e, the structures which arise and help to guide our understanding. Of course, Grothendieck was a master at this. And of course the modern language for discussing mathematical structures is category theory. Sometimes also one “knows” that something is true because it fits with so many things. I also spent 9 years on an “idea for a proof in search of a theorem”: what was lacking was a gadget (a homotopy double groupoid) to realise the idea.

I also feel there is not enough discussion about methodology. See the article: http://pages.bangor.ac.uk/~mas010/methmat.html . “The methodology of mathematics” . which has been published variously.

Hi Terry,
Should formalism be introduced strongly at the middle school and high school level? Or only people in graduate or advanced undergraduate should be introduced to formalism. I am asking as a person wanting to teach mathematics to middle school and high school students.
Vivek

There is no connection between maths and rigour. Opera singers or ballet dancers, for instance, also require insane amounts of rigour and precision in the profession of their skill. However, no one actually thinks of classical music or ballet dancing in such terms. At the same time, rather reductively and discriminately, math is perceived in this way, almost to the point of confusion. I prefer intuitive insights or visual explanations over rigorous proofs any day.

Intuition is very dangerous, no matter how intelligent one is. Rigour is very important in mathematics. Of course there is little or no rigour in mainstream mythmatics. Analysis is not rigorous, never was rigorous, will never be rigorous.

Terry Tao is no mathematician, Fields Medal or not.

Great blog post, I found this quote

“In contrast, when unchecked by a solid intuition, once an error is introduced in an argument by a pre-rigorous or rigorous mathematician, it is possible for the error to propagate out of control until one is left with complete nonsense at the end of the argument.”

very analogous to the different stages in a programs life cycle where a bug is introduced. Having a more costly effect the earlier the bug is introduced into that life cycle.

Going through the rigor in Analysis was fine. Though it was the lingering questions: “How did the author think of this?”, “Why is it defined this way?”, etc. (especially in clever manipulations of inequalities) that haunted me and made me doubt whether I actually understood what was being taught.

I contrast this with an IBL (independent based learning) class I took in number theory. In that course, there was motivation for the problem. There were explanations and excerpts about history that allowed me to gain insight into why someone would prove something a certain way, or define a thing that way.

An excellent description of the learning curve!

This post was pointed out to me by a reader of my blog, Mr Peter Munro, as a comment to a post about my ongoing troubles (http://www.alexcolovic.com/2016/08/before-olympiad.html#comment-form). Even though I am a chess grandmaster for quite some time, and I can safely put myself in the “post-rigorous” stage, I still find that I am very prone to formal mistakes. This has affected my performances of late, which has also affected my confidence. I think mathematicians are lucky not to have to live in a competitive environment!