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I recently bought a used copy of "Mathematical Analysis" by Apostol for \$1.0 and "Probability and Measure Theory" by Robert Ash for \$3.0 (well another \$3.99 for shipping)! When I read the first few chapters of these books it made me believe that there were many concepts that I was taught as an engineer that lack mathematical rigor and many proofs with handwaving arguments. It bugs me a bit but at the same time it is understandable to some degree. I was so excited to continue reading the books and getting nice and clear understanding of some of the concepts but I came across this post today Can I use my powers for good? and got cold feet :(

I don't want to be a mathematician but I don't want to end-up feeling "so what!?"

I guess I'm just looking for some advice from the other side of aisle, mathematicians of course :) Should I continue what I felt "really exciting" and dive into rigorous math, or stay focused on what I've been doing for the past 15 years (practicing engineering and enjoy elementary but challenging math problems and pyzzles as a hobby) and forget about all this?

Thanks!

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closed as off-topic by Peter Woolfitt, Jean-Claude Arbaut, Zev Chonoles, Rob Arthan, Newb Oct 10 '15 at 0:07

This question appears to be off-topic. The users who voted to close gave this specific reason:

  • "Seeking personal advice. Questions about choosing a course, academic program, career path, etc. are off-topic. Such questions should be directed to those employed by the institution in question, or other qualified individuals who know your specific circumstances." – Jean-Claude Arbaut, Zev Chonoles, Rob Arthan, Newb
If this question can be reworded to fit the rules in the help center, please edit the question.

  • $\begingroup$ 1. Shoud I continue what I felt 'really exciting' [...]? The answer to this should be obvious. (Excluding things that hurt you or others in any way.) 2. I guess you'll have a hard time finding a mathematician that encourages you to not be interested because I feel like this is what mathematics is about. :) $\endgroup$ – Piwi Oct 9 '15 at 21:48
  • $\begingroup$ Sorry, but this site is not for careers advice. $\endgroup$ – Rob Arthan Oct 9 '15 at 21:55
  • $\begingroup$ @RobArthan: I'm not looking for career advice, but if it feels that way to this community I will remove my question. $\endgroup$ – Ali Oct 9 '15 at 22:13
  • $\begingroup$ @Ali: please leave your question. I have been trying to bottom out exactly what the MSE policies are for careers/study advice. I think you are actually asking about self-study advice and i see no reason at all why that should be excluded. $\endgroup$ – Rob Arthan Oct 9 '15 at 22:21
  • $\begingroup$ Please try to rephare your question a bit to make more clear what you're asking. $\endgroup$ – YoTengoUnLCD Oct 10 '15 at 4:58
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I assume you are just doing this reading in your free time. In my opinion, any leisure activity that doesn't harm you and brings enjoyment is something you should pursue until it doesn't interest you anymore. I think nothing negative will come from learning things that interest you- if that happens to be mathematics, then more power to you!

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Three benefits of learning analysis:

  1. You will understand things we take for granted (limits, continuity, etc) at a solid and foundation level.
  2. You will never again forget to check conditions before applying a theorem.
  3. You will learn some very "out there" concepts like different infinities, Devil's Staircase, etc.

I would definitely go for it if you have the time and mental fortitude. The latter is a requirement.

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As a mathematician working as an engineer, it has surprised me just how much mathematics I have been able to apply. Unsurprisingly, numerical methods have been a big requirement. But other aspects that you just don't expect to use in practice (though they are vital in understanding the theory) occasionally crop up. I've had cause to do differentiations and integrations, found that applying complex numbers to a purely mechanical problem simplified it considerably, did considerable investigation into linear operators in an effort to figure out how best to salvage rounded inertia values. And many others.

The point is, investigate what you find interesting as long as you find it interesting. If you never use it, well you have still explored something enjoyable. If you do find use for it, that is just a bonus!

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