Yes, he does, it’s episode nine. The video is hidden but you can find it by looking at the playlists, it’s called something like Engineering maths: crash course in complex analysis.
Professor, this guy is a Brit and is a bit confused cause he doesn't know the proper pronunciation of "z" and even worst is that he thinks there are many "maths" instead of one math; still this is very useful alternative to using Taylor series. My suspicion is you've seen it, but should you ever want to add a video (e.g. L02.2) or in week 2, this would be useful to add: ua-cam.com/video/N3Xxj4xNjIo/v-deo.html
![The most beautiful equation in math, explained visually [Euler’s Formula]](http://i.ytimg.com/vi/f8CXG7dS-D0/mqdefault.jpg)
thank you for these high quality lectures.
OMG my best topic in all math and my best teacher!!! Thanks A LOT. You should start to make money from it. You are the best explainer
Luckily I found your channel! You are a great teacher! Thank you so much!
Thank you for compact explanation of Euler's formula using Taylor's Series expansion.
I am gutted I did not have an engineering/maths teacher as good as you.
You are an excellent teacher. I enjoy your lecture. Thank you.
Thanks Steve. Great lecture series!
This explains clearly how the euler's and de moivre's formulas used in other videos in Google Sheets.
The derivation of Eulers formula is very interesting. Pretty sure i learnt it in calc 1 but i forgot it, so it was great to rediscover it!
Thank you very much for the wonderful lectures. Are you really writing mirrored-image texts on a cleared glass board? It’s mesmerizing!
Thank you for compact explanation of Euler's formula as pertains to Complex Analysis.
Hello professor, will you cover residue theorem in this complex analysis series?
Yes, he does, it’s episode nine. The video is hidden but you can find it by looking at the playlists, it’s called something like Engineering maths: crash course in complex analysis.
Here's the link: ua-cam.com/video/ywAEVq9ULxs/v-deo.html
Hello, Professor Brunton. The course is really helpful. But the first video of this series is missing. Please check it. Thanks a lot.
WOW! Thanx for the informative lesson...learned a lot! 😂 🎉
Awesome video!
Great video!
Is Steve writing everything backwards on glass there?
I think so. I can’t comprehend that!!
Formally you have to prove that you can rearrange the terms of the series :)
Great
fucking amazing man
Next how to integrate octonions ☺️😈🙃
Professor, this guy is a Brit and is a bit confused cause he doesn't know the proper pronunciation of "z" and even worst is that he thinks there are many "maths" instead of one math; still this is very useful alternative to using Taylor series. My suspicion is you've seen it, but should you ever want to add a video (e.g. L02.2) or in week 2, this would be useful to add:
ua-cam.com/video/N3Xxj4xNjIo/v-deo.html