Hi friends, thanks for watching! I want to thank Squarespace for sponsoring this video - go to Squarespace.com for a free trial, and when you’re ready to launch, go to www.squarespace.com/parthg to save 10% off your first purchase of a website or domain. As always, let me know what other topics to cover in future videos :)

Yes, certainly interested in a lecture about voltage and current, thanks.

I read once that Gauss wanted to call them “lateral” numbers which, given the complex plane, makes a lot of sense.

Thank you parth I'm really glad you made this video because I was always intrigued on how imaginary numbers would be used I've heard of them in my math classes but never used them to solve a physics problem so it's nice that you gave me your window onto how that would work

Electrical circuits series all the way! Great video as always

I really enjoy your content. I initially saw some of your videos when I was getting into physics a while back. I really couldn’t understand the math but was able to pick up on your enthusiasm for the subject as well as gain insight with a layer of abstraction. I think personalities like yours are crucial to spreading these physical/mathematical ideas effectively. Upon coming across your channel now after having brushed up on some math, I’m left much more fulfilled and informed with the concision of your explanations, as well as your taste in content.

Consensus: Imaginary numbers Gauss: Lateral numbers Parth: JEFF!

Thank you parth the structure of the video is really nice ❤️

I wish I had math and physics teachers like you during my school days... You make learning science more fun and beautiful! ❤

Man !!! You just saved my whole Classical Mechanics

1:30 Actually, +/- 2i. 5:20 Yes, the square of the imaginary number is the product of that number and its complex comjugate.

“Fundamentals of Electric Circuits” 5E is a good read, rather an easy to follow textbook on things that concern phasors, circuits and complex numbers too. Mathew Sadiku is an excellent writer on the topic of Electromagnetics too. These helped me a lot during my college days..and Parth does well in providing a lot of insight to young students these days..👍🏻👍🏻

Make as many videos on as many concepts as you want, will watch them all.

I would really really love to see the video about electric circuits in 5 difficulties you mentioned!

Awesome video! Would love to see more on this topic. I’m currently in quantum 2 and still don’t fully understand the interpretation of imaginary numbers in a system lol

Would love to see a video from you on electric circuits

I was just waiting for Parth to upload another interesting topic.

Absolutely would love a video on circuits. Can you talk about the connection between resistance and impedance.

Yes , i´m also interested in advanced circuit analysis & thank you very much for your videos on Physics

yeah it would be pretty nice, if you could do a video about eletric circuits, thanks for the vid btw

Can you go thru the related concepts of j^2=1, but j 1 and epsilon^2=0, but epsilon 0 ?

Yes. do the electric circuits referred to at time stamp 11:40

Yes, please do the other videos you talked about on circuits.

I'm a great fan. My 12yo son gets a kick out of your videos, too. Keep it coming!

This was well presented my guy! Well done!

thank you so much for such a nice explaination, my main intrest was in understanding quantum physics relation to complex number.

Yes, a video on Euler's Identity will be helpful. Thanks by the way.

PLEASE DO make a circuit analysis video!

Hey, G your Physics videos are awesome. Can you also make math videos.

your way of explaning is sooo damn good

Very clear explanation: thank you! I would like to see all the videos you mentioned, me having the feeling I might actually get them.

Good Morning! The correct is ì² = -1 And V-1 = { - i ; i } The principal Square of -1 in The set complex numbers is i We write V-1 = i ; so you must to indicate That this is a principal Square of -1 and that exist a second Square that is this - i. I wish you a Good Day!

Thank you Parth. VERY much interested in your proposed electric circuits video - particularly the beginner level!

Thanks for this wonderful video. Clear as always

Can you make a more in depth video for simple harmonic motion and waves relationship to complex numbers like how we use the properties and all of that stuff.

Thanks, I understood how to put them in polar form but not what it actually represented

I'm suspicious of the 13:30 "you can't have a 3i% chance of finding a particle in space" thing. Maths doesn't lie.

This video needs more views! V good

8:37 yes! yes! yes!....... Pls make a video on euler's identity

Would love to see those 5 videos!

Would love a talk about theory and application of Fourier, wavelets, splines, etc.

Yes, please. Very interested.

He perfectly knows what to tell vs. to skip (like no parentheses when multiply compl. numbers, 2:51). And OMG I'm going to call compl. numbers »Jeff« for the rest of my live, hilarious!🤣Speaking about names: He used the approp. name for the Argand plane. 1st time I saw this-ever.

Was thinking of doing my PhD thesis in Jeff analysis

Actually, i is defined such that i^2 = -1. This means that ‘solving for i’ gives two values ( sqrt(-1) and -1*sqrt(-1) ), so this is something you shouldn’t do. This is also the reason why sqrt(-4) is actually undefined, there is no positive square root for complex numbers because i can be considered neither positive nor negative.

Thank u that was very helpful.

Thank you! Very helpful!

3:50 "We can chose to represent" - it is not a choice, by Euler's formula, Imaginary Numbers are orthogonal to real numbers. However, the choice of plane is arbitrary in a 3D space.

Hell to the yeah would I love to see the Electronic discussion in 5 levels.!!!!

Thank you very much Parth. Can you give the 5 lectures on electrical circuits and the pseudo Ohms law you emphasize?

Great Video! A video on electric circuits in 5 levels of difficulty would be wonderful

certainly need voltage related content

Really interested in the circuit video

I would definitely like to see a video on circuits and on electric currents in general

Thanks for educating us...I now know what my professors never explained.

I, for one, would like to leave a standing election on any physics videos Parth would like to make: an unqualified YES!

11:43 definitely!

I always like your video before watching it.

Yes plz, i have to take the circuit exam this semester

@2:29 was that an outtake that you decided to keep in

Appreciate you sir

Please make videos on electrical circuit in depth.

Definitely do the 5 level difficulty for electr[on]ic circuits

I'd be intested in a Video about electric circuits!

Yes please make a video about eulers identity

I first ran into imaginary numbers in junior high school. The teacher said something like "imaginary numbers don't exist, but they are useful in some things like electric circuits." Luckily, my high school algebra teacher had a math degree and wasn't having it, but the damage was already done. This is a great explanation!

A set of axiomatic operations could be created whose operation was similar to that of complex numbers. The fact is, complex numbers being useful in physics doesn't mean they're fundamental to mathematics. In fact, the rule that multiplying two negative numbers returns a positive number, while useful in many real-life mathematical calculations, fails in many calculation jobs and that is why we need the concept of the absolute value of a number.

Plz make a video about e and the euler identity

Thanks a lot for such a detailed explanation to complex numbers, but I still don't understand regarding the computation of complex numbers where the real part is taken at last. Part of the "real part results" from the multiplication is contributed by the imaginary part of the original complex numbers, which were considered as "not interested", but they are actually involved in the "interested part" of the final result, I still don't understand that. Recently, I was studying the Fraunhofer diffraction which is an application of Fourier transform, some textbooks are mentioning the same idea.

Thanks

No seriously, call it Jeff :) excellent video. tks.

yeah that electric circuit video would be amazing.

Euler's identity leads to the beautiful result: exp(i π) = 1 or if you prefer exp(i π) - 1 = 0. Here exp is the alternative functional notation to represent "e raised to the power of" whatever follows in the parenthesis. If you were asked "Which 5 significant symbols (constant entities?) of mathematics would you invite to dinner?" The answer most certainly would be those present already in the identity above - e, i, π, 1 and 0! Just imagine how much mathematics and physics you could do with these 5 entities alone. By the way Euler is my favorite mathematician. He (besides being a mathematical genius) was a really wonderful person. Unlike Newton who was a really obnoxious person in his personal and public life.

I might be wrong but I thought even with a resistor the voltage and current have a 90 deg offset. One is sine wave and the other a cousine wave. Hope you can can clarify, thanks.

Amazing video again parth thank you. BTW when are you going to visit India?

Please mate, do a video on electric circuits!

Parth - Thanks; excellently clear explanation as always. But ne thing has always =puzzled me. You take a maybe-impossible 'thingie', 'i', then boldly assert you can add or multiply units of 'i'. That's one questionable thing. You then boldly assert you can add a real and imaginary 'number' (who said this thing was a 'number' in any conventional sense?) to produce what looks disconcertingly like a vector - one component of which is certainly no conventional number. Again, what justifies this aside from 'suck it and see?' Eh? Eh? There. I feel better already, anticipating your explanation!

TY. When you say 14:20 "such as the Aharanov-Bohm effect that i've discussed in this video here if you're interested" i am interested but i don't see anything. I dunno why. I'm using Opera on Windows 10 on PC. Do I need a mobile phone or to active annotations or something?

lecture about electronic components soon, it is fun they say. *electroboom joins in*

When my solution ends up with an imaginary number in the answer... I'm just trying to make physics easier to understand. Actually it's usually because I put it in the calculator wrong.

Is your merchandise available in India?

Plz make vdo on ac and dc motor

For the oscillator, complex numbers are not a convenience. The Space of position-speed is thé complex plane. In that case, complex exponential solution is thé REAL solution

I like the idea of different level of electric corcuit

Ah yes, Aharonov-bohm effect. That's what i needed to understand complex numbers in real life.

omg thx

I have a question. If the root of 1 (√1) exist in the real numbers axis, the why the √(-1) doesn't exist in the real numbers axis? Why we have to use another axis?

Good!

To answer your question, Euler's Identity can not (imho) be over discussed.

Do an electronics video!

Jeff-Numbers, whatever it takes, i will try to establish this. Way too funny to ignor^^

I have problems in digesting the term 'density'

Would like to see the 5 electronics videos ✋

Super awesome

Could complex numbers be used in even more basic physics, like projectile motion? They are two dimensional numbers, so maybe they could be used to describe X and y velocities as one complex velocity

11:45 we need electric circuits 5 levels of difficulty

I want videos on electric circuit sir

rotation

Yes

i itself is periodic, i^5 = i, so it should be no surprise that some functions of i are periodic.