I just found out about the Tech Talks with Brian and oh my... I've been BINGINGGGG on these videos. I just finished my EE degree and watching all these videos with amazing clear explanations have been doing wonders in bridging the gaps of my undergrad knowledge. Thank you so much for these gems, Brian! You da goat.
I really liked the domain map, that was really helpful for seeing how the frequency analysis techniques are connected. Also the z domain animation wrapping around the s domain was crazy. This video was great
Hi everyone, I'll be on and answering questions during the premiere. Feel free to drop any questions or comments here in the meantime and I'll try to get to them before then. Cheers!
I know z domain but hearing Brian's voice makes me happy😂 I already graduated from my master's but watching his videos reminds me if control theory lectures which were my fav of all.
at last you have made a video on z-plane after z- transform and have given a reference/recommendation of another video also. May ALLAAH give you better reward
Thank you Brian for a thought-provoking video. The quirks and physical meaning of each domain (frequency, s, z, discrete frequency) felt like an undervalued topic during my undergrad. I have enjoyed your recent videos on this subject--especially the "map" relating the various domains and your intuitive explanation as to why the z-domain uses polar coordinates. I will be recommending this video to friends who have questions on the z-domain. Looking forward to your next video, and I hope you have a great day.
Thank you Brian for the great explanation on Z-Domain. I am currently working on Data driven method for nonlinear systems using the Discrete Volterra Series; I didn't catch the relationship between this representation and the Z-Domain. I think now, I have a kind of better understanding. Keep up the good work !!
How can the Z transform help identify how different frequencies decay in a signal? What can it tell about a signal and how the frequencies change over time? Thank you!
@ 15:01 *integrator* example is also misleading. Integrator is actually a continuous-time device.... the discrete-time equivalent of integrator is *accumulator* that sums the number of samples... Integrator never takes a discrete-time signal as input, u[k] and gives discrete-time output, y[k] as shown in the video.... it works on continuous-time signals
These videos are amazing. Would it make sense to use the z-transform for system identification and with that build (or tune) a controller? Would be nice too see an example like the one you did with the arduino heater :)
Thanks for the clarification, my explanation is misleading. I should have just explained that the Z-domain is the discrete-time equivalent of the S-plane. But you are right, that the domain itself is continuous.
I just found out about the Tech Talks with Brian and oh my... I've been BINGINGGGG on these videos. I just finished my EE degree and watching all these videos with amazing clear explanations have been doing wonders in bridging the gaps of my undergrad knowledge. Thank you so much for these gems, Brian! You da goat.
I really liked the domain map, that was really helpful for seeing how the frequency analysis techniques are connected. Also the z domain animation wrapping around the s domain was crazy. This video was great
Hi everyone, I'll be on and answering questions during the premiere. Feel free to drop any questions or comments here in the meantime and I'll try to get to them before then. Cheers!
I know z domain but hearing Brian's voice makes me happy😂
I already graduated from my master's but watching his videos reminds me if control theory lectures which were my fav of all.
at last you have made a video on z-plane after z- transform and have given a reference/recommendation of another video also. May ALLAAH give you better reward
I’m currently studying DSP and this is really helpful. Thank you!
Thank you Brian for a thought-provoking video.
The quirks and physical meaning of each domain (frequency, s, z, discrete frequency) felt like an undervalued topic during my undergrad. I have enjoyed your recent videos on this subject--especially the "map" relating the various domains and your intuitive explanation as to why the z-domain uses polar coordinates.
I will be recommending this video to friends who have questions on the z-domain.
Looking forward to your next video, and I hope you have a great day.
Thank you sir, i got clarity on z transform
Great to hear 🙌
Thank you Brian for the great explanation on Z-Domain. I am currently working on Data driven method for nonlinear systems using the Discrete Volterra Series; I didn't catch the relationship between this representation and the Z-Domain. I think now, I have a kind of better understanding.
Keep up the good work !!
Hey that was fantastic, can't wait for the digital controller video, thanks 👍🏼
Thanks! A digital controller video would be a good follow up for this.
How does mapping from the s-domain to the z-domain affect the frequency response of a digital filter? Specifically near the Nyquist rate
Plot z,s of the tustin transformation s=(2 (z-1))/((z+1) t_s)
Thanks, i am looking for this type video , got good clarity,
How can the Z transform help identify how different frequencies decay in a signal? What can it tell about a signal and how the frequencies change over time? Thank you!
Thanks, very nice animation, do you mind if I use it in my lecture ?
@ 12:24 impulse response should be discrete not continuous because time domain signal is discrete... that is ZT exists only for discrete-time signals
@ 15:01 *integrator* example is also misleading. Integrator is actually a continuous-time device.... the discrete-time equivalent of integrator is *accumulator* that sums the number of samples...
Integrator never takes a discrete-time signal as input, u[k] and gives discrete-time output, y[k] as shown in the video.... it works on continuous-time signals
Beautiful thanks!
Glad you like it!
Very helpful, thanks.
These videos are amazing. Would it make sense to use the z-transform for system identification and with that build (or tune) a controller? Would be nice too see an example like the one you did with the arduino heater :)
Thank you for your suggestion!
yes finally!!
Thanks ❤
You're welcome 😊
z-domain is not discrete... it is continuous
Thanks for the clarification, my explanation is misleading. I should have just explained that the Z-domain is the discrete-time equivalent of the S-plane. But you are right, that the domain itself is continuous.
RIGHT! DTFT is continuous, while DFT is discrete.