Laplace Transform: First Shifting Theorem
Free ebook tinyurl.com/EngMathYT
I calculate the Laplace transform of a particular function via the "first shifting theorem". This video may be thought of as a basic example. The first shifting theorem is a useful tool when faced with the challenge of taking the Laplace transform of the product of exponential function with another function. The Laplace transform is very useful in solving ordinary differential equations.
Пікірлер: 151
I was trying to understand my lecture recordings for like over half an hour, and you explained all of it in less than 5 minutes, thank you
Dr.Tisdell, thank you so much I was literally pulling my hair out to figure out what to do and your simple lecture helped me out! You should teach more!! You're an awesome teacher!
God bless you for posting these videos! You're helping people all over the world. I'm watching these in Minneapolis, Minnesota. Thanks again for your generosity. I hope I can also share knowledge with others in this way someday.
Wow I learned more in 8 Minutes than my entire 3 hour lecture at school. I should send this to my professor. Maybe he'll learn a thing or 2.
thank u Dr. !! FINALLY I UNDERSTAND HOW TO USE THE 1st shift theorem !! thanks a lot for the clear explanation !
Thank you Dr Tisdell. Well explained. I understood everything clearly.
Sooo good!! So fast, so clear! :)
every university professor could learn a thing or two from you. keep up the informative videos, they are awesome! one suggestion, leave the video on the final solution for a bit so we can pause it and look over the solution. great stuff, thanks!
Thank you very much, Sir, for your lecture on FST which can be easily comprehended by any one. Await many more videos from you, Sir.
I hope your realise just how BRILLIANT you are. Not just because you're a mathematician but BRILLIANT as a unique individual who has the gift of teaching. Thank you
You have saved 1 part of my life. Thank you so much
Your explanations and general enthusiasm completely humuliate any lecturer I have come across so far in England; and I attend a top University (Imperial College London). Thankyou so much
Hey man you're so awesome, clear, and simple! Thanks
awesome teaching style... It becomes very useful to me as i was facing alot of problems in solving such questions. thank you very much Sir.
Very good, clear, simple explanation. Thank you.
Helpful and insightful, I'll be watching more of your videos in time to come!
A big thank to you Dr. Chris!! this helped me much!
Thanks so much! - this is really well simplified and clearly explained!
Thank you very much man, I have a quiz tomorrow. Appreciate it
thank you so much. I just don't understand why university lecturers find it so hard to explain things as simply as you just did.
Great video mate. Nice and simple and well described!
Thank You. Quite helpful during last minute revision
Amazing tutorial, very easy to follow
Amazing way of teaching, sir! This is seriously gonna help me pass this semester, despite our course teacher who teaches at the speed of light ^~^...Thanks a million! :)
Good, clear presentation!
I encourage you to do so - it's very rewarding!
Thank you sir for your explanation. I understand really fast than reading notes.
feeling lucky i found your videos. they are good very helpful.
Cheers Dr.Tisdell, your video was extremely helpful
you saved me man just before my final exam in 6 hours i finally get it i hope the best for you 😍😍
U've saved a life, THANK YOU SIR! Love from Oman :D!
Nicely done. Very informative!
thank you so much Professor for all of this great explanation
Thanks very much ,, am a student of chemical engineering in Uganda and l had a challenge with the first shifting theorem but now l understand it better...
As I was solving this a couple of seconds a head of you I suddenly gasped at all the inversion of laplace problems I failed at that were all first shifting theorems and I had no idea! thanks for the video
very helpful- just about to do a little test on Laplace that counts for a massive 2% of my degree, this helped straighten things out alot (my maths professor is Russian, very thick accent) thanks again.
You are one of a kind. i love you soo much
Awesome!! thanks Dr keep it up you among the ones who make the leader of tomorrow Happy teacher's day!!!
clear crystal, thank you sir
Great explanation, thank you!
My pleasure and please do check out my new ebook with more examples. The free link is in the description.
thank u sir ur class was really awesome i really enjoyed the class.thank u for an an interesting class sir
Thank you so much! very well explained!
outstanding explanation, really helped :)
Thank you Dr.Tisdell. I envy your intelligence, once a DJ, now a maths professor. I guess being envious is ok when reflected for good cause :) UWS Parramatta student
Thank you, that was very helpful!
very well taught, thanks very much
Thank you, I want to understand about laplace function now.
Thanks a lot, very helpful!
Glad you enjoyed this, Thomas. Thre are many more examples in my free ebook - the link is in the description.
Thank you sir. I missed my class on this topic. But now i understand F.S.T. From. Electrical And Electronic Engineering student(Singapore Polytechnic)
Thisajes so much sense👌👏
for 2009 the quality is too good......its helping me in 2023 its that good dr.
@DrChrisTisdell
9 ай бұрын
Woohoo! Always pleased to hear that these resources are still being used. 👍
Thank you so much Doc!!
thank you! you're a great teacher :)
Wow, really really nice tutorial
Great! Glad you enjoyed it and hope you also find my free ebook useful. The link is in the description.
thank u for ur helpful videos
You're welcome!
your handwriting is intoxicating; i like the aesthetic of the whiteboard
Nice!!! Thank You Very Much. U help Me A lot,DrChris
Still helping after 14 yrs ❤❤❤
thank you very much for posting this clip
You are very welcome.
OMAGAWD...this video is sooooooo helpfulllllll Thankuuuuuuuu
Amazing content
Very useful!..Thanks so much!...
Thank you, sir! 😊
Thank you so much Sir May God bless you Sir :)
Hi Neil! If I understand you correctly, then I think you're saying that a better solution method would be to substitute $e^{2x} \cos 3x$ straight into the integral and then do some algebra on the exponents to show that $F(s-2)$ is required? If so, then that would suffice! Thanks for commenting.
Thank you sir, this was very helpful My final is tomorrow, wish me luck
#greatJob #subscribed THANK YOU! All the way from Trinidad!
Thank you sir..
Great Video
very well explained!!! i wish u were my lecturer ^_^
Thanks for your very kind works and good luck with your exams (soon, yes?)
bro u nailed it
you made it so easy dude
Everything makes so much more sense now
@ronalddlelariarte The reason he used 3 in the expression you've mentioned is it's the coefficient of t in the transformed expression cos(3*t), and the parameter a as defined in the expression you've mentioned absolutely shouldn't and doesn't refer to the parameter a defined in the video, so the use of 3 as the parameter a in that expression doesn't contradict with the use (shown in the video) of 2 as the parameter a in the Laplace Transform shifting power, e^(a*t).
I love ur videos and I am so very grateful! I was wondering how would we solve something like t^2e^(-3t) sin4t? F(s)= L{t^2sin4t} but then what steps do we use?
Thankssss very much sir
Thank you very much
thank you very much.
thank you vere much - from kingdom of saudi arabia - mechanical engineering student
I love you thank you so much
thank you so much............
Thanks sir ☺️
Excellent
That helped. Thanks.
thank you sir
My pleasure and please check out my free ebook, too!
thankyou so much!
hi,DrChris. can i know what is the difference between ur first and second shifting method to the time and frequency method? Is that ur first and shifting method can do all the laplace transform questions?
Wow amazing, my lecturer tried to explain this in 1 hour, u explained it in 7 mins, thanks a lot!
awesome!!
thankx sir nice lecture watching in pakistan
thx sooooooooooooooooooooooooooooooooooooo much!!!!!!!!!!!!!!!!!
Thank u so much :)
well explained thank you Dr... Anyone in 2020 here??😊