This guy is the best Math teacher I have ever had in my life. Thank you so much for your effort, you literally made this topic as simple as addition and subtraction.
Perhaps the best video on YT on how to solve ODEs by LT. Yes and a shame that only 126 views for this really great video. We can learn more out of a single video than a week of a lectures in a calculus class.
You all probably dont give a shit but does any of you know a trick to log back into an Instagram account?? I was stupid forgot my password. I love any tips you can give me.
@Chaim Wilder Thanks for your reply. I got to the site on google and Im in the hacking process now. I see it takes a while so I will reply here later when my account password hopefully is recovered.
This man is my hero. I am an Electrical Engineer student and I love this videos. Really helpful for my circuit analysis 2 class and my Differential Equations class. Thanks
By far the best teaching of Laplace transform that I have found online, better than both DE professors that I've had! Videos are very well put together too. Much appreciated!
I look this course and have no idea, what Laplace Transform can be usefull for. And at 8:00 - it hit me!!! I just realised the power of it! WOW! Thanks!
I'm a MSE phd student taking up adv. engineering math as bridge course since my background is not engineering. The laplace transform was discussed in our class last week and I didn't quite absorb all of it. After watching your great videos (from video 1), I finally had a a better understanding . Thank you for sharing your knowledge through these videos :)
Thank you so so very much you are a real blessing. May God bless for making our lives so much easier. Its hard to find a real smart person that can actually bring it down to the level of a students understanding but you have done this i am very grateful.
dumb question after doing an example i came up with at random (I just made up a second order differential equation that seemed easy enough), Can the solution be a complex function? I don´t see why it shouldn´t but I thought I better ask. The DE I tried was D^2x-Dx=0 with x(0)=1 and x'(0)=1 and the result was Cos(it) unless I have a mistake somewhere. yup there was a big mistake as I just checked the inital conditions, the first is met, the second isn´t. I was just happy that my first try at it came out immediately in the shape like in the table s/(s^2-1) so s/(s^2+i^2) meaning cos(it) though maybe my "failure" was me missing that I just made up a "hidden" first order?
nice video but I hope you don´t mind me saying that, but I think a derivation of the la place transform of the derivative would have been worth it. Especially as you referenced what happens inside the transformation multiple times. And then we could´ve very well stopped at a point "here is the laplace transformation of the original function x" which of course would show that the la Place transform for higher order derivatives is recursive (because the la place transform of the integrated part is still a derivative and thus the whole process kicks up again). But that´just my opinion. But well I just want to know why something happens. I understand why you decided against it, after all I just saw the LT of the wanted function in the LT of the first derivative and pretty much knew how to deal with higher order derivatives (just do it again until all derivatives are gone. pretty much i just couldn´t come up with a completely correct general expression on my own upon seeing the LT of the integrated function appear in the LT of the derivative). But I personally would have preferred to see the derivation. No matter as you said it´s just IBP so I should be easily able t odo it myself. chosing x' dt as dv and e^-st as u should do the trick, right?^^
This guy is love . His teaching comes purely from heart .
This guy is the best Math teacher I have ever had in my life. Thank you so much for your effort, you literally made this topic as simple as addition and subtraction.
I rarely comment on any videos but you are an amazing teacher. Thanks a lot!
Perhaps the best video on YT on how to solve ODEs by LT. Yes and a shame that only 126 views for this really great video. We can learn more out of a single video than a week of a lectures in a calculus class.
So happy you liked it!
Get our Free App and View all Lessons!
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You all probably dont give a shit but does any of you know a trick to log back into an Instagram account??
I was stupid forgot my password. I love any tips you can give me.
@Chaim Wilder Thanks for your reply. I got to the site on google and Im in the hacking process now.
I see it takes a while so I will reply here later when my account password hopefully is recovered.
@Chaim Wilder it did the trick and I now got access to my account again. I am so happy:D
Thanks so much you saved my ass !
@Finnley Kaiden you are welcome =)
This man is my hero. I am an Electrical Engineer student and I love this videos. Really helpful for my circuit analysis 2 class and my Differential Equations class. Thanks
I really appreciate it!
His language is clear and concise and his articulation is easily understandable. Amazing classes.
Such a shame this only has 98 views. people are missing out.. Thank you for these videos!
Thank you!
Get our Free App and View all Lessons!
www.MathTutorApp.com
Now 9.8k time changes
13,704 views
Look at his name.........
37k.. still more to come
By far the best teaching of Laplace transform that I have found online, better than both DE professors that I've had! Videos are very well put together too. Much appreciated!
You are very welcome!
I look this course and have no idea, what Laplace Transform can be usefull for.
And at 8:00 - it hit me!!! I just realised the power of it! WOW! Thanks!
Extremely Brilliant explanation.. you deserve more.
Man you are just splendid with reasoning.
Mr you are my teacher 🙏 I don’t speak yet English fluently but can follow and understand your explanations. Thank you so much 👌🙏
I'm a MSE phd student taking up adv. engineering math as bridge course since my background is not engineering. The laplace transform was discussed in our class last week and I didn't quite absorb all of it. After watching your great videos (from video 1), I finally had a a better understanding . Thank you for sharing your knowledge through these videos :)
So happy you liked it!
Get our Free App and View all Lessons!
www.MathTutorApp.com
woow i do not need to go to classes anymore you are an amazing lecture plz keep us updated in the math world
I skipped all my classes, and you got my right on track in a weekend! Thank you for your videos they are very helpful❤.
thank you our Math teacher. i learned with this video that Laplace transform can be exploited for solving diff.equations in easy way.
the best video with best explanation ever with true basics
Really thank you go this series of videos about laplace transform
In Arabic : شكرا لك أيها المعلم
I really appreciate it!
Jason, MathAndScience.com
Woow... you're such an amazing teacher 🎉 this is the first time I've understood this topic
life saver!!!!! you deserve so much more
Thank you so much for taking time to break everything down into steps. You're a lifesaver. God bless you!
You are so welcome!
Badass class💯♥️ Thank you the entire world sir🫡
Again. I love you....
I'm so grateful sir🇿🇦
Excellent teacher.Anybody can easily understand your steps and great method thanks a lot
I love you, Jason! you're the greatest! I'm your fan!!! ❤
Awww thanks so much!
Great explanation and perfect pace
U r really an awesome teacher!!!!
I wish I could like this a hundred times, thank you 🤲🥺
thanks so much Mr Jason, you're a hero ❤
Im in 10th grade and amazed that you were able to make me understand stuff till here. You are amazing ngl
omg much respect and grateful for you, wish my lectures were able to teach this well !
Great Video! Appreciate that a lot
But in my textbook it's solved without the inverse, and it's much easier.
Thank you so so very much you are a real blessing. May God bless for making our lives so much easier. Its hard to find a real smart person that can actually bring it down to the level of a students understanding but you have done this i am very grateful.
Thanks so much!
needs this for my masters
thank you
you are awesome teacher, thank you!
You are great at teaching 💐.
Pls make more videos of other topics
How the heck did Laplace come up with this? Genius. The amount of brainpower is staggering.
NOBODY TAUGHT ME THIS WAY .........SUPERB!!!!!!!!!!!!!!!!!!!!
I reallly wish I had professors like you
Awww thanks!
Very good videos. Great teacher.
very useful and beuatiful videos. Thank you!!!
Excellent video, though, at 17 minutes in, I'm pretty sure you had explained the Dx notation three times.
Wow! Amazing teaching. Thank you Sir.
Welcome!
Best Video on the topic
Lesson starts at 3.30
In Shona language this Lecturer is named Shangwiti meaning legend.😊
Thank you Sir . Can I get a generalization for Laplus transform of n th derivative of X with respect to t please 🙏
Thank you so much you are the best teacher
Thanks so much! Jason
Thanks for 4:49, 14:44
this chanell owns laplace transform
Ha thanks!
dumb question after doing an example i came up with at random (I just made up a second order differential equation that seemed easy enough), Can the solution be a complex function? I don´t see why it shouldn´t but I thought I better ask.
The DE I tried was D^2x-Dx=0 with x(0)=1 and x'(0)=1 and the result was Cos(it) unless I have a mistake somewhere.
yup there was a big mistake as I just checked the inital conditions, the first is met, the second isn´t. I was just happy that my first try at it came out immediately in the shape like in the table s/(s^2-1) so s/(s^2+i^2) meaning cos(it)
though maybe my "failure" was me missing that I just made up a "hidden" first order?
Your channel is awesome , but I have a recomandation , Furie series video. I support you channel to grow.
nice video but I hope you don´t mind me saying that, but I think a derivation of the la place transform of the derivative would have been worth it. Especially as you referenced what happens inside the transformation multiple times. And then we could´ve very well stopped at a point "here is the laplace transformation of the original function x" which of course would show that the la Place transform for higher order derivatives is recursive (because the la place transform of the integrated part is still a derivative and thus the whole process kicks up again). But that´just my opinion. But well I just want to know why something happens. I understand why you decided against it, after all I just saw the LT of the wanted function in the LT of the first derivative and pretty much knew how to deal with higher order derivatives (just do it again until all derivatives are gone. pretty much i just couldn´t come up with a completely correct general expression on my own upon seeing the LT of the integrated function appear in the LT of the derivative). But I personally would have preferred to see the derivation. No matter as you said it´s just IBP so I should be easily able t odo it myself. chosing x' dt as dv and e^-st as u should do the trick, right?^^
starts at 3:40
Immense gratitude Sir.
Love from INDIA
(PU)
Brilliant explanation
excellent teaching skill
Thank you so much for this. 100 thumbs up (y)
Perfect
Be blessed..
Excellent!!! Thanks!
What goes from zero to infinity - s or t?
you very good
thank you so much
GREAT
23:33
Thank you sir.
Can you help me and solve question for me now
🙏🏾
your super I love you
💪💪💪💪💪
😍😍😍