I am an electrical engineering major and I can legitimately say you saved my life and kept me from having to repeat my Calc 4 class. Thank you so much for the explanations!
@@abdallababikir9154 Yeah that's pretty weird. I've heard some schools mix linear algebra with ODE and call it Calc 4. Calc 4 at my school is just Vector Analysis.
I'm taking Calc3 and Diff Eq at the same time currently, and if it weren't for your videos, I know I'd be failing this year, because my professors are basically reading the textbook to us. I just wish I knew your channel existed when I took Calc1 and 2, I would have gotten better grades. I'm sharing your channel with everyone I know.
For this presentation he's wearing a long-sleeved shirt without the sleeves rolled up. Good idea - this is serious subject matter, and we students can't be distracted by those biceps.
Professor Leonard, you are the reason why I will pass my Calculus 3 class and my Differential Equations Class. Thank you very Much! I wish my Professors were as good as you at explaining the work, you make math fun! I Wish I could have been in your classes. Kind regards from South Africa.
Just a thought for the first problem at (6:24). If v = y^(-2), then dv/dx = -2y^(-3)dy/dx. If you divide the whole equation by y^3 you will be able to substitute in (-1/2)(dv/dx) directly. From there you can put it in linear form and solve. Saves you from all of the fraction exponents. Hard to explain in text but you essentially do two substitutions that gets you to dv/dx +2v= -2 in less steps. That's actually the brilliant thing about using substitution methods.
So I watched this video and the other homogeneous equation video yesterday night and this morning and was able to figure out 3 of my 4 exam problems (open notes). I want to thank you Professor Leonard for your videos because I would definitely have not been able to do my exam without your in depth explanations and tips 🙌🏽❤️
I'm so so thankful for this really. My prof introduced diff eqs, its properties, separation of variables, linear DEs and integrating factors, and bernoulli's equation all within a span of 40 minutes and i could barely understand anything. You're a lifesaver
Played all your videos at the speed of 1.5 and really enjoyed your marvel. I absorbed everything you imparted like a sponge Professor Leonard. You have helped me get a straight A in Math courses. Keep up your excellent work, Professor!
Today I did the second example by myself when a few days I had no clue what any of this was including a foggy idea on u-sub. It's crazy how many leaps in knowledge I'm experiencing from just following these videos. Thank you thank you thank you. Can never be overstated how much your help guides people like me who thought they were hopeless. You're the best!
Even after I'm done with the diff eq class this semester, I will anxiously wait for the rest of your lecture videos. Hands down the best explanation anyone has given on Bernoulli's.
Yes..., yes you make sense!!!! The hand-waving is yet explained again!!! Thank you, Sir!!! This beats the heck out of a zoom white board where all we get is a non-rigorous proof (because coming from Calc III Students know what that is....not at all), of Bernoulli's DE's, then thrown into examples where the product rule is bypassed when we learned it, LIKE, yesterday. As a student, I do not need five shorthand examples in chicken-scratch on a digital whiteboard over zoom, I need 1 or 2 examples that dive into the details as you do in your videos. You're the Clark Kent of Mathematics, yet be the one who has found the Kryptonite of college paid professors that lack a basic understanding of how to actually teach what they understand themselves!
I just spent 6 hours trying to work through this one math problem on homework not including the 4 hours spent the day prior. I looked at videos, notes, re-watched lectures, and asked peers, but I just was not getting anywhere. Finally, after all that stress and pulling my hair, I was able to follow the process, know what I was doing, and FINALLY get the correct answer. I cannot thank you enough. My grades are everything to me right now. Thank you.
Thank you Prof Leonard! This class has been a lifesaver. Hoping you come back soon and give us a Linear Algebra course! Taking it next quarter and don't know how I'll make it without your help.
I scored pretty good marks in maths in my initial semesters because of him... when he had stopped making vedios i had no choice so left maths and took another subject as minor.. my syllabus for this sem was differential equations even though I dont have the subject anymore I still watch his vedios 😁😁
You are a seriously fantastic teacher! The detail and depth you provide with each new topic answers almost any question a student could possibly have. You also organize the information is such a way that it is easy to memorize the concept structure and problem solving structure.
Long but useful and necessary. I tried learning this with quick 10 min videos but it wasn't cutting it. This is the kind of step by step explanation that works for complex topics.
I love you. Thank you for being great. You make so happy every time because you explain everything so clearly. I hope you have a wonderful and fulfilling life that gives you everything you want Professor Leonard. You really do make a difference. Thank you. ❤
Dear Sir!! you are the one of the best professor I have ever seen. if u are on social media like Instagram or facebook then please let us know that so that we will start follow you on other platforms too.
These computations can be simplified. Indeed, set v=y^{-2}, you get that dv/dx=-2y^{-3}dy/dx. Then divide both sides of the equation dy/dx - y =y^3 by y^3. You get y^{-3} dy/dx -y^{-2}=1. So, (-1/2)dv/dx-v=1 or dv/dx+2v=-2 or dv/dx=-2v-2. This is a simple separable equation dv/(-2v-2)=dx. Now integrate both sides: (-1/2)ln(|v+1|)=x+c. This implies that ln(|v+1|)=-2x+C. Finally, apply the exponential and solve for v to get v=-1+Ae^{-2x}.
Amazing, you've taught me all Cal classes + some stuff we didn't cover in my Differential Equations class (like in this video). A little comment I have is that I feel that you could've maybe done the work for all n to show how it always simplifies to a linear ODE. Keep up the good work!
You are a freaking champ dude, I wish schools and textbooks taught like this. This was very clear and it helps a lot that you explain the logic behind the method.
I just wanted to mention that at 54:33, where you get the Linear differential equation, it turns out you can also solve it by using seperable equations. You can bring 6xv to the right side and factor 6x out...
My friend recommended this channel to me. It is really helping me study for my first DiffEQ exam. I did notice a POSSIBLE ERROR at 24:20 bottom right-hand corner. V=Ce^(-2x) -1 does not = Ce^(-2x) +1 Great video. Please keep making videos! This is crazy helpful!
Professor Leonard - "He who is only an athlete is too crude, too vulgar, too much a savage. He who is only a scholar is too soft, too effeminate. The ideal citizen is the scholar athlete, the man of thought and the man of action." ~Plato
As an alternative way to derive the substitution, you can divide both sides of the equation by y^n. Then the indicated substitution becomes easier to see.
Just learned homogenous and Bernoulli equations a couple hours before my exam today using your videos, and I felt like I actually knew what I was doing on the exam. Thanks for being a great teacher!!
Yep! I took a break for Thanksgiving and I'm going to take another for Christmas Break, but I will certainly be filming again in the Spring and until this project is complete. Enjoy!
Professor Leonard You are a living legend. Respect and Love, I have learned a lot from you Sir and still learning and will definitely donate in the near future cox I maybe getting a job :D.
It's good to practice the theory for linears, but like Bernoulli always gives a result, you can shortcut the linear to y = 1/rho • ∫ rho F(x) dx, or in this case v= and back-substitute. Just be careful to apply 1/rho (or 1/mu) to the entire integral including C.
@@ProfessorLeonard your videos + Slader.com have saved me and are allowing me to pursue a career that I never thought I would be able to because of the math requirements.
This type of equation randomly showed up during the solution steps for one of the example problems in my Applied Mathematics course about perturbation theory, and I had forgotten about it.
Hey! I'm noticing that at 20:47, the bernoulli differential equation we obtained can be solved by separation. Is this correct or do we have to continue solving the DE using an integrating factor?
I have tried solving that bernoulli differential using the separation technique and obtained the same result! I answered my own question I guess... Would there be any reason why I can't do separation?
Thanks for the video. However, I want to point out that at 8:47 you wrote y^2 = v^-1 => y = v^(-1/2). Correct me if I am wrong, but I think you should have written y = (+,-)v^(-1/2) instead. So I am not sure if you are allowed to make the following substitutions as you did.
I’m not even in Diff Eq anymore, just stopping by to say hi lol. Sending good vibes from Florida!
bro this is A MILLION ZILLION TRILLION GAZILLION TIMES LESS CONFUSING THAN MY BOOK THANK YOU!!!!
Totally
I agree, but you could write this as a constant lol
Wow that’s a lot.
I am an electrical engineering major and I can legitimately say you saved my life and kept me from having to repeat my Calc 4 class. Thank you so much for the explanations!
y'all call it calc 4, differential equations
@@abdallababikir9154 Yeah that's pretty weird. I've heard some schools mix linear algebra with ODE and call it Calc 4. Calc 4 at my school is just Vector Analysis.
im sorry Calc 4?
Didn't know Isaac Newton made a 4th sequal
@@warwick802 Calculus 4: Revenge of the Limit
I'm taking Calc3 and Diff Eq at the same time currently, and if it weren't for your videos, I know I'd be failing this year, because my professors are basically reading the textbook to us. I just wish I knew your channel existed when I took Calc1 and 2, I would have gotten better grades.
I'm sharing your channel with everyone I know.
For this presentation he's wearing a long-sleeved shirt without the sleeves rolled up. Good idea - this is serious subject matter, and we students can't be distracted by those biceps.
Fan for life. Leonard is the GOAT
Professor Leonard, you are the reason why I will pass my Calculus 3 class and my Differential Equations Class. Thank you very Much! I wish my Professors were as good as you at explaining the work, you make math fun! I Wish I could have been in your classes.
Kind regards from South Africa.
I just love you man
Youre the best maths teacher, would be a pleasure studying from you
This link ruclips.net/video/pSIqUnPIkP4/видео.html is also a nice video on Bernoulli's Equation.
might as well send you my degree when i graduate since you're the only reason ill pass most of my courses lmao
🥰
Just a thought for the first problem at (6:24). If v = y^(-2), then dv/dx = -2y^(-3)dy/dx. If you divide the whole equation by y^3 you will be able to substitute in (-1/2)(dv/dx) directly. From there you can put it in linear form and solve. Saves you from all of the fraction exponents. Hard to explain in text but you essentially do two substitutions that gets you to dv/dx +2v= -2 in less steps. That's actually the brilliant thing about using substitution methods.
So I watched this video and the other homogeneous equation video yesterday night and this morning and was able to figure out 3 of my 4 exam problems (open notes). I want to thank you Professor Leonard for your videos because I would definitely have not been able to do my exam without your in depth explanations and tips 🙌🏽❤️
bruh I would kill for an open note DE exam
Please see my Chanel (Abdulhussein Alsultani) to see the differences between my method in solving th e examples)
Thank you very much.
I'm so so thankful for this really. My prof introduced diff eqs, its properties, separation of variables, linear DEs and integrating factors, and bernoulli's equation all within a span of 40 minutes and i could barely understand anything. You're a lifesaver
Played all your videos at the speed of 1.5 and really enjoyed your marvel. I absorbed everything you imparted like a sponge Professor Leonard. You have helped me get a straight A in Math courses. Keep up your excellent work, Professor!
This is the most effective lecture on Bernoulli Differential Equations I have ever had.
Thank you professor for the video. Looks like there is a typo at 24:05, Ce^(-2x) - 1, but you wrote + 1
He rectifies it later at 24:54
I am a Mechanical Engineering major at UNF. I find your videos extremely helpful. I do tell everyone to watch your videos when I saw an opening
Today I did the second example by myself when a few days I had no clue what any of this was including a foggy idea on u-sub. It's crazy how many leaps in knowledge I'm experiencing from just following these videos. Thank you thank you thank you. Can never be overstated how much your help guides people like me who thought they were hopeless. You're the best!
this absolute unit of a man is going to be the reason I pass my differential equation class god bless you good sir
Even after I'm done with the diff eq class this semester, I will anxiously wait for the rest of your lecture videos. Hands down the best explanation anyone has given on Bernoulli's.
Yes..., yes you make sense!!!! The hand-waving is yet explained again!!! Thank you, Sir!!! This beats the heck out of a zoom white board where all we get is a non-rigorous proof (because coming from Calc III Students know what that is....not at all), of Bernoulli's DE's, then thrown into examples where the product rule is bypassed when we learned it, LIKE, yesterday. As a student, I do not need five shorthand examples in chicken-scratch on a digital whiteboard over zoom, I need 1 or 2 examples that dive into the details as you do in your videos. You're the Clark Kent of Mathematics, yet be the one who has found the Kryptonite of college paid professors that lack a basic understanding of how to actually teach what they understand themselves!
i have never ever a teacher like you after my school! you just awesome! thank you a lot!
You have a gift for teaching and explaining complex topics. Thank you for providing these lectures for free to everyone
I just spent 6 hours trying to work through this one math problem on homework not including the 4 hours spent the day prior. I looked at videos, notes, re-watched lectures, and asked peers, but I just was not getting anywhere. Finally, after all that stress and pulling my hair, I was able to follow the process, know what I was doing, and FINALLY get the correct answer. I cannot thank you enough. My grades are everything to me right now. Thank you.
Thank you Prof Leonard! This class has been a lifesaver. Hoping you come back soon and give us a Linear Algebra course! Taking it next quarter and don't know how I'll make it without your help.
I scored pretty good marks in maths in my initial semesters because of him... when he had stopped making vedios i had no choice so left maths and took another subject as minor.. my syllabus for this sem was differential equations even though I dont have the subject anymore I still watch his vedios 😁😁
This link ruclips.net/video/pSIqUnPIkP4/видео.html is also a nice video on Bernoulli's Equation.
You are a seriously fantastic teacher! The detail and depth you provide with each new topic answers almost any question a student could possibly have. You also organize the information is such a way that it is easy to memorize the concept structure and problem solving structure.
I need this man leading me into combat
This link ruclips.net/video/pSIqUnPIkP4/видео.html is also a nice video on Bernoulli's Equation.
this is the only one on youtube that doesnt make you remember the general solution. thank you
Long but useful and necessary. I tried learning this with quick 10 min videos but it wasn't cutting it. This is the kind of step by step explanation that works for complex topics.
"leveraging the derivative of the power rule to undo a power rule inside of a product rule to undo that to find your original equation"= this video.
Was told about your channel today by a math major at my school. You're my hero.
11:35 "that garbage" lmao i love this prof
I love you. Thank you for being great. You make so happy every time because you explain everything so clearly. I hope you have a wonderful and fulfilling life that gives you everything you want Professor Leonard. You really do make a difference. Thank you. ❤
Just watched the whole thing and I finally understood Bernoulli!, thank you so much superman!
Your videos are amazing. Also the way you have placed the ads on you videos are also great.
2 hours recording this math video in his free time. Professor Leonard is a badass!
if every math teacher watched professor leonard the world would be a much better place
you are the best thing to happen to our universe
Dear Sir!! you are the one of the best professor I have ever seen.
if u are on social media like Instagram or facebook then please let us know that so that we will start follow you on
other platforms too.
god, I freaking love you
This link ruclips.net/video/pSIqUnPIkP4/видео.html is also a nice video on Bernoulli's Equation.
give this guy a raise
these videos saved my life...
This helped me immensely. Thank you so much, sir!!
prof Leonard LIVING legend himself
im gonna remember him in my prayers may god bless you
Leonard, you're the best.
This video saved my life, thank you so much!!
Bernoulli is a name appeared very often in Fluid Mechanics.
Very helpful. With much gratitude Professor Leonard! You rock 🚀🎸🎯🏆
This man is far more handsome than a math professor has any right to be. (Also, he's really, really good at teaching.)
you made math look easy and cool for me, thank you for that.
These computations can be simplified. Indeed, set v=y^{-2}, you get that dv/dx=-2y^{-3}dy/dx. Then divide both sides of the equation dy/dx - y =y^3 by y^3. You get y^{-3} dy/dx -y^{-2}=1. So, (-1/2)dv/dx-v=1 or dv/dx+2v=-2 or dv/dx=-2v-2. This is a simple separable equation dv/(-2v-2)=dx. Now integrate both sides: (-1/2)ln(|v+1|)=x+c. This implies that ln(|v+1|)=-2x+C. Finally, apply the exponential and solve for v to get v=-1+Ae^{-2x}.
Amazing, you've taught me all Cal classes + some stuff we didn't cover in my Differential Equations class (like in this video). A little comment I have is that I feel that you could've maybe done the work for all n to show how it always simplifies to a linear ODE. Keep up the good work!
This link ruclips.net/video/pSIqUnPIkP4/видео.html is also a nice video on Bernoulli's Equation.
You are a freaking champ dude, I wish schools and textbooks taught like this. This was very clear and it helps a lot that you explain the logic behind the method.
i love you professor leonard greetings from ecuador!
I just wanted to mention that at 54:33, where you get the Linear differential equation, it turns out you can also solve it by using seperable equations. You can bring 6xv to the right side and factor 6x out...
You are the best, Sir. Loads of respect from Pakistan!
This link ruclips.net/video/pSIqUnPIkP4/видео.html is also a nice video on Bernoulli's Equation.
@@jarvisty3640 subscribed :)
@@rainasajid6678 I found that video lecture so nice. There are a lot in the channel and I think is is just new.
you're unique and I feel you should one day be a professor at Carleton University or MIT .
My friend recommended this channel to me. It is really helping me study for my first DiffEQ exam.
I did notice a POSSIBLE ERROR at 24:20 bottom right-hand corner. V=Ce^(-2x) -1 does not = Ce^(-2x) +1
Great video. Please keep making videos! This is crazy helpful!
Professor Leonard
- "He who is only an athlete is too crude, too vulgar, too much a savage. He who is only a scholar is too soft, too effeminate. The ideal citizen is the scholar athlete, the man of thought and the man of action."
~Plato
Thanks professor for this fantastic lecture.
This guy is a math rock be star. Where was he when I took Cal 1,2,3, and Diif EQ?
if nobody got me, i know that Professor Leonard got me. Amen
I was so lost in class but this video helped me alot thanks
1st! Salute to Prof Leonard!
I'll second that! The master at work...incomparable.
Thank you professor ! This helped me so much!
Thank you so much sir ,,could'nt be more easier than this,,thanks alot,,❤❤❤love from Pakistan
you are a life saverrrrrr
Thank you professor Leonard
As an alternative way to derive the substitution, you can divide both sides of the equation by y^n. Then the indicated substitution becomes easier to see.
Just learned homogenous and Bernoulli equations a couple hours before my exam today using your videos, and I felt like I actually knew what I was doing on the exam. Thanks for being a great teacher!!
MasterClass!!!
Super helpful! Thanks so much for your detail!
love you prof leonard
The first example was also a separable equation, -2 goes to the right side, you factor it out to get -2(1+v). Then just divide by 1+v and integrate
He’s back.
Yep! I took a break for Thanksgiving and I'm going to take another for Christmas Break, but I will certainly be filming again in the Spring and until this project is complete. Enjoy!
Professor Leonard You are a living legend. Respect and Love, I have learned a lot from you Sir and still learning and will definitely donate in the near future cox I maybe getting a job :D.
@@abdulmomun5592did you ever donate
thank you very much sir. love from sri lanka ❤
Awesome teacher!! Thanks for all the help!! =)
Thank you pro.Leonard
It's good to practice the theory for linears, but like Bernoulli always gives a result, you can shortcut the linear to y = 1/rho • ∫ rho F(x) dx, or in this case v= and back-substitute. Just be careful to apply 1/rho (or 1/mu) to the entire integral including C.
පට්ට...supiri..Thanks sir..respect ..
Thank you Prof,, you are the best,, thank you very much
Thank you!!!, these videos are really helping me understand the math behind the problems.
Much love Professor!
You're the GOAT!
Got a diff eq final tomorrow but I'll be fine... probably... maybe...
Trust yourself. You'll be fine
@@ProfessorLeonard Thank you, I will :)
@@ProfessorLeonard your videos + Slader.com have saved me and are allowing me to pursue a career that I never thought I would be able to because of the math requirements.
Two years late, but I also have a diff eq final tomorrow
@@aaron.glidden3yrs late but I don’t have diff eq final tmro
Umdah! Thanks alot Mr. Leonard
Can't believe I'm learning math from Clark Kent
1:00:00
1:13:56
1:24:37
This type of equation randomly showed up during the solution steps for one of the example problems in my Applied Mathematics course about perturbation theory, and I had forgotten about it.
Hey! I'm noticing that at 20:47, the bernoulli differential equation we obtained can be solved by separation. Is this correct or do we have to continue solving the DE using an integrating factor?
I have tried solving that bernoulli differential using the separation technique and obtained the same result! I answered my own question I guess... Would there be any reason why I can't do separation?
awesome work on explaining this
This link ruclips.net/video/pSIqUnPIkP4/видео.html is also a nice video on Bernoulli's Equation.
Thanks for the video. However, I want to point out that at 8:47 you wrote y^2 = v^-1 => y = v^(-1/2). Correct me if I am wrong, but I think you should have written y = (+,-)v^(-1/2) instead. So I am not sure if you are allowed to make the following substitutions as you did.
the plus minus gets absorbed by C
YOU ARE AMAZINGGGGGGGGGGGGGGGGGGGGGGGGGGGGGGGGGGGGGGGGGGG
23:20
why is -1 changed to +1?
Yea i saw that too. I think its just a little mistake. He probably meant to write -1.
He fixed it if you continue.
THANK YOU
Do you have a video for Euler's Method? Also thank you for all the help. Saved my buns in Calc 3
thanks king
excellent vid!
Amazing! Thank you!