You Can Solve This Differential Equation in Different Way
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- Опубліковано 16 тра 2024
- In this video, I am solving this interesting differential equation by Lambert W function. Of course, there are other ways to solve this differential equation, but I am showing how it is also possible to solve this differential equation with Lambert W function in this video. See how we can make the algebraic forms of this differential equation to come up with the final answer with Lambert W Function.
#differentialequation #calculus #lambertwfunction
Thanks for the great video professor
Thanks my friend for your support haha👍👍👍
Very great prof
Thank you my friend for your support👍👍👍
Your video is always in superb quality, prof. Appreciate your sharing this video
Thanks a lot my friend for your support haha👍👍👍
1st. Another great video professor
Aww thank you so much my friend👍👍👍
3:50 > *∫[W(u)/u]du = W²(u)/2 + W(u)*
That was quite unexpected.
Even shocking.
Don't even know what to think.
Have to think it over.
A bit more elaboration on it would be helpful.
Nice rhyme haha👍👍👍
Let t=w(u)
@@appybane8481 And what's next?
@@appybane8481 There is already an explanation in this thread, but it's not visible to others.
@@appybane8481 It starts like this:
*W(u)/u = W(u)(W(u)+1)/u(W(u)+1)*