This is a really interesting differential equation video! Thank you so much! Also, is it possible to solve a non-homogeneous Cauchy-Euler differential equation?
Sounds good! I'm an undergraduate math major at UTSA. Thank you for doing what you do. Professors are the gladiators in the world of academia! Have a great day and be safe. :)
What would happen in the case of 'double zero-points'? For example if (r+1)^2 = 0. My textbook says it's c1*(1/x) + c2*(lnx/x), but i don't quite know why?
I didnt understand about this since I saw this video. thanks
This is a really interesting differential equation video! Thank you so much! Also, is it possible to solve a non-homogeneous Cauchy-Euler differential equation?
Yes you can! One way is to use variation of parameters to find y_p.
Sounds good! I'm an undergraduate math major at UTSA. Thank you for doing what you do. Professors are the gladiators in the world of academia! Have a great day and be safe. :)
What would happen in the case of 'double zero-points'? For example if (r+1)^2 = 0.
My textbook says it's c1*(1/x) + c2*(lnx/x), but i don't quite know why?