What is the difference between cosh sinh and sine and cosine? I thought you meant that cosh and sinh was cosine and sine when talking about the condition when lambda is less than 0.
Write C1 coshx + C2 sinhx in terms of exponentials, do some factorisation and you'll see that it yields the first general solution he got, K1 and K2 would be in terms of C1 and C2
Dear TH-cam uploader.
Thank you for saving my skins and going through this problem step by step.
From a deranged maths student
Thanks for these, your lectures have helped a ton. You're the best teacher for Boyce Diprima.
Thanks so much, this is a great video that goes into great detail and breaks everything down !
Thanks!! You explain the work very well
Straight to the point, thanks!
Thanku for uploading..its really useful
very helpful !
Very handsome and good teacher👍
thank you from China
Well explainaition 👍
this help me alot thank you sir
Great
that wave at the end
Thanks a lot! Was very helpful!!
Thank you so much
this very helpful bro , thanks
great explanations
fantastic
Hello, I didn't get the transformation of (C1 e^mx + c2e^-mx) to (C1 cosh mx + c2 sinh mx). How did you get there?
Write the latter in terms of exponentials you'll be able to do some factorisation and get the first solution, with the constants in terms of C1 and C2
When lamda is less than zero you right directly in hyperbolic function without conversion. Is there no need of it?
Excellent one
why you removed C2 in the last last step??
Was this filmed at UT?
What is the difference between cosh sinh and sine and cosine? I thought you meant that cosh and sinh was cosine and sine when talking about the condition when lambda is less than 0.
Not clear on how we substituted coshx and sinhx in place of exponential function.
Can you explain ?
Thank you!
i cant see how the identity for sinh and cosh looks like the general solution..
Write C1 coshx + C2 sinhx in terms of exponentials, do some factorisation and you'll see that it yields the first general solution he got, K1 and K2 would be in terms of C1 and C2
When y(-l)=0,y(l)=0 then how can we find the eigen values and eigen functions
Do you have any example for non-homogeneous?
Hi Winsanlaya, I'll post one soon!
+Engineering Empowerment did u? :D
Sir I need problm of green function associated with S.L system
Why can we erase the C2 in the final answer?
Boundary conditions force C2 to be zero.
Thanks
Y(-2)=0 and Y(2)=
Will you tell me whats was the eigen value when boundary condition is like that
Tá fazendo wizard?
areee bahi hindi bool
meee Angrej koni
I cannot concentrate 😑
SINNNSH AND COSHHHH
Very badly presented.
Do better
Thanks