Summary:: van der waals
I have a pretty good understanding of implicit differentiation. However I'm stuck on a homework problem and could use some help.
[P + (an^2)/V^2][V - nb] = nRT a,n,b,R are constants
My professor wants me to take the implicit differentiation of P wrt...
I'm having a hard time grasping the concept of reducing the two recursive relations at the end of the frobenius method.
For example, 2xy''+y'+y=0
after going through all the math i get
y1(x) = C1[1-x+1/6*x^2-1/90*x^3+...]
y2(x) = C2x^1/2[1-1/3*x+1/30*x^2-1/630*x^3+...]
I know those are right...
I think i figured it out. We're supposed to use y=e^mx when the ode has constant coefficients (a, b, c) and y=x^m for Cauchy-Euler equations, which are ODEs but the terms have have a-sub-n(x^n)(d^n y/dx^n)
I know how to solve ODEs using both methods. The problem I'm having is knowing when to use one and not the other. If someone could help clarify this for me. I can't find the correct section in my textbook.