Finding Particular Solution of a Second Order Differential equation with dsolve

17 views (last 30 days)
jake stan
jake stan on 19 Mar 2018
Commented: Torsten on 8 Jul 2022
The homogenous equation: 28^(e^(−2x)) − 18(e(−3x))
I found the homogenous solution to the equation, however I am not sure how to find the particular solution when the differential equation is equal to 8. I tried using the dsolve function, however it doesn't give me the correct solution. Apparently the particular solution is supposed to be 4/3.
y2 = dsolve('D2v + 5*Dv + 6*v = 8')

Sign in to answer this question.

Accepted Answer

Birdman
Birdman on 19 Mar 2018
Well, it should give you the correct solution. In my computer it worked:
>>syms v(x)
eq=diff(v,2)+5*diff(v)+6*v==8;
v(x)=dsolve(eq)
ans =
C1*exp(-2*x) + C2*exp(-3*x) + 4/3
  2 Comments
Jaryd Kynaston-Blake
Jaryd Kynaston-Blake on 8 Jul 2022
Edited: Jaryd Kynaston-Blake on 8 Jul 2022
now how can get values for C1 & C2 using:
V(0) = V0 % just an arbitrary variable
& t(0) = 0
Sincerely.
Torsten
Torsten on 8 Jul 2022
Ran in:
syms v(x) v0
eq = diff(v,2)+5*diff(v)+6*v==8;
Dv = diff(v,x);
cond = [v(0)==v0, Dv(0)==0];
vSol(x) = dsolve(eq,cond)
vSol(x) = 

Sign in to comment.

More Answers (0)

Categories

Find more on Symbolic Math Toolbox in Help Center and File Exchange

Tags

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!