Differential equations Assuming zero initial conditions, use classical methods to find solutions for the following differential equations: Show all the steps for full credit. (a) det + 5x (b) d²x + 4 + 2x = 2 sint dt² 2 cos 3t (c) +6+20x = 5u(t) d²x dt²

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
Question
Differential equations
Assuming zero initial conditions, use classical methods to find solutions for the following differential equations:
Show all the steps for full credit.
 
Differential equations
Assuming zero initial conditions, use classical methods to find solutions for the following differential equations:
Show all the steps for full credit.
(a) da + 5x = 2 cos 3t
(b) d²
dt²
+ 4 + 2x = 2 sin t
dt
d²x
(c) da +6+20x = 5u(t)
Transcribed Image Text:Differential equations Assuming zero initial conditions, use classical methods to find solutions for the following differential equations: Show all the steps for full credit. (a) da + 5x = 2 cos 3t (b) d² dt² + 4 + 2x = 2 sin t dt d²x (c) da +6+20x = 5u(t)
Differential equations
Assuming zero initial conditions, use classical methods to find solutions for the following differential equations:
Show all the steps for full credit.
(a) da + 5x = 2 cos 3t
(b) d²
dt²
+ 4 + 2x = 2 sin t
dt
d²x
(c) da +6+20x = 5u(t)
Transcribed Image Text:Differential equations Assuming zero initial conditions, use classical methods to find solutions for the following differential equations: Show all the steps for full credit. (a) da + 5x = 2 cos 3t (b) d² dt² + 4 + 2x = 2 sin t dt d²x (c) da +6+20x = 5u(t)
Expert Solution
Step 1

Solution :-

(a)

dxdt+5x=2·cos3tSubstitutedxdtwithx'x'+5x=2cos3tTheequationisinfirstorderlinearODEformFindtheintegrationfactor:  μtFindtheintegratingfactorμx,sothat:  μx·px=μ'xμt=e5tPuttheequationintheformμx·y'=μx·qx:  e5tx'=2cos3te5tSolvee5tx'=2cos3te5tIf  f'x=gx  then  fx=gxdxe5tx=2cos3te5tdt2cos3te5tdt=23e5tsin3t34+5e5tcos3t34+c1e5tx=23e5tsin3t34+5e5tcos3t34+c1Isolatex:  x=3sin3t+5cos3t17+c1e5tx=3sin(3t)+5cos(3t)17+c1e5t

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