Laplace initial value problem> HELP PLEASE

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Homework Help Overview

The discussion revolves around solving a Laplace initial value problem represented by the differential equation y''(t) + 4y'(t) = sin(2t) with initial conditions y(0) = 0 and y'(0) = 0. Participants are exploring the implications of the initial conditions on the solution.

Discussion Character

  • Exploratory, Assumption checking, Problem interpretation

Approaches and Questions Raised

  • Participants discuss the necessity of both initial conditions and question the implications of having only one initial condition specified. There are attempts to clarify the role of the constants in the solution and the steps involved in applying the Laplace transform.

Discussion Status

The discussion is ongoing, with participants providing guidance on the steps to take without giving direct answers. There is recognition of the potential for multiple solutions due to the nature of the differential equation and the initial conditions provided.

Contextual Notes

Some participants note the confusion regarding the initial conditions and their effect on the solution, particularly the implication of y'(0) = 0 alongside y(0) = 0. There is also mention of external resources for further assistance.

leenaa
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Laplace initial value problem... HELP! PLEASE!

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Hello all!
I'm stuck on this question:

y''(t)+ 4y'(t) = sin2t

y(0) = 0

solve it using laplace transform,... my final is tomorrow, and its 2 am, i would appreciate a quick respone
thanks in advance!
 
Last edited:
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Show your attempt at it...
 
I can not!
please
 
Thank you very much
But I have a problem is all Constants equal to zero!
What reason?
 
Maybe because your initial condition works out that way? I didn't work your problem.
 
The problem lies in the
y'(0) = 0
As a result, all the constants equal to zero
 
If you say so :) Like I said I didn't work your problem.
 
Thank you
Your participation in the subject to others if allowed
 
  • #10
leenaa
this solution is very straightforward so I am not going to solve it for you but I will tell you the steps you should do to get to the final solution. THis is a DE, u need to find y(t).

Step 1)
Find the laplace transforms for y'', y', y... note the LT of y is just Y(s)
Find the laplace transform for the right hand side of the equation.
Apply the initial conditions.

Step 2)
Put it all back in the algebraic equation and solve for Y(s),
Step 3)
find the laplace inverse of Y(s) and that will give you y(t)

good luck, and I hope this is helpful and not to late.
 
  • #11
Didn't the OP already say they solved it?
 
  • #12
Am I the only one to notice that this is a second order d.e. and there is only one initial condition?

There exist an infinite number of solutions that have different values of y'(0).

y(t)= C- (C+ 1/4)e^{-4t}+ 1/2 cos(t)+ (1/4)sin(2t) satisfies this equation and y'(0)= 0 for any value of C.
 
  • #13
In post 7, the OP says y'(0) = 0 which seems to be in addition to y(0) = 0?
 

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