Solve Process Engineering ODE without Laplace Transforms | ODE Help

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The discussion focuses on solving a specific ordinary differential equation (ODE) in process engineering without employing Laplace transforms. The ODE presented is of the form \(\frac{dh^{p}}{dt}+h^{p}+\int h^{p}=F^{p}(t)\), where \(F^{p}(t)\) represents a unit ramp function. The solution approach involves differentiating the equation with respect to time, transforming it into a non-homogeneous linear differential equation with constant coefficients, which can be solved directly.

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So this question pertains to some process engineering homework i have, which is basically the following:

I have an ODE that has the form: [tex]\frac{dh^{p}}{dt}[/tex]+h[tex]^{p}[/tex]+[tex]\int h^{p}[/tex]=F[tex]^{p}[/tex]{t}
where F[tex]^{p}[/tex]{t} is the unit ramp function (i.e. F[tex]^{p}[/tex]{t}=0 when t<0, and is equal to t when F[tex]^{p}[/tex][tex]\geq[/tex]0

So my question is how do i solve this ODE without using Laplace transforms?? Can there even be an integral in such an ODE??

Thanks in advance, i appreciate your help
 
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We can remove the integral sign by differentiating the equation with respect to t

h" + h' + h = F'(t)

This is a nonhomegeneous linear DE with constant coefficients which can be solved quite easily without using the Laplace transform.
 

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