Mathematics Homework Solutions
#19922
Fourier Transform of a Partial Differential Equation
Please see the attached file for the fully formatted problems.
Consider the partial differential equation:
d3y/dx3 =d2y/dt2
Using Fourier Transforms, reduce this to solving an ODE.
A partial differential equation is made solvable through a Fourier transform. The solution is detailed and well-presented.
What is this?
By OTA - Overall OTA Rating
Yupei Xiong, PhD - 4.8/5
Purchase Cost Now
$2.19 CAD (was ~$11.97)
Included in Download
- Plain text response
- Attached file(s):
- 19922.doc
Why you can trust BrainMass.com
- Your Information is Secure
- Best Online Academic Help Service
- Students find real academic Success
- Cauchy-Euler or Equidemensional Equations. - I'm taking differential equations I and we are studying non homogeneous equations. There is a problem concerning Cauchy-Euler equations that I don't understand. I need help with the solution. I have a ...
- Solving Differential Equations - Solve the differential equations: a. 16y''+24y'+9y =0 b. 9y''+4y = 0 c. d2y/dt2 - 6 dy/dt +4y = 0
- Sum of Series using Fourier Series - Use the Fourier series of the function f(x) and the properties of Fourier series to obtain the Fourier series of... (aee attachment for full question)
- Fourier Transforms - Let F{} = Fourier Transform symbol. Prove that F{ F{ g(x) } } = g(-x)
- Fourier series integration - The problems are from Fourier Series, Fourier Integral, and Fourier Transform. Please show each step of your solution. If there is anything unclear in the problem, let me know. Thank you.
