Fourier integral / transform ? What is it really?

Click For Summary
SUMMARY

The discussion focuses on the application of the Fourier transform to solve for phi(k) in a given mathematical context. A participant suggests setting t = 0 and multiplying both sides by e^{-i k' x}, leading to an integral that simplifies to a delta function. The conversation emphasizes the importance of completing the square in the exponential to facilitate further simplification. Dr. T's guidance reinforces the necessity of this technique for effective problem-solving.

PREREQUISITES
  • Understanding of Fourier transforms and their applications
  • Familiarity with delta functions in mathematical analysis
  • Knowledge of complex exponentials and integration techniques
  • Experience with completing the square in algebraic expressions
NEXT STEPS
  • Study the properties and applications of the Fourier transform in signal processing
  • Learn about delta functions and their role in physics and engineering
  • Practice integration techniques involving complex exponentials
  • Explore advanced algebraic techniques, specifically completing the square
USEFUL FOR

Students and professionals in mathematics, physics, and engineering who are working with Fourier transforms and require a deeper understanding of their applications in solving integrals.

student1938
Messages
91
Reaction score
1
Find phi(k)

I need help with this question as far as what am I looking for and how do I use a Fourier transform cause I think I need one.

student
 

Attachments

  • scan0001.jpg
    scan0001.jpg
    2.8 KB · Views: 451
Physics news on Phys.org
Any suggestions guys?
 
Set t = 0, multiply both sides by
e^{-i k' x}
and integrate over x. The integrand
e^{i(k-k')x}
in the x integral will yield a delta function which let's you evaluate the k integral.
 
try completing the square in the exponential...
 
If i multiple both sides by exp(-ik'x) the LHS gives exp(-ik'x-(x/2a)^2). I' m not sure what to do with this to simplify it further. Do i have to try to complete the square in this exponential now?
 
student1938 said:
If i multiple both sides by exp(-ik'x) the LHS gives exp(-ik'x-(x/2a)^2). I' m not sure what to do with this to simplify it further. Do i have to try to complete the square in this exponential now?

Yes, that's what Dr T was suggesting.
 

Similar threads

2D Fraunhofer-diffraction with infinitely long slits
  • · Replies 9 ·
Replies
9
Views
2K
Fourier Transform - Solutions Error?
  • · Replies 5 ·
Replies
5
Views
2K
Quantum Mechanics I, finding impuls wavefunction.
  • · Replies 6 ·
Replies
6
Views
1K
Uncertainties For Wave Packets
  • · Replies 4 ·
Replies
4
Views
1K
Graduate Polar Fourier transform of derivatives
  • · Replies 4 ·
Replies
4
Views
3K
Undergrad Fourier transforms in Hilbert Space
  • · Replies 2 ·
Replies
2
Views
954
Undergrad Fourier transform of the density fluctuation
  • · Replies 2 ·
Replies
2
Views
3K
DSB-SC Signal from Homework Statement
  • · Replies 1 ·
Replies
1
Views
3K
Show the Fourier transformation of a Gaussian is a Gaussian.
  • · Replies 1 ·
Replies
1
Views
2K
Fourier transform of wave packet
  • · Replies 3 ·
Replies
3
Views
2K