which of the following is not a property of fourier transform
Answers
Answered by
0
Answer:
pls ask question properly as no image how can we give answers
Step-by-step explanation:
Answered by
0
The complete question is,
Which of the following is not a property of Fourier Transform?
a.) Fourier Transform of an Integral
b.) Asymmetry
c.) Operational Formula
d.) Reversal
Answer:
Option (b) Asymmetry is not a property of Fourier Transform.
Step-by-step explanation:
- Fourier Transform of an Integral is valid. This is because the Fourier transform uses an integral that gives the properties of sine and cosine to recover the amplitude and phase of each sinusoid in a Fourier series.
- Operational formula is valid for Fourier Transform. This is because operations can be done in Fourier Transform .
- Fourier Transform has the property of reversal. This is because the inverse Fourier transform recombines the waves of sine and cosine using a inverse integral to reproduce the original function.
- When we take the the Fourier Transform of a real function, for instance a one-dimensional signal we obtain a complex Fourier Transform. This Fourier Transform has symmetry properties. So, Fourier Transform do not have asymmetry property.
Similar questions