-
A function ƒ(t) is shown in the figure.
The Fourier transform F(ω) of ƒ(t) is
-
- real and even function of ω
- real and odd function of ω
- imaginary and odd function of ω
- imaginary and even function of ω
Correct Option: C
Since ƒ(t) is odd and real
ƒ(t) = – ƒ(– t)
∮ F(ω) is imaginary and odd [symmetry property of fourier Transform]
