A triangular pulse $x(t)$ in the Fig. 3 (c) as the convolution of two rectangular pulses, determine the Fourier transform of $x(t)$. Also evaluate the Fourier transform of individual rectangular pulses.
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A rectangular pulse can be represented by the function: rect(t) = 1, -1/2 ≤ t ≤ 1/2 = 0, otherwise The Fourier transform of rect(t) can be calculated using the Fourier transform pair for a rectangular function: F(rect(t)) = sinc(ω/2π) where sinc(ω) = Show more…
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