Solved For this problem we are using the rect function, | Chegg.com
How to show that the Fourier Transform of [math] \int_{-\infty}^{t}rect(\tau)d\tau[/math] is [math]\pi \delta(\omega)+\frac{sin(\omega/2) }{ \omega/2} \frac{1}{j\omega}[/math] - Quora
Rectangle Function -- from Wolfram MathWorld
Fourier Series Examples
Fourier transform of common signals By OpenStax | Jobilize
Rectangular Pulse and Its Fourier Transform - Wolfram Demonstrations Project
Solved: Chapter 2 Problem 24 Solution | Signals And Systems: Analysis Using Transform Methods & Matlab 2nd Edition | Chegg.com
Solved Q4) Recall that the Fourier Transform of x(t)-rect( t | Chegg.com
Continuous-time Signals
Fourier transform of a rectangle function (a) and a sinc function (b) | Download Scientific Diagram
Solved 2. (20 points) Suppose you have the function z(t) = | Chegg.com
Solved Fourier Series of RECT t • Find Fourier series | Chegg.com
The Continuous-Time Rectangle, Triangle, and Sinc Functions - YouTube