Determine the continuous time Fourier series representation of an even rectangular wave with following specifications: 1....
Find the Continuous Time Fourier Series of an even continuous rectangular wave signal with peak to peak amplitude 15, Tf=100HZ, T0= 10% of Tf, average value=0 with Tf=T0
Let \(\left.x_{(} t\right)=\left\{\begin{array}{rr}t, & 0 \leq t \leq 1 \\ -t, & -1 \leq t \leq 0\end{array}\right.\), be a periodic signal with fundamental period of \(T=2\) and Fourier series coefficients \(a_{k}\).a) Sketch the waveform of \(x(t)\) and \(\frac{d x(t)}{d t}\) b) Calculate \(a_{0}\) c) Determine the Fourier series representation of \(g(t)=\frac{d x(t)}{d t}d) Using the results from Part (c) and the property of continuous-time Fourier series to determine the Fourier series coefficients of \(x(t)\)
Determine the Fourier series for the rectangular wave illustrated in Figure P3.28, and plot the resultsHint:The square wave of period Tis described by 3.27 Determine the Fourier series for the rectangular wave illustrated in Figure P3.28, and plot the results 2T Эт Hint: The square wave of period T is described by
a) Find the analytic expression for the zero frequency ("D.C.") Fourier series coefficient, c0, as a function of the duty cycle D between 0 and 1. b) Find the analytic expression for the absolute value of the first Fourier series coefficient, c1, a function of the duty cycle D between 0 and 1. At what value of the duty cycle is the magnitude of the coefficient maximized? f(t) is a periodic square wave with variable duty cycle, D, where D...
15) (10 marks) The Fourier series representation of a square wave with amplitude 1 and offset of 1 is: sin((2n-1)aOt] (2n - 1)T a) Write out the first 5 terms of this series (the DC component and 4 harmonics) (2 marks) b) A square wave with amplitude 1, DC offset of 1, and fundamental frequency of 1 rad/s, is passed through a system with the below system response. Write the first 5 terms of the wave after passing through the...
Problem (3) a) A periodic square wave signal x(t) is shown below, it is required to answer the below questions: x(t) 1. What is the period and the duration of such a signal? 2. Determine the fundamental frequency. 3. Calculate the Trigonometric Fourier Series and sketch the amplitude spectrum and phase spectrum of the signal x(t) for the first 5 harmonics. b) Find the Continuous Time Fourier Series (CTFS) and Continuous Time Fourier Transform (CTFT) of the following periodic signals...
Consider the following problems related to the exponential Fourier series. (a) The exponential Fourier series of a periodic signal x(t) of funda- 4.7 mental period To is 3 i. Determine the value of the fundamental period To ii. What is the average or dc value of x(t)? iii. Is x(t) even, odd, or neither even nor odd function of time? iv. One of the frequency components of x(t) is expressed as Acos(ST) 0- What is A? (b) A train of...
solve for a and b 1. Plot each of the following functions and find its Fourier series representation, also determine the first three One zero harmonics (a) f(t) -1<t< T= 2 where T is the period. 0t<1 J (b) f(t) -t-1<t<0 T 4 where T is the poriod = 0t1 0-2<t<-1 T = 4 where T is the period (e) g(t) 1 -1<t<1 0 1<t<2 (d) g(t) = 1- t -1<t<1;T = 4 where T is the period 1. Plot...
Please help by writing a MATLAB Code for the this lab Fourier Series Synthesis You will consider five continuous-time signals 1- 2- for A D 4- We were unable to transcribe this imageWe were unable to transcribe this imager(t) e-t for-1 < t > 1 x(t) 2 2 4 3 3 x(t) -4 2 2 4 2 1, 0sts be a periodic signal with fundamental period T = 2 and Fourier coefficients ak. (a) Determine the value of ao (b)...
Let x(t) = t, 0<t 1 and Fourier series coefficients a , be a periodic signal with fundamental period of T 2 -t,-1t0 dz(t) a) Sketch the waveform of r(t)d3 marks) b) Calculate ao (3 marks) c) Determine the Fourier series representation of gt)(4 rks) d) Using the results from Part (c) and the property of continuous-time Fourier series to dr(t) determine the Fourier series coefficients of r(t) (4 marks)