Hi pls help with f and g, need this urgently. Accurate answers pls and upvote guaranteed. Thanks.
Posted: Sun May 15, 2022 2:50 pm
Hi pls help with f and g, need this urgently. Accurate answers
pls and upvote guaranteed. Thanks.
A small portion of a causal piecewise continuous periodic signal (t) = 2(t+nT) is shown in Figure Q1 below. x(t) [V]1 А - 1 b T T ЗТ t[ms] - 2 2 -A = Figure Q1: A Piecewise continuous periodic waveform z(t) = 2(t+nT). For the rest of this question, the period of the signal T = 100 ms, A = 7V, and b = 2. Answer all parts of this question. The use of mathematical software, such as MATLAB, is permitted. Round all numerical answers to 3 significant figures unless otherwise advised.
Q1(iii) Exponential Fourier series For a periodic signal 2(t) = 2(t+nT), the exponential Fourier series approximation for 2(t) is defined as f(t) = 8 CM. . E-00 f) Match the properties of 3(t) with the properties of the Exponential Fourier series coefficients Ck= ==Sº z(t)e+Polt dit. The coefficients C are real. The coefficients Ck are complex The coefficients C are imaginary. The coefficients Cle for k even k=0,2,4,...) are zero. The periodic signal has even symmetry f(t) = f(-+). The periodic signal has odd symmetry f(t) = -f(-t). The periodic signal has half-wave symmetry f(t) = -f(f-T/2). The periodic signal has neither odd nor even symmetry.
g) Compute the exponential Fourier series coefficient (mean voltage) T 1 Co = **z(t)dt for the signal shown in Figure Q1. Co = V.
pls and upvote guaranteed. Thanks.
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Q1(iii) Exponential Fourier series For a periodic signal 2(t) = 2(t+nT), the exponential Fourier series approximation for 2(t) is defined as f(t) = 8 CM. . E-00 f) Match the properties of 3(t) with the properties of the Exponential Fourier series coefficients Ck= ==Sº z(t)e+Polt dit. The coefficients C are real. The coefficients Ck are complex The coefficients C are imaginary. The coefficients Cle for k even k=0,2,4,...) are zero. The periodic signal has even symmetry f(t) = f(-+). The periodic signal has odd symmetry f(t) = -f(-t). The periodic signal has half-wave symmetry f(t) = -f(f-T/2). The periodic signal has neither odd nor even symmetry.
g) Compute the exponential Fourier series coefficient (mean voltage) T 1 Co = **z(t)dt for the signal shown in Figure Q1. Co = V.