Figure (A) shows the overall system for filtering a continuous-time signal using a discrete- time filter. (Note that this is the same procedure we have always followed in this class!) Plots of Xe(jw) (the original signal in the frequency domain) and H(e) (the discrete-time filter) are shown in Figure (B). For this problem, assume that the sampling period, T, equals 0.05 seconds. Conversion to a sequence p(t) = S(t – nT) Conversion x[n] h[n] y[n] = to an xe(NT) H(e) ye(nT) impulse train = Xc(jw) 2 -30T 30T (A) (B) yp(t) T H(ejw) 1 ¨¨¨NA¨¨¨ -ㅠ-ㅠ ㅠㅠ (a) Sketch Xp(jw). Be sure to accurately label both axes! H(jw) ㅠ T ye(t)

Figure (A) shows the overall system for filtering a continuous-time signal using a discrete- time filter. (Note that this is the same procedure we have always followed in this class!) Plots of Xe(jw) (the original signal in the frequency domain) and H(e) (the discrete-time filter) are shown in Figure (B). For this problem, assume that the sampling period, T, equals 0.05 seconds. Conversion to a sequence p(t) = S(t – nT) Conversion x[n] h[n] y[n] = to an xe(NT) H(e) ye(nT) impulse train = Xc(jw) 2 -30T 30T (A) (B) yp(t) T H(ejw) 1 ¨¨¨NA¨¨¨ -ㅠ-ㅠ ㅠㅠ (a) Sketch Xp(jw). Be sure to accurately label both axes! H(jw) ㅠ T ye(t)

Introductory Circuit Analysis (13th Edition)

13th Edition

ISBN:9780133923605

Author:Robert L. Boylestad

Publisher:Robert L. Boylestad

Chapter1: Introduction

Section: Chapter Questions

Problem 1P: Visit your local library (at school or home) and describe the extent to which it provides literature...

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