Complex exponentials obey the expected rules of algebra when doing integrals and derivatives. Consider the complex signal z(t) = Zejлt/2 where Z = e¯jπ/³¸ (a) Show that the first derivative of z(t) with respect to time can be represented as a new com- plex exponential Qejлt/², i.e., ¼z(t) = Qеjлt/2. Determine the value for the complex amplitude Q. How much greater (or smaller) is the angle of Q than the angle of Z. (b) Evaluate the definite integral of z(t) over the range 0 < t < 1: 1 z(t)dt = ? Note that integrating a complex quantity follows the expected rules of algebra: you could integrate the real and imaginary parts separately, but you can also use the integration formula for an exponential directly on z(t). (c) Evaluate the integral of the magnitude squared |z(t)|² over the range -1 ≤ t ≤ 1: 1 [ \z (1)³ dt = ? -1

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...
icon
Related questions
Question
Complex exponentials obey the expected rules of algebra when doing integrals and derivatives.
Consider the complex signal z(t) = Zejлt/2 where Z = e¯jπ/³¸
(a) Show that the first derivative of z(t) with respect to time can be represented as a new com-
plex exponential Qejлt/², i.e., ¼z(t) = Qеjлt/2. Determine the value for the complex
amplitude Q. How much greater (or smaller) is the angle of Q than the angle of Z.
(b) Evaluate the definite integral of z(t) over the range 0 < t < 1:
1
z(t)dt
= ?
Note that integrating a complex quantity follows the expected rules of algebra: you could
integrate the real and imaginary parts separately, but you can also use the integration formula
for an exponential directly on z(t).
(c) Evaluate the integral of the magnitude squared |z(t)|² over the range -1 ≤ t ≤ 1:
1
[ \z (1)³ dt = ?
-1
Transcribed Image Text:Complex exponentials obey the expected rules of algebra when doing integrals and derivatives. Consider the complex signal z(t) = Zejлt/2 where Z = e¯jπ/³¸ (a) Show that the first derivative of z(t) with respect to time can be represented as a new com- plex exponential Qejлt/², i.e., ¼z(t) = Qеjлt/2. Determine the value for the complex amplitude Q. How much greater (or smaller) is the angle of Q than the angle of Z. (b) Evaluate the definite integral of z(t) over the range 0 < t < 1: 1 z(t)dt = ? Note that integrating a complex quantity follows the expected rules of algebra: you could integrate the real and imaginary parts separately, but you can also use the integration formula for an exponential directly on z(t). (c) Evaluate the integral of the magnitude squared |z(t)|² over the range -1 ≤ t ≤ 1: 1 [ \z (1)³ dt = ? -1
Expert Solution
steps

Step by step

Solved in 2 steps with 2 images

Blurred answer
Recommended textbooks for you
Introductory Circuit Analysis (13th Edition)
Introductory Circuit Analysis (13th Edition)
Electrical Engineering
ISBN:
9780133923605
Author:
Robert L. Boylestad
Publisher:
PEARSON
Delmar's Standard Textbook Of Electricity
Delmar's Standard Textbook Of Electricity
Electrical Engineering
ISBN:
9781337900348
Author:
Stephen L. Herman
Publisher:
Cengage Learning
Programmable Logic Controllers
Programmable Logic Controllers
Electrical Engineering
ISBN:
9780073373843
Author:
Frank D. Petruzella
Publisher:
McGraw-Hill Education
Fundamentals of Electric Circuits
Fundamentals of Electric Circuits
Electrical Engineering
ISBN:
9780078028229
Author:
Charles K Alexander, Matthew Sadiku
Publisher:
McGraw-Hill Education
Electric Circuits. (11th Edition)
Electric Circuits. (11th Edition)
Electrical Engineering
ISBN:
9780134746968
Author:
James W. Nilsson, Susan Riedel
Publisher:
PEARSON
Engineering Electromagnetics
Engineering Electromagnetics
Electrical Engineering
ISBN:
9780078028151
Author:
Hayt, William H. (william Hart), Jr, BUCK, John A.
Publisher:
Mcgraw-hill Education,