Q2) show that: a) ſªx(t)dt ↔ X(f) + X(0)8(ƒ) 2πJf 2 b) if x(t) = x(-t) (even symmetery) then all the sin terms in the Fourier series Vanish (bn=0).
Q2) show that: a) ſªx(t)dt ↔ X(f) + X(0)8(ƒ) 2πJf 2 b) if x(t) = x(-t) (even symmetery) then all the sin terms in the Fourier series Vanish (bn=0).
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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![Q2) show that:
a)
x(t)dt ←
X(f) X(0)8(f)
+
2πJf
2
b) if x(t) = x(-t) (even symmetery) then all the sin terms in the Fourier series
Vanish (bn=0).](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F343580b2-9b32-4a34-b6e7-89bf424f7562%2Fe4afd06d-c8b1-44fe-8011-116c013ee56f%2Fy61egd_processed.jpeg&w=3840&q=75)
Transcribed Image Text:Q2) show that:
a)
x(t)dt ←
X(f) X(0)8(f)
+
2πJf
2
b) if x(t) = x(-t) (even symmetery) then all the sin terms in the Fourier series
Vanish (bn=0).
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