Overview
This text applies the classic Fourier analysis to common waveforms. The following questions are answered: can a signal be considered a superposition of common waveforms with different frequencies?; how can a signal be decomposed into a series of common waveforms?; how can a signal best be approximated using finite common waveforms?; how can a combination of common waveforms that equals a given signal at N uniform points be found?; and can common waveforms be used in techniques that have traditionally been based on sine-cosine functions?
Full Product Details
Author: Yuchuan Wei ,
Qishan Zhang
Publisher: Kluwer Academic Publishers
Imprint: Kluwer Academic Publishers
Edition: 2000 ed.
Volume: 9
Dimensions:
Width: 15.50cm
, Height: 1.10cm
, Length: 23.50cm
Weight: 0.960kg
ISBN: 9780792379058
ISBN 10: 0792379055
Pages: 157
Publication Date: 31 August 2000
Audience:
College/higher education
,
Professional and scholarly
,
Undergraduate
,
Postgraduate, Research & Scholarly
Format: Hardback
Publisher's Status: Active
Availability: In Print
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Reviews
"From the reviews: ""In the book ! Wei and Zhang have selected and presented the analysis of square, triangular, and trapezoidal waves with sufficient details and the related mathematical theories behind the subjects. ! the work is impressive in a mathematical sense. ! Square, triangular, and trapezoidal waveform analysis can be useful in many practical engineering and scientific environments, and this 160-page work is a good reference source for such a specific area."" (Nihal Kularatna, IEEE Circuits & Devices Magazine, Vol. 21 (2), 2005)"
From the reviews: In the book ... Wei and Zhang have selected and presented the analysis of square, triangular, and trapezoidal waves with sufficient details and the related mathematical theories behind the subjects. ... the work is impressive in a mathematical sense. ... Square, triangular, and trapezoidal waveform analysis can be useful in many practical engineering and scientific environments, and this 160-page work is a good reference source for such a specific area. (Nihal Kularatna, IEEE Circuits & Devices Magazine, Vol. 21 (2), 2005)
From the reviews: <p> In the book a ] Wei and Zhang have selected and presented the analysis of square, triangular, and trapezoidal waves with sufficient details and the related mathematical theories behind the subjects. a ] the work is impressive in a mathematical sense. a ] Square, triangular, and trapezoidal waveform analysis can be useful in many practical engineering and scientific environments, and this 160-page work is a good reference source for such a specific area. (Nihal Kularatna, IEEE Circuits & Devices Magazine, Vol. 21 (2), 2005)
From the reviews: In the book ! Wei and Zhang have selected and presented the analysis of square, triangular, and trapezoidal waves with sufficient details and the related mathematical theories behind the subjects. ! the work is impressive in a mathematical sense. ! Square, triangular, and trapezoidal waveform analysis can be useful in many practical engineering and scientific environments, and this 160-page work is a good reference source for such a specific area. (Nihal Kularatna, IEEE Circuits & Devices Magazine, Vol. 21 (2), 2005)
