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István
Novák, Executive Editor: Power Distribution Design
Methodologies
![](data:image/jpeg;base64,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)
Reformatted reprint of the 2008 original book by
IEC, published by Faraday Press, August 2021
ISBN-10: 1949267679
Table of
Contents
Sample chapter
![](PDNDesignMethodologies_files/IEC.jpg)
Published by IEC, 2008
ISBN: 978-1-931695-65-7
Out of print