Reduced Error in Root Mean Square (rms) Value for Square Wave Signal Relative to Sine Wave Signal
DOI:
https://doi.org/10.71330/thenucleus.2017.178References
R. Priemer, Introductory Signal Processing. World Scientific, 1991.
D. Sundararajan, “A Practical Approach to Signals and Systems”, John Wiley & Sons (Asia), Pvt. Ltd, 2008.
M. Hulak and M. F. Alves, “On the analysis of (Un) true root mean square measurement, Instituto Superior de Engenharia, 1999.
M. Albu, and G. T. Heydt, “On the rms values in power quality assessment”. IEEE Transactions on Power Delivery, vol. 18, no. 4, pp. 1586-1587, 2003.
J. Bird, “Engineering Mathematics”, 5th Ed., Elsevier Ltd. 2007.
A. Jeffrey, “Advanced Engineering Mathematics”, Harcourt/ Academic Press, 2002.
I.S. Gradshteyn and I.M. Ryzhik, “Tables of Integrals, Series and Products”, 6th Edn., San Diego, CA: Academic Press, p. 1101, 2000.
H.P. Hsu, “Schaum's outlines of theory and problems of signals and systems”, McGraw Hill, 1995.
A.R. Thompson, J.M. Moran, and G.W. Swenson, “Interferometry and synthesis in radio astronomy”, New York: Wiley, 2nd Ed., 2001.
B. Ahmad, “More suitable values of Power and Root mean square (RMS) of periodic rectangular wave signal”, Int. J. Signal Processing Systems, Engineering and Technology Publishing, vol. 2, no. 2, pp. 128-131, 2014.
Downloads
Published
How to Cite
Issue
Section
License
For all articles published in The Nucleus, copyright is retained by the authors. Articles are licensed under an open access licence [CC Attribution 4.0] meaning that anyone may download and read the paper for free. In addition, the article may be reused and quoted provided that the original published version is cited properly.
