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Probability and Random Processes, Advanced Theory and Engineering
Probability is ubiquitous in every branch of science and engineering. This text on probability and random processes assumes basic prior knowledge of the subject at the undergraduate level.
by John J. Shynk
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Rating: 4.00
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Probability, an introduction
This new undergraduate text offers a concise introduction to probability and random processes.
by Geoffrey Grimmett, D. J. A. Welsh
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Rating: 4.50
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Probability and random processes for electrical and computer engineers
This books covers the fundamental theory, and applications, of probability and random processes in electrical and computer engineering.
by John A. Gubner
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Probability and random processes, problems and solutions
by Geoffrey R. Grimmett, David R. Stirzaker
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Theory of probability and random processes
One section is devoted to the theory of Gibbs random fields.This material is essential to many undergraduate and graduate courses. The book can also serve as a reference for scientists using modern probability theory in their research.
by Leonid B. Koralov, Yakov G. Sinai, Iï¸ A︡kov Grigorʹevich SinaÄ
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Probability and random processes, problems and solutions
by G. R. Grimmett, D. R. Stirzaker
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Fundamentals of applied probability and random processes
This book is based on the premise that engineers use probability as a modeling tool, and that probability can be applied to the solution of engineering problems.
by Oliver Chukwudi Ibe
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Probability and random processes, lectures presented at the seminar held at Purdue University, November 10-11, 1969
by Frank Kozin, J. L. Bogdanoff, John E. Goldberg
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Intuitive probability and random processes using MATLAB
Featuring MATLAB examples to provide motivation for the theory to come, this introductory text incorporates MATLAB code to allow students to understand how the theory is applied in practice.
by Steven M. Kay
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Probability and random processes for electrical engineering, student solutions manual
1.4 The random experiment consisting of the toss of a coin has a sample space with two outcomes, 5" = {h,t}, and associated probability p = P[{/i}] and 1 — p = P[{t}]. a) In testing a device where the outcome is binary (ie "pass test" ...
by Alberto León-GarcÃa
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