Szczegóły

Tytuł artykułu

Systematic Effect as a Part of the Coverage Interval

Tytuł czasopisma

Metrology and Measurement Systems

Rocznik

2010

Numer

No 3

Autorzy

Wydział PAN

Nauki Techniczne

Wydawca

Polish Academy of Sciences Committee on Metrology and Scientific Instrumentation

Data

2010

Identyfikator

ISSN 0860-8229

Referencje

<i>Guide to the Expression of Uncertainty in Measurement.</i> ISO 1995. ; <i>Evaluation of measurement data - Supplement 1 to the Guide - Propagation of distribution using a Monte Carlo method.</i> JCGM 101:2008. ; Blázquez J. (2008), The coverage factor in a Flatten-Gaussian distribution, Metrologia, 45, 503. ; Fotowicz P. (2003), Method of the coverage factor evaluation in procedure for calculating the uncertainty of measurement, PAR, 10, 13. ; Fotowicz P. (2004), Methods of the coverage factor evaluation basing on the convolution of rectangular and normal distributions, PAK, 4, 13. ; Fotowicz P. (2005), Calculating expanded uncertainty by means of analytical method basis of convolution of input quantities distributions, PAR, 1, 5. ; Fotowicz P. (2006), An analytical method for calculating a coverage interval, Metrologia, 43, 42. ; Fotowicz P. (2001), Estimation of approximation accuracy of convolution of rectangular and normal distributions by symmetrical trapezoidal distribution, PAR, 5, 9. ; Fotowicz P. (2001), Principle of distribution approximation of measurement result in calibration, PAR, 9, 8. ; Fotowicz P. (2004), A method of approximation of the coverage factor in calibration, Measurement, 35, 251. ; Phillips S. (1997), Guidelines for Expressing the Uncertainty of Measurement Results Containing Uncorrected Bias, Journal of Research of the NIST, 102, 577. ; Lira I. (1998), The evaluation of the uncertainty in knowing a directly measured quantity, Measurement Science and Technology, 9, 1167. ; Karker R. (2007), Evaluation of modern approaches to express uncertainty in measurement, Metrologia, 44, 513.

DOI

10.2478/v10178-010-0037-1

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