. "Bias; Correction for systematic error; Coverage probability; Level of significance; t-Test; Uncertainty"@en . . . . "Effect of insignificant bias and its uncertainty on the coverage probability of uncertainty intervals Part 2. Evaluation for a found insignificant experimental bias"@en . . "1304-1311" . "NL - Nizozemsko" . . "Effect of insignificant bias and its uncertainty on the coverage probability of uncertainty intervals Part 2. Evaluation for a found insignificant experimental bias"@en . "1"^^ . "1"^^ . . . "Effect of insignificant bias and its uncertainty on the coverage probability of uncertainty intervals Part 2. Evaluation for a found insignificant experimental bias" . "13520" . . "Talanta" . "Vliv nev\u00FDznamn\u00E9ho vych\u00FDlen\u00ED a jeho nejistoty na pravd\u011Bpodobnost pokryt\u00ED nejistotn\u00EDch interval\u016F \u010C\u00E1st 2. Vyhodnocen\u00ED pro nalezen\u00E9 nev\u00FDznamn\u00E9 experiment\u00E1ln\u00ED vych\u00FDlen\u00ED"@cs . "3" . "418969" . . "P(1M0554)" . "RIV/44555601:13520/07:00003558" . "[881F1DA7F687]" . . . . "Vliv nev\u00FDznamn\u00E9ho vych\u00FDlen\u00ED a jeho nejistoty na pravd\u011Bpodobnost pokryt\u00ED nejistotn\u00EDch interval\u016F \u010C\u00E1st 2. Vyhodnocen\u00ED pro nalezen\u00E9 nev\u00FDznamn\u00E9 experiment\u00E1ln\u00ED vych\u00FDlen\u00ED"@cs . "This paper continues in studying the coverage probability of uncertainty intervals. It particularly investigates the uncertainty intervals determined in compliance with the GUM and EURACHEM Guide in case of the results uncorrected for the systematic error, since the experimental bias has been found insignificant. The problem is solved for known values of the experimental bias, its standard uncertainty and the overall standard uncertainty. The obtained findings given in graphs and tables show that coverage probability of the uncertainty intervals defined by expanded uncertainty about the uncorrected results can considerably fall below the chosen level of confidence; this depression depends only on the ratio of the bias and the overall uncertainty. The bias uncertainty does not directly influence this depression, it only determines whether the bias is significant or not and thereby determines whether the results will be corrected or not. The paper proposes three methods how to remove this coverage proba" . . "8"^^ . . "71" . . . "RIV/44555601:13520/07:00003558!RIV07-MSM-13520___" . "Synek, V\u00E1clav" . "This paper continues in studying the coverage probability of uncertainty intervals. It particularly investigates the uncertainty intervals determined in compliance with the GUM and EURACHEM Guide in case of the results uncorrected for the systematic error, since the experimental bias has been found insignificant. The problem is solved for known values of the experimental bias, its standard uncertainty and the overall standard uncertainty. The obtained findings given in graphs and tables show that coverage probability of the uncertainty intervals defined by expanded uncertainty about the uncorrected results can considerably fall below the chosen level of confidence; this depression depends only on the ratio of the bias and the overall uncertainty. The bias uncertainty does not directly influence this depression, it only determines whether the bias is significant or not and thereby determines whether the results will be corrected or not. The paper proposes three methods how to remove this coverage proba"@en . "Tento \u010Dl\u00E1nek pokra\u010Duje ve studiu pravd\u011Bpodobnosti pokryt\u00ED nejistotn\u00EDch interval\u016F. P\u0159edev\u0161\u00EDm vy\u0161et\u0159uje nejistotn\u00ED intervaly stanoven\u00E9 ve shod\u011B s GUM and EURACHEM Guide v p\u0159\u00EDpad\u011B v\u00FDsledk\u016F nekorigovan\u00FDch na systematickou chybu, pon\u011Bvad\u017E experiment\u00E1ln\u00ED vych\u00FDlen\u00ED bylo shled\u00E1no nev\u00FDznamn\u00FDm. Probl\u00E9m je \u0159e\u0161en pro zn\u00E1m\u00E9 hodnoty experiment\u00E1ln\u00EDho vych\u00FDlen\u00ED, jeho standardn\u00ED nejistotu a celkov\u00E9 standardn\u00ED nejistotu. Z\u00EDskan\u00E1 zji\u0161t\u011Bn\u00ED uveden\u00E1 v grafech a tabulk\u00E1ch ukazuj\u00ED, \u017Ee pravd\u011Bpodobnost pokryt\u00ED nejistotn\u00EDch interval\u016F vymezen\u00FDch roz\u0161\u00ED\u0159enou nejistotou kolem nekorigovan\u00FDch v\u00FDsledk\u016F m\u016F\u017Ee zna\u010Dn\u011B poklesnout pod zvolenou statistickou jistotu; toto sn\u00ED\u017Een\u00ED z\u00E1vis\u00ED pouze na pom\u011Bru vych\u00FDlen\u00ED a celkov\u00E9 nejistoty. Nejistota vych\u00FDlen\u00ED neovliv\u0148uje p\u0159\u00EDmo toto sn\u00ED\u017Een\u00ED, pouze ur\u010Duje, zda je vych\u00FDlen\u00ED v\u00FDznamn\u00E9 nebo nikoliv, a tud\u00ED\u017E ur\u010Duje, zda budou nebo nebudou v\u00FDsledky korigov\u00E1ny. \u010Cl\u00E1nek navrhuje t\u0159i zp\u016Fsoby, jak odstranit toto sn\u00ED\u017Een\u00ED pravd\u011Bpodobnosti pokryt\u00ED: pou\u017E\u00EDt p\u0159i testu vy\u0161\u0161\u00ED hladinu v\u00FDznamnosti, korigovat v\u00FDsledky"@cs . . "0039-9140" . "Effect of insignificant bias and its uncertainty on the coverage probability of uncertainty intervals Part 2. Evaluation for a found insignificant experimental bias" .