. . "RIV/44555601:13520/06:00003555!RIV07-MSM-13520___" . "13520" . "Tento \u010Dl\u00E1nek vy\u0161et\u0159uje pravd\u011Bpodobnost pokryt\u00ED nejistotn\u00EDch interval\u016F stanoven\u00FDch ve shod\u011B s GUM a EURACHEM Guide, kter\u00E9\u017Eto jsou vymezeny roz\u0161\u00ED\u0159enou nejistotou U kolem v\u00FDsledk\u016F nekorigovan\u00FDch nev\u00FDznamn\u00FDmi vych\u00FDlen\u00EDmi a korigovan\u00FDch vych\u00FDlen\u00EDmi v\u00FDznamn\u00FDmi. Pravd\u011Bpodobnost pokryt\u00ED m\u016F\u017Ee v n\u011Bkter\u00FDch p\u0159\u00EDpadech v\u00FDznamn\u011B klesnout pod vybranou \u00FArove\u0148 spolehlivosti jak odhalili za pou\u017Eit\u00ED metody Monte Carlo Maroto et al. Jejich \u010D\u00EDseln\u00E9 v\u00FDsledky z\u00EDskan\u00E9 za p\u0159edpokladu, \u017Ee se p\u0159i testu v\u00FDznamnosti objevily pouze chyby typu \u00DF, a zji\u0161t\u011Bn\u00ED, \u017Ee sn\u00ED\u017Een\u00ED pokryt\u00ED z\u00E1vis\u00ED pouze na vz\u00E1jemn\u00FDch pom\u011Brech velikost\u00ED systematick\u00E9 chyby, celkov\u00E9 nejistoty a nejistoty vych\u00FDlen\u00ED, jsou v tomto \u010Dl\u00E1nku potvrzeny za pou\u017Eit\u00ED po\u010Dtu pravd\u011Bpodobnosti a numerick\u00E9 integrace. Tento probl\u00E9m je rovn\u011B\u017E studov\u00E1n, kdy\u017E jsou uva\u017Eov\u00E1ny v\u0161echna mo\u017En\u00E1 empirick\u00E1 vych\u00FDlen\u00ED. P\u0159i tomto pohledu se sn\u00ED\u017Een\u00ED pravd\u011Bpodobnosti pokryt\u00ED ukazuje m\u00E9n\u011B v\u00E1\u017En\u00E9 ne\u017E p\u0159i pohledu p\u0159edchoz\u00EDm. Pravd\u011Bpodobnost pokryt\u00ED je tak\u00E9 vy\u0161et\u0159ov\u00E1na pro n\u011Bkter\u00E9 nejistotn\u00ED intervaly po\u010D"@cs . . "Effect of insignificant bias and its uncertainty on the coverage probability of uncertainty intervals Part 1. Evaluation for a given value of the true bias"@en . . "1"^^ . . "RIV/44555601:13520/06:00003555" . "Effect of insignificant bias and its uncertainty on the coverage probability of uncertainty intervals Part 1. Evaluation for a given value of the true bias" . . . "NL - Nizozemsko" . . "1"^^ . "5" . "Vliv nev\u00FDznamn\u00E9ho vych\u00FDlen\u00ED a jeho nejistoty na pravd\u011Bpodobnost pokryt\u00ED nejistotn\u00EDho intervalu \u010C\u00E1st 1. Vyhodnocen\u00ED pro danou hodnotu skute\u010Dn\u00E9ho vych\u00FDlen\u00ED"@cs . "Vliv nev\u00FDznamn\u00E9ho vych\u00FDlen\u00ED a jeho nejistoty na pravd\u011Bpodobnost pokryt\u00ED nejistotn\u00EDho intervalu \u010C\u00E1st 1. Vyhodnocen\u00ED pro danou hodnotu skute\u010Dn\u00E9ho vych\u00FDlen\u00ED"@cs . . . "P(1M0554)" . "70" . . "This paper investigates the coverage probability of the uncertainty intervals determined in compliance with the GUM and EURACHEM Guide, which are defined by expanded uncertainty U about the results uncorrected with the insignificant biases and corrected with the significant biases. This coverage probability can significantly fall below the chosen level of confidence in some cases as Maroto et al. discovered by using the Monte Carlo method. Their numerical results obtained provided that only the \u00DF errors have occurred in the test significance and findings that the coverage reduction depends on the mutual proportions of the magnitudes of the systematic error, overall uncertainty and bias uncertainty are confirmed in this paper by using probability calculus and numerical integration. This problem is also studied when all possible experimental biases, both significant and insignificant, are considered. From this point of view, the reduction of the coverage probability turns out to be less severe than from"@en . "0039-9140" . . . "Talanta" . "1024-1034" . "Synek, V\u00E1clav" . "Effect of insignificant bias and its uncertainty on the coverage probability of uncertainty intervals Part 1. Evaluation for a given value of the true bias" . . "This paper investigates the coverage probability of the uncertainty intervals determined in compliance with the GUM and EURACHEM Guide, which are defined by expanded uncertainty U about the results uncorrected with the insignificant biases and corrected with the significant biases. This coverage probability can significantly fall below the chosen level of confidence in some cases as Maroto et al. discovered by using the Monte Carlo method. Their numerical results obtained provided that only the \u00DF errors have occurred in the test significance and findings that the coverage reduction depends on the mutual proportions of the magnitudes of the systematic error, overall uncertainty and bias uncertainty are confirmed in this paper by using probability calculus and numerical integration. This problem is also studied when all possible experimental biases, both significant and insignificant, are considered. From this point of view, the reduction of the coverage probability turns out to be less severe than from" . "Effect of insignificant bias and its uncertainty on the coverage probability of uncertainty intervals Part 1. Evaluation for a given value of the true bias"@en . . "473090" . . "11"^^ . . "[60C23B6B38C4]" . "Bias; \u00DF Error; Correction for systematic error; Coverage probability; t-Test; Uncertainty"@en . .