kw.\*:("POPULATION NORMALE")
Results 1 to 12 of 12
Selection :
ANALYSE DISCRIMINANTE DES POPULATIONS NORMALES AVEC DIFFERENTES MATRICES DE COVARIANCEMALINOVSKIJ LG.1975; PROBL. PEREDACHI INFORM.; S.S.S.R.; DA. 1975; VOL. 11; NO 3; PP. 53-60; BIBL. 6 REF.Article
LOCALLY-BEST UNBIASED ESTIMATION OF THE CORRELATION COEFFICIENT IN A BIVARIABLE NORMAL POPULATIONGOLDSTEIN GB.1972; IN: 3RD SYMP. NONLINEAR ESTIMATION THEORY APPL. PROC. SAN DIEGO, CALIF., 1972; NORTH HOLLYWOOD, CALIF.; WESTERN PERIODICALS CO.; DA. 1972; PP. 81-84; BIBL. 5 REF.Conference Proceedings
THE IDENTIFICATION PROBLEM FOR A MIXTURE OF OBSERVATIONS FROM TWO NORMAL POPULATIONSRAYMENT PR.1972; TECHNOMETRICS; U.S.A.; DA. 1972; VOL. 14; NO 4; PP. 911-918; BIBL. 2 REF.Serial Issue
DETERMINATION APPROCHEE DE LA DUREE D'UNE PROCEDURE SEQUENTIELLE DE SEPARATION DE DEUX POPULATIONS NORMALES MULTIDIMENSIONNELLES DANS LE CAS GENERALRAZIN AM; FOMIN YA A; KONOVALIKHIN YU N et al.1977; AVTOMAT. VYCHISLIT. TEKH., LATV. S.S.R.; S.S.S.R.; DA. 1977; NO 5; PP. 45-48; BIBL. 6 REF.Article
TESTING GROUP EFFECTS FROM TYPE II CENSORED NORMAL SAMPLES IN EXPERIMENTAL DESIGNTIKU ML.1973; BIOMETRICS; U.S.A.; DA. 1973; VOL. 29; NO 1; PP. 25-33; ABS. FR.; BIBL. 13 REF.Serial Issue
ESTIMATION OF THE DIRECTION OF A BIVARIATE NORMAL MEAN WITH FINITE MEMORYTARUMI T.1972; MEM. FAC. SCI. KYUSHU UNIV., A; JAP.; DA. 1972; VOL. 26; NO 2; PP. 351-359; BIBL. 3 REF.Serial Issue
INTERVALLE DE CONFIANCE POUR LA MOYENNE COMMUNE DE PLUSIEURS DISTRIBUTIONS NORMALESPAGUROVA VI; GURSKIJ VV.1979; TEOR. VEROJAT. PRIMEN.; SUN; DA. 1979; VOL. 24; NO 4; PP. 885-892; ABS. ENG; BIBL. 3 REF.Article
ESTIMATION DE LA MOYENNE DANS UNE POPULATION NORMALEIBRAGIMOV IA; KHAS'MINSKIJ RZ.1974; PROBL. PEREDACHI INFORM.; S.S.S.R.; DA. 1974; VOL. 10; NO 2; PP. 64-74; BIBL. 1 REF.Article
Steps toward healing: false memories and traumagenic amnesia may coexist in vulnerable populationsBAARS, B. J; MCGOVERN, K.Consciousness and cognition (Print). 1995, Vol 4, Num 1, pp 68-74, issn 1053-8100Article
A two-stage sampling by unequal size samples from two normal populations with unknown variancesTARGHETTA, M. L.Metrika (Heidelberg). 1997, Vol 45, Num 1, pp 31-37, issn 0026-1335Article
Table of percentage points of the Behrens-Fisher distributionKIM, S.-H; COHEN, A. S.Journal of statistical computation and simulation (Print). 1996, Vol 55, Num 3, pp 181-187, issn 0094-9655Article
On an estimator of normal population mean and UMVU estimation of its relative efficiencySAHAI, Ashok.Applied mathematics and computation. 2004, Vol 152, Num 3, pp 701-708, issn 0096-3003, 8 p.Article