TY  - GEN
AU  - Spiegel,Murray R.
AU  - Osuna Suarez,Jairo
TI  - TeorÃ­a y problemas de probabilidad y estadÃ­stica
SN  - 968-422-923-2
PY  - 1991///
CY  - MÃ©xico
PB  - McGraw-Hill
N1  - 1. Conjuntos y probabilidad - 2. Variables aleatorias y distribuciones de probabilidad - 3. Esperanza matemÃ¡tica - 4. DistribuciÃ³n de probabilidad con nombre propio - 5. TeorÃ­a de muestreo - 6. TeorÃ­a de estimaciÃ³n - 7. Ensayos de hipotesis y significaciÃ³n - 8. Curva de ajuste, regresiÃ³n y correlaciÃ³n - 9. AnÃ¡lisis de varianza
UR  - 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
ER  -