TY  - BOOK
AU  - Gaucin, Víctor.
AU  - Gaucin, Víctor
AU  - Ríos, Marta
AU  - Benavides, Francisco
AU  - Benavides, Ángela
TI  - Principios de Investigación de operaciones
SN  - 978-607-550-215-1
U1  - 658.403 4 
PY  - 2020///
CY  - Ciudad de México
PB  - Grupo Editorial Patria
KW  - Investigación de operaciones
KW  - Programación lineal
N1  - Contiene: Introducción a la investigación de operaciones; Programación lineal; Método gráfico; Método simplex; Problemas de dualidad y análisis de sensibilidad; Programación  lineal entera; Transporte y asignación
UR  - 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
ER  -