Título : | Cálculo con geometría analítica. | Tipo de documento: | texto impreso | Autores: | Purcell, Edwing j., Autor ; Varberg, Dale., Autor | Mención de edición: | 4a Edición. | Editorial: | México; Prentice-Hall Hispanoamericana, | Fecha de publicación: | 1987. | Número de páginas: | 883 p. | ISBN/ISSN/DL: | 958-880-079-10 | Idioma : | Español (spa) | Materias: | Matemáticas
| Palabras clave: | Cálculo, Geometría analítica | Clasificación: | 515.15 / P872c | Resumen: | Funciones y límites , Derivada , Aplicaciones de la derivada , Integral , Aplicaciones de la integral , Funciones trascendentales , Técnicas de integración , Formas indeterminadas e integrales impropias , Métodos numéricos , Series infinitas , Cónicas y coordenadas polares , Geometría en el plano y espacio vectores , Derivadas en el espacio , Integral en el espacio , Cálculo vectorial , Ecuaciones diferenciales. |
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) 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