tag:blogger.com,1999:blog-6775266567707797162023-11-15T23:29:18.518-08:00Teoria cientifica de la administracionGinnahttp://www.blogger.com/profile/01393212643063625181noreply@blogger.comBlogger1125tag:blogger.com,1999:blog-677526656770779716.post-10065813262077378532012-05-16T08:31:00.001-07:002012-05-16T08:31:24.668-07:00<div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><u><b>EN QUE C<span style="font-family: "Courier New",Courier,monospace;">ONSISTE?</span></b></u></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><u><b> </b></u></span> </div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>El enfoque típico de la <a class="autolink" href="http://www.monografias.com/trabajos13/artcomu/artcomu.shtml" id="autolink">escuela</a> de la <a class="autolink" href="http://www.monografias.com/trabajos36/administracion-y-gerencia/administracion-y-gerencia.shtml" id="autolink">administración</a> científica es el énfasis en las tareas. El nombre <a class="autolink" href="http://www.monografias.com/trabajos7/act/act.shtml" id="autolink">administración científica</a> se debe al intento de aplicar los <a class="autolink" href="http://www.monografias.com/trabajos11/metods/metods.shtml" id="autolink">métodos</a> de <a class="autolink" href="http://www.monografias.com/trabajos16/ciencia-y-tecnologia/ciencia-y-tecnologia.shtml" id="autolink">la ciencia</a> a los <a class="autolink" href="http://www.monografias.com/trabajos15/calidad-serv/calidad-serv.shtml#PLANT" id="autolink">problemas</a> de la <a class="autolink" href="http://www.monografias.com/Administracion_y_Finanzas/index.shtml" id="autolink">administración</a>, con el fin de alcanzar elevada <a class="autolink" href="http://www.monografias.com/trabajos11/veref/veref.shtml" id="autolink">eficiencia</a> industrial. Los principales métodos científicos aplicables a los problemas de la administración son la <a class="autolink" href="http://www.monografias.com/trabajos11/metcien/metcien.shtml#OBSERV" id="autolink">observación</a> y la <a class="autolink" href="http://www.monografias.com/trabajos15/la-estadistica/la-estadistica.shtml" id="autolink">medición</a>. La escuela de la administración científica fue iniciada en el comienzo de este siglo por el ingeniero mecánico americano Frederick W. <a class="autolink" href="http://www.monografias.com/trabajos7/freta/freta.shtml" id="autolink">Taylor</a>, considerado el fundador de la moderna TGA.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>A Esta Corriente se le llama Administración Científica Por la Racionalización que hace de los dos métodos de <a class="autolink" href="http://www.monografias.com/trabajos14/historiaingenieria/historiaingenieria.shtml" id="autolink">ingeniería</a> aplicados a la administración y debido a que desarrollan <a class="autolink" href="http://www.monografias.com/trabajos11/norma/norma.shtml" id="autolink">investigaciones</a> experimentales orientadas hacia el rendimiento del obrero.</b></span></div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"><img alt="" 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" /></span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><u><b><a href="" id="carac" name="carac"></a>CARACTERISTICAS</b></u></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Salarios altos y bajos <a class="autolink" href="http://www.monografias.com/trabajos4/costos/costos.shtml" id="autolink">costos</a> unitarios de <a class="autolink" href="http://www.monografias.com/trabajos54/produccion-sistema-economico/produccion-sistema-economico.shtml" id="autolink">producción</a>.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Aplicar métodos científicos al problema global, con el fin de formular</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>principios y establecer <a class="autolink" href="http://www.monografias.com/trabajos14/administ-procesos/administ-procesos.shtml#PROCE" id="autolink">procesos</a> estandarizados.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Los empleados deben ser dispuestos científicamente en <a class="autolink" href="http://www.monografias.com/trabajos14/verific-servicios/verific-servicios.shtml" id="autolink">servicios</a> o puestos de <a class="autolink" href="http://www.monografias.com/trabajos34/el-trabajo/el-trabajo.shtml" id="autolink">trabajo</a> donde los <a class="autolink" href="http://www.monografias.com/trabajos14/propiedadmateriales/propiedadmateriales.shtml" id="autolink">materiales</a> y las condiciones laborales sean seleccionados con criterios científicos, para que así las <a class="autolink" href="http://www.monografias.com/trabajos4/leyes/leyes.shtml" id="autolink">normas</a> sean cumplidas.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Los empleados deben ser entrenados científicamente para perfeccionar sus aptitudes.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Debe cultivarse una <a class="autolink" href="http://www.monografias.com/trabajos/atm/atm.shtml" id="autolink">atm</a>ósfera cordial de cooperación entre la <a class="autolink" href="http://www.monografias.com/trabajos3/gerenylider/gerenylider.shtml" id="autolink">gerencia</a> y los trabajadores.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>La racionalización del trabajo productivo debería estar acompañada por una <a class="autolink" href="http://www.monografias.com/trabajos15/todorov/todorov.shtml#INTRO" id="autolink">estructura</a> general de <a class="autolink" href="http://www.monografias.com/trabajos11/empre/empre.shtml" id="autolink">la empresa</a> que hiciese coherente la aplicación de sus <a class="autolink" href="http://www.monografias.com/trabajos6/etic/etic.shtml" id="autolink">principios</a>.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><img alt="" 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" /><b> </b></span></div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><u><b><a href="" id="rt" name="rt">RACIONALIZACIÓN DEL TRABAJO</a></b></u></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Como entre los diferentes métodos e instrumentos utilizados en cada trabajo hay siempre un <a class="autolink" href="http://www.monografias.com/trabajos11/metods/metods.shtml" id="autolink">método</a> más rápido y un instrumento más adecuado que los demás, estos métodos e instrumentos pueden encontrarse y perfeccionarse mediante un <a class="autolink" href="http://www.monografias.com/trabajos11/metods/metods.shtml#ANALIT" id="autolink">análisis</a> científico y depurado estudio de tiempos y movimientos, en lugar de dejarlos a criterio <a class="autolink" href="http://www.monografias.com/trabajos11/fuper/fuper.shtml" id="autolink">personal</a> de cada operario. Ese intento de sustituir métodos empíricos y rudimentarios por los métodos científicos en todos los oficios recibió el nombre de <a class="autolink" href="http://www.monografias.com/trabajos6/napro/napro.shtml" id="autolink">organización</a> racional del trabajo ORT.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"><u> </u></span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><u><b><a href="" id="pac" name="pac"></a>PRINCIPIOS DE LA ADMINISTRACION CIENTIFICA</b></u></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Principios de <a class="autolink" href="http://www.monografias.com/Administracion_y_Finanzas/index.shtml" id="autolink">la administración</a> científica de Taylor.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Para Taylor, la gerencia adquirió nuevas atribuciones y responsabilidades descritas por los cuatro principios siguientes:</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>1. Principio de <a class="autolink" href="http://www.monografias.com/trabajos7/plane/plane.shtml" id="autolink">planeamiento</a>: sustituir en <a class="autolink" href="http://www.monografias.com/trabajos/fintrabajo/fintrabajo.shtml" id="autolink">el trabajo</a> el criterio individual del operario, la improvisación y la actuación empírico-práctica por los métodos basados en <a class="autolink" href="http://www.monografias.com/trabajos13/mapro/mapro.shtml" id="autolink">procedimientos</a> científicos. Sustituir la improvisación por la <a class="autolink" href="http://www.monografias.com/trabajos10/fciencia/fciencia.shtml" id="autolink">ciencia</a>, mediante la <a class="autolink" href="http://www.monografias.com/trabajos7/plane/plane.shtml" id="autolink">planeación</a> del método.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>2. Principio de la preparación / planeación: seleccionar científicamente a los trabajadores de acuerdo con sus aptitudes y prepararlos, entrenarlos para producir más y mejor, de acuerdo con el método planeado.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>3. Principio del <a class="autolink" href="http://www.monografias.com/trabajos14/control/control.shtml" id="autolink">control</a>: controlar el trabajo para certificar que el mismo esta siendo ejecutado de acuerdo con las normas establecidas y según el <a class="autolink" href="http://www.monografias.com/trabajos7/plane/plane.shtml" id="autolink">plan</a> previsto.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>4. Principio de la ejecución: distribuir distintamente las atribuciones y las responsabilidades, para que la ejecución del trabajo sea disciplinada.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b><a href="" id="opi" name="opi"></a><u>OTROS PRINCIPIOS IMPLÍCITOS DE ADMINISTRACIÓN CIENTÍFICA SEGÚN TAYLOR</u></b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Estudiar el trabajo de los operarios, descomponerlo en sus movimientos elementales y cronometrarlo para después de un análisis cuidadoso, eliminar o reducir los movimientos inútiles y perfeccionar y racionalizar los movimientos útiles.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Estudiar cada trabajo antes de fijar el modo como deberá ser ejecutado.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Seleccionar científicamente a los trabajadores de acuerdo con las tareas que le sean atribuidas.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Dar a los trabajadores instrucciones <a class="autolink" href="http://www.monografias.com/trabajos6/juti/juti.shtml" id="autolink">técnicas</a> sobre el modo de trabajar, o sea, entrenarlos adecuadamente.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Separar las <a class="autolink" href="http://www.monografias.com/trabajos7/mafu/mafu.shtml" id="autolink">funciones</a> de planeación de las de ejecución, dándoles atribuciones precisas y delimitadas.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Especializar y entrenar a los trabajadores, tanto en la planeación y control del trabajo como en su ejecución.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Preparar la producción, o sea, planearla y establecer premios e <a class="autolink" href="http://www.monografias.com/trabajos6/moem/moem.shtml" id="autolink">incentivos</a> para cuando fueren alcanzados los estándares establecidos, también como otros premios e incentivos mayores para cuando los patrones fueren superados.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Estandarizar los utensilios, materiales, maquinaria, equipo, métodos y procesos de trabajo a ser utilizados.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Dividir proporcionalmente entre la <a class="autolink" href="http://www.monografias.com/trabajos11/empre/empre.shtml" id="autolink">empresa</a>, los accionistas, los trabajadores y los consumidores las ventajas que resultan del aumento de la producción proporcionado por la racionalización.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Controlar la ejecución del trabajo, para mantenerlos en niveles deseados, perfeccionarlo, corregirlo y premiarlo.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Clasificar de forma práctica y simple los equipos, procesos y materiales a ser empleados o producidos, de forma que sea fácil su manejo y uso.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"><u> </u></span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><u><b><a href="" id="p" name="p">PERSPECTIVA</a></b><b>:</b></u></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b><a href="" id="pt" name="pt">Los principios de Taylor.</a> 1. - Substituir las reglas por la ciencia (<a class="autolink" href="http://www.monografias.com/trabajos/epistemologia2/epistemologia2.shtml" id="autolink">conocimiento</a> organizado).</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>2. - Obtener armonía más que discordia en la <a class="autolink" href="http://www.monografias.com/trabajos35/categoria-accion/categoria-accion.shtml" id="autolink">acción</a> de <a class="autolink" href="http://www.monografias.com/trabajos14/dinamica-grupos/dinamica-grupos.shtml" id="autolink">grupo</a>.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>3. - Lograr la cooperación entre los seres humanos, en vez del individualismo caótico.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>4. - Trabajar en busca de una producción máxima en vez de una producción restringida.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>5. - Desarrollar a todos los trabajadores hasta el grado más alto posible para su propio beneficio y la mayor prosperidad de la compañía.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b><a href="" id="pe" name="pe"></a><u>Principio de excepción</u></b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Taylor adoptó un <a class="autolink" href="http://www.monografias.com/trabajos11/teosis/teosis.shtml" id="autolink">sistema</a> de control operacional bastante simple que se basaba no en el <a class="autolink" href="http://www.monografias.com/trabajos15/indicad-evaluacion/indicad-evaluacion.shtml" id="autolink">desempeño</a> medio sino en la verificación de las excepciones o desvío de los patrones normales; todo lo que ocurre dentro de los patrones normales no deben ocupar demasiada <a class="autolink" href="http://www.monografias.com/trabajos14/deficitsuperavit/deficitsuperavit.shtml" id="autolink">atención</a> del <a class="autolink" href="http://www.monografias.com/trabajos10/habi/habi.shtml" id="autolink">administrador</a>. Según este principio, las decisiones más frecuentes deben reducirse a la rutina y delegadas a los subordinados, dejando los problemas más serios e importantes para los superiores; este principio es un sistema de <a class="autolink" href="http://www.monografias.com/trabajos7/sisinf/sisinf.shtml" id="autolink">información</a> que presenta sus <a class="autolink" href="http://www.monografias.com/trabajos11/basda/basda.shtml" id="autolink">datos</a> solamente cuando los resultados, efectivamente verificados en la práctica, presentan divergencias o se distancian de los resultados previstos en algún problema. Se fundamenta en <a class="autolink" href="http://www.monografias.com/trabajos14/informeauditoria/informeauditoria.shtml" id="autolink">informes</a> condensados y resumidos que muestran apenas los desvíos, omitiendo los hechos normales, volviéndolos comparativos y de fácil utilización y visualización.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b><a href="" id="pee" name="pee"></a><u>Principios de eficiencia de Emerson</u></b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Buscó simplificar los métodos de estudios y de trabajo de su maestro (Taylor), creyendo que aun perjudicando la perfección de la organización, sería más razonable realizar menores <a class="autolink" href="http://www.monografias.com/trabajos10/rega/rega.shtml#ga" id="autolink">gastos</a> en el análisis del trabajo. Fue <a class="autolink" href="http://www.monografias.com/trabajos15/fundamento-ontologico/fundamento-ontologico.shtml" id="autolink">el hombre</a> que popularizó la administración científica y desarrolló los primeros trabajos sobre <a class="autolink" href="http://www.monografias.com/trabajos5/selpe/selpe.shtml" id="autolink">selección</a> y <a class="autolink" href="http://www.monografias.com/trabajos14/mocom/mocom.shtml" id="autolink">entrenamiento</a> de los empleados. Los principios de rendimiento pregonados por Emerson son:</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Trazar un plan <a class="autolink" href="http://www.monografias.com/trabajos16/objetivos-educacion/objetivos-educacion.shtml" id="autolink">objetivo</a> y bien definido, de acuerdo con los ideales.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Establecer el predominio del sentido común.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Mantener orientación y <a class="autolink" href="http://www.monografias.com/trabajos13/conce/conce.shtml" id="autolink">supervisión</a> competentes.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Mantener <a class="autolink" href="http://www.monografias.com/trabajos14/disciplina/disciplina.shtml" id="autolink">disciplina</a>.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Mantener <a class="autolink" href="http://www.monografias.com/trabajos13/valores/valores.shtml" id="autolink">honestidad</a> en los acuerdos, o sea, <a class="autolink" href="http://www.monografias.com/trabajos14/hanskelsen/hanskelsen.shtml" id="autolink">justicia</a> social en el trabajo.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Mantener <a class="autolink" href="http://www.monografias.com/trabajos7/regi/regi.shtml" id="autolink">registros</a> precisos, inmediatos y adecuados.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Fijar remuneración proporcional al trabajo.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Fijar normas estandarizadas para las condiciones de trabajo.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Fijar normas estandarizadas para el trabajo.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Fijar normas estandarizadas para las <a class="autolink" href="http://www.monografias.com/trabajos6/diop/diop.shtml" id="autolink">operaciones</a>.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Establecer instrucciones precisas.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Fijar incentivos eficientes al mayor rendimiento y a la eficiencia.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b> </b></span></div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b><a href="" id="pbf" name="pbf"></a><u>Principios básicos de Ford</u></b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Utilizó un sistema de <a class="autolink" href="http://www.monografias.com/trabajos11/funpro/funpro.shtml" id="autolink">integración</a> vertical y horizontal, produciendo desde la <a class="autolink" href="http://www.monografias.com/trabajos14/costosbanc/costosbanc.shtml#MATER" id="autolink">materia prima</a> inicial hasta el <a class="autolink" href="http://www.monografias.com/trabajos12/elproduc/elproduc.shtml" id="autolink">producto</a> final, además de una cadena de <a class="autolink" href="http://www.monografias.com/trabajos11/travent/travent.shtml" id="autolink">distribución</a> comercial a través de agencias propias. Hizo una de las mayores fortunas del mundo gracias al constante perfeccionamiento de sus métodos, procesos y <a class="autolink" href="http://www.monografias.com/trabajos12/elproduc/elproduc.shtml" id="autolink">productos</a>. A través de la racionalización de la producción creó la línea de montaje, lo que le permitió la producción en serie, esto es, el moderno método que permite fabricar grandes cantidades de un determinado producto estandarizado.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Ford adoptó tres principios básicos:</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Principio de intensificación: consiste en disminuir el <a class="autolink" href="http://www.monografias.com/trabajos901/evolucion-historica-concepciones-tiempo/evolucion-historica-concepciones-tiempo.shtml" id="autolink">tiempo</a> de producción con el <a class="autolink" href="http://www.monografias.com/trabajos36/teoria-empleo/teoria-empleo.shtml" id="autolink">empleo</a> inmediato de los equipos y de la <a class="autolink" href="http://www.monografias.com/trabajos10/lamateri/lamateri.shtml" id="autolink">materia</a> prima y la rápida colocación del producto en el <a class="autolink" href="http://www.monografias.com/trabajos13/mercado/mercado.shtml" id="autolink">mercado</a>.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Principio de la economicidad: consiste en reducir al mínimo el <a class="autolink" href="http://www.monografias.com/trabajos5/volfi/volfi.shtml" id="autolink">volumen</a> de materia prima en transformación.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Principio de la <a class="autolink" href="http://www.monografias.com/trabajos6/prod/prod.shtml" id="autolink">productividad</a>: consiste en aumentar la capacidad de producción del <a class="autolink" href="http://www.monografias.com/trabajos15/fundamento-ontologico/fundamento-ontologico.shtml" id="autolink">hombre</a> en el mismo período (productividad) mediante la especialización y la línea de montaje.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Se caracteriza por la aceleración de la producción por medio de un trabajo rítmico, coordinado y económico. Fue también uno de los primeros hombres de empresa en utilizar incentivos no saláriales para sus empleados. En el área de <a class="autolink" href="http://www.monografias.com/trabajos13/mepla/mepla.shtml" id="autolink">mercadeo</a> implantó la asistencia técnica, el sistema de concesionarios y una inteligente <a class="autolink" href="http://www.monografias.com/Politica/index.shtml" id="autolink">política</a> de <a class="autolink" href="http://www.monografias.com/trabajos16/fijacion-precios/fijacion-precios.shtml#ANTECED" id="autolink">precios</a>.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"><u> </u></span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><u><b><a href="" id="ae" name="ae">AUTORES O EXPONENTES</a></b></u></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"><u> </u></span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><u><b>FREDERICK TAYLOR</b></u></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>A el se debe que la administración se haya empezado a estudiar como materia separada y así <a class="autolink" href="http://www.monografias.com/trabajos35/el-poder/el-poder.shtml" id="autolink">poder</a> aplicar la ciencia sobre ella para mejoraría de resultados, es también conocido como el "Padre de la Administración Científica".</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Fue uno de los principales exponentes del cientificismo, nace en Filadelfia en el año de 1856 y muere en 1915. Ingresó a una compañía que fabricaba lingotes de <a class="autolink" href="http://www.monografias.com/trabajos10/hidra/hidra.shtml#fa" id="autolink">acero</a> en la época de <a class="autolink" href="http://www.monografias.com/trabajos15/depreciacion-fiscal/depreciacion-fiscal.shtml#DEPRE" id="autolink">depreciación</a> en los EE.UU. ocupando el puesto de obrero y luego pasando por los demás niveles llegó al puesto mas alto. Esto le permitió darse cuenta de las afectaciones que hacían los obreros a las <a class="autolink" href="http://www.monografias.com/trabajos6/auti/auti.shtml" id="autolink">máquinas</a>.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Sus obras:</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>"Principios de la <a class="autolink" href="http://www.monografias.com/trabajos13/parde/parde.shtml#que" id="autolink">administración pública</a>"<br />
"Fundamentos de administración científica"<br />
"Las correas" y muchos <a class="autolink" href="http://www.monografias.com/trabajos11/dertrat/dertrat.shtml" id="autolink">tratados</a> más.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Dentro de sus principales aportaciones a la administración están los principios administrativos, los mecanismos de administración, el pago por destajo, la selección de personal y las características de los trabajos humanos.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><u><b>Principios Administrativos:</b></u></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>1.- Estudio de Tiempos y Movimientos<br />
2.- Selección de obreros<br />
3.- <a class="autolink" href="http://www.monografias.com/trabajos33/responsabilidad/responsabilidad.shtml" id="autolink">Responsabilidad</a> compartida<br />
4.- Aplicación a la administración</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Mecanismos Administrativos:</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>1. Estudio de tiempos y movimientos<br />
2. Supervisión funcional<br />
3. <a class="autolink" href="http://www.monografias.com/trabajos11/teosis/teosis.shtml" id="autolink">Sistemas</a> o departamentos de producción<br />
4. Principio de la excepción<br />
5. <a class="autolink" href="http://www.monografias.com/trabajos10/tarin/tarin.shtml" id="autolink">Tarjetas</a> de inscripción<br />
6. Uso de la regla de calculo<br />
7. Estandarización de las tarjetas de instrucción<br />
8. Bonificación de las tarjetas de instrucción<br />
9. Estudio de las rutas de producción<br />
10.Sistema de clasificación de la producción<br />
11.<a class="autolink" href="http://www.monografias.com/trabajos7/coad/coad.shtml#costo" id="autolink">Costo</a> de la producción.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Su principal contribución fue en demostrar que la Administración científica no es un grupo de técnicas de eficiencia o incentivos sino una <a class="autolink" href="http://www.monografias.com/trabajos910/en-torno-filosofia/en-torno-filosofia.shtml" id="autolink">filosofía</a> en virtud de la cual la gerencia reconoce que su objetivo es buscar científicamente los mejores métodos de trabajo a través del entretenimiento y de los tiempos u movimientos.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"><u> </u></span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><u><b>HERRY RABINSON TOWNE </b></u></span></div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"><u> </u></span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><u><b>(1844-1924)</b></u></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Towne fue el mediador para alcanzar el reconocimiento de Taylor y sus métodos. Fue también un innovador por su propio derecho, especialmente en sus intentos por mejorar los sistemas de jornada por trabajo a destajo. Abogo por un intercambio de experiencias entre los gerentes de <a class="autolink" href="http://www.monografias.com/trabajos14/verific-servicios/verific-servicios.shtml" id="autolink">servicio</a> de diferentes compañías bajo la <a class="autolink" href="http://www.monografias.com/trabajos15/direccion/direccion.shtml" id="autolink">dirección</a> de la ASME presentando así los Datos sobre los que podría basarse una ciencia administrativa.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><u><b>HERRY LAWRENCE GANTT </b></u></span></div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"><u> </u></span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><u><b>(1861-1919)</b></u></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Originario del sur de Maryland <a class="autolink" href="http://www.monografias.com/trabajos7/esun/esun.shtml" id="autolink">Estados unidos</a> obtuvo titulo de ingeniero conoció a Tylor en 1887 en la Midvale Steel Co. y a partir de esa fecha se convirtió en fiel discípulo y colaborador, sin embargo, Gantt presto mas atención en crear un <a class="autolink" href="http://www.monografias.com/trabajos15/medio-ambiente-venezuela/medio-ambiente-venezuela.shtml" id="autolink">ambiente</a> que le permita obtener mayor cooperación de sus trabajadores, al fijarles una tarea bien definida. Para tal efecto estableció un sistema de remuneración a los obreros a los que llamo primas y tareas de Gantt.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Así mismo <a class="autolink" href="http://www.monografias.com/trabajos12/desorgan/desorgan.shtml" id="autolink">desarrollo</a> métodos de adiestramientos de obreros para formarlos profesionalmente, su aportación más relevante fue el desarrollo de técnicas <a class="autolink" href="http://www.monografias.com/trabajos11/estadi/estadi.shtml#METODOS" id="autolink">graficas</a> para planear y controlar las cuales en la actualidad lleva su nombre.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>FRANK BUNKER GILBREN</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>(1868-1924)</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Sus estudios y <a class="autolink" href="http://www.monografias.com/trabajos10/cuasi/cuasi.shtml" id="autolink">experimentos</a> lo llevaron a identificar los 17 elementos básicos que se podrían aplicar en cualquier actividad para reducir movimientos. el llamo a estos elementos THERBLIGS denominación que utilizo por <a class="autolink" href="http://www.monografias.com/trabajos12/cntbtres/cntbtres.shtml" id="autolink">inversión</a> de su apellido A cada elemento le asigno un símbolo y un <a class="autolink" href="http://www.monografias.com/trabajos5/colarq/colarq.shtml" id="autolink">color</a>. Estos elementos eran</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Buscar:</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Coger</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Seleccionar</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Trasporte vació</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Trasporte c / carga</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Sostener</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Dejar carga</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Poner en posición</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Colocación previa</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Inspeccionar</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Montar</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Desmontar</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Utilizar</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Espera Inevitable</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Espera evitable</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Plan</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Descanso</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Desarrollo un esquema de <a class="autolink" href="http://www.monografias.com/trabajos14/administ-procesos/administ-procesos.shtml#PROCE" id="autolink">proceso</a>, <a class="autolink" href="http://www.monografias.com/trabajos12/diflu/diflu.shtml" id="autolink">diagramas</a> de flujo que permite estudiar operaciones completas y no solo una actividad en especial, para la toma de decisiones al eliminar, reducir o combinar operaciones, mismas que se identifican como operación trasporte inspección, demoras y almacenaje.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b><a href="" id="at" name="at"></a><u>APLICABILIDAD DE LA TEORIA</u></b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><br />
</div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Aplicaciones Actuales En Las Organizaciones</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Todas las <a class="autolink" href="http://www.monografias.com/trabajos11/empre/empre.shtml" id="autolink">empresas</a> actualmente basan su funcionamiento en todos los conceptos dados por los clásicos de la administración, pero al día de hoy, las empresas comprueban que la <a class="autolink" href="http://www.monografias.com/trabajos11/conge/conge.shtml" id="autolink">calidad</a> y el servicio son uno de los factores mas importantes para lograr la alta productividad en la misma ; de ahí que se necesite una combinación de las <a class="autolink" href="http://www.monografias.com/trabajos4/epistemologia/epistemologia.shtml" id="autolink">teorías</a> clásicas y de la <a class="autolink" href="http://www.monografias.com/trabajos4/epistemologia/epistemologia.shtml" id="autolink">teoría</a> moderna administrativa.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Definiciones Operacionales:</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>a) Camas Disponibles: es el número de camas realmente instaladas en el Hospital en condiciones de uso para la atención de pacientes internados, Independientemente que estén ocupadas o no.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>b) Paciente-día: es el conjunto de servicios brindados a un paciente hospitalizado en el período comprendido entre la 0 y las 24 horas de un día censal.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>c) Día-cama disponible: es el período de 24 horas, durante el cual una cama del Hospital se mantiene a disposición para el uso de pacientes hospitalizados.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>d) Día de estada: es el número de días de permanencia en el hospital de un paciente egresado, comprendidos entre la fecha de ingreso y la fecha de egreso.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Indicadores de Rendimiento Hospitalario: a título de ejemplo se mencionarán algunos de ellos:</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>a) Promedio días de estadía: es el número de días que en promedio estuvo internado cada paciente egresado:</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Total días de Estadía / No. total de egresos</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>b) Porcentaje Ocupacional: es el porcentaje de camas que en promedio estuvieron ocupadas diariamente durante un período:</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Total de pacientes-días / Total de días-camas disponibles</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>c) Giro de Camas: indica el número de pacientes egresados por cada cama en el período:</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Total de egresados del período / Promedio de camas disponibles</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Area Programática:</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Es el ámbito geográfico de cobertura asignado a un establecimiento, para ejecutar el <a class="autolink" href="http://www.monografias.com/Computacion/Programacion/" id="autolink">programa</a> de atención médica y de saneamiento ambiental.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>El área programática de cada Hospital se determina según distintas especificaciones, por ejemplo, la capacidad de sus servicios de implementar las actividades programáticas, la posibilidad de acceso geográfico de la <a class="autolink" href="http://www.monografias.com/trabajos/explodemo/explodemo.shtml" id="autolink">población</a> y la relación con otros centros asistenciales.</b></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>Debe distinguirse de la anterior a la denominada "área de influencia", determinada por la <a class="autolink" href="http://www.monografias.com/trabajos/ofertaydemanda/ofertaydemanda.shtml" id="autolink">demanda</a> espontánea y regular de pacientes residentes fuera del área programática.</b></span></div><span style="font-family: "Courier New",Courier,monospace; font-size: small;"> </span><div class="separator" style="clear: both; font-family: "Courier New",Courier,monospace; text-align: center;"><span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhHTqmNcP0m0F3x_Q9bEPaP84sHZl7YZp4IJRmXMvJtB1DdG6xaS5i5mvS6nUj-tRp8_2v41fVq-qJ-UAlvxI6OHPIHqGYeFgyMZlf9XV0Lj6Lf0xnonHoEzJe1tj4tgzqlKQUTXvnY41s/s1600/administracion+cien.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="197" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhHTqmNcP0m0F3x_Q9bEPaP84sHZl7YZp4IJRmXMvJtB1DdG6xaS5i5mvS6nUj-tRp8_2v41fVq-qJ-UAlvxI6OHPIHqGYeFgyMZlf9XV0Lj6Lf0xnonHoEzJe1tj4tgzqlKQUTXvnY41s/s320/administracion+cien.jpg" width="320" /></a></span></div><div style="font-family: "Courier New",Courier,monospace;"><br />
</div><div class="separator" style="clear: both; font-family: "Courier New",Courier,monospace; text-align: center;"><span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhZeYi4EmCL0UKx8RpZe1JaAEJhd-zG-nyQyil7nCEqboxA-2pDUdiNYeNsWgrNGb_xDvj23oKuyXt-aNbQO_Ohx-ckLgfpqbxSlBvq9HV420lJjgk-qAibWDmRu_cCAqQ5Zjw4uveOSz4/s1600/mapa_conceptual_1.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="240" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhZeYi4EmCL0UKx8RpZe1JaAEJhd-zG-nyQyil7nCEqboxA-2pDUdiNYeNsWgrNGb_xDvj23oKuyXt-aNbQO_Ohx-ckLgfpqbxSlBvq9HV420lJjgk-qAibWDmRu_cCAqQ5Zjw4uveOSz4/s320/mapa_conceptual_1.png" width="320" /></a></span></div><div style="font-family: "Courier New",Courier,monospace;"><br />
</div><div class="separator" style="clear: both; font-family: "Courier New",Courier,monospace; text-align: center;"><span style="font-size: small;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjDCwiHRffkIT9WqS63qFSzj_xaRQ6twFygXF4K2XfyhyphenhyphenrKd0NnPgYtrcHr0dMv6vc6ZdN523njHepH2ENbB_pSpicuswQM733e3l1DhqBjXIl3b80DeOosSKeNdD5EJV-AZYO2g89UC40/s1600/enfoques+cientificos.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjDCwiHRffkIT9WqS63qFSzj_xaRQ6twFygXF4K2XfyhyphenhyphenrKd0NnPgYtrcHr0dMv6vc6ZdN523njHepH2ENbB_pSpicuswQM733e3l1DhqBjXIl3b80DeOosSKeNdD5EJV-AZYO2g89UC40/s1600/enfoques+cientificos.jpg" /></a></span></div><div style="color: purple; font-family: "Courier New",Courier,monospace;"><span style="font-size: small;"><b>El rea de influencia, habitualmente es mucho más amplia que el área programática y deber ser tenida en cuenta en la <a class="autolink" href="http://www.monografias.com/Computacion/Programacion/" id="autolink">programación</a> de actividades hospitalarias.</b></span></div>Ginnahttp://www.blogger.com/profile/01393212643063625181noreply@blogger.com0