bg-purpleAl cargar el formatobg-teal[{"value":"Página 1","type":"elementovariable","id":"formElec_element1","tipo":"pagina"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Si","type":"environment"}]<variable> = <expresion>formElec_event2bg-teal[{"value":"Página 2","type":"elementovariable","id":"formElec_element20","tipo":"pagina"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event2bg-teal[{"value":"Página 3","type":"elementovariable","id":"formElec_element34","tipo":"pagina"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event2bg-teal[{"value":"Página 4","type":"elementovariable","id":"formElec_element35","tipo":"pagina"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event2bg-teal[{"value":"Wizard pagina 2","type":"elementovariable","id":"formElec_element32","tipo":"wizard"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Si","type":"environment"}]<variable> = <expresion>formElec_event2bg-teal[{"value":"Wizard pagina 4","type":"elementovariable","id":"formElec_element65","tipo":"wizard"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event2bg-teal[{"value":"Fecha 66","type":"elementovariable","id":"formElec_element66","tipo":"fecha"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Hoy","type":"environment"}]<variable> = <expresion>formElec_event2bg-teal[{"value":"Folio VALMEX","type":"elementovariable","id":"formElec_element68","tipo":"texto"},{"value":".","type":"point"},{"value":"habilitado","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event2bg-teal[{"value":"NuevoDocumento","type":"environment"},{"value":"=","type":"equal"},{"value":"Si","type":"environment"}]<variable> = <expresion>formElec_event2bg-orangeSi <expresion> Entonces (Si No)formElec_event1bg-teal[{"value":"ExpedienteTransitar","type":"elementovariable","id":"formElec_element67","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"2","type":"unit"}]<variable> = 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bigglyphicon glyphicon-picturefalseLogofalsefalseLogotrueformElec_element11falsetrue0%0%falseCargando...spinner-borderverticalleftbignone4_3_formElec_element97normal.*falseglyphicon glyphicon-fontfalse200Folio VALMEXnormalFolio_VALMEXTexto Linealfalse2falsefalsefalseFolio VALMEXtruefalseformElec_element12falsefalsefalsetrue0%0%falseCargando...spinner-border verticalleftbignone4_3_formElec_element6normalbg-purpleAl cambiar el valor del elementobg-teal[{"value":"Número de contrato","type":"elementovariable","id":"formElec_element22","tipo":"texto"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Número de contrato","type":"elementovariable","id":"formElec_element2","tipo":"texto"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"}]<variable> = <expresion>formElec_event33bg-teal[{"value":"Número de contrato","type":"elementovariable","id":"formElec_element36","tipo":"texto"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Número de contrato","type":"elementovariable","id":"formElec_element2","tipo":"texto"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"}]<variable> = <expresion>formElec_event33bg-teal[{"value":"Número de contrato","type":"elementovariable","id":"formElec_element37","tipo":"texto"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Número de contrato","type":"elementovariable","id":"formElec_element2","tipo":"texto"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"}]<variable> = <expresion>formElec_event33^[0-9]*$trueglyphicon glyphicon-fontfalse500Número de contratoupperNumero_de_contratoTexto Linealfalse4Número de contrato,Número de contrato_2,Número de contrato_3,Número de contrato_4falsefalsefalseNúmero de contratotruefalseformElec_element13falsefalsefalsetrue0%0%falseCargando...spinner-border verticalleftbignonenormald/m/Yfalsefa fa-calendarfalseFechaFecha_datetimeFechafalse1Fecha,Fecha_2,Fecha_3,Fecha_4false/falseFechatruetrueformElec_element14-9999-9999falsefalsetrue0%0%falseCargando...spinner-bordercenterbignonenormalboldfa fa-paragraphfalseLeyendatruefalseLeyenda 6CUESTIONARIO PARA CONOCER EL PERFIL DEL CLIENTE APLICABLE A PERSONAS FISICAStrueformElec_element15falsefalsetrue0%0%falseCargando...spinner-borderfalseverticalleftbignone4_3_formElec_element22normal^[A-Za-zÑñáéíóúÁÉÍÓÚ\s]*$trueglyphicon glyphicon-fontfalse1000NombrenormalNombreTexto Linealfalse3NombrefalsetruefalseNombretruetrueformElec_element16falsefalsefalsetrue0%0%falseCargando...spinner-border verticalleftbignonenormal^[A-Za-zÑñáéíóúÁÉÍÓÚ\s]*$trueglyphicon glyphicon-fontfalse1000OcupaciónnormalOcupacionTexto Linealfalse1OcupaciónfalsefalsefalseOcupaciónfalsetrueformElec_element17falsefalsefalsetrue0%0%falseCargando...spinner-border justifybignonenormalnormalfa fa-paragraphfalseLeyendatruefalseLeyenda 10Estimado Cliente, le informamos que los Servicios de inversión que esta Casa de Bolsa ofrece, sus características y diferencias, así como las comisiones que se cobrarán, se encuentran en la Guía de Servicios de Inversión, misma que está a su disposición en la página electrónica www.valmex.com.mxtrueformElec_element18falsefalsetrue0%0%falseCargando...spinner-borderfalsebigtrueglyphicon glyphicon-modal-windowtrueSecciónfalsefalseELECCIÓN DE SERVICIOS DE INVERSIÓNtrueformElec_element19left#cccccc#f5f5f5#000000nonenormal1normalfalsetruetrue0%0%falsetrueCargando...spinner-borderverticalleftbigfalse33falsenonenormalbg-purpleAl cambiar el valor del elementobg-teal[{"value":"Wizard pagina 2","type":"elementovariable","id":"formElec_element32","tipo":"wizard"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Si","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"Wizard pagina 4","type":"elementovariable","id":"formElec_element65","tipo":"wizard"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"12)El porcentaje que deseo invertir en Renta Variable es\n(Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element51","tipo":"lista"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Si","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"13)Estoy dispuesto a invertir en una sola acción en directo(Nota: a mayor porcentaje por emisora menor diversificación ymayor riesgo). (Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element52","tipo":"lista"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Si","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"14)El porcentaje que deseo invertir en valores corporativos\n(ejemplo: Papel comercial, bonos y certificados bursátiles).\n(Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element53","tipo":"lista"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Si","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"15)Estoy dispuesto a invertir en valores corporativos\n(ejemplo: papel comercial, bonos y certificados bursátiles)\nEn una sola emisora (Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element54","tipo":"lista"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Si","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"16)¿Requiere restricciones adicionales a las que se derivande su perfil de inversión? (Puede seleccionar más de\nuna opción):","type":"elementovariable","id":"formElec_element55","tipo":"lista"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Si","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"Wizard pagina 4","type":"elementovariable","id":"formElec_element65","tipo":"wizard"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Si","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"Wizard pagina 2","type":"elementovariable","id":"formElec_element32","tipo":"wizard"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"12)El porcentaje que deseo invertir en Renta Variable es\n(Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element51","tipo":"lista"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"13)Estoy dispuesto a invertir en una sola acción en directo(Nota: a mayor porcentaje por emisora menor diversificación ymayor riesgo). (Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element52","tipo":"lista"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"14)El porcentaje que deseo invertir en valores corporativos\n(ejemplo: Papel comercial, bonos y certificados bursátiles).\n(Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element53","tipo":"lista"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"15)Estoy dispuesto a invertir en valores corporativos\n(ejemplo: papel comercial, bonos y certificados bursátiles)\nEn una sola emisora (Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element54","tipo":"lista"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"16)¿Requiere restricciones adicionales a las que se derivande su perfil de inversión? (Puede seleccionar más de\nuna opción):","type":"elementovariable","id":"formElec_element55","tipo":"lista"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"1) Mi Rango de edad es:","type":"elementovariable","id":"formElec_element27","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"2) Grado Máximo de Estudio:","type":"elementovariable","id":"formElec_element28","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"3) La estrategia de inversión que HE UTILIZADO en mi portafolio de inversión ha sido (Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element29","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"4) ¿Conoce usted las características de los servicios de inversión? (Asesoría de Inversiones, Gestión de Inversiones, Ejecución de Operaciones y/o Comercialización de Promoción):","type":"elementovariable","id":"formElec_element30","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"5) ¿En cuáles de los siguientes instrumentos ha invertido en los últimos 2 años? (Puede seleccionar más de una opción)","type":"elementovariable","id":"formElec_element31","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"¿Cuáles?","type":"elementovariable","id":"formElec_element40","tipo":"textarea"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"6) Lo que deseo invertir representa de mi patrimonio financiero: (No incluye por ejemplo: bienes raíces, joyas, arte,","type":"elementovariable","id":"formElec_element42","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"7) Del patrimonio que deseo invertir (Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element43","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"8) Podría estar dispuesto a asumir compromisos financieros adicionales al valor de mi inversión:","type":"elementovariable","id":"formElec_element45","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"Porcentaje %","type":"elementovariable","id":"formElec_element50","tipo":"numero"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"9) El objetivo de mi inversión actual podría ser (Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element46","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"10) ¿En qué plazo podría utilizar la mayor parte de los recursos de esta inversión? (Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element47","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"11) Si pudiera elegir uno de los siguientes portafolios ¿Cuál elegiría? (Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element64","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"12)El porcentaje que deseo invertir en Renta Variable es\r\n(Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element51","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"13)Estoy dispuesto a invertir en una sola acción en directo(Nota: a mayor porcentaje por emisora menor diversificación ymayor riesgo). (Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element52","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"14)El porcentaje que deseo invertir en valores corporativos\r\n(ejemplo: Papel comercial, bonos y certificados bursátiles).\r\n(Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element53","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"15)Estoy dispuesto a invertir en valores corporativos\r\n(ejemplo: papel comercial, bonos y certificados bursátiles)\r\nEn una sola emisora (Favor de seleccionar una opción):","type":"elementovariable","id":"formElec_element54","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"16)¿Requiere restricciones adicionales a las que se derivande su perfil de inversión? (Puede seleccionar más de\r\nuna opción):","type":"elementovariable","id":"formElec_element55","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"\"\"","type":"quotation"}]<variable> = <expresion>formElec_event51bg-teal[{"value":"Favor de marcar con “X” solo una opción:","type":"elementovariable","id":"formElec_element13","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"2","type":"unit"}]<variable> = <expresion>formElec_event51bg-orangeSi <expresion> Entonces (Si No)formElec_event50catalogosnormaltrueglyphicon glyphicon-th-listfalse1Servicios_inversion1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12Servicioinversion 0falsefalsefalseididradioFavor de marcar con “X” solo una opción:falsetrueformElec_element111falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalsebigtrueglyphicon glyphicon-modal-windowtrueSecciónfalsefalseAdvertencia respecto al servicio de Ejecución de operaciones:trueformElec_element110left#cccccc#f5f5f5#000000nonenormal1normalfalsetruetrue0%0%falsetrueCargando...spinner-borderjustifybigunderlinenormalnormalfa fa-paragraphfalseLeyendatruefalseLeyenda 15Es muy importante informarle, que en este servicio el cliente es responsable de verificar que las operaciones que se realicen, los valores o instrumentos financieros derivados que adquieran, son acordes a su objetivo de inversión, así como evaluar sus riesgos inherentes. Por consiguiente este servicio no está restringido por ninguna categoría de perfil. Las operaciones pactadas por medio de este servicio, en ningún caso procederán de una recomendación por parte del promotor o de la casa de bolsa.trueformElec_element141falsefalsetrue0%0%falseCargando...spinner-borderfalsejustifybignonenormalnormalfa fa-paragraphfalseLeyendafalsefalseLeyenda 16Las diferencias entre el servicio de Ejecución de Operaciones y los Servicios de Inversión Asesorados, son que a través de los servicios asesorados, la “Casa de Bolsa” brindará al cliente recomendaciones o consejos de inversión para la toma de decisiones, o bien, tomarlas por su cuenta tratándose del servicio de gestión de inversiones, siendo el caso que mediante la ejecución de operaciones, la Casa de Bolsa, exclusivamente ejecutará las instrucciones del Cliente, absteniéndose de emitir cualquier tipo de consejo o recomendación, siendo el Cliente el único responsable de los riesgos inherentes a la ejecución de dichas operaciones.trueformElec_element142falsefalsetrue0%0%falseCargando...spinner-borderfalsebigtrueglyphicon glyphicon-modal-windowtrueSecciónfalsefalseIMPORTANTEtrueformElec_element111left#cccccc#f5f5f5#000000nonenormal1normalfalsetruetrue0%0%falsetrueCargando...spinner-borderjustifybignonenormalboldfa fa-paragraphfalseLeyendafalsefalseLeyenda 18Si usted únicamente seleccionó el servicio de EJECUCIÓN DE OPERACIONES, favor de remitirse a la hoja 4 Apartado A haciendo caso omiso al Cuestionario que se presenta a continuación.trueformElec_element171falsefalsetrue0%0%falseCargando...spinner-borderfalsejustifybignonenormalboldfa fa-paragraphfalseLeyendafalsefalseLeyenda 19Si su contrato será manejado por un asesor independiente favor de contestar el Apartado A que se presenta al final de este cuestionario.trueformElec_element172falsefalsetrue0%0%falseCargando...spinner-borderfalsejustifybignonenormalnormalfa fa-paragraphfalseLeyendafalsefalseLeyenda 21El siguiente cuestionario ayudará a determinar el perfil de inversión de su contrato y ofrecerle los instrumentos adecuados a sus necesidades. El cuestionario contempla los siguientes temas: I) Conocimiento y experiencia; II) Situación y capacidad financiera; III) Objetivo de inversión.trueformElec_element173falsefalsetrue0%0%falseCargando...spinner-borderfalsejustifybignonenormalnormalfa fa-paragraphfalseLeyendafalsefalseLeyenda 24El presente cuestionario tiene como única función determinar las preferencias y personalidad del cliente como inversionista, NO implica compromiso alguno ni de permanencia de la inversión, ni de la clase de instrumentos que se mencionan en el mismo.trueformElec_element174falsefalsetrue0%0%falseCargando...spinner-borderfalseverticalleftnormalfalse47falsenonenormalcatalogosnormalfalseglyphicon glyphicon-th-listfalse0ExpedienteTransitar1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12falsefalsefalseididcomboExpedienteTransitarfalsefalseformElec_element112falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalsebigtrueglyphicon glyphicon-modal-windowtrueSecciónfalsefalseI. CONOCIMIENTO Y EXPERIENCIA DEL CLIENTEtrueformElec_element113left#cccccc#f5f5f5#000000nonenormal1normalfalsetruetrue0%0%falsetrueCargando...spinner-borderverticalleftbigfalse28falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0Rango_edad1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12Rangoedad 0falsefalsetrueididradio1) Mi Rango de edad es:falsetrueformElec_element251falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticalleftbigfalse29falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0Grado_maximo_estudio1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12Gradomaximoestudio 0falsefalsefalseididradio2) Grado Máximo de Estudio:falsetrueformElec_element252falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticaljustifybigfalse30falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0Estrategia_inversion1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12Estrategiainversionportafolioinversion 0falsefalsefalseididradio3) La estrategia de inversión que HE UTILIZADO en mi portafolio de inversión ha sido (Favor de seleccionar una opción):falsetrueformElec_element253falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticaljustifybigfalse31falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0Conoce_caract_inversion1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12Conocecaracteristicas 0falsefalsefalseididradio4) ¿Conoce usted las características de los servicios de inversión? (Asesoría de Inversiones, Gestión de Inversiones, Ejecución de Operaciones y/o Comercialización de Promoción):falsetrueformElec_element254falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticaljustifybigfalse32falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse3instrumentacion_invertida_10001Lista/Catálogofalse1col-sm-12 col-12Instrumentosinvertidos 10falsefalsefalsedescidcheckbox5) ¿En cuáles de los siguientes instrumentos ha invertido en los últimos 2 años? (Puede seleccionar más de una opción)falsetrueformElec_element255falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticaljustify40bignonenormal.*trueglyphicon glyphicon-text-heightfalse1000normalCualesTexto Multilineasfalse1Cuálesfalsefalsefalse¿Cuáles?falsetrueformElec_element256falsefalsefalsetrue0%0%falseCargando...spinner-borderbigtrueglyphicon glyphicon-modal-windowtrueSecciónfalsefalseII. SITUACIÓN Y CAPACIDAD FINANCIERAtrueformElec_element114left#cccccc#f5f5f5#000000nonenormal1normalfalsetruetrue0%0%falsetrueCargando...spinner-borderverticaljustifybigfalse34falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0Lo_que_deseo_invertir1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12Deseoinvertirrepresentapatrimonio 0falsefalsefalseididradio6) Lo que deseo invertir representa de mi patrimonio financiero: (No incluye por ejemplo: bienes raíces, joyas, arte, negocios) (Favor de seleccionar una opción):falsetrueformElec_element411falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticaljustifybigfalse35falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0Patrimonio_que_deseo_invertir1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12patrimoniodeseoinvertir 0falsefalsefalseididradio7) Del patrimonio que deseo invertir (Favor de seleccionar una opción):falsetrueformElec_element412falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticalleftbigfalse36falsenonenormalbg-purpleAl cambiar el valor del elementobg-teal[{"value":"Porcentaje %.","type":"elementovariable","id":"formElec_element50","tipo":"numero"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event41bg-teal[{"value":"Porcentaje %","type":"elementovariable","id":"formElec_element50","tipo":"numero"},{"value":".","type":"point"},{"value":"requerido","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"No","type":"environment"}]<variable> = <expresion>formElec_event41bg-teal[{"value":"Porcentaje %","type":"elementovariable","id":"formElec_element50","tipo":"numero"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"0","type":"unit"}]<variable> = <expresion>formElec_event41bg-teal[{"value":"Porcentaje %.","type":"elementovariable","id":"formElec_element50","tipo":"numero"},{"value":".","type":"point"},{"value":"visible","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Si","type":"environment"}]<variable> = <expresion>formElec_event41bg-teal[{"value":"Porcentaje %","type":"elementovariable","id":"formElec_element50","tipo":"numero"},{"value":".","type":"point"},{"value":"requerido","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"Si","type":"environment"}]<variable> = <expresion>formElec_event41bg-teal[{"value":"8) Podría estar dispuesto a asumir compromisos financieros adicionales al valor de mi inversión:","type":"elementovariable","id":"formElec_element45","tipo":"lista"},{"value":".","type":"point"},{"value":"valor","type":"propiedadvariable"},{"value":"=","type":"equal"},{"value":"1","type":"unit"}]<variable> = <expresion>formElec_event41bg-orangeSi <expresion> Entonces (Si No)formElec_event37catalogosnormaltrueglyphicon glyphicon-th-listfalse0Dispuesto_asumir_comp_fin1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12dispuestoasumircompromisosfinancieros 1falsefalsefalseididradio8) Podría estar dispuesto a asumir compromisos financieros adicionales al valor de mi inversión:falsetrueformElec_element413falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticalleftbig0nonenormal.*truefa fa-hashtagfalse1000Porcentaje de dispuestonormalPorcentaje_dispuestoNúmero1000false1%falsefalsefalsePorcentaje %falsefalseformElec_element414falsefalsefalsetrue0%0%falseCargando...spinner-borderbigtrueglyphicon glyphicon-modal-windowtrueSecciónfalsefalseIII. OBJETIVO DE INVERSION DE ESTE CONTRATOtrueformElec_element115left#cccccc#f5f5f5#000000nonenormal1normalfalsetruetrue0%0%falsetrueCargando...spinner-borderverticalleftbigfalse37falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0Objetivo_inversion1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12Objetivoinversionactual 0falsefalsefalseididradio9) El objetivo de mi inversión actual podría ser (Favor de seleccionar una opción):falsetrueformElec_element441falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticaljustifybigfalse38falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0Plazo_util_rec_inversion1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12Plazoutilizarrecursosinversion 0falsefalsefalseididradio10) ¿En qué plazo podría utilizar la mayor parte de los recursos de esta inversión? (Favor de seleccionar una opción):falsetrueformElec_element442falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticalleftbigfalse39falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0Elegir_portafolios1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12Elegirportafolio 0falsefalsefalseididradio11) Si pudiera elegir uno de los siguientes portafolios ¿Cuál elegiría? (Favor de seleccionar una opción):falsetrueformElec_element443falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticaljustifybigfalse40falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0invertir_Renta_Variable1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12PorcentajeinvertirRentaVariable 0falsefalsefalseididradio12)El porcentaje que deseo invertir en Renta Variable es (Favor de seleccionar una opción):falsetrueformElec_element444falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticalleftbigfalse41falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0Invertir_sola_accion_directo1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12Dispuestoinvertirsolaaccion 0falsefalsefalseididradio13)Estoy dispuesto a invertir en una sola acción en directo (Nota: a mayor porcentaje por emisora menor diversificación y mayor riesgo). (Favor de seleccionar una opción):falsetrueformElec_element445falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticaljustifybigfalse42falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0Deseo_invertir_valores1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12Porcentajedeseoinvertirvalorescorporativos 0falsefalsefalseididradio14)El porcentaje que deseo invertir en valores corporativos (ejemplo: Papel comercial, bonos y certificados bursátiles). (Favor de seleccionar una opción):falsetrueformElec_element446falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticaljustifybigfalse43falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0Dispuesto_invertir_valores1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12Dispuestoinvertirvalorescorporativossolaemisora 0falsefalsefalseididradio15)Estoy dispuesto a invertir en valores corporativos (ejemplo: papel comercial, bonos y certificados bursátiles) En una sola emisora (Favor de seleccionar una opción):falsetrueformElec_element447falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalseverticaljustifybigfalse44falsenonenormalcatalogosnormaltrueglyphicon glyphicon-th-listfalse0Restricciones_adicionales1Lista/Catálogofalse1col-md-12 col-sm-12 col-xs-12Restriccionesadicionales 0falsefalsefalseididradio16)¿Requiere restricciones adicionales a las que se derivande su perfil de inversión? (Puede seleccionar más de una opción):falsetrueformElec_element448falsealphaasc{t}falsetrue0%0%falseCargando...spinner-borderfalsefalsefalsebigtrueglyphicon glyphicon-modal-windowtrueSecciónfalsefalseApartado AtrueformElec_element116left#cccccc#f5f5f5#000000nonenormal1normalfalsetruetrue0%0%falsetrueCargando...spinner-borderjustifybignonenormalboldfa fa-paragraphfalseLeyendafalsefalseLeyenda 57Si su contrato será manejado por un Asesor de inversiones Independiente (que No pertenezca a Valmex), favor de llenar el siguiente campo:trueformElec_element561falsefalsetrue0%0%falseCargando...spinner-borderfalseverticaljustifybignonenormal^[A-Za-zÑñáéíóúÁÉÍÓÚ\s]*$trueglyphicon glyphicon-fontfalse1000Nombre de asesornormalNombre_asesorTexto Linealfalse1Nombre de su asesor independientefalsefalsefalseNombre de su asesor independientefalsetrueformElec_element562falsefalsefalsetrue0%0%falseCargando...spinner-border justifybignonenormalnormalfa fa-paragraphfalseLeyendafalsefalseLeyenda 59Manifiesto que he sido informado respecto a las características y riesgos implícitos tanto de los productos como servicios de inversión que la Casa de Bolsa proporciona. Así mismo manifiesto que la información proporcionada es verdadera y que no he sido inducido en el llenado de este cuestionario, en el entendido de que el resultado del mismo servirá para determinar el perfil de inversión de la cuenta.trueformElec_element563falsefalsetrue0%0%falseCargando...spinner-borderfalsejustifybignonenormalnormalfa fa-paragraphfalseLeyendafalsefalseLeyenda 60La firma del suscrito asentada en el presente documento significa que conoce, entiende y acepta el contenido íntegro del mismo, aún y cuando no todas sus páginas estén firmadas por él.trueformElec_element564falsefalsetrue0%0%falseCargando...spinner-borderfalseverticalleftbignone4_3_formElec_element22normal^[A-Za-zÑñáéíóúÁÉÍÓÚ\s]*$trueglyphicon glyphicon-fontfalse1000Nombre completonormalNombre_completoTexto Linealfalse1Nombre1falsetruefalseNombre completofalsetrueformElec_element117falsefalsefalsetrue0%0%falseCargando...spinner-border verticalleftbignone0normaltruefa fa-pencil-square-ofalsefalseFirma (Anexo)falseFirma1truefalse14FirmatrueformElec_element118false#186bb1#ffffff#ffffff#6bb2ee0%0%falsetruefalseCargando...spinner-borderportraitjustifybigbtn-primarybtn-successbtn-primarynonenormaltruefa fa-magicfalseWizardfalseformElec_element1formElec_element34false12_1AvanzarAceptarRegresarWizard 63falsetruefalsetruefalseformElec_element119true#3c8dbc#3c8dbc#3c8dbc#ffffff#ffffff#fffffffalsepublicaciontruetrue0falsetrueformElec_element0truenormal0%0%falseCargando...spinner-borderfalsefalsefalsefalseformElec_element0truefas fa-shoe-printstruefalsePie de plantillaPie de plantilla 69