[size=150]A continuación, encontrarás varios problemas para poner en práctica la proporcionalidad. Lee atentamente los enunciados y resuélvelos contestando las siguientes preguntas.[/size]
[br][size=150][b][br]1. Sandra va a merendar a una heladería donde cada helado cuesta 2,50 euros. Ha decidido comprarse 5 helados en total.[/b][br][/size][br][br][br][br][img]https://t.pimg.jp/068/848/480/1/68848480.jpg[/img][br][br][br][size=150]¿Qué operación utilizarías para saber cuánto le costarán 5 helados? ¿Por qué?[/size]
[size=150][size=150]¿Cuánto le costarán entonces los 5 helados?[/size][br][/size][br][size=150][br][/size]
[size=150]¿Y si quisiera 3 helados?[/size]
[size=150][justify]Completa esta tabla en tu cuaderno con los datos que has obtenido, ¿Qué observas? ¿Hay alguna relación?[/justify][br][center][img]data:image/png;base64,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[/img][/center][/size]
[size=150]Teniendo en cuenta el enunciado de este ejercicio ¿Qué tipo de proporcionalidad es?[/size]
[size=150]¿Por qué es ese tipo de proporcionalidad? ¿Cómo lo has hecho? ¿Qué operaciones has utilizado?[/size]
[b][size=150]2. Dos agricultores tardan 6 horas en recoger toda la cosecha, ¿ Qué operación harías para saber cuántas horas tardaría un solo agricultor?[/size][/b]
[size=150]¿Cuánto tarda entonces uno solo?[/size]
[size=150]¿Tarda más o menos? ¿Por qué?[/size]
[size=150]¿Y que operación utilizarías si lo hicieran entre 3? ¿Cuánto tardarán?[/size]
[size=150]Y si vinieran a ayudarles aún más... ¿Cuánto tardarían seis agricultores?[/size]
[size=150]Completa esta tabla en tu cuaderno con los datos que has obtenido. [br][br][center][img]data:image/png;base64,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[/img][/center][/size]
[size=150]¿Observas algo en particular?[/size]
[size=150]Teniendo en cuenta el enunciado de este ejercicio ¿Qué tipo de proporcionalidad es?[/size]
[size=150]¿Por qué? ¿Qué operaciones has hecho?[/size]