Fracciones: razón
¿Qué es el significado de razón?[br][br][b][size=200]RAZÓN[/size][br][br][/b]Podemos decir que [u]razón[/u] es un cociente o una división entre dos o más cantidades que se puede expresar como fracción.
[size=200][b]EJEMPLO:[br][/b][/size][br]Queremos preparar una receta y necesitamos arroz. En la receta nos dice que tenemos que echar dos vasos de agua por cada vaso de arroz. ¿Cómo podemos representar esto en razón?
Primero, debemos entender cómo se lee en razón.[br]Vamos a usar este ejemplo de la receta para explicarlo.[br]Tenemos esta fracción:[br]
[img]data:image/png;base64,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[/img]
Esto quiere decir que [math]\frac{2}{1}[/math] (dos vasos de agua (numerador: 2) por cada vaso de agua (denominador: 1).[br]En razón esto se lee [u]dos a uno.[/u]
¿Sabes responder a este problema?
[img]data:image/png;base64,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[/img][br]Daniel y Marta tienen caramelos azules de piña y caramelos rosas de fresa. [br]¿Cuántos caramelos azules tienen? ¿Y rosas?
¿Cómo expresarías la fracción de caramelos?
Y por último, ¿cómo se lee esa fracción?