1. Los [math]\frac{3}{4}[/math] de una docena de naranjas ¿Cuántas naranjas son? [b]Explica tu respuesta[/b].

2.Con los [math]\frac{2}{3}[/math] de $1500 Pepe compró una caja de chocolate ¿Cuál fue el precio de esta caja? [b]Explica tu respuesta[/b].

3.En una olla habían 12 litros de leche, si se derraman los [math]\frac{5}{6}[/math] de esa cantidad ¿Cuántos litros queda aún? [b]Explica tu respuesta[/b].

4. Don Rómulo tiene que aflojar una tuerca pequeñita: para esto le pide a su hijo que le escoja entre las tres llaves que tiene, aquella que es de menor calibre. Si una de estas llaves es de un cuarto, otra de un dieciseisavo y la otra de tres octavos ¿Cuál será la llave que debe escoger el hijo? [b]Explica tu respuesta[/b].

5.Las franjas en que están divididos los rectángulos P y Q es el mismo tamaño. Si el área del rectángulo P se mide utilizando el rectángulo Q, el área de P es igual a _______. [b]Explica tu respuesta[/b].[br][img]data:image/png;base64,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[/img]

6. Si en los dos rectángulos se utiliza el rectángulo P para medir el área del rectángulo Q, complete la siguiente frase de tal manera que exprese correctamente el resultado de la medicion:[br]"El área de Q es igual a ______ del área de P" [b]Explica tu respuesta[/b].

7. De los 10 problemas que dejó el profesor como tarea, Orlando solucionó 7. El rendimiento de Orlando en esta tarea se puede expresar así. [b]Explica tu respuesta[/b].

8.En el partido de baloncesto Juan encestó 5 tiros de los 12 que lanzo. Expresa, mediante una fracción, el rendimiento de Juan en este partido. [b]Explica tu respuesta[/b].

9. Por cada 25 libros que compras te regalan 3. La razón del número de libros obsequiados al número de libros comprados es ________. [b]Explica tu respuesta[/b].