1. La mitad de los tres cuartos de $120 ¿Cuántos pesos son? [b]Explica tu respuesta[/b].

2. Con los dos tercios de $1500 Pepe compró una caja de chocolates ¿Cual fue el precio de esta caja? [b]Explica tu respuesta[/b].

3. Los tres cuartos de una docena de naranjas ¿Cuántas naranjas son? [b]Explica tu respuesta[/b].

4. En una caja caben exactamente 8 cubitos. El volumen de un cubito comparado con el volumen interno de la caja puede expresarse como ______. [b]Explica tu respuesta[/b].

5. Para medir la longitud de la cuerda M se utilizó la cuerda S. Si en ambas cuerdas los nudos están igualmente separados, la longitud de M es igual a _____. [b]Explica tu respuesta[/b].[img]data:image/png;base64,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[/img]

6. Una compañía expresa en años el tiempo que emplea en la realización de sus obras. En la construcción de un puente la compañía demoró 7 meses. Escriba el dato en años correspondiente al tiempo empleado en hacer dicha obra. [b]Explica tu respuesta[/b].[br][img]data:image/png;base64,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[/img]

7. En un supermercado ofrecen un descuento de $20 por cada $100 del precio de la compra. Expresa de dos formas distintas este descuento. [b]Explica tu respuesta[/b].

8. Mientras estuve en el parque pasaron 7 busetas y 13 automóviles ¿Cuál es la razón del número de busetas al número total de vehículos los que pasaron mientras estuve en el parque? [b]Explica tu respuesta[/b].

9. Si en una reunión de 60 personas, 48 son hombre ¿Qué parte del número de personas son estos 48 hombres? [b]Explica tu respuesta[/b].