¿En esta imagen cuál sería la [b]UNIDAD[/b]?

¿Cuál sería el [b]DENOMINADOR[/b] del puzzle?[br]

[justify][/justify]¿Qué fracción representa las piezas que[b] ya hemos puesto[/b]?[br]

¿Qué fracción de piezas [b]nos falta por poner[/b]?[br]

[b]Y ahora... un poquito más difícil...[br][/b]¿Qué fracción representa este gráfico?[br][img]data:image/png;base64,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[/img]