[b]Para usar o applet:[/b][br][br]Use as setas para obter a fração desejada.[br]Clique em "mostrar" para ter uma fração equivalente. [br]Use as novas setas para obter outras frações equivalentes.[br]Clique em "esconder" para voltar a etapa anterior.
[math]\frac{5}{6}[/math] é equivalente a [math]\frac{25}{30}[/math].
[math]\frac{15}{20}[/math] é equivalente a [math]\frac{3}{4}[/math]?
Analise a seguinte situação:[br][br][img]data:image/png;base64,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[/img][br]Por que [math]\frac{2}{5}[/math] é equivalente a [math]\frac{6}{15}[/math]?