Para fazer as atividades propostas, recomendo que explorem anteriormente as atividades [url=https://www.geogebra.org/m/wdetmPun]https://www.geogebra.org/m/wdetmPun[/url] e [url=https://www.geogebra.org/m/g2g3mYaU]https://www.geogebra.org/m/g2g3mYaU[/url]
Considere o gráfico abaixo[br][img]data:image/png;base64,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[/img][br]Qual das equações representa a função que descreveu o gráfico?