[center]Quais dos gráficos abaixo representam uma função quadrática?[br][br]1 - 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[/img] 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[/img][br][br]3 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[/img] 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[/img][/center]

Seja [math]f[/math] a função quadrática definida por [math]f\left(x\right)=\left(m-3\right)x^2+2x-m[/math], determine as opções verdadeiras. [br]