Localização de Racionais na Reta

Questão 01
A professora Clotilde pediu que seus estudantes escrevessem um número que[br]representasse meio ou metade.[br][img]data:image/png;base64,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[/img][br]Os estudantes que acertaram o exercício foram:
Questão 02
Assinale a alternativa em que consta o intervalo inteiro em que se localiza o número racional [math]-\frac{4}{3}[/math]:
Questão 03
Marque na reta numérica a seguir a localização do número racional [math]\frac{9}{4}[/math]:
Questão 04
Marque na reta numérica a seguir a localização do número racional [math]-\frac{8}{3}[/math]:
Questão 05
Marque na reta numérica a seguir a localização do número racional [math]\frac{22}{7}[/math]:
Close

Information: Localização de Racionais na Reta