Um carro percorreu a distância de 150 km em 3 horas, a expressão que representa a razão entre essas grandezas é dada por:[br]

Suponha que um viajante saiu de carro da cidade A para a cidade B e, decorridas 4 horas, percorreu 240 km e chegou ao seu destino final. Qual foi a velocidade média desse automóvel?[br][br]

A partir das informações fornecidas pelo IBGE, referentes ao ano de 2022, sobre a área territorial e população residente na cidade de Recife, Pernambuco, calcule a densidade demográfica.[br][br][br][img]data:image/png;base64,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[/img]