Cópia de Atividade - Equação da Reta

Equação da Reta
O objetivo dessa atividade é analisar o comportamento do gráfico a partir da manipulação dos coeficientes da equação da reta.[br][br]Questão 1 - O que você observa no gráfico ao aumentar e diminuir o valor do coeficiente angular? Explique o porquê.[br][br]Questão 2 - E quando você aumenta e diminui o valor do coeficiente linear, o que acontece? Explique o porquê.[br][br]Questão 3 - [b](SAEPE – 2018) [/b]A reta t, cuja equação reduzida é dada por y = kx + z, possui coeficientes k > 0 e z < 0. O gráfico que representa essa reta é:[br][br][img]data:image/png;base64,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[/img][br][br][br]

Information: Cópia de Atividade - Equação da Reta