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[/img][br]A produção de peças em uma indústria tem um custo fixo de R$ 8,00 mais um custo variável de R$ 0,50 por unidade produzida. [br]Considerando x a quantidade de unidades produzidas (nesse caso, x é um número natural), determine a lei da função que fornece o custo total y de x peças:

A lei de função da questão anterior corresponde à uma função afim?

Calcule o custo de 100 unidades produzidas nessa indústria.

Determine quantas peças podem ser produzidas com R$ 83,00.

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[/img][br]Gustavo é representante comercial. Ele recebe mensalmente um salário composto de 2 partes: uma fixa, no valor de R$ 2.200,00, e uma variável, que corresponde a uma comissão de 7% (0,07) sobre o total de vendas que ele faz durante o mês. Considere S o salário mensal e x o total das vendas do mês. [br][br]Qual é a lei da função que associa S a x?[br]

Uma pessoa tinha no banco um saldo positivo de R$ 450,00. Após um saque no caixa eletrônico que fornece apenas notas de 50 reais, o novo saldo (y) é dado em função da quantidade (x) de notas retiradas.[br][br]Qual é a lei da função que determina o novo saldo?

Se Gustavo aumentar a quantidade de vendas durante o mês:

Se aumentarmos a quantidade de notas retiradas no saque do caixa eletrônico:

O gráfico que representa o salário de Gustavo é uma função:

O gráfico que representa o saldo bancário é uma função: