[b]1.[/b] Usando a ferramenta ponto [img]data:image/png;base64,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[/img], insira os pontos [br]A(-2, -3), B(-1, -1), C(0,1), D(1, 3) e E(2, 5).[br][br][b]2. [/b]Digite a lei da função [b]y = 2x + 1 [/b]no campo de entrada. [br][img]data:image/png;base64,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[/img][br][br][b]3.[/b] Use a ferramenta Ponto em Objeto. Clique em qualquer lugar da reta. Será criado um novo ponto F.[br] [img]data:image/png;base64,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[/img][br][br][b]4.[/b] 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Animação.[br][img]data:image/png;base64,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[/img]
O gráfico de uma função afim, que é uma reta, possui quantos pontos?
Explique por que o ponto E(2, 5) pertence ao gráfico da função y = 2x + 1.
Porque no ponto E(2, 5) temos que x = 2 e y = 5.[br]Substituindo x por 2 na lei da função, temos que y = 2(2) + 1 = 4 + 1 = 5.
Usando a ferramenta ponto, insira o ponto G(-3, -2). O ponto G(-3, -2) pertence ao gráfico da função y = 2x + 1 ?
1. Usando a ferramenta ponto [img]data:image/png;base64,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[/img], insira os pontos A(0, 1) e B(2, 5).[br][br]2. Usando a ferramenta reta [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAD0AAAA7CAYAAADIO4L0AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAQxSURBVGhD7ZpfSFtXHMe/qQvGOlhEpVoGs6BC0aJDDVSxFqqbFkGf2idlQnwQikH3pCusZTS+FCX4EP9kUPSpe3IPTpn6EESFqAxBKahQC4MKUbQwiZ3V7Pe7HkdX7q1Jdqv3ePOBk3vPOffhfDg593dO8rPs7++HYTIuiaupiEubhYjW9NxcAgKBBLx8acHbt6LRYCQmAteuheFwHOLmzUPRqs5HpQ8OAJ/PSlcL7tyx4Pp1IClJdBqMUAh48QKYmgrDag3D6Tygq+j8gI9Ke71WZGZewv37okESnj8HXr8+QksLzZoKmmuav9I8w7IJMzxmHjs7qKEpzWuYv9KywmNnBzU0pfmlxWtYVnjs7KCGpjS/pY360ooEHrtWpDFlnI5Lm4ULIz0yMiLuTudCSLe1tcHlcona6UgtPTMzg6KiImxvb2NpaUm0no600m63G1VVVbTVbMHQ0BDsdrvoOR3ppFdXV1FdXY3p6Wlldp1Op+iJHKmkBwcHUVBQgIqKCoyNjSEnJ0f0RIchpX0+H65ezYfN9gVu376HnZ0dNDQ0oL+/n46OU+jo6BBPxobhpEdHR/HgwU90NPyetpGL8Pv/QlraV0hPT8fCwgJKS0vFk7FjOGmPZ5xkm+muiUo2ld+oJMHhcNBVHwwnvbn5J33mH1cER0d3aeY3Re3/Yzjpy5f5961fqASVOp3sqTxDfn7ecVUHDCN9Eors9r+Rl7eFhIRcKgV0RKynF9ePSkzWC0NIcygqLCxUQtH4+DiWl3/H+vofmJvzIRhco43II/GkPpyr9Eko6uvrw+Tk5H9CUVZWFkpKSpCcnCxa9OPcpPlUxBsNDkWLi4u6hKJIORfp9vZ2tLa2ore3F93d3aL17DhT6ZNTUTAYVPbNdXV1ouds+STSe3t7mJ+fx8bGhmgBurq6UFlZqZyKhoeHkZKSInrOHt2lHz58ROs0h9aoE9nZX+PGjW+UUOT3+2M+FemNrtITExN48uQxQqFf8e7dEg4PVyn8pOHNG6sSinJzc8WT54uu0isrK/T5HZUSpQ6kU7lHX/fPjqsGQVfpjIwMWCx8QHifZVy58qW4Nwa6SgcCAZIO0d1dKutUniEx8We4XN9yt2HQRXp2dhbFxcVKKNraeoVbtz4n2SJkZj6lWPwDamtrxZMGgf+fVitNTeGIcLvdYZvNFh4YGBAtxoEd1Nxinum1tTXU1NT8G4qam/ngLwcxSfNvWLxvLi8vN1QoipSopHd3d9HY2Aiv16vE5M7OTtEjF1FJ8+ympqYqp6KysjLRKh9RSXs8HvT09IiavEQlXV9fL+7kJqYXmezEpd+H0w45C09WeOzsoIamNOdZctqhrPDY2UENTWlOLOU8S1nhsbODGprSnEnLiaWcZykbPGYeu1Y2cDwLWAtT5XtfVOJx2izEpc2CCaWBfwAFsV2BmZO0AQAAAABJRU5ErkJggg==[/img] clique sobre os pontos A e B.
Quantos pontos são necessários para determinar uma reta?
Preencha a tabela em cada caso. [br]Para que o ponto digitado na tabela seja automaticamente representado no plano cartesiano, digite o sinal de igual antes. Por exemplo, =(1, 1).[br][br]Use a ferramenta reta [img]data:image/png;base64,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[/img] para obter o gráfico em cada caso.
O gráfico abaixo apresenta informações sobre a relação entre a quantidade comprada (x) e o valor total pago (y) para um determinado produto que é comercializado para revendedores.[br][br][img]data:image/png;base64,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[/img][br]Um comerciante que pretende comprar 2.350 unidades desse produto para revender pagará, nessa compra, o valor total de: