Função Afim - Taxa de Variação Média

Daniel, Aug 21, 2021

Table of Contents

  1. Explorações
    1. Teor de Álcool Sanguíneo
    2. Hora de Carregar o Celular
  2. Revisão e Simulação
    1. Taxa de variação média da função afim
  3. Questões de Vestibulares
    1. Questões ENEM
    2. Gabarito
  4. Gabarito

1.

Explorações

  • 1. Teor de Álcool Sanguíneo
  • 2. Hora de Carregar o Celular

1.1.

Teor de Álcool Sanguíneo

1) TEOR DE ÁLCOOL SANGUÍNEO
De acordo com o site wikiHow o Teor Alcoólico Sanguíneo, ou TAS, é a medida da proporção de álcool no sangue de uma pessoa. Um TAS de 0,08 indica que há 80 mg de álcool por 100 ml de sangue. O álcool é absorvido de forma diferente pelos homens e pelas mulheres. O corpo masculino geralmente tem mais água (61% versus 52%) e, portanto, dilui melhor o álcool, gerando TAS mais baixos.[br]O TAS é proporcional ao número de doses de bebida consumidas, de maneira que para uma[br]pessoa de 75 kg, a função linear h(x) que relaciona o TAS com o número de doses x de bebida[br]é dada pela expressão:[br][br][math]h\left(x\right)=0,0205.x[/math][br][br]Para uma pessoa que pesa 60 kg, a mesma relação é dada pela função linear:[br][br][math]m\left(x\right)=0,0307.x[/math][br]
[b]a) [/b]Complete a tabela a seguir que relaciona os valores de h(x) e de m(x) correspondentes[br]a valores inteiros de x, de 0 a 5.
Tabela a)
Utilizando os dados da tabela preenchida acima, coloque no plano cartesiano abaixo os pontos para representar esses dados obtidos.[br]Para isso, basta usar o campo "Entrada" e colocar uma letra maiúscula seguida do sinal = e as coordenadas desejadas, por exemplo:[br]A = ( 0, 1) [br][br]Obs.: Se houver números com vírgulas represente-os com . no lugar da ,
[b]b) [/b]Calcule, para a função h(x), as taxas de variação médias nos seguintes intervalos de[br]valores de x:[br][list][*]entre x = 0 e x = 1;[/*][*]entre x = 1 e x = 3;[/*][*]entre x = 2 e x = 5;[/*][/list]
Qual(is) o(s) valor(es) encontrado(s)?
[b]c)[/b] Repita o item anterior para a função m(x) nos intervalos:[br][br][list][*]entre x = 2 e x = 3;[/*][*]entre x = 1 e x = 4;[/*][*]entre x = 0 e x = 5;[/*][/list]
Qual(is) o(s) valor(es) encontrado(s)?
Você observa um padrão nos dados obtidos nos itens b) e c) ? A partir deles, faça uma conjectura (uma suposição) sobre as taxas de variação média de uma função linear qualquer.
Daniel

1.2.

2.

Revisão e Simulação

  • 1. Taxa de variação média da função afim

2.1.

Taxa de variação média da função afim

[size=150][justify][size=200][b][br]1ª Parte: [color=#0000ff]a > 0[/color][/b][/size][br][br] No [i]applet[/i] abaixo, observe a taxa de variação exibida da janela de visualização.[br][br][br]Movimente os pontos A (de abscissa x[sub]1[/sub]) ou B (de abscissa x[sub]2[/sub]), mantendo x[sub]2[/sub] > x[sub]1[/sub]. Para isso, mova os pontos sobre o eixo x.[/justify][/size]
[size=150][b]a)[/b] Ao mover os pontos A ou B, o que acontece com a taxa de variação média?[/size]
[size=150][justify][b]b)[/b] Observe o valor de [b][i]a[/i][/b]. Compare-o com o valor da taxa de variação média da função. [br]Assinale a resposta correta:[/justify][/size]
[size=150][b]c)[/b] Movimente o controle deslizante [b]a[/b]. Mova, novamente, os pontos A ou B. O que acontece com a taxa de variação média?[/size]
[size=150][justify][b]d) [/b]Observe o valor de [b][i]a[/i][/b]. Compare-o com o valor da taxa de variação média da função. [br]Assinale a resposta correta:[/justify][/size]
[size=150][justify][size=200][b]2ª Parte: [color=#0000ff]a < 0[/color][br][/b][/size][br]No[i] applet[/i] abaixo, movimente o controle deslizante [b]a[/b]. [br][br]Movimente os pontos A (de abscissa x[sub]1[/sub]) ou B (de abscissa x[sub]2[/sub]), mantendo x[sub]2[/sub] > x[sub]1[/sub]. Para isso, mova os pontos sobre o eixo x.[br][br]Observe a taxa de variação exibida da janela de visualização.[/justify][/size]
[size=150][justify][b]a) [/b]Ao mover os pontos A ou B, o que acontece com a taxa de variação média?[/justify][/size]
[size=150][justify][b]b) [/b]Observe o valor de [b]a[/b]. Compare-o com o valor da taxa de variação média da função. [br]Assinale a resposta correta:[/justify][/size]
[size=200][b]Conclusão[/b][/size][br][size=150][justify][br][/justify][/size][size=150]A taxa de variação média, em relação a x, de uma função afim qualquer, definida por [i]f(x) = ax + b[/i], é [i][b]a[/b][/i].[/size][size=150][justify][/justify][/size][br][size=150][justify][br][b][u]Observações:[br][/u][/b][br][b]1ª)[/b] Como a taxa de variação média de uma função afim é constante, nesse caso podemos dizer apenas [b][u]taxa de variação[/u][/b].[br][br][br][b]2ª)[/b] A taxa de variação da função afim pode ser interpretada como a variação em f(x) causada por cada aumento de uma unidade em x.[br][br] [u]Exemplos[/u]: [br]- a taxa de variação da função afim [i]f(x) = 5x + 2[/i] é 5, ou seja, cada acréscimo de uma unidade em x faz [i]f(x)[/i] aumentar 5 unidades; [br]- taxa de variação da função [i]g(x) = -3x + 2[/i] é -3, ou seja, cada acréscimo de uma unidade em x faz g[i](x) [/i]diminuir 3 unidades.[/justify][/size][br][justify][size=150][b]3ª) [/b] A taxa de variação da função afim pode ser obtida conhecendo-se dois dos seus valores f(x[sub]1[/sub]) e f(x[sub]2[/sub]):[/size][/justify][img]data:image/png;base64,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[/img][br][size=150][justify][b][size=200][br][br][br]Propriedade[br][/size][/b][br] Uma função afim é:[br][br]-[b] crescente[/b] (x[sub]1[/sub]< x[sub]2[/sub] ⇒ f(x1)) quando a taxa de variação [u][b][i]a[/i] é [/b][/u][b][u]positiva[/u][/b];[br][b][br][/b]- [b]decrescente[/b] (x[sub]1[/sub] < x[sub]2[/sub] ⇒ f(x1) > f(x2)) quando a taxa de variação[b][u] [i]a[/i] é negativa[/u][/b]; [br][br]- [b]constante [/b]quando [b][u]a = 0[/u][/b].[br][br][br][/justify][/size]
[size=150][size=200][b]Exercícios[/b][/size][br][br][b]1. [/b]Marque os itens que relacionam corretamente a [b]taxa de variação[/b] de cada função:[/size][br]
[size=150][b]2.[/b] Marque os itens que relacionam corretamente a interpretação de cada função:[/size]
[size=150][justify][b]3. [/b]Na produção de peças, uma indústria tem um custo fixo de R$ 8,00 mais um custo variável [br]de R$ 0,50 por unidade produzida. Sendo x o número de unidades produzidas, determine:[br][br][b]a) [/b]a lei da função que fornece o custo total de x peças.[br][br][b]b)[/b] a taxa de variação dessa função e o seu valor inicial.[br][br][b]c)[/b] o custo de 100 peças.[/justify][/size]
Larissa Moreira

3.

Questões de Vestibulares

  • 1. Questões ENEM
  • 2. Gabarito

3.1.

Questões ENEM

1.(ENEM)
Certo vendedor tem seu salário mensal calculado da seguinte maneira: ele ganha um valor fixo de R$ 750,00, mais uma comissão de R$ 3,00 para cada produto vendido. Caso ele venda mais de 100 produtos, sua comissão passa a ser de R$ 9,00 para cada produto vendido, a partir do 101º produto vendido.[br][br]Com essas informações, o gráfico que melhor representa a relação entre salário e o número de produtos vendidos 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[/img]
2. (UERJ)
A promoção de uma mercadoria em um supermercado está representada no gráfico abaixo, por 6 pontos de uma mesma reta[br][br][img]https://cdn.mesalva.com/uploads/medium/attachment/FNPGEX09enum.png[/img][br]Quem comprar 20 unidades dessa mercadoria, na promoção, pagará por unidade, em reais, qual valor?[br]
3. (ENEM)
[justify]Quem comprar 20 unidades dessa mercadoria, na promoção, pagará por unidade, em reais, qual valor?Um comerciante contratou um novo funcionário para cuidar das vendas. Combinou pagar a essa pessoa R$ 120,00 por semana, desde que as vendas se mantivessem em torno dos R$ 600,00 semanais e, como um estímulo, também propôs que na semana na qual ele vendesse R$ 1.200,00, ele receberia R$ 200,00, em vez de R$ 120,00.[br][br]Ao término da primeira semana, esse novo funcionário conseguiu aumentar as vendas para R$ 990,00 e foi pedir ao seu patrão um aumento proporcional ao que conseguiu aumentar nas vendas. O patrão concordou e, após fazer algumas contas, pagou ao funcionário a quantia de:[br][br][br]a) R$ 160,00.[br]b) R$ 165,00.[br]c) R$ 172,00.[br]d) R$ 180,00.[br]e) R$ 198,00.[/justify]
4. (ENEM)
A tabela mostra alguns dados da emissão de dióxido de carbono de uma fábrica, em função do número de toneladas produzidas.[br][br][img width=453,height=406]https://lh6.googleusercontent.com/BfLxZMJYWJeey2tdodkBBnL08Ler24lBdm90rESKrSoH-RZQ0jYXFYYiWnHyJOFFnDtp_3htLENJFnmuOsiVy_zc8sLAAzkZt4OUs2JQlLswStNDTPnt9ZXhfIL6L3cJnMNKE0UZ[/img][br][br]Os dados na tabela indicam que a taxa média de variação entre a emissão de dióxido de carbono (em ppm) e a produção (em toneladas) é:[br][br]a) inferior a 0,18.[br]b) superior a 0,18 e inferior a 0,50.[br]c) superior a 0,50 e inferior a 1,50.[br]d) superior a 1,50 e inferior a 2,80.[br]e) superior a 2,80.
5. (ENEM)
Um experimento consiste em colocar certa quantidade de bolas de vidro idênticas em um copo com água até certo nível e medir o nível da água, conforme ilustrado na figura a seguir. Como resultado do experimento, concluiu-se que o nível da água é função do número de bolas de vidro que são colocadas dentro do copo.[br][br][img]https://d2q576s0wzfxtl.cloudfront.net/2017/08/08150621/quest%C3%A3o159UM.enem2009.jpg[/img][br]O quadro a seguir mostra alguns resultados do experimento realizado.[br][br][img]https://d2q576s0wzfxtl.cloudfront.net/2017/08/08150621/quest%C3%A3o159dois.enem2009.jpg[/img][br]Qual a expressão algébrica que permite calcular o nível da água (y) em função do número de bolas (x)?[br][br]a) y = 30x[br]b) y = 25x + 20,2[br]c) y = 1,27x[br]d) y = 0,7x[br]e) y = 0,07x + 6[br][br]
6. (ENEM)
O gráfico mostra o número de favelas no município do Rio de Janeiro entre 1980 e 2004, considerando que a variação nesse número entre os anos considerados é linear.[br][br][img]https://d2q576s0wzfxtl.cloudfront.net/2017/08/08150447/quest%C3%A3o166.enem2010.jpg[/img][br]Se o padrão na variação do período 2004/2010 se mantiver nos próximos 6 anos, e sabendo que o número de favelas em 2010 é 968, então o número de favelas em 2016 será:[br][br]a) menor que 1150.[br]b) 218 unidades maior que em 2004.[br]c) maior que 1150 e menor que 1200.[br]d) 177 unidades maior que em 2010.[br]e) maior que 1200.
7. (ENEM)
[justify]Um dos grandes desafios do Brasil é o gerenciamento dos seus recursos naturais, sobretudo os recursos hídricos.  Existe uma demanda crescente por água e o risco de racionamento não pode ser descartado.  O nível de água de um reservatório foi monitorado por um período, sendo o resultado mostrado no gráfico.  Suponha que essa tendência linear observada no monitoramento se prolongue pelos próximos meses.[/justify][img width=586,height=327]https://lh3.googleusercontent.com/mDnK5BV7haYbiYVxNA6fo2_8NB8BQAXOZk_Nw_UvNLEJf5qcjrRrMgGSWWFTQH1FIUHjR8RSC5DjIJGlYEopjp401g1fixQ0h4LwsWaMejgHnQfco3BCav8LZqp1n_h-MqeEOS-G[/img][br]Nas condições dadas, qual o tempo mínimo, após o sexto mês, para que o reservatório atinja o nível zero de sua capacidade?[br][br]a) 2 meses e meio.[br]b) 3 meses e meio.[br]c) 1 mês e meio.[br]d) 4 meses.[br]e) 1 mês.
Daniel, Carolina Bastarrica

3.2.

4.

Gabarito


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