✅ Após desenvolver os cálculos, concluímos que a equação reduzida da reta tangente à referida curva pelo respectivo ponto de tangência é:
[tex]\Large\displaystyle\text{$\begin{gathered}\boxed{\boxed{\:\:\:\bf t: y = 5x - 16\:\:\:}}\end{gathered}$}[/tex]
Sejam os dados:
[tex]\Large\begin{cases} y = x^{2} - 3x\\x = 4\end{cases}[/tex]
Observe que:
[tex]\Large\displaystyle\text{$\begin{gathered} y = f(x)\end{gathered}$}[/tex]
Para resolver esta questão, devemos:
- Determinar as coordenadas do ponto de tangência "T" entre as curvas. Para isso, fazemos:
[tex]\Large\displaystyle\text{$\begin{gathered} T = (X_{T},\,Y_{T})\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} = \left[x,\,f(x)\right]\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} = \left[4,\,4^{2} - 3\cdot4\right]\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} = \left[4,\,16 - 12\right]\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} = \left[4,\,4\right]\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} \therefore\:\:\:T(4, 4)\end{gathered}$}[/tex]
- Calcular a declividade - coefiiciente angular - da reta tangente "t". Para isso, devemos calcular a derivada primeira da função no ponto "T". Então, fazemos:
[tex]\Large\displaystyle\text{$\begin{gathered} m_{t} = \frac{\partial}{\partial x}\codt f(x)\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} = \frac{\partial}{\partial x}\codt (x^{2} - 3x)\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} = 2\cdot4^{2 - 1} - 3\cdot1\cdot4^{1 - 1}\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} = 2\cdot4 - 3\cdot4^{0}\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} = 8 - 3\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} = 5\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} \therefore\:\:\:m_{t} = 5\end{gathered}$}[/tex]
- Montar a equação da reta tangente "t". Para isso, devemos utilizar a fórmula do "ponto/declividade", ou seja:
[tex]\Large\displaystyle\text{$\begin{gathered} \bf(I)\end{gathered}$}[/tex] [tex]\Large\displaystyle\text{$\begin{gathered} y - y_{T} = m_{t}\cdot(x - x_{T})\end{gathered}$}[/tex]
Substituindo os valores das incógnitas na equação "I", temos:
[tex]\Large\displaystyle\text{$\begin{gathered} y - 4 = 5\cdot(x - 4)\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} y - 4 = 5x - 20\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} y = 5x - 20 + 4\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} y = 5x - 16\end{gathered}$}[/tex]
✅ Portanto, a equação da reta tangente é:
[tex]\Large\displaystyle\text{$\begin{gathered} t: y = 5x - 16\end{gathered}$}[/tex]
[tex]\LARGE\displaystyle\text{$\begin{gathered} \underline{\boxed{\boldsymbol{\:\:\:Bons \:estudos!!\:\:\:Boa\: sorte!!\:\:\:}}}\end{gathered}$}[/tex]
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[tex]\Large\displaystyle\text{$\begin{gathered} \underline{\boxed{\boldsymbol{\:\:\:Observe \:o\:Gr\acute{a}fico!!\:\:\:}}}\end{gathered}$}[/tex]
