✅ Após resolver os cálculos, concluímos que o ângulo entre as referidas retas é:
[tex]\Large\displaystyle\text{$\begin{gathered}\boxed{\boxed{\:\:\:\bf \theta \cong 22,83^{\circ}\:\:\:}}\end{gathered}$}[/tex]
Sejam as retas:
[tex]\Large\begin{cases} r: 4x - y + 4 = 0\\s: 4x - 3y + 8 = 0\end{cases}[/tex]
Quando estamos procurando a medida do ângulo entre as retas, na realidade estamos procurando o menor ângulo entre as retas e, para isso, devemos utilizar a seguinte fórmula:
[tex]\Large\displaystyle\text{$\begin{gathered} \bf(I)\end{gathered}$}[/tex] [tex]\Large\displaystyle\text{$\begin{gathered} \theta = \arctan \bigg(\bigg|\frac{m_{r} - m_{s}}{1 + m_{r}\cdot m_{s}}\bigg|\bigg), \:\:\:\textrm{com}\:0 < \theta < 90^{\circ}\end{gathered}$}[/tex]
Para resolver esta questão devemos:
[tex]\Large\displaystyle\text{$\begin{gathered} -y = -4x - 4\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} y = 4x + 4\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} \therefore\:\:\: m_{r} = 4\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} -3y = -4x - 8\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} 3y = 4x + 8\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} y = \frac{4}{3}x + \frac{8}{3}\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} \therefore\:\:m_{s} = \frac{4}{3}\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} \theta = \arctan \bigg(\bigg|\frac{4 -\frac{4}{3}}{1 + 4\cdot\frac{4}{3}}\bigg|\bigg)\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} = \arctan \bigg(\bigg|\frac{\frac{8}{3}}{1 + \frac{16}{3}}\bigg|\bigg)\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} = \arctan \bigg(\bigg|\frac{\frac{8}{3}}{\frac{19}{3}}\bigg|\bigg)\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} = \arctan \bigg(\bigg|\frac{8}{19}\bigg|\bigg)\end{gathered}$}[/tex]
[tex]\Large\displaystyle\text{$\begin{gathered} = \arctan \bigg(\frac{8}{19}\bigg)\end{gathered}$}[/tex]
✅Portanto, o ângulo procurado é:
[tex]\Large\displaystyle\text{$\begin{gathered} \theta = \arctan (0,4210526316) \Longrightarrow \theta \cong 22,83^{\circ}\end{gathered}$}[/tex]
Saiba mais:
Veja a solução gráfica da questão representada na figura:
