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Massyanya · Answer 1 · 2023-09-07T03:48:18+0000

Step 1

State the relationship between the slopes of perpendicular lines

$\begin{gathered} m_2=-(1)/(m_1) \\ \text{where m = slope} \end{gathered}$

The given equation of a line is;

$\begin{gathered} h(t)=-4t+8 \\ \text{From the slope-intercept form of the equation of a line} \\ h(t)=mt+c \\ \text{and comparing both equations} \\ m_1=-4 \end{gathered}$

Step 2

Find m₂

Step 3

State the equation for a line in the slope-point form and get the equation

$\begin{gathered} g(t)-g(t_1)_{}=m(t-t_1) \\ g(t_1)=-1 \\ m=m_2=(1)/(4) \\ t_1=-8 \\ \end{gathered}$

$\begin{gathered} g(t)-(-1)=(1)/(4)(t-(-8)) \\ g(t)+1=(1)/(4)(t+8) \\ g(t)=(1)/(4)t+(8)((1)/(4))-1 \\ g(t)=(1)/(4)t+2-1 \\ g(t)=(1)/(4)t+1 \end{gathered}$

Hence the equation is;

g(t)=(1/4)t+1

Write an equation for a line g(t) perpendicular to h(t) = -4t + 8 and passing through-example-1

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