1 Answer

Jaden · Answer 1 · 2023-03-03T21:54:55+0000

Step-by-step explanation

Algebra / Graphs and Functions / Equations of Parallel and Perpendicular Lines

We have the line:

We must find the equation:

0. of the perpendicular line,

,

1. and the parallel line,

to the given line that passes through the point (-2, 3).

1) Perpendicular line

The equation of the perpendicular line has the form:

$y=m_p\cdot(x-x_0)+y_0.$

Where mₚ is the slope, and (x₀, y₀) = (-2, 3).

From the equation of the given line, we see that its slope is m = 7. The slope of the perpendicular line mₚ is given by the equation:

$\begin{gathered} m\cdot m_p=-1, \\ 7\cdot m_p=-1, \\ m_p=-(1)/(7). \end{gathered}$

Replacing mₚ = -1/7 and (x₀, y₀) = (-2, 3) in the equation of the perpendicular line, we get:

$y=-(1)/(7)\cdot(x-(-2))+3=-(1)/(7)\cdot(x+2)+3=-(1)/(7)\cdot x-(2)/(7)+3=-(1)/(7)\cdot x+(19)/(7).$

2) Parallel line

The equation of the perpendicular line has the form:

$y=m_p\cdot(x-x_0)+y_0.$

Where mₚ is the slope, and (x₀, y₀) = (-2, 3).

From the equation of the given line, we see that its slope is m = 7. The parallel line has the same slope as the given line, so we have:

$\begin{gathered} m_p=m, \\ m_p=7. \end{gathered}$

Replacing mₚ = 7 and (x₀, y₀) = (-2, 3) in the equation of the parallel line, we get:

$y=7\cdot(x-(-2))+3=7\cdot(x+2)+3=7x+14+3=7x+17.$

3) Graph

Plotting the equations obtained, we get the following graph:

Answer

1) Equation of the perpendicular line:

2) Equation of the parallel line:

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