19,294 views
10 votes
10 votes
What's the equation of the line that's a perpendicular bisector of the segment

connecting A(-2, 8) and B(-4, 2)?

User Pawel Solarski
by
3.0k points

1 Answer

19 votes
19 votes

Answer:

y = -
(1)/(3) x + 4

Explanation:

The perpendicular bisector bisects AB at right angles

The midpoint of AB using the midpoint formula


M_(AB) = (
\frac{x_{1+x_(2) } }{2} ,
(y_(1)+y_(2) )/(2) )

with (x₁,y₁ ) = A (- 2, 8 ) and (x₂, y₂ ) = B (- 4, 2 )


M_(AB) = (
(-2-4)/(2) ,
(8+2)/(2) ) = (
(-6)/(2) ,
(10)/(2) ) = (- 3, 5 )

Calculate the slope m of AB using the slope formula

m =
(y_(2)-y_(1) )/(x_(2)-x_(1) ) =
(2-8)/(-4-(-2)) =
(-6)/(-4+2) =
(-6)/(-2) = 3

Given a line with slope m then the slope of a line perpendicular to it is


m_(perpendicular) = -
(1)/(m) = -
(1)/(3)

The perpendicular bisector passes through (- 3, 5 ) with slope = -
(1)/(3)

The equation in slope- intercept form is

y = mx + c ( m is the slope and c the y- intercept ) , then

y = -
(1)/(3) x + c ← is the partial equation

To find c substitute (- 3, 5 ) into the partial equation

5 = 1 + c ⇒ c = 5 - 1 = 4

y = -
(1)/(3) x + 4 ← equation of perpendicular bisector

User Rochie
by
3.2k points