69,198 views
34 votes
34 votes
The end points of a line segment are (13, 1)

and (17,-7).
What is the equation of the perpendicular
bisector of this line segment?
Give your answer in the form y = mx + c,
where m and c are integers or fractions in
their simplest forms.

User TZU
by
2.7k points

1 Answer

16 votes
16 votes

Answer:

y = 2x - 41

Explanation:


(x1 \: \: y1) = (13 \: \: \: 1) \\ (x2 \: \: y2) = (17 \: \: - 7) \\ now \\ slope = change \: in \: y \: over \: change \: in \: x \\ slope \: = y2 - y1 / x2 - x1 \\ slope = - 7 - 1 / 17 - 13 \\ - 8 / 4 \\ slope = - 2

equation of the line

y=mx +c


slope = y - yo \ \: over \: x - xo \\ slope = - 7 - y \: over \: 17 - x \\ 2 = - 7 - y \: over \: 17 - x


1( - 7 - y) = 2(17 - x) \\ - 7 - y = 34 - 2x \\ - y = 34 + 7 - 2x \\ - y = 41 - 2x \\ - y = 41 - 2x

-y=41-2x/-y

y=2x+41

User Shesek
by
3.3k points
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