1.4. Midpoints and Bisectors http://www.ck12.org
Let’s create a formula from this. If the two endpoints are (-5, 6) and (3, 4), then the midpoint is (-1, 4). -1 ishalfway
between -5 and 3 and 4 ishalfwaybetween 6 and 2. Therefore, the formula for the midpoint is the average of the
x−values and the average of they−values.
Midpoint Formula:For two points,(x 1 ,y 1 )and(x 2 ,y 2 ), the midpoint is
(x 1 +x 2
2 ,y 1 +y 2
2)
Example 2:Find the midpoint between (9, -2) and (-5, 14).
Solution:Plug the points into the formula.
(
9 +(− 5 )
2,
− 2 + 14
2
)
=
(
4
2
,
12
2
)
= ( 2 , 6 )
Example 3:IfM( 3 ,− 1 )is the midpoint ofABandB( 7 ,− 6 ), findA.
Solution:Plug what you know into the midpoint formula.
(
7 +xA
2,
− 6 +yA
2)
= ( 3 ,− 1 )
7 +xA
2=3 and
− 6 +yA
2=− 1 Ais(− 1 , 4 ).
7 +xA=6 and− 6 +yA=− 2
xA=−1 andyA= 4Another way to find the other endpoint is to find the difference betweenMandBand then duplicate it on the other
side ofM.
x−values: 7− 3 =4, so 4 on the other side of 3 is 3− 4 =− 1
y−values:− 6 −(− 1 ) =−5, so -5 on the other side of -1 is− 1 −(− 5 ) = 4
Ais still (-1, 4). You may use either method.
Segment Bisectors
Segment Bisector:A line, segment, or ray that passes through a midpoint of another segment.
A bisector cuts a line segment into two congruent parts.
Example 4:Use a ruler to draw a bisector of the segment below.