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Geometry Section 1.2 and 1.3
Using Segments and Congruence
Distance and Midpoint Formula
Segments
A
B
C
D
Where is B located?
Between A and C
Where is D located?
Not between A and C
For a point to be between two other points, all three points must be collinear. Segments can be defined using the idea of betweenness of points.
Measure of SegmentsABC
What is a segment?
A part of a line that consists of two endpoints and all the points between them.
What is the measure of a segment?
The distance between the two endpoints.
In the above figure name three segments:
CB BA AB
Postulate 1-1Ruler Postulate
The distance between points A and B, written as AB, is the absolute value of the difference of the coordinates of A and B.
0X Y
Since x is at -2 and Y is at 4, we can say the distance from X to Y or Y to X is:
-2 – 4 = 6 or 4 – (-2) = 6
EXAMPLE 1 Apply the Ruler Postulate
Measure the length of ST to the nearest tenth of a centimeter.
SOLUTION
Align one mark of a metric ruler with S. Then estimate the coordinate of T. For example, if you align S with 2, T appears to align with 5.4.
Use Ruler Postulate.ST = 5.4 – 2 = 3.4
The length of ST is about 3.4 centimeters.ANSWER
Postulate 1-2 Segment Addition Postulate
If Q is between P and R, then
PQ + QR = PR.
If PQ +QR = PR, then Q is between P and R.
P Q R
2x 4x + 6
PQ = 2x QR = 4x + 6 PR = 60
Use the Segment Addition Postulate find the measure of PQ and QR.
EXAMPLE 3 Find a length
Use the diagram to find GH.
Use the Segment Addition Postulate to write an equation. Then solve the equation to find GH.
SOLUTION
Segment Addition Postulate.
Substitute 36 for FH and 21 for FG.
Subtract 21 from each side.
21 + GH=36
FG + GH=FH
=15 GH
EXAMPLE 4 Compare segments for congruence
SOLUTION
To find the length of a horizontal segment, find the absolute value of the difference of the x-coordinates of the endpoints.
Use Ruler Postulate.JK = 2 – (– 3) = 5
Plot J(– 3, 4), K(2, 4), L(1, 3), and M(1, – 2) in a coordinate plane. Then determine whether JK and LM are congruent.
EXAMPLE 4 Compare segments for congruence
To find the length of a vertical segment, find the absolute value of the difference of the y-coordinates of the endpoints.
Use Ruler Postulate.LM = – 2 – 3 = 5
JK and LM have the same length. So, JK LM.
Remember when we speak of length the bar does not go over the letters but it does when we speak of congruence.
=~
ANSWER
What is midpoint?
The midpoint M of PQ is the point between P and Q such that PM = MQ.
How do you find the midpoint?
On a number line, the coordinate of the midpoint of a segment whose endpoints have coordinates a and b is (a + b)/2.
P M Q
1.) Find the midpoint of AC:
Examples:
0-5 6
(-5 + 6)/2 = ½
2.) If M is the midpoint of AZ, 2.) If M is the midpoint of AZ,
AM = 3x + 12 and MZ = 6x – 9; find AM = 3x + 12 and MZ = 6x – 9; find the measure of AM and MZ.the measure of AM and MZ.
3x + 12 = 6x – 93x + 12 = 6x – 9
21 = 3x21 = 3x
X = 7X = 7
AM = 33 MZ = 33AM = 33 MZ = 33
Q. How do you find the midpoint of 2 ordered pairs?
A. In a coordinate plane, the coordinates of the midpoint of a segment whose endpoints have coordinates (x1, y1) and (x2, y2) are ((x1 + x2)/2), (y1 + y2)/2)
Example:1.) Find the midpoint, M, of A(2, 8) and B(4, -4).
x = (2 + 4) ÷ 2 = 3
y = (8 + (-4)) ÷ 2 = 2
M = (3, 2)
2.) Find M if N(1, 3) is the midpoint of MP where the coordinates of P are (3, 6).
M = (-1, 0)
EXAMPLE 3 Use the Midpoint Formula
a. FIND MIDPOINT The endpoints of RS are R(1,–3) and S(4, 2). Find the coordinates of the midpoint M.
SOLUTION
EXAMPLE 2 Use algebra with segment lengths
STEP 1 Write and solve an equation. Use the fact that VM = MW.
VM = MW4x – 1 = 3x + 3
x – 1 = 3x = 4
Write equation.
Substitute.
Subtract 3x from each side.Add 1 to each side.
Point M is the midpoint of VW . Find the length of VM .ALGEBRA
EXAMPLE 2 Use algebra with segment lengths
STEP 2 Evaluate the expression for VM when x = 4.
VM = 4x – 1 = 4(4) – 1 = 15
So, the length of VM is 15.
Check: Because VM = MW, the length of MW should be 15. If you evaluate the expression for MW, you should find that MW = 15.
MW = 3x + 3 = 3(4) +3 = 15
Bisectors
What is a segment bisector?
- Any segment, line, or plane that intersects a segment at its midpoint.
A B C
M
N
If B is the midpoint of AC, then MN bisects AC.
In the skateboard design, VW bisects XY at point T, and XT = 39.9 cm. Find XY.
Skateboard
SOLUTION
EXAMPLE 1 Find segment lengths
Point T is the midpoint of XY . So, XT = TY = 39.9 cm.
XY = XT + TY= 39.9 + 39.9= 79.8 cm
Segment Addition PostulateSubstitute.
Add.
GUIDED PRACTICE for Examples 1 and 2
2.
In Exercises 1 and 2, identify the segment bisectorof PQ . Then find PQ.
line l ; 11 57
ANSWER
Distance Formula
The Distance Formula was developed from the Pythagorean Theorem
Where d = distance
x =x coordinate and y=y coordinate