Download Midsegment Review - White Plains Public Schools

Name
LESSON​
Date ​
Class
Reteach​
5-4​ The Triangle Midsegment Theorem
A ​ m idsegment ​ of a triangle joins the midpoints of two sides of the triangle. ​
Every triangle has three midsegments.

_
_
R​ is the midpoint of _
CD .​ ​
RS ​ is a midsegment ​
of​ ​᭝​C DE​.
S​ is the midpoint of CE .​



_
Use the figure for Exercises 1–4. AB ​is a midsegment of ​᭝​R ST ​.​
_
1.​ What is _
the slope of midsegment AB
​ ​ and the slope
of side ST ?​ ​
Ϫ​1; ​Ϫ​1​
_

 �

� �
_
_ _

2.​ What can you conclude about AB ​ and ST
​ ?​
Since the slopes are the same, AB ​ʈ​ ST.​

​
�​
 ��
 ��
��
3.​ Find ​ AB​ and ​ ST ​.
ᎏ
ᎏ
AB​ ​ϭ​ 2͙ 2 , ​ST​ ​ϭ​ 4͙ 2 ​
_
_
4.​ Compare the lengths of AB
​ ​ and ST
​ .​
AB​ ​ϭ​ __1​ ​ ST
​ ​or ​ST​ ​ϭ​ 2​AB​
2​
Use ​ ᭝​MNP​ for Exercises 5–7.​
_
5.​ UV
​ ​is a midsegment of ​᭝​MNP​. Find the
coordinates of ​ U​ and ​ V​.​

 ��
U (​ Ϫ
​ ​1, 3), ​V (3,
​ 2)​
_
 �

_
_
6.​ Show that UV ​ ʈ​ MN .​
The slope of UV ​ϭ​ ​Ϫ​ __1​ ​ and the slope of
4​
_
1
​
__
MN ​ϭ​ ​Ϫ​ ​ . Since the slopes are the
_4​ _
same, UV ​ʈ​ MN.​
1​ ​ MN
7.​ Show that ​ U V​ ​ϭ​ __
​ ​.
ᎏ 2​
ᎏ
ᎏ


�​

​
 ��

ᎏ
UV​ ​ϭ​ ͙ 17 and ​MN​ ​ϭ​ 2͙ 17 . Since ͙ 17 ​ϭ​ __1​ ​ (2͙ 17 ), ​UV​ ​ϭ​ __1​ ​ MN
​ ​.
2​
2​
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All rights reserved.
30 ​ ​
Holt Geometry​
Name
LESSON
Date ​
Class
Reteach​
5-4​ The Triangle Midsegment Theorem ​ continued
Theorem ​
Example

​
Triangle Midsegment Theorem ​
A midsegment of a triangle is parallel to ​
a side of the triangle, and its length is ​
half the length of that side.
​
​

_
Given: ​ PQ ​ is _
a midsegment of ​ ᭝​LMN.​
_
Conclusion: ​ PQ
​ ​ʈ​ LN ,​ ​PQ ​ ​ϭ​ __12​ ​​ LN
​ ​
You can use the Triangle Midsegment Theorem to
find various measures in ​ ᭝​ABC ​.​
1​ ​ AC
HJ ​ ​ ϭ​ __
​ ​ ​ ᭝​ Midsegment Thm.​
2​
1​ ​ (12)
HJ ​ ​ ϭ​ __
​
Substitute 12 for ​ AC ​.​
2​
HJ ​ ​ ϭ​ 6 ​
Simplify.​
1​ ​ AB
J​ K​ ​ ϭ​ __
​ ​​
2​
1
​
__
4 ​ ϭ​ ​ AB
​ ​
2​
8 ​ ϭ​ ​AB​
_
​
​

​

�​
​

_
᭝​ Midsegment Thm.
HJ
​ ​|| AC ​
Midsegment Thm.​
Substitute 4 for ​ J K.​
m​Є​BCA​ ​ ϭ​ m​Є​BJH​
Corr. ​д​ Thm.​
Simplify. ​
m​Є​BCA​ ​ ϭ​ 35° ​
Substitute 35° for m​Є​BJH​.​
Find each measure.
8.​ ​ VX​ ​ϭ​ ​
23​
9.​ ​ HJ ​ ​ ϭ​
54​



​

92°​
10.​ m​Є​VXJ ​ ​ ϭ​
11.​ ​ XJ ​ ​ ϭ
​

​
​

27​
Find each measure.
12.​ ​ ST ​ ​ϭ​ ​
72​
13.​ ​ DE​ ​ϭ​
22​
​

14.​ m​Є​D ES​ ​ϭ​
48°​
15.​ m​Є​RCD​ ​ϭ​
48°
Copyright © by Holt, Rinehart and W inston. ​ ​
All rights reserved.
​
​
​

​

​
31 ​ ​
Holt Geometry​
N ame ​
LESSON​
D ate ​
Class
N ame ​
Practice A​
5-4​ The Triangle Midsegment Theorem​
U se t he Triangle Midsegment Theorem ​
to name parts of the figure for ​
Exercises 1–5.
5-4​ The Triangle Midsegment Theorem​
_
_
DE​
_
DE​
_
AD
_​
DE​
_
​
1.​ a mids egment of ​ ​ ABC
2.​ a s egment parallel to AC
​
�
_
3.​ a s egment that has the s ame length as BD
_
4.​ a s egment that has half the length of AC
_
​
 �​ 

6.​ U s e the Midpoint Formula to find the c oordinates of ​ G ​. ​
(​
7.​ U s e the Midpoint Formula to find the c oordinates of ​ H .​ ​
(
_
0​
3​
0​
0​
8.​ U s e the Slope Formula to find the s lope of D F.
_
9.​ U s e the Slope Formula to find the s lope of GH​ .
10.​ If tw o s egments hav
s ame s lope, then the s egments ​
_ e the _
are parallel. Are DF​ and GH​ parallel?

U se t he Triangle Midsegment Theorem ​
and the figure for Exercises 14–19. ​

Find each measure.

12​
15.​ QR
12​
17.​ m​ �​ SU P
55°​
19.​ m​ �​ PR Q
55°
125°​
27​
N ame ​
9.​ H ow does the perimeter of the mids egment triangle c ompare to ​
the perimeter of the Bermuda Triangle?
It is half the perimeter of the Bermuda Triangle.​
_ _
_
​

10.​ Given: U S ,​ ST ​, and TU ​are mids egments of ​ ​ PQR ​.​
Prove:​ The perimeter of ​ ​ STU ​ ​ _1_(​PQ​ �​ QR​ �​ R P​ ) .​
2​
​
Possible answer:
Ho lt Ge o me tr y​
28​
Copyright © by Holt, Rinehart and Winston.​
All rights reserved.
N ame ​
​ Practice C​
5-4​ The Triangle Midsegment Theorem​
​
​
Reasons​
1. Given ​
2. Midsegment Theorem​
3. Definition of perimeter​
D ate ​
Class
Ho lt Ge o me tr y​
Reteach​
5-4​ The Triangle Midsegment Theorem
LESSON
LESSON​
A​ midsegment ​ of a triangle joins the midpoints of tw o s ides of the triangle. ​
Ev ery triangle has three mids egments .
​
 ( 0, 2 )
​
​


​
� ( 0, 0)
2a​ b​
2.​ Find the c oordinates of the midpoints ​ D ,​ ​ E​ , and ​ F​.

Write a two-column proof that the perimeter of a
midsegment triangle is half the perimeter of the triangle.​
4. Substitution​
4. The perimeter of 
​ S
​ TU​ ​ _1_​ PQ
​ ​ �​ _1​_ QR
​ ​
2​
2​
�​ _1_​ R
​ P.​ ​
2​
5. The perimeter 
​ S
​ TU​ ​ _1​_ (​PQ​ �​ QR​ �​ RP​ )​ 5. Distributive Property ​
2​
of​ 
Class
Pedro has a hunch about t he area of midsegment triangles.
H e is a careful student, so he investigates in a methodical ​
manner. First Pedro draws a right triangle because he ​
knows it will be easy to calculate the area. ​
1.​ Find the area of ​ ​ ABC ​.​
San J u an ​
3045 mi​
22​
D ate ​
Bermuda​
M iami ​
1522.5 mi​

16.​ PU
​
�
Dis t. ​
( mi)
M iami t o S an J uan​
1038​
M iami t o B e rmuda​
1042​
B e rmuda t o S an J uan​ � 965
Statements​
_ _
_
1. US​ , ST​ , and TU​ are midsegments of ​
P
​ QR​.​
2.​ ST​ ​ _1​_ PQ
​ ​,​ TU​ ​ _1​_ QR
​ ​,​ US​ ​ _1​_ RP
​ ​
2​
2​
2​
3. The perimeter of 
​ S
​ TU​ ​ ST ​ �​ TU​ �​ US​.​
14.​ ST​
​
8.​ Find the perimeter of the mids egment triangle w ithin ​
the Bermuda Triangle.


​
Copyright © by Holt, Rinehart and Winston.​
All rights reserved.
)​

7.​ U s e the dis tanc es in the c hart to find the perimeter of ​
the Bermuda Triangle. ​

​
18.​ m​ �​ SUR
,
)​
yes​
6​
3​
yes​
11.​ U s e the D is tanc e Formula to find ​ D F​.
12.​ U s e the D is tanc e Formula to find ​ G H​.
13.​ Does ​ G H​ ​ _1_ DF​ ?
2​
2​
2​
,
18. 2​

58°
58°​
6.​ m​ �​ D
The B ermuda Triangle is a region in t he ​
A tlantic Ocean off the southeast coast of ​
the U nited States. The triangle is bounded ​
by Miami, Florida; San Juan, Puert o R ico; ​
and B ermuda. In t he figure, t he dot t ed lines ​
are midsegments.​
 �
​ ​

17. 5
​
58°​
4.​ m​ �​ H IF
122°​
5.​ m​ �​ H GD

 �

9.1​
3.​ GE
BC​
5.​ a s egment that has tw ic e the length of EC
C omplete Exercises
_6–13 to show ​
t_
hat midsegment GH​ is parallel t o
DF​ and that ​ G H​ ​ _1_DF​.
2​
Class
U se the figure for Exercises 1–6. Find each measure.
9.1​
35​
1.​ H I​
2.​ DF
​

D ate ​
​ Practice B​
LESSON
R S​ is a mids egment ​
of​ ​ C DE​.
R​ is the midpoint of CD​
_ .​
S​ is the midpoint of C E​ .
D​ (0,​ b​),​ E​ (​a​,​ b​),​ F​ (​a,​ 0)​

3.​ Pedro k now s it w ill be eas y to find the area of ​ ​ EFD ​ if ​ �​ D EF ​ is a right angle. Write a ​
proof that ​ �​ D EF ​ � ​ �​ A​ .​
_


_
Possible answer: ​F​ is the midpoint of AC​, so ​AF​ ​ _1_​ AC
​ ​.​ DE​ ​ _1_​ AC
​ ​
2​
_ _ _ _2​
by the Midsegment Theorem, so AF​ � DE.​ DE​  AF​ by the Midsegment ​
Theorem and
​ E
​ DF
_​ and �​ A​ FD​ are alternate interior angles, so ​� E​ DF​
_�
�​ � A
​ FD​. DF​ � DF​ by the Reflexive Property, thus 
​ E
​ FD​ � ​  A
​ DF​.​
By CPCTC, ​� D
​ EF​ � ​ � A
​ ​.​
_1_ ab
​ ​
2
​
4.​ Find the area of ​ ​ EFD ​.
U se the figure for Exercises 1–4. AB​ is a midsegment of ​ ​ R ST​.​
_
1.​ W hat is _
the s lope of mids egment AB​ and the s lope
of s ide ST ​?​
1​ ;​ 1​ ​
_
_
_ _
2.​ What c an y ou c onc lude about AB​ and ST ​?
Since the slopes are the same, AB​  ST​.​

 �

��
​

�​

 � �
 ��
� �
5.​ C ompare the areas of ​ ​ ABC ​ and ​ ​ EFD ​ .
3.​ Find ​ AB​ and ​ ST​ .
�
A
​ BC​ has four times the area of ​ E
​ FD​.​
�
AB​ ​ 2 2 , ​ST​ ​ 4 2​
_1_ ab
​ ​
2​
6.​ Pedro has already s hown that ​ ​ EFD ​ �​ ​ AD F​.​
C alc ulate the area of ​ ​ AD F​ .
_
_
 ( 2 , 0)
_
_
4.​ C ompare the lengths of AB​ and ST ​.
AB​ ​ _1_​ ST
​ ​ or​ ST​ ​ 2A
​ B​
2​
7.​ Write a c onjec ture about c ongruent triangles and area.
Possible answer: Congruent triangles have equal area.​
Use ​ ​ MN P​ for Exercises 5–7.​
_
Pedro already knows some things about the area of the
midsegment t riangle of a right t riangle. B ut he thinks he ​
can expand his theorem. B efore he can get to that, however, ​
he has to show another property of triangles and area. ​
8.​ Find the area of ​ ​ W XY​ ,​ ​ W XZ​ , and ​ ​ YXZ​ .​
16; 6; 10​
5 . U V​ is a mids egment of ​ ​ MN P​ . Find the
c oordinates of ​ U ​ and ​ V​ .​


_
​
​

​
The slope of UV​  ​ _1​_ and the slope of
4​
MN​  ​ _1​_. Since the slopes are the
_4​ _
same, UV​  MN​.​
​
_
Possible answer: The total of the areas of ​ W
​ XZ​ and 
​ Y
​ XZ​ is equal to
the area of 
​ W
​ XY.​ ​

�​

​
 ��

�
�
�
UV​   17 and M
​ N​ ​ 2 17 . Since  17 
​ ​ _1​_ (2  17 ), ​UV​ ​ _1​_ MN
​ ​.
2​
2​
Possible answer: The area of a larger triangle is the sum of areas of the
triangles within it.
Copyright © by Holt, Rinehart and W inston. ​ ​
All rights reserved.

7.​ Show that ​ U V​ ​ _1_MN ​.
� 2​
10.​ Write a c onjec ture about the areas of triangles w ithin a larger triangle.
29​
 �

_
_
6.​ Show that U V​  MN ​.
9.​ C ompare the total of the areas of ​ ​ W XZ​ and ​ ​ YXZ​ to the area of ​ ​ W XY​ .
Copyright © by Holt, Rinehart and Winston.​
All rights reserved.

��
U​ (​1​ , 3), ​V​ (3, 2)​
Ho lt Ge o me tr y​
Copyright © by Holt, Rinehart and Winston.​
All rights reserved.
73
​ ​
30​
Ho lt Ge o me tr y​
Holt Geometry​
N ame ​
LESSON
D ate ​
Class
N ame ​
Reteach​
LESSON​
5-4​ The Triangle Midsegment Theorem ​ c ontinued
Theorem​
5-4​ Consider Different Cases​

​
J K​ ​ _1_ AB​
2​
4 ​ ​ _1_ AB​
2​
8 ​ ​ AB​
�​
​

HJ​ || AC ​ ​
Mids egment Thm.​
C orr. ​ ​ Thm.​
Simplify. ​
m​ �​ BC A​ ​ 35° ​
Subs titute 35° for m​ �​ BJ H​.​
23​

case 1: ​EF​ ​ FG​ ​ 7 and E
​ G​ ​ 8; case 2: ​EF​ ​ FG​ ​ 8 and E
​ G​ ​ 6​
​
12.​ ST​ ​
72​
13.​ D E​ 
22​
Two cases; the midsegment joins
the sides with lengths 12 and 18.
The midsegment joins the side
with lengths 12 and x​ .​
​
14.​ m​ �​ D ES​ 
48°​
15.​ m​ �​ R CD​ 
48°
​
​


31​
Copyright © by Holt, Rinehart and Winston.​
All rights reserved.
​

D ate ​
Class
Ho lt Ge o me tr y​
Problem Solving​
5-4​ The Triangle Midsegment Theorem​

A​ midsegment t riangle​ is formed from the ​
three mids egments of a triangle.
5x​ ​ �​ 2​
_ _ _
LM​ ; MN​ ; NL ​
( 4, 8)
2.​ What is the mids egment triangle in ​ ​ Q R S​ ?
6
 (1, �1)
8​
9.2 mi​
​
_
3.​ Whic h mids egment is parallel to s ide QS ​?
_
MN​
4mi
1. 5mi ​ ​
_
5.​ LN​ �
U se the diagram for Exercises 7 and 8.​
6 cm​
_
_
QM​ � MR​
�
6.​ D raw the mids egments in ​ ​ ABC ​.
6.​ In triangle ​ H JK​, m​ �​H ​ ​ 110​,​ m​ �​ J ​ ​ 30°,​
and
of ​
_ m​ �​ K​ ​ 40​.​ If ​ R​ is the midpoint
_
J K​,​ and​ S​ is the midpoint of H K​, w hat is ​
m​ �​ J RS​ ?​
F​ 150​ ​
G​ 140​  ​
_
_
4.​ If s ide R S​ is 12 c m, how long is LM​ ?

C hoose the best answer.​
C​ 240 c m​2​
D​ 480 c m​2​
​

The Triangle Midsegment Theorem: ​ A mids egment of a ​
triangle is parallel to a s ide of the triangle, and its length is ​
half the length of that s ide.​
(12, �3)
�
4.​ The diagram at right s how s hors_
ebac k riding trails . Point ​ B​
is the halfw ay point
t ​ D ​ is the
_along path AC ​ . Po in
_
_halfw ay ​
point along path C E​ . The paths along BD ​ and AE​ are ​

parallel. If riders trav el from ​ A​ to ​ B​ to ​ D ​ to ​ E​ , and then ​
bac k to ​ A​ , how far do they trav el?
1. 7mi ​
​
​
L
​ MN​

0
5.​ R ight triangle ​ FGH​ has mids egments of ​
length 10 c entimeters , 24 c entimeters , ​
and 26 c entimeters . What is the area of ​
​ FGH​ ? ​

1.​ N ame the mids egments in ​ ​ Q R S​ .

_
Ho lt Ge o me tr y​
Class
LESSON​
9.5
Yes; ​X​ is the midpoint of LN​ , and
_
Y​ is the midpoint of ML.​
D ate ​
A​ midsegment ​ of a triangle is a s egment that joins the midpoints of tw o s ides ​
of the triangle.​
1.​ The v ertic es _
of ​ ​ J KL​ are ​ J ​ (
​ ​ 9 , 2), ​ K​ (10, 1), ​ 2.​ In ​ ​ Q R S​ ,​ QR​ ​ 2​x ​ �​ 5, ​ R S​ ​ 3​x ​ ​ 1,​
and​_L​ ( 5, 6). CD​ is the mids egment
and ​ SQ​ ​ 5​x .​ W hat is the perimeter of ​
_ parallel
to J K​ . W hat is the length of C D ?​ R ound to
the mids egment triangle of ​ ​ Q R S​ ?​
the neares t tenth.
3.​ Is ​ XY​ a mids egment of ​ ​ L MN​ if its endpoints ​
are​ X​ (8, 2.5) and ​ Y​ (6.5,​ ​ 2 )? Ex plain.
32​
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All rights reserved.
N ame ​
Reading Strategies​
5-4​ Identify Relationships​
LESSON​
​

H​ 110​ ​
J​ 30​
​
​
​
_
On the balanc e beam, ​ V​ is
_the midpoint of AB​ ,​
and​ W​ is the midpoint of YB​ .​
_
7.​ The length of VW ​ is 1 _7​ _ feet. W hat is ​ AY​ ?​
8​
A​ _7_ ft ​
C​ 3 _3​ _ ft​
8​
4​
15
___
B​
ft ​
D​ 7 _1​ _ ft​
16​
2​
8.​ The meas ure of ​ �​ AYW ​ is 50​ .​ W hat is the ​
meas ure of ​ �​ VW B​ ?​
F​ 45​ ​
H​ 90​ ​
G​ 50​ ​
J​ 130​
Copyright © by Holt, Rinehart and Winston.​
All rights reserved.
If the midsegment joins the sides
with lengths 12 and 18, then the
third side is 18. If the midsegment
joins the side with lengths 12 and
x​, then it is impossible to find the
length of the third side.
​
N ame ​
A​ 60 c m​ 2​
B​ 120 c m​2​
4.​ Find the length of the third s ide of ​ ​ ABC ​
by c ons idering both c as es .​
​

​
​

3.​ How many c as es are there to c ons ider ​
w hen mak ing a c onc lus ion about the ​
third s ide of the triangle? Ex plain.
​
18
12​
�​
27​
Find each measure.

Use ​ ​ A BC ​ for Exercises 4 and 5. ​
A midsegment of t he t riangle is 9.​

92°​
10.​ m​ �​ VXJ ​ 
2.​ Find the lengths of the triangle’s s ides for eac h of the c as es in Ex erc is e 1.​




​
​
m​ �​ BC A​ ​ m​ �​ BJ H​
54​
​


�​
​ Mids egment Thm.
9.​ HJ​ 
​
�​
Subs titute 4 for ​ J K.​
8.​ VX​ ​
​
​
​

Find each measure.
11.​ XJ ​ 
​
​
_
_
_ midsegment connects ​
Case 2: The
the base EG​ and one of the ​
congruent sides of ​ E​ FG.​
​
Case 1: The midsegment connects
the two congruent sides E​ F​ and F​ G.​

_

​
1.​ Des c ribe two pos s ible c as es and mak e a drawing of eac h.​
Given: PQ​ is a mids egment of ​ ​ L MN .​
_ _
C onclusion: PQ​  LN ,​​ PQ​ ​ _1_ LN​
2​
​
​
Triangle ​ EFG​ is an is os c eles triangle
_ w ith ​ EF​ ​ FG​ and w ith the perimeter ​
equal to 22 units . A mids egment, QR ,​ o f ​ ​ EFG​ is equal to 4 units .​
​
​
You c an us e the Triangle Mids egment Theorem to
find v arious meas ures in ​ ​ ABC ​ .​
HJ​ ​ _1_ AC ​
​ Mids egment Thm.​
2​
HJ​ ​ _1_(12)
Subs titute 12 for ​ AC ​ .​
2​
HJ​ ​ 6 ​
Simplify.​
Class
When s olv ing a problem, it is s ometimes nec es s ary to c ons ider more than ​
one pos s ible c as e. It is helpful to mak e a draw ing of eac h c as e.​
Example​
Triangle Midsegment Theorem​
A mids egment of a triangle is parallel to ​
a s ide of the triangle, and its length is ​
half the length of that s ide.
D ate ​
Challenge​
33​
Copyright © by Holt, Rinehart and W inston. ​ ​
All rights reserved.

�​
7.​ What are the names of the mids egments ? ​
Answers will vary based on
_
students’ choice of letters: QR​ ,
_ _
RS​, QS​ .​
​

​

8.​ W hat is the mids egment triangle?
Q
​ RS
Ho lt Ge o me tr y​
Copyright © by Holt, Rinehart and Winston.​
All rights reserved.
74
​ ​
34​
Ho lt Ge o me tr y​
Holt Geometry​