Download Geometry Chapter 4 Review. 1. Classify as equilateral, isosceles, or

Geometry Chapter 4 Review.
1. Classify OPQ as equilateral, isosceles, or scalene.
P
8
O
10
9
Q
2. Name a right triangle.
B
35° 55°
A
30°
115°
D
65°
60°
C
[A] ABC
[B] ADB
[C] BDC
[D] none of these
3. Complete the statement using one of the following words: always, sometimes, or never. “An
isosceles triangle is ______ an obtuse triangle.”
4. How many acute angles can an isosceles triangle have? Explain.
5. A scalene triangle can have how many right angles? Explain your reasoning.
6. Find the value of x:
84°
128°
x
[A] 128°
[B] 84°
[C] 32°
[D] 148°
7. Find the measure of the interior angles to the nearest tenth. (Drawing is not to scale.)
( x  1)
(3x  1)
( x  1)
[A] 36.2  , 40.9  , 102.9 
[B] 39.3  , 34.8  , 105.9 
[C] 35.3  , 37.8  , 106.9 
[D] 36.8  , 36.8  , 106.4 
8. Use the figure below to solve for x.
( x  10)
2x
55
[A] 145
[B] 45
[C] 90
[D] 55
9. Refer to the figure below. mA  ______.
[A] 67
[B] 74
[C] 35
[D] 141
10. Which figures appear to be congruent?
1
2
4
3
5
[A] 3 and 4
[B] 1 and 3
[C] 1, 3, and 4
[D] 4 and 5
11. Which two figures shown below appear to be
congruent?
A.
B.
C.
D.
12. Consider a triangle, DEF . Must it be true that DEF  FED ? Explain.
13. In the diagram, B  E and C  F . Find the value of x.
B
A
bx  50g
D
75
[B] x  75
[C] x  35
[D] x  50
C
F
E
[A] x  25
35
14. If ABC  GHJ and DEF  GHJ , then ABC  DEF . What property of congruence
does this statement represent?
15. Refer to the figure below. Give a congruence statement for two triangles in the figure.
E
G
D
F
DEF is equilateral. DG ~
= FG
16. Refer to the figure shown. Give a congruence statement for the two triangles and name the
theorem or postulate that proves the congruence.
I
K
H
J
HI  JK
L
IJ  LK
17. You are making a patch for a quilt. You cut the pieces so that XR  YZ and XY  RZ . Show
that XRZ  ZYX and state the congruence postulates you use.
X
Y
R
P
Z
Q
18. Which postulate or theorem can be used to determine the measure of
RT ?
[A] SSS Congruence Postulate
[B] AAS Congruence Theorem
[C] ASA Congruence Postulate
[D] SAS Congruence Postulate
19. Given: AB  DE
B  E Prove: ABC  DEC
20. Phillip walked 80 yards to the southwest while Shondra walked 140 yards to the west.
Meanwhile, 220 yards to the southeast, José walked 140 yards to the northeast and LuYin
walked 80 yards to the east. The angle formed between the walking paths of Phillip and Shondra
is congruent to the angle formed by the walking paths of José and LuYin. If Phillip and Shondra
are now 101 yards apart, how far apart are José and LuYin? How do you know?
21. Given: BC  DA, 1  2, and CF  AF
Prove: CEF  AEF
B
D
2
1
E
C
A
F
23. What can you conclude about EGF?
A
G
C
E
F
B
24. In ABC , if AB  BC and mA  39 , then mC  ______.
[A] mB
[B] 39
[C] 141
[D] 102
25. Given: ED  EC; BD  BC; ED  BC
Prove:  CED   DBC
A
E
B
D
C
26. ABD  CBD . Name the theorem or postulate that justifies the congruence.
A
B
D
C
[A] SAS
[B] ASA
[C] AAS
[D] HL
27. Place a square in a convenient position in the first quadrant of a coordinate plane. Label each
vertex using variables for each of the coordinates. Be sure to use the fewest possible variables.
28. Use the labeled diagram and a coordinate proof to prove that in an equilateral triangle the
triangle formed by connecting the midpoints of each side is
F
IJ
equilateral.
AH
a, a 3K
G
X
b g
B 0, 0
Y
Z
b g
C 2a , 0
Reference: [4.1.1.1]
[1] scalene
Reference: [4.1.1.4]
[2] [A]
Reference: [4.1.1.7]
[3] Sometimes
Reference: [4.1.1.10]
[4] It can have two acute angles if it is a right isosceles or an obtuse isosceles triangle; otherwise
it will have 3 acute angles.
Reference: [4.1.2.13]
[5] 1; a scalene triangle cannot have 2 or 3 right angles because the sum of the measures of the
angles in a triangle is 180 .
Reference: [4.1.2.15]
[6] [D]
Reference: [4.1.2.19]
[7] [D]
Reference: [4.1.2.25]
[8] [B]
Reference: [4.1.2.27]
[9] [A]
Reference: [4.2.1.30]
[10] [B]
Reference: [4.2.1.32]
[11] B and D
Reference: [4.2.1.38]
[12] No. In order for DEF  FED , DEF must be isosceles or equilateral.
Reference: [4.2.2.45]
[13] [A]
Reference: [4.2.2.47]
[14] Transitive Property
Reference: [4.3.1.50]
[15] DGE  FGE
Reference: [4.3.1.59]
[16] HIJ  JKL by the SAS Congruence Postulate
Reference: [4.3.2.61]
Statements
1. XR  YZ
[17]
Reasons
Given
XY  RZ
2. XZ  XZ
Reflexive property of congruence
3. XRZ  XYZ SSS congruence postulate
Reference: [4.4.1.64]
[18] [B]
Reference: [4.4.1.66]
Statements
Reasons
1. AB  DE
1. Given
[19] 2. B  E
2. Given
3. ACB  DCE 3. Vertical s Thm.
4. ABC  DEC 4. AAS Congruence Thm.
Reference: [4.4.2.71]
[20] 101 yards; SAS Congruence Post.
Reference: [4.5.1.74]
[21] BEC  DEA by vertical angles. BEC  DEA by AAS. Then, because corresponding
parts of congruent triangles are congruent,
CE  AE . EF  EF by the Reflexive Property. So CEF  AEF by SSS.
Reference: [4.5.2.75]
[22] Students’ proofs should explain how all three segments of the construction are copied and
are therefore congruent to the segments in the original angle. They should then use the SSS
Congruence Postulate to show that the two triangles are congruent. Next, they should use
congruent parts of congruent triangles to prove that the corresponding angles are congruent.
Reference: [4.6.1.79]
[23] EGF is equilateral and equiangular.
Reference: [4.6.1.82]
[24] [B]
Reference: [4.6.2.87]
1. ED  EC
2.  CED is a rt 
3. BD  BC
[25] 4.  DBC is a rt 
5. ED  BC
6. DC  CD
7.  CED   DBC
Reference: [4.6.2.86]
[26] [D]
Reference: [4.7.1.91]
1. Given
2. If 2 segments are  , they form rt s.
3. Given
4. If 2 segments are  , they form rt s.
5. Given
6. Reflexive
7. HL Congruence Theorem
[27]
b g
ba, ag
b0, 0g
ba, 0gx
y
0, a
Reference: [4.7.2.96]
[28]
First, calculate the midpoint of each side:
X =
Fa , a 3 I, Z = ba, 0g, and Y = F3a ,
G
G
H2 2 J
K
H2
I
J
K
a 3
. Second, using the Distance Formula, find
2
the length of each segment connecting those
midpoints:
F a 3 I  F
aI
G
G
J
K a,
H 2 K H2 J
2
distance of XZ =
Fa 3 I  F
aI
G
G
J
K a,
H2 K H2 J
2
2
distance of YZ =
2
and the distance of XY = 02  a 2  a. Since each of the sides are the same length, the
inscribed triangle is equilateral.