CHAPTER Chapter Test A 5 For use after Chapter 5

Name ———————————————————————

Date ————————————

Chapter Test A

CHAPTER

5

For use after Chapter 5

}

WY is the midsegment of nQRS. Find the value of x. 1.

2.

R W

1.

R

x

34 Q

Y

3.

S

S

3. Q

Y

4.

R

15

x W

2.

W

22

x

Answers

R

5.

8 Y

6.

x

W

Y

7.

12 Q

S

8.

S

9.

Find the coordinates of point M in the figure. 5.

6.

y

4.

10.

y

(h, 2k)

M

(0, 0)

x

M (0, 0)

x

Find the value of x. 7.

X

Z

8. A

B

Y 2x

16

E

6x 2 8

x12

D

W C

Use the information in the diagram to find x. 9.

10. m∠ ABC 5 908.

M 258

N

L Q (x 1 10)8

A 12 B

458 C

90

Geometry Chapter 5 Assessment Book

D

x28

Copyright © Holt McDougal. All rights reserved.

(2h, k)

Name ———————————————————————

Chapter Test A

CHAPTER

5

Date ————————————

continued


In n ABC, Q is the centroid. 11. QC 5 12. Find CM. L

C

12. QC 5 6. Find CL.

11.

B

A

Q

N

Answers

12. 13.

M

L

M

14.

Q C

N

A

B

15.

List the unknown sides or angles in order from smallest to largest.

16.

13.

17.

14.

R

B

858 24 408

Q

558

18.

30

19.

S 18

C

20.

A

Is it possible to construct a triangle with the given side lengths? 15. 3, 7, 9

16. 4, 6, 10

17. 2, 7, 10

Complete with <, >, or 5.

?


18. AB

BC

A

19. RS

? VW V

C

B

R 458 208

D

T

308 Q

508

W

S

20. Arrange statements A–D in order to write an indirect proof of the

statement: If x 1 y Þ 10 and x 5 9, then y Þ 1. A. But this contradicts the given statement that x 1 y Þ 10. B. x 1 y 5 9 1 1 5 10 C. Temporarily assume that y 5 1. D. The contradiction shows that the temporary assumption that

y 5 1 is false. This proves that y Þ 1.


91

Name ———————————————————————

Date ————————————

Chapter Test B

CHAPTER

5


}

WY is the midsegment of nQRS. Find the value of x. 1.

2.

R

W

3.

x 2 16 S

Y

S

Y

4.

R 2x W

2.

W

30

19

4.

See left.

6.

See left.

R

3

Y

W

2x 1 8

Y

14 S

S

Place the figure in a coordinate plane in a convenient way. Give the coordinates of each vertex. 5. Isosceles right triangle:

7.

6. Rectangle: Length is 3 and

Leg length is 3.

8.

width is 2.

y

y

1

1 x

1

x

1

In the diagram, the perpendicular bisectors of nWXY meet at point Z. Find the indicated measure. 7. WZ

8. ZY

X

5

Z

W

8

X

9 Z 7

3 W

92

5.


4

Y

Y


3.

1.

R

28

x 1 10

Answers

Name ———————————————————————

Chapter Test B

CHAPTER

5


Date ————————————

continued

Use the information in the diagram to find x. 9.

Answers

10.

9.

x 1 12

3x 2 5

10.

458 458

2x 1 2

11. 2(x 1 10)

12. 13.

In n ABC, Q is the centroid. Find the indicated length. 11. QC 5 12. Find QM. L

C

15.

B

A

N

14.

12. QC 5 6. Find QL.

M

16.

M

L

17. A

B

C

N

18.

List the unknown sides in order from smallest to largest. 13.

14.

B

R 298

858


508 A

C S

15. A triangle has one side of length 10 and another of length 6.

Describe the possible lengths of the third side. Complete with <, >, or 5. 16. AB

?

BC

17. RS

?

VU V

C A 458

B 1108

648

R

308 D

T 508

708

U

S

18. Suppose you wanted to prove the statement “If x 1 y . 20 and

y 5 5, then x . 15.” What temporary assumption could you make to prove the conclusion indirectly? Geometry Chapter 5 Assessment Book

93

Name ——————————————————————— CHAPTER

5

Date ————————————

Chapter Test C For use after Chapter 5

Answers

E

Use nDEF, where J, K, and L are midpoints of the sides.

1.

1. If DE 5 8x 1 12 and KL 5 10x 2 9,

J

what is DE?

2.

K

2. If JL 5 7x 2 6 and EF 5 9x 1 8,

3.

what is EK? D

3. If DF 5 18x 2 6 and JK 5 3x 1 11,

L

F

4.

what is JK?

5.

Find the value of x.

6.

4.

5.

G

(

5 x 8

(x 2 11)8

)

7.

178

8. 9. F J 3x 1 10

7 x 2

H 15

10.

Find the value of x that makes P the incenter of the triangle. 6.

7.

B

11. 12.

Z

3x 1 1 7x 2 4 W

P A

34 H 30

X P 117

C

R

108

Y

Q

Find the coordinates of the centroid P of nSTU. 8. S(2, 5), T(5, 22), U(21, 26) 9. S(21, 7), T(5, 26), U(27, 24)

Point S is the centroid nPQR. Use the given information to find the value of x. 10. QS 5 3x 1 5 and QT 5 4x 1 11

U

P

S

11. VS 5 3x 2 2 and VP 5 7x 1 4 12. RS 5 4x 1 1 and SU 5 3x 2 4

T

V R

94


Q


G

F

Name ———————————————————————

Chapter Test C

CHAPTER

5

Date ————————————

continued


Answers

13. In the space below, construct a circle through three

noncollinear points.

13.

See left.

14.

15.

List the sides and the angles in order from smallest to largest. 14. A

C

418

15.

16.

F 56

30

17. G

48

H B

18.

Is it possible to build a triangle using the given side lengths? If so, order the angle measures of the triangle from least to greatest. }

}

}

}

}

16. AB 5 Ï 73 , BC 53Ï 10 , AC 5 5Ï 7

20. 21.

}

17. JK 5 Ï 33 , KL 5 4Ï 5 , JL 5 9Ï 3 Copyright © Holt McDougal. All rights reserved.

19.

Complete the statement with <, >, or 5. 18. m ∠1

?

m∠2

19. PQ

?

SR Q

10 5

2

1

R

6 17 P S

Use the Hinge Theorem or its converse and properties of triangles to write and solve an inequality to describe a restriction on the value of x. 20.

21.

12

7

10 (3x 1 8)8

x 1 11

16 718

1058 348 5x 2 7

948

7

10


95

Chapter 4, continued

e.

y

B(0, 4) E(0, 4)

C(21, 1) A(23, 0)

1 D(3, 0)

6.

y

y

1

1 1

x

1

x

(0, 0), (0, 3), (3, 0)

(0, 0), (0, 2), (3, 2), (3, 0) 7. 5 8. 9 9. 10 10. 25 11. 6 12. 3 } } } } } } 13. BC, AB, AC 14. QS, QR, RS 15. 4 < x < 16 16. < 17. > 18. x ≤ 15 Chapter Test C 1. 32 2. 22 3. 18 4. x 5 10 5. x 5 48

F(1, 1)

1

5.

ANSWERS

illustrates the student’s explanation of when to use the method. 2. a. n ABD and nCBD are scalene right triangles; n ABC is an acute isosceles triangle; nEFG is an obtuse scalene triangle b. It is given that n ABD and nCBD are right triangles and } } } } AB > CB. By the Reflexive Property, BD > BD. So, by the HL Congruence Theorem, n ABD > nCBD. c. ∠ BAD > ∠ BCD; } } ∠ ABD > ∠ CBD; ∠ ADB > ∠ CDB; AB > CB; } } } } BD > BD; AD > CD d. 1148

x

6. x 5 5 7. x 5 7 8. (2, 21) 9. (21, 21)

9 10. x 5 7 11. x 5 5 12. x 5 } 2

} } }

13. Check students’ drawings 14. BC, AC, AB 15. ∠ G, ∠ F, ∠ H f. reflection in y-axis g. Sample answer: Use the

Distance Formula to find the side lengths of all three triangles. Then use the SSS Congruence Postulate.

16. yes; ∠ C, ∠ A, ∠ B 17. no 18. <

9 19. 5 20. x < 21 21. x < } 2


Standardized Test A

Chapter 5

1. D 2. B 3. D 4. C 5. A 6. B 7. A 8. C

Quiz 1

9. A 10. A 11. D 12. B 13. 6

1. 19 2. 12 3. 8 4. 10; Perpendicular Bisector Theorem 5. 14; Concurrency of

14. CM . 5 and CM , 17

Perpendicular Bisectors Theorem

is Ï 92 1 122 5 15 miles. b. The tower and the fires form a triangle and the shortest distance between the campgrounds is a midsegment of the triangle. It is parallel to the side measuring 15 miles, so its distance is 7.5 miles. c. 4.5 miles; The path is the midsegment that is parallel to the side between the tower and Fire 1, which measures 9 miles.

Quiz 2 1. 7 2. 7 3. 6 4. 12 5. 4

Quiz 3 1. yes 2. No, 4 1 7 < 13. 3. 1 < x < 11

} } }

4. 7 < x < 35 5. BC, AC, AB 6. ∠ D, ∠ E, ∠ F 7. < 8. 5

Chapter Test A 1. 68 2. 11 3. 12 4. 7.5 5. (2h, 0)

h 6. }, k 7. 8 8. 2 9. 15 10. 20 11. 18 2 } } } 12. 9 13. RS, RQ, QS 14. ∠ B, ∠ A, ∠ C

1

2

15. yes 16. no 17. no 18. < 19. > 20. C, B, A, D

Chapter Test B 3 1. 50 2. 30 3. 7 4. } 4

15. a. By the Pythagorean Theorem, the distance }

Standardized Test B 1. B 2. D 3. B 4. C 5. A 6. A 7. D 8. B 9. A 10. B 11. C 12. A 13. 43 14. 11 < QR < 29 15. a. 141.4 yd b. By the Pythagorean Theorem, a2 1 b2 5 c2, so

502 1 502 5 c2 and c < 70.7. By the Midsegment Theorem, because the pool and laundry room are midpoints, the distance from the laundry room to the pool is half the distance from the game room to the shower. c. Turn clockwise 1358 and walk forward 70.7 yards. Geometry Assessment Book

A9

CHAPTER Chapter Test A 5 For use after Chapter 5

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