Mathematics Grade 7 Unit 5 Geometry Answers

Cite

Geometry: Answer Key

Answer Key

This provides the answers and solutions for the Put Me in, Coach! exercise boxes, organized by sections.

Taking the Burden out of Proofs

Yes
Theorem 8.3: If two angles are complementary to the same angle, then these two angles are congruent.

?A and ?B are complementary, and ?C and ?B are complementary.

Given: ?A and ?B are complementary, and ?C and ?B are complementary.

Prove: ?A ~= ?C.

	Statements	Reasons
1.	?A and ?B are complementary, and ?C and ?B are complementary.	Given
2.	m?A + m?B = 90 , m?C + m?B = 90	Definition of complementary
3.	m?A = 90 - m?B, m?C = 90 - m?B	Subtraction property of equality
4.	m?A = m?C	Substitution (step 3)
5.	?A ~= ?C	Definition of ~=

Proving Segment and Angle Relationships

If E is between D and F, then DE = DF ? EF.

E is between D and F.

Given: E is between D and F

Prove: DE = DF ? EF.

	Statements	Reasons
1.	E is between D and F	Given
2.	D, E, and F are collinear points, and E is on DF	Definition of between
3.	DE + EF = DF	Segment Addition Postulate
4.	DE = DF ? EF	Subtraction property of equality

2. If ?BD divides ?ABC into two angles, ?ABD and ?DBC, then m?ABC = m?ABC - m?DBC.

?BD divides ?ABC into two angles, ?ABD and ?DBC.

Given: ?BD divides ?ABC into two angles, ?ABD and ?DBC

Prove: m?ABD = m?ABC - m?DBC.

	Statements	Reasons
1.	?BD divides ?ABC into two angles, ?ABD and ?DBC	Given
2.	m?ABD + m?DBC = m?ABC	Angle Addition Postulate
3.	m?ABD = m?ABC - m?DBC	Subtraction property of equality

3. The angle bisector of an angle is unique.

?ABC with two angle bisectors: ?BD and ?BE.

Given: ?ABC with two angle bisectors: ?BD and ?BE.

Prove: m?DBC = 0.

	Statements	Reasons
1.	?BD and ?BE bisect ?ABC	Given
2.	?ABC ~= ?DBC and ?ABE ~= ?EBC	Definition of angel bisector
3.	m?ABD = m?DBC and m?ABE ~= m?EBC	Definition of ~=
4.	m?ABD + m?DBE + m?EBC = m?ABC	Angle Addition Postulate
5.	m?ABD + m?DBC = m?ABC and m?ABE + m?EBC = m?ABC	Angle Addition Postulate
6.	2m?ABD = m?ABC and 2m?EBC = m?ABC	Substitution (steps 3 and 5)
7.	m?ABD = ^m?ABC/₂ and m?EBC = ^m?ABC/₂	Algebra
8.	^m?ABC/₂ + m?DBE + ^m?ABC/₂ = m?ABC	Substitution (steps 4 and 7)
9.	m?ABC + m?DBE = m?ABC	Algebra
10.	m?DBE = 0	Subtraction property of equality

4. The supplement of a right angle is a right angle.

?A and ?B are supplementary angles, and ?A is a right angle.

Given: ?A and ?B are supplementary angles, and ?A is a right angle.

Prove: ?B is a right angle.

	Statements	Reasons
1.	?A and ?B are supplementary angles, and ?A is a right angle	Given
2.	m?A + m?B = 180	Definition of supplementary angles
3.	m?A = 90	Definition of right angle
4.	90 + m?B = 180	Substitution (steps 2 and 3)
5.	m?B = 90	Algebra
6.	?B is a right angle	Definition of right angle

Proving Relationships Between Lines

m?6 = 105 , m?8 = 75
Theorem 10.3: If two parallel lines are cut by a transversal, then the alternate exterior angles are congruent.

l ? ? m cut by a transversal t.

Given: l ? ? m cut by a transversal t.

Prove: ?1 ~= ?3.

	Statements	Reasons
1.	l ? ? m cut by a transversal t	Given
2.	?1 and ?2 are vertical angles	Definition of vertical angles
3.	?2 and ?3 are corresponding angles	Definition of corresponding angles
4.	?2 ~= ?3	Postulate 10.1
5.	?1 ~= ?2	Theorem 8.1
6.	?1 ~= ?3	Transitive property of 3.

3. Theorem 10.5: If two parallel lines are cut by a transversal, then the exterior angles on the same side of the transversal are supplementary angles.

l ? ? m cut by a transversal t.

Given: l ? ? m cut by a transversal t.

Prove: ?1 and ?3 are supplementary.

	Statement	Reasons
1.	l ? ? m cut by a transversal t	Given
2.	?1 and ?2 are supplementary angles, and m?1 + m?2 = 180	Definition of supplementary angles
3.	?2 and ?3 are corresponding angles	Definition of corresponding angles
4.	?2 ~= ?3	Postulate 10.1
5.	m?2 ~= m?3	Definition of ~=
6.	m?1 + m?3 = 180	Substitution (steps 2 and 5)
7.	?1 and ?3 are supplementary	Definition of supplementary

The Top 3D Printers

3D Printers

Interested in 3D Printing?

We?ve researched the top things you should consider when purchasing a 3Dprinter, and have chosen the best printers of 2020 based on your needs.

4. Theorem 10.9: If two lines are cut by a transversal so that the alternate exterior angles are congruent, then these lines are parallel.

Lines l and m are cut by a transversal t.

Given: Lines l and m are cut by a transversal t, with ?1 ~= ?3.

Prove: l ? ? m.

	Statement	Reasons
1.	Lines l and m are cut by a transversal t, with ?1 ~= ?3	Given
2.	?1 and ?2 are vertical angles	Definition of vertical angles
3.	?1 ~= ?2	Theorem 8.1
4.	?2 ~= ?3	Transitive property of ~=.
5.	?2 and ?3 are corresponding angles	Definition of corresponding angles
6.	l ? ? m	Theorem 10.7

5. Theorem 10.11: If two lines are cut by a transversal so that the exterior angles on the same side of the transversal are supplementary, then these lines are parallel.

Lines l and m are cut by a t transversal t.

Given: Lines l and m are cut by a transversal t, ?1 and ?3 are supplementary angles.

Prove: l ? ? m.

	Statement	Reasons
1.	Lines l and m are cut by a transversal t, and ?1 are ?3 supplementary angles	Given
2.	?2 and ?1 are supplementary angles	Definition of supplementary angles
3.	?3 ~= ?2	Example 2
4.	?3 and ?2 are corresponding angles	Definition of corresponding angles
5.	l ? ? m	Theorem 10.7

Two's Company. Three's a Triangle

An isosceles obtuse triangle
The acute angles of a right triangle are complementary.

?ABC is a right triangle.

Given: ?ABC is a right triangle, and ?B is a right angle.

Prove: ?A and ?C are complementary angles.

	Statement	Reasons
1.	?ABC is a right triangle, and ?B is a right angle	Given
2.	m?B = 90	Definition of right angle
3.	m?A + m?B + m?C = 180	Theorem 11.1
4.	m?A + 90 + m?C = 180	Substitution (steps 2 and 3)
5.	m?A + m?C = 90	Algebra
6.	?A and ?C are complementary angles	Definition of complementary angles

3. Theorem 11.3: The measure of an exterior angle of a triangle equals the sum of the measures of the two nonadjacent interior angles.

?ABC with exterior angle ?BCD.

	Statement	Reasons
1.	?ABC with exterior angle ?BCD	Given
2.	?DCA is a straight angle, and m?DCA = 180	Definition of straight angle
3.	m?BCA + m?BCD = m?DCA	Angle Addition Postulate
4.	m?BCA + m?BCD = 180	Substitution (steps 2 and 3)
5.	m?BAC + m?ABC + m?BCA = 180	Theorem 11.1
6.	m?BAC + m?ABC + m?BCA = m?BCA + m?BCD	Substitution (steps 4 and 5)
7.	m?BAC + m?ABC = m?BCD	Subtraction property of equality

4. 12 units²

5. 30 units²

6. No, a triangle with these side lengths would violate the triangle inequality.

Congruent Triangles

1. Reflexive property: ?ABC ~= ?ABC.

Symmetric property: If ?ABC ~= ?DEF, then ?DEF ~= ?ABC.

Transitive property: If ?ABC ~= ?DEF and ?DEF ~= ?RST, then ?ABC ~= ?RST.

2. Proof: If AC ~= CD and ?ACB ~= ?DCB as shown in Figure 12.5, then ?ACB ~= ?DCB.

	Statement	Reasons
1.	AC ~= CD and ?ACB ~= ?DCB	Given
2.	BC ~= BC	Reflexive property of ~=
3.	?ACB ~= ?DCB	SAS Postulate

3. If CB ? AD and ?ACB ~= ?DCB, as shown in Figure 12.8, then ?ACB ~= ?DCB.

	Statement	Reasons
1.	CB ? AD and ?ACB ~= ?DCB	Given
2.	?ABC and ?DBC are right angles	Definition of ?
3.	m?ABC = 90 and m?DBC = 90	Definition of right angles
4.	m?ABC = m?DBC	Substitution (step 3)
5.	?ABC ~= ?DBC	Definition of ~=
6.	BC ~= BC	Reflexive property of ~=
7.	?ACB ~= ?DCB	ASA Postulate

4. If CB ? AD and ?CAB ~= ?CDB, as shown in Figure 12.10, then ?ACB~= ?DCB.

	Statement	Reasons
1.	CB ? AD and ?CAB ~= ?CDB	Given
2.	?ABC and ?DBC are right angles	Definition of ?
3.	m?ABC = 90 and m?DBC = 90	Definition of right angles
4.	m?ABC = m?DBC	Substitution (step 3)
5.	?ABC ~= ?DBC	Definition of ~=
6.	BC ~= BC	Reflexive property of ~=
7.	?ACB ~= ?DCB	AAS Theorem

5. If CB ? AD and AC ~= CD, as shown in Figure 12.12, then ?ACB ~= ?DCB.

	Statement	Reasons
1.	CB ? AD and AC ~= CD	Given
2.	?ABC and ?DBC are right triangles	Definition of right triangle
3.	BC ~= BC	Reflexive property of ~=
4.	?ACB ~= ?DCB	HL Theorem for right triangles

6. If ?P ~= ?R and M is the midpoint of PR, as shown in Figure 12.17, then ?N ~= ?Q.

	Statement	Reasons
1.	?P ~= ?R and M is the midpoint of PR	Given
2.	PM ~= MR	Definition of midpoint
3.	?NMP and ?RMQ are vertical angles	Definition of vertical angles
4.	?NMP ~= ?RMQ	Theorem 8.1
5.	?PMN ~= RMQ	ASA Postulate
6.	?N ~= ?Q	CPOCTAC

Smiliar Triangles

x = 11
x = 12
40 and 140
If ?A ~= ?D as shown in Figure 13.6, then ^BC/_AB = ^CE/_DE.

	Statement	Reasons
1.	?A ~= ?D	Given
2.	?BCA and ?DCE are vertical angles	Definition of vertical angles
3.	?BCA ~= ?DCE	Theorem 8.1
4.	?ACB ~ ?DCE	AA Similarity Theorem
5.	^BC/_AB = ^CE/_DE	CSSTAP

5. 150 feet.

Opening Doors with Similar Triangles

If a line is parallel to one side of a triangle and passes through the midpoint of a second side, then it will pass through the midpoint of the third side.

DE ? ? AC and D is the midpoint of AB.

Given: DE ? ? AC and D is the midpoint of AB.

Prove: E is the midpoint of BC.

	Statement	Reasons
1.	DE ? ? AC and D is the midpoint of AB.	Given
2.	DE ? ? AC and is cut by transversal ?AB	Definition of transversal
3.	?BDE and ?BAC are corresponding angles	Definition of corresponding angles
4.	?BDE ~= ?BAC	Postulate 10.1
5.	?B ~= ?B	Reflexive property of ~=
6.	?ABC ~ ?DBE	AA Similarity Theorem
7.	^DB/_AB = ^BE/_BC	CSSTAP
8.	DB = ^AB/₂	Theorem 9.1
9.	^DB/_AB = ¹/₂	Algebra
10.	¹/₂ = ^BE/_BC	Substitution (steps 7 and 9)
11.	BC = 2BE	Algebra
12.	BE + EC = BC	Segment Addition Postulate
13.	BE + EC = 2BE	Substitution (steps 11 and 12)
14.	EC = BE	Algebra
15.	E is the midpoint of BC	Definition of midpoint

2. AC = 4?3 , AB = 8? , RS = 16, RT = 8?3

3. AC = 4?2 , BC = 4?2

Putting Quadrilaterals in the Forefront

AD = 63, BC = 27, RS = 45
AX, CZ, and DY

Trapezoid ABCD with its XB CY four altitudes shown.

3. Theorem 15.5: In a kite, one pair of opposite angles is congruent.

Kite ABCD.

Given: Kite ABCD.

Prove: ?B ~= ?D.

	Statement	Reasons
1.	ABCD is a kite	Given
2.	AB ~= AD and BC ~= DC	Definition of a kite
3.	AC ~= AC	Reflexive property of ~=
4.	?ABC ~= ?ADC	SSS Postulate
5.	?B ~= ?D	CPOCTAC

4. Theorem 15.6: The diagonals of a kite are perpendicular, and the diagonal opposite the congruent angles bisects the other diagonal.

Kite ABCD.

Given: Kite ABCD.

Prove: BD ? AC and BM ~= MD.

	Statement	Reasons
1.	ABCD is a kite	Given
2.	AB ~= AD and BC ~= DC	Definition of a kite
3.	AC ~= AC	Reflexive property of ~=
4.	?ABC ~= ?ADC	SSS Postulate
5.	?BAC ~= ?DAC	CPOCTAC
6.	AM ~= AM	Reflexive property of ~=
7.	?ABM ~= ?ADM	SAS Postulate
8.	BM ~= MD	CPOCTAC
9.	?BMA ~= ?DMA	CPOCTAC
10.	m?BMA = m?DMA	Definition of ~=
11.	?MBD is a straight angle, and m?BMD = 180	Definition of straight angle
12.	m?BMA + m?DMA = m?BMD	Angle Addition Postulate
13.	m?BMA + m?DMA = 180	Substitution (steps 9 and 10)
14.	2m?BMA = 180	Substitution (steps 9 and 12)
15.	m?BMA = 90	Algebra
16.	?BMA is a right angle	Definition of right angle
17.	BD ? AC	Definition of ?

5. Theorem 15.9: Opposite angles of a parallelogram are congruent.

Parallelogram ABCD.

Given: Parallelogram ABCD.

Prove: ?ABC ~= ?ADC.

	Statement	Reasons
1.	Parallelogram ABCD has diagonal AC.	Given
2.	?ABC ~= ?CDA	Theorem 15.7
3.	?ABC ~= ?ADC	CPOCTAC

6. 144 units²

7. 180 units²

8. Kite ABCD has area 48 units².

Parallelogram ABCD has area 150 units².

Rectangle ABCD has area 104 units².

Rhombus ABCD has area ³⁵/₂ units².

Anatomy of a Circle

Circumference: 20? feet, length of ?RST = ¹⁵⁵/₁₈? feet
9? feet²
15? feet²
28

The Unit Circle and Trigonometry

³/_?34 = ^3?34/₃₄
¹/_?3 = ^?3/₃
tangent ratio = ^?40/₃, sine ratio = ^?40/₇
tangent ratio = ⁵/_?56 = ^5?56/₅₆, cosine ratio = ^?56/₉

Excerpted from The Complete Idiot's Guide to Geometry 2004 by Denise Szecsei, Ph.D.. All rights reserved including the right of reproduction in whole or in part in any form. Used by arrangement with Alpha Books, a member of Penguin Group (USA) Inc.

To order this book direct from the publisher, visit the Penguin USA website or call 1-800-253-6476. You can also purchase this book at Amazon.com and Barnes & Noble.

Geometry: Parallel Lines and Supplementary Angles