Geometry Section 2-7 1112

SECTION 2-7
Proving Segment Relationships

ESSENTIAL QUESTIONS
How do you write proofs involving segment addition?
How do you write proofs involving segment
congruence?

POSTULATES & THEOREMS
Ruler Postulate:
Segment Addition Postulate:

Rule r P o s t u l a t e : The points on any line or segment can be put
into one-to-one correspondence with real numbers

You can measure the distance between two points

You can measure the distance between two points
Segm e n t A d d i t i o n P o s t u l a t e : If A, B, and C are collinear, then B is
between A and C if and only if (IFF) AB + BC = AC

THEOREM 2.2 - PROPERTIES OF
SEGMENT CONGRUENCE
Reflexive Property of Congruence:
Symmetric Property of Congruence:
Transitive Property of Congruence:

SEGMENT CONGRUENCE
Symmetric Property of Congruence: If AB ≅ CD, then CD ≅ AB
Transitive Property of Congruence:

SEGMENT CONGRUENCE
Symmetric Property of Congruence: If AB ≅ CD, then CD ≅ AB
Transitive Property of Congruence: If AB ≅ CD and CD ≅ EF, then
AB ≅ EF

EXAMPLE 1
Prove that if AB ≅ CD, then AC ≅ BD

EXAMPLE 1
1. AB ≅ CD

EXAMPLE 1
1. AB ≅ CD Given

EXAMPLE 1
1. AB ≅ CD Given
2. AB = CD

EXAMPLE 1
1. AB ≅ CD Given
2. AB = CD Def. of ≅ segments

EXAMPLE 1
1. AB ≅ CD Given
3. BC = BC

EXAMPLE 1
1. AB ≅ CD Given
3. BC = BC Reflexive property of equality

EXAMPLE 1
1. AB ≅ CD Given
4. AB + BC = AC

EXAMPLE 1
1. AB ≅ CD Given
4. AB + BC = AC Segment Addition

EXAMPLE 1
1. AB ≅ CD Given
5. CD + BC = AC

EXAMPLE 1
1. AB ≅ CD Given
5. CD + BC = AC Substitution prop. of equality

EXAMPLE 1
6. CD + BC = BD

EXAMPLE 1
6. CD + BC = BD Segment Addition

EXAMPLE 1
7. AC = BD

EXAMPLE 1
7. AC = BD Substitution property of equality

EXAMPLE 1
8. AC ≅ BD

EXAMPLE 1
8. AC ≅ BD Def. of ≅ segments

PROOF
The Transitive Property of Congruence
If AB ≅ CD and CD ≅ EF, then AB ≅ EF

PROOF
1. AB ≅ CD and CD ≅ EF

PROOF
1. AB ≅ CD and CD ≅ EF Given

PROOF
2. AB = CD and CD = EF

PROOF
2. AB = CD and CD = EF Def. of ≅ segments

PROOF
3. AB = EF

PROOF
3. AB = EF Transitive property
of Equality

PROOF
of Equality
4. AB ≅ EF

PROOF
of Equality
4. AB ≅ EF Def. of ≅ segments

EXAMPLE 2
Matt Mitarnowski is designing a badge for his club. The length of
the top edge of the badge is equal to the length of the left edge of the
badge. The top edge of the badge is congruent to the right edge of the
badge, and the right edge of the badge is congruent to the bottom edge
of the badge. Prove that the bottom edge of the badge is congruent to
the left edge of the badge.

EXAMPLE 2
A B
D C

EXAMPLE 2
A B
D C
Given: AB = AD, AB ≅ BC, and BC ≅ CD

EXAMPLE 2
A B
D C
Given: AB = AD, AB ≅ BC, and BC ≅ CD
Prove: AD ≅ CD

EXAMPLE 2
1. AB = AD,
AB ≅ BC, and
BC ≅ CD
A B
D C

EXAMPLE 2
1. AB = AD,
AB ≅ BC, and
BC ≅ CD
A B
D C
Given

EXAMPLE 2
1. AB = AD,
AB ≅ BC, and
BC ≅ CD
Given
2. AB ≅ AD
A B
D C

EXAMPLE 2
1. AB = AD,
AB ≅ BC, and
BC ≅ CD
A B
D C
Given
2. AB ≅ AD Def. of ≅ segments

EXAMPLE 2
1. AB = AD,
AB ≅ BC, and
BC ≅ CD
Given
3. AB ≅ CD
A B
D C

EXAMPLE 2
1. AB = AD,
AB ≅ BC, and
BC ≅ CD
A B
D C
Given
3. AB ≅ CD Transitive property

EXAMPLE 2
1. AB = AD,
AB ≅ BC, and
BC ≅ CD
A B
D C
Given
4. AD ≅ AB

EXAMPLE 2
1. AB = AD,
AB ≅ BC, and
BC ≅ CD
A B
D C
Given
4. AD ≅ AB Symmetric property

EXAMPLE 2
1. AB = AD,
AB ≅ BC, and
BC ≅ CD
A B
D C
Given
5. AD ≅ CD

EXAMPLE 2
1. AB = AD,
AB ≅ BC, and
BC ≅ CD
A B
D C
Given
5. AD ≅ CD Transitive property

PROBLEM SET
p. 145 #1-13, 15, 17, 18
“Trust yourself. Think for yourself. Act for yourself. Speak for
yourself. Be yourself. Imitation is suicide.” - Marva Collins

Geometry Section 2-7 1112

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Geometry Section 2-7 1112