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Laabri

3.7 Segment Proofs

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Last updated about 1 month ago
5 Nsɛmmisa
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Asemmisa {{asɛmmisaAhyɛnsode}}
1.

Complete the proof.

Mmuae Afoforo a Wobɛpaw:
Prove
Substitution prop.
Subtraction Prop.
Given

M is the midpoint of \overline{MO}

Symmetric prop.
Simplification

\overline{LM}\cong\overline{NO}

Multiplication Prop.
Def. of bisect
Addition Prop.
Division Prop.
Segment Addition Axiom
Def. of midpoint

M is the midpoint of \overline{LN}

Reflexive prop.
Asemmisa {{asɛmmisaAhyɛnsode}}
2.

Complete the proof.

Mmuae Afoforo a Wobɛpaw:
Def. of bisect

PQ = QR

Substitution prop.
Division Prop.
Given
Addition Prop.
Symmetric prop.
Prove
Reflexive prop.
Segment Addition Axiom
Multiplication Prop.

Q is the midpoint of \overline{PR}

Simplification

2PQ = PR

Def. of midpoint
Subtraction Prop.
Asemmisa {{asɛmmisaAhyɛnsode}}
3.

Complete the proof.

Mmuae Afoforo a Wobɛpaw:
Addition Prop.
Simplification
Def. of bisect
Symmetric prop.

S is the midpoint of \overline{RT}

RS = ST

Division Prop.
Prove
Reflexive prop.
Substitution prop.
Def. of midpoint
Given
Subtraction Prop.
Multiplication Prop.
Segment Addition Axiom
Asemmisa {{asɛmmisaAhyɛnsode}}
4.

Complete the proof.

Mmuae Afoforo a Wobɛpaw:
Def. of midpoint

XY = VY

Segment Addition Axiom
Subtraction Prop.
Division Prop.
Multiplication Prop.
Symmetric prop.
Def. of bisect
Given
Prove
Reflexive prop.

XZ = VY + YW

Addition Prop.

YW = YZ

XZ = XY + YZ

VW = VY + YW

Substitution prop.
Simplification
Asemmisa {{asɛmmisaAhyɛnsode}}
5.

Complete the proof.

Mmuae Afoforo a Wobɛpaw:

YZ = TU

Simplification

XY = UV

Given
Def. of bisect
Subtraction Prop.
Def. of midpoint

XZ = XY + YZ

Addition Prop.
Prove
Multiplication Prop.
Substitution prop.
Division Prop.

TV = TU + UV

Symmetric prop.
Segment Addition Axiom
Reflexive prop.