sss proof #1
given: ( overline{pq} cong overline{st} ), ( overline{qr} cong overline{tr} ), ( r ) is the midpoint of ( overline{ps} )
prove: ( riangle pqr cong riangle str )
(diagram: triangles ( pqr ) and ( str ) with ( p, r, s ) colinear, ( q, t ) above ( pr, rs ) respectively)
statements | reasons
(blank table rows)
boxes: ( overline{pq} cong overline{st} ), ( ext{def. of midpoint} ), ( overline{qr} cong overline{tr} ), ( r ) is the midpoint of ( overline{ps} ), ( ext{given} ), ( overline{pr} cong overline{sr} ), ( ext{given} ), ( ext{sss} ), ( ext{given} ), ( riangle pqr cong riangle str )

sss proof #2
given: ( l ) is the midpoint of ( overline{jn} ), ( overline{jm} cong overline{nm} ),
prove: ( riangle jlm cong riangle nlm )
(diagram: triangle ( jnm ) with ( l ) midpoint of ( jn ), ( m ) above ( l ))
statements | reasons
(blank table rows)
boxes: ( overline{jl} cong overline{nl} ), ( l ) is the midpoint of ( overline{jn} ), ( overline{jm} cong overline{nm} ), ( ext{def. of midpoint} ), ( riangle jlm cong riangle nlm ), ( ext{given} ), ( ext{given} ), ( ext{sss} ), ( overline{lm} cong overline{lm} ), ( ext{reflexive property} )

Question

sss proof #1
given: ( overline{pq} cong overline{st} ), ( overline{qr} cong overline{tr} ), ( r ) is the midpoint of ( overline{ps} )
prove: ( 	riangle pqr cong 	riangle str )
(diagram: triangles ( pqr ) and ( str ) with ( p, r, s ) colinear, ( q, t ) above ( pr, rs ) respectively)
statements | reasons
(blank table rows)
boxes: ( overline{pq} cong overline{st} ), ( 	ext{def. of midpoint} ), ( overline{qr} cong overline{tr} ), ( r ) is the midpoint of ( overline{ps} ), ( 	ext{given} ), ( overline{pr} cong overline{sr} ), ( 	ext{given} ), ( 	ext{sss} ), ( 	ext{given} ), ( 	riangle pqr cong 	riangle str )

sss proof #2
given: ( l ) is the midpoint of ( overline{jn} ), ( overline{jm} cong overline{nm} ),
prove: ( 	riangle jlm cong 	riangle nlm )
(diagram: triangle ( jnm ) with ( l ) midpoint of ( jn ), ( m ) above ( l ))
statements | reasons
(blank table rows)
boxes: ( overline{jl} cong overline{nl} ), ( l ) is the midpoint of ( overline{jn} ), ( overline{jm} cong overline{nm} ), ( 	ext{def. of midpoint} ), ( 	riangle jlm cong 	riangle nlm ), ( 	ext{given} ), ( 	ext{given} ), ( 	ext{sss} ), ( overline{lm} cong overline{lm} ), ( 	ext{reflexive property} )

Accepted Answer

### SSS Proof #1
# Explanation:
## Step1: List Given Information
- $ \overline{PQ} \cong \overline{ST} $ (Given)
- $ \overline{QR} \cong \overline{TR} $ (Given)
- $ R $ is the midpoint of $ \overline{PS} $ (Given)

## Step2: Use Midpoint Definition
Since $ R $ is the midpoint of $ \overline{PS} $, $ \overline{PR} \cong \overline{SR} $ (Def. of Midpoint)

## Step3: Apply SSS Congruence
In $ \triangle PQR $ and $ \triangle STR $:
- $ \overline{PQ} \cong \overline{ST} $ (From Step 1)
- $ \overline{QR} \cong \overline{TR} $ (From Step 1)
- $ \overline{PR} \cong \overline{SR} $ (From Step 2)

By SSS (Side - Side - Side) Congruence Criterion, $ \triangle PQR \cong \triangle STR $

### SSS Proof #2
# Explanation:
## Step1: List Given Information
- $ L $ is the midpoint of $ \overline{JN} $ (Given)
- $ \overline{JM} \cong \overline{NM} $ (Given)

## Step2: Use Midpoint Definition
Since $ L $ is the midpoint of $ \overline{JN} $, $ \overline{JL} \cong \overline{NL} $ (Def. of Midpoint)

## Step3: Use Reflexive Property
$ \overline{LM} \cong \overline{LM} $ (Reflexive Property of Congruence)

## Step4: Apply SSS Congruence
In $ \triangle JLM $ and $ \triangle NLM $:
- $ \overline{JL} \cong \overline{NL} $ (From Step 2)
- $ \overline{JM} \cong \overline{NM} $ (From Step 1)
- $ \overline{LM} \cong \overline{LM} $ (From Step 3)

By SSS (Side - Side - Side) Congruence Criterion, $ \triangle JLM \cong \triangle NLM $

### Filling the Tables

#### SSS Proof #1 Table
| Statements | Reasons |
| --- | --- |
| $ \overline{PQ} \cong \overline{ST} $ | Given |
| $ \overline{QR} \cong \overline{TR} $ | Given |
| $ R $ is the midpoint of $ \overline{PS} $ | Given |
| $ \overline{PR} \cong \overline{SR} $ | Def. of Midpoint |
| $ \triangle PQR \cong \triangle STR $ | SSS |

#### SSS Proof #2 Table
| Statements | Reasons |
| --- | --- |
| $ L $ is the midpoint of $ \overline{JN} $ | Given |
| $ \overline{JM} \cong \overline{NM} $ | Given |
| $ \overline{JL} \cong \overline{NL} $ | Def. of Midpoint |
| $ \overline{LM} \cong \overline{LM} $ | Reflexive Property |
| $ \triangle JLM \cong \triangle NLM $ | SSS |

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QUESTION IMAGE

Question

Explanation:

SSS Proof #1

Step1: List Given Information

Step2: Use Midpoint Definition

Step3: Apply SSS Congruence

SSS Proof #2

Step1: List Given Information

Step2: Use Midpoint Definition

Step3: Use Reflexive Property

Step4: Apply SSS Congruence

Filling the Tables

SSS Proof #1 Table

SSS Proof #2 Table

Answer:

Step1: List Given Information

Step2: Use Midpoint Definition

Step3: Use Reflexive Property

Step4: Apply SSS Congruence

Filling the Tables

SSS Proof #1 Table

SSS Proof #2 Table

Statements	Reasons
\( \overline{QR} \cong \overline{TR} \)	Given
\( R \) is the midpoint of \( \overline{PS} \)	Given
\( \overline{PR} \cong \overline{SR} \)	Def. of Midpoint
\( \triangle PQR \cong \triangle STR \)	SSS

Statements	Reasons
\( \overline{JM} \cong \overline{NM} \)	Given
\( \overline{JL} \cong \overline{NL} \)	Def. of Midpoint
\( \overline{LM} \cong \overline{LM} \)	Reflexive Property
\( \triangle JLM \cong \triangle NLM \)	SSS