pq = rs
pq + qr = rs + qr
segment addition postulate (post. 1.2)
rs + qr = qs
segment addition postulate (post. 1.2)
pr = qs
:: pq + qr = pr :: addition property of equality :: given
:: reflexive property of equality :: substitution property of equality
:: transitive property of equality

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Accepted Answer

# Explanation:
## Step1: Given equality
$PQ = RS$ is given.
## Step2: Apply addition property of equality
Adding $QR$ to both sides of $PQ = RS$ gives $PQ+QR = RS + QR$ by the Addition Property of Equality.
## Step3: Use segment addition postulate
By the Segment Addition Postulate, $PQ + QR=PR$ and $RS + QR = QS$.
## Step4: Use substitution property of equality
Since $PQ+QR = RS + QR$, $PQ + QR=PR$ and $RS + QR = QS$, we can substitute to get $PR = QS$ by the Substitution Property of Equality.

# Answer:
1. Given: $PQ = RS$
2. Addition Property of Equality: $PQ+QR = RS + QR$
3. Segment Addition Postulate: $PQ + QR=PR$
4. Segment Addition Postulate: $RS + QR = QS$
5. Substitution Property of Equality: $PR = QS$

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Question

Explanation:

Step1: Given equality

Step2: Apply addition property of equality

Step3: Use segment addition postulate

Step4: Use substitution property of equality

Answer: