QUESTION IMAGE
Question
rewrite the two - column proof without using the congruent supplements theorem.
statements
- blank
- ( angle5 ) and ( angle6 ) are a linear pair. ( angle6 ) and ( angle7 ) are a linear pair.
- ( angle5 ) and ( angle6 ) are supplementary. ( angle6 ) and ( angle7 ) are supplementary.
- blank and blank
- ( mangle5 + mangle6 = mangle6 + mangle7 )
- blank
reasons
- given
- blank
- blank
- definition of supplementary angles
- blank
- subtraction property of equality
Step1: Identify Given (Missing in Statement 1)
Assume the given is about angles related to ∠5, ∠6, ∠7 (e.g., ∠5 and ∠7 related, but likely the initial given is context for linear pairs. Let's fill based on typical proof:
- Statement 1: Let's say "∠5 and ∠7 are such that ∠5, ∠6 linear pair; ∠6, ∠7 linear pair" (but actually, the first given is usually the setup, like "∠5 and ∠6 form a linear pair, ∠6 and ∠7 form a linear pair" but no—wait, the problem is to rewrite the proof. Let's structure each step:
Step2: Reason for Linear Pair (Statement 2)
- Reason: Definition of linear pair (adjacent angles forming a straight line).
Step3: Reason for Supplementary (Statement 3)
- Reason: Linear Pair Postulate (linear pairs are supplementary).
Step4: Statement from Supplementary Def (Statement 4)
- Statement: \( m\angle5 + m\angle6 = 180^\circ \) and \( m\angle6 + m\angle7 = 180^\circ \) (by definition of supplementary: sum to \( 180^\circ \)).
Step5: Reason for Equation (Statement 5)
- Reason: Substitution Property (since both \( m\angle5 + m\angle6 \) and \( m\angle6 + m\angle7 \) equal \( 180^\circ \), they equal each other).
Step6: Statement from Subtraction (Statement 6)
- Statement: \( m\angle5 = m\angle7 \) (subtract \( m\angle6 \) from both sides: \( m\angle5 + m\angle6 - m\angle6 = m\angle6 + m\angle7 - m\angle6 \)).
Filled Proof Table:
| STATEMENTS | REASONS |
|---|---|
| 2. ∠5 and ∠6 are a linear pair. ∠6 and ∠7 are a linear pair. | 2. Definition of Linear Pair |
| 3. ∠5 and ∠6 are supplementary. ∠6 and ∠7 are supplementary. | 3. Linear Pair Postulate |
| 4. \( m\angle5 + m\angle6 = 180^\circ \) and \( m\angle6 + m\angle7 = 180^\circ \) | 4. Definition of Supplementary Angles |
| 5. \( m\angle5 + m\angle6 = m\angle6 + m\angle7 \) | 5. Substitution Property (both equal \( 180^\circ \)) |
| 6. \( m\angle5 = m\angle7 \) | 6. Subtraction Property of Equality |
(Note: The exact "given" in Statement 1 depends on the original problem’s context, but this follows the logical flow of proving \( \angle5 \cong \angle7 \) via linear pairs and equality properties, avoiding Congruent Supplements Theorem.)
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Step1: Identify Given (Missing in Statement 1)
Assume the given is about angles related to ∠5, ∠6, ∠7 (e.g., ∠5 and ∠7 related, but likely the initial given is context for linear pairs. Let's fill based on typical proof:
- Statement 1: Let's say "∠5 and ∠7 are such that ∠5, ∠6 linear pair; ∠6, ∠7 linear pair" (but actually, the first given is usually the setup, like "∠5 and ∠6 form a linear pair, ∠6 and ∠7 form a linear pair" but no—wait, the problem is to rewrite the proof. Let's structure each step:
Step2: Reason for Linear Pair (Statement 2)
- Reason: Definition of linear pair (adjacent angles forming a straight line).
Step3: Reason for Supplementary (Statement 3)
- Reason: Linear Pair Postulate (linear pairs are supplementary).
Step4: Statement from Supplementary Def (Statement 4)
- Statement: \( m\angle5 + m\angle6 = 180^\circ \) and \( m\angle6 + m\angle7 = 180^\circ \) (by definition of supplementary: sum to \( 180^\circ \)).
Step5: Reason for Equation (Statement 5)
- Reason: Substitution Property (since both \( m\angle5 + m\angle6 \) and \( m\angle6 + m\angle7 \) equal \( 180^\circ \), they equal each other).
Step6: Statement from Subtraction (Statement 6)
- Statement: \( m\angle5 = m\angle7 \) (subtract \( m\angle6 \) from both sides: \( m\angle5 + m\angle6 - m\angle6 = m\angle6 + m\angle7 - m\angle6 \)).
Filled Proof Table:
| STATEMENTS | REASONS |
|---|---|
| 2. ∠5 and ∠6 are a linear pair. ∠6 and ∠7 are a linear pair. | 2. Definition of Linear Pair |
| 3. ∠5 and ∠6 are supplementary. ∠6 and ∠7 are supplementary. | 3. Linear Pair Postulate |
| 4. \( m\angle5 + m\angle6 = 180^\circ \) and \( m\angle6 + m\angle7 = 180^\circ \) | 4. Definition of Supplementary Angles |
| 5. \( m\angle5 + m\angle6 = m\angle6 + m\angle7 \) | 5. Substitution Property (both equal \( 180^\circ \)) |
| 6. \( m\angle5 = m\angle7 \) | 6. Subtraction Property of Equality |
(Note: The exact "given" in Statement 1 depends on the original problem’s context, but this follows the logical flow of proving \( \angle5 \cong \angle7 \) via linear pairs and equality properties, avoiding Congruent Supplements Theorem.)