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Question
- complete the two - column proof. given: x || y prove: ∠3 ≅ ∠5 statements: (1) x || y (2) m∠3 + m∠8 = 180° (3) m∠5 + m∠8 = 180° (4) transitive property of equality (5) subtraction property of equality (6) definition of congruence reasons:
Step1: State the given
$x\parallel y$ (Given)
Step2: Use same - side interior angles theorem
Since $x\parallel y$, $\angle3$ and $\angle8$ are same - side interior angles, so $m\angle3 + m\angle8=180^{\circ}$ (Same - side interior angles are supplementary when lines are parallel)
Step3: State another angle - sum equation
$\angle5$ and $\angle8$ are also related in a way that $m\angle5 + m\angle8 = 180^{\circ}$ (Linear pair of angles are supplementary)
Step4: Apply transitive property of equality
Since $m\angle3 + m\angle8=180^{\circ}$ and $m\angle5 + m\angle8 = 180^{\circ}$, then $m\angle3=m\angle5$ (Transitive Property of Equality)
Step5: Use definition of congruence
If $m\angle3=m\angle5$, then $\angle3\cong\angle5$ (Definition of congruence: Two angles are congruent if their measures are equal)
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The two - column proof is completed as follows:
| Statements | Reasons |
|---|---|
| 2. $m\angle3 + m\angle8=180^{\circ}$ | Same - side interior angles are supplementary when lines are parallel |
| 3. $m\angle5 + m\angle8 = 180^{\circ}$ | Linear pair of angles are supplementary |
| 4. $m\angle3=m\angle5$ | Transitive Property of Equality |
| 5. $\angle3\cong\angle5$ | Definition of congruence |