QUESTION IMAGE
Question
- use the given information to prove that ∠2≅∠7. given: x∥y prove: ∠2≅∠7 4. use the given information to prove that ∠3≅∠6. given: a∥b prove: ∠3≅∠6
Step1: Recall corresponding - angles property
If two parallel lines are cut by a transversal, corresponding angles are congruent.
Step2: Identify corresponding - angles for $\angle2$ and $\angle7$
For parallel lines $x\parallel y$ cut by a transversal, $\angle2$ and $\angle7$ are corresponding angles.
Step3: Prove $\angle2\cong\angle7$
Since $x\parallel y$ (given) and $\angle2$ and $\angle7$ are corresponding angles, by the corresponding - angles postulate, $\angle2\cong\angle7$.
Step4: Recall alternate - interior angles property
If two parallel lines are cut by a transversal, alternate - interior angles are congruent.
Step5: Identify alternate - interior angles for $\angle3$ and $\angle6$
For parallel lines $a\parallel b$ cut by a transversal, $\angle3$ and $\angle6$ are alternate - interior angles.
Step6: Prove $\angle3\cong\angle6$
Since $a\parallel b$ (given) and $\angle3$ and $\angle6$ are alternate - interior angles, by the alternate - interior angles theorem, $\angle3\cong\angle6$.
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For the first proof:
| Statement | Reason |
|---|---|
| $\angle2\cong\angle7$ | Corresponding angles postulate (since $x\parallel y$ and $\angle2$ and $\angle7$ are corresponding angles) |
For the second proof:
| Statement | Reason |
|---|---|
| $\angle3\cong\angle6$ | Alternate - interior angles theorem (since $a\parallel b$ and $\angle3$ and $\angle6$ are alternate - interior angles) |