Mathematics
Grade-8
Easy
Question
Given the following two parallel lines cut by a transversal.
Identify the pair of angles represents alternate interior angles.
![](data:image/png;base64,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)
- ∠3 and ∠8
- ∠7 and ∠2
- ∠7 and ∠8
- ∠4 and ∠8
Hint: