Mathematics
Grade10
Easy
Question
Choose the most precise answer: These streets are
![](data:image/png;base64,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)
- Parallel
- Perpendicular
- Intersecting
- Both
The correct answer is: Perpendicular
To find the alignment of streets.
Given lines are perpendicular. Because Perpendicular lines are lines that intersect at a right (90 degrees) angle.
Therefore, the given streets are perpendicular.