Mathematics
Grade10
Easy
Question
Identify the below lines are _______.
![](data:image/png;base64,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)
- Parallel
- Perpendicular
- Intersecting
- Not parallel
The correct answer is: Parallel
To find the alignment type of given lines.
Given lines are parallel lines Because parallel lines are the lines that do not intersect or meet each other at any point in a plane.
Therefore, the given lines are parallel.