Question

are points m, n and o collinear? if so, name the line on which they lie. ○ no, the three points are not collinear. ○ yes, they lie on the $overleftrightarrow{mp}$ ○ yes, they lie on the $overleftrightarrow{np}$ ○ yes, they lie on the $overleftrightarrow{mo}$

Explanation:

To determine if points \( M \), \( N \), and \( O \) are collinear, we check if they lie on the same straight line. From the diagram, points \( M \), \( N \), and \( O \) are on the same line, which can be named \( \overleftrightarrow{MO} \) (since it passes through \( M \), \( N \), and \( O \)). The other options: \( \overleftrightarrow{MP} \) does not include \( O \), \( \overleftrightarrow{NP} \) does not include \( M \) or \( O \) in a way that all three are on it, and the first option is incorrect as they are collinear.

Answer:

Yes, they lie on the \( \overleftrightarrow{MO} \)