The number of line segments determined by three given non-collinear points is:
3. Infinitely many
With three non-collinear points, you can connect any two points to form a line segment. Since you can choose any combination of two points, there are infinite possibilities for line segments.
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Explanation:
The number of line segments determined by three non-collinear points is three.
Answer:
The number of line segments determined by three given non-collinear points is:
3. Infinitely many
With three non-collinear points, you can connect any two points to form a line segment. Since you can choose any combination of two points, there are infinite possibilities for line segments.
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