how many line segments can be determined by given three noncollinear points
Answers
- ANS:-
Step-by-step explanation:
line segments can be the line segment can be determined by the given. Are the line segment and the line collinear point
Given:
Three points on a plane which are non-collinear to each other
To find/determine:
Line segments that can be drawn from above given noncollinear points=?
Solution:
When sketched on paper, noncollinear points are drawn in such a way that each of the three points has a separate plane or axis.
They are not continuous and cannot be combined into a single line or line segment due to their opposing directions.
=> Let noncollinear points be A, B, and C respectively.
=> From two points at any given distance one line segment can be formed. Using this principle:
=> From point A to point B= Line segment PQ (1st)
=> From point A to point C= Line segment PR (2nd)
=> From point B to point C= Line segment QR (3rd)
=> Three noncollinear points form a triangle.
Hence the number of line segments that can be drawn from three noncollinear points is three-line segmnets in the way described above.