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Find the number of diffrent segments formed by 8 collinear points?
8 collinear points determine 28 unique line segments
A plane figure formed by coplanar segments such that each segment intersects exactly two other segments and no two segments with a common endpoint are collinear?
If each segment intersects exactly two other segment but could, if extended, intersect the third, then the figure is a quadrilateral. Otherwise it is a parallelogram.
A closed figure formed by line segments?
A polygon.
What is a plane figure formed by four segments called?
polygon
What is a figure formed by two rays or line segments that have a common vertex?
It is an angle.
What is a figure formed by three segments joing non-collinear points?
its a triangle
A triangle is a figure formed by three segments connecting three collinear points?
False.
What plane geometric figure is formed by three non-collinear line segments that meet at the endpoints?
A triangle
A triangle is a figure formed by three segments connecting three collinear points true or false?
False.
What is a plane figure formed by coplanar segments such that each segment intersects exactly two other segments and no two segments with a common endpoint are collinear?
Polygon
Find the number of diffrent segments formed by 8 collinear points?
8 collinear points determine 28 unique line segments
How many segments are formed by 10 collinear points?
10 collinear points form one set of overlapping line segments, of which there are 45.
Is a triangle a figure formed by 3 segments connected to conlinear points?
Conlinear is an interesting concatenation of the correct word and the wrong word. If "Collinear", the statement is wrong. If "Non-collinear", the statement is correct.
How many different segments are formed by three different collinear points?
3
A plane figure formed by coplanar segments such that each segment intersects exactly two other segments and no two segments with a common endpoint are collinear?
If each segment intersects exactly two other segment but could, if extended, intersect the third, then the figure is a quadrilateral. Otherwise it is a parallelogram.
How does a triangle form?
a triangle is formed by line segments that connect two non-collinear points
How many segments are formed by n x number of collinear points?
For ( n ) collinear points, the number of line segments that can be formed is given by the combination formula ( \binom{n}{2} ), which represents the number of ways to choose 2 points from ( n ) points. This simplifies to ( \frac{n(n-1)}{2} ). Therefore, the total number of segments formed by ( n ) collinear points is ( \frac{n(n-1)}{2} ).
