The answer is A. Any
Any two points are collinear.Further explanationAll points in a straight line are called collinear. The two points are always collinear because we can continue to connect them in a straight line.Therefore, at least two points can form a line and are considered collinear.All points can, also, be said to be coplanar. This is because in addition to these points forming a line they must also lie on a planar surface.Noncollinear points are the points that do not lie in a similar straight line.
Let us practice other alternative questions.
(Fill in the blank) three points are collinear.
Sometimes three points are collinear.
Three points may be collinear or not. We can consider a triangle consisting of three points that are not collinear. All triangle vertices are called coplanar.Learn moreWhich points are coplanar and noncollinear? What are the names of three collinear points? Comparing collinear points and coplanar points. Which defines a Line segment?
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At least three points P_1, P_2, P_3, ..., are said to be collinear in the event that they lie on a solitary straight line L. A line on which focuses lie, particularly in the event that it is identified with a geometric figure, for example, a triangle, is in some cases called a hub.
Two are inconsequentially collinear since two decide a line.
Three x_i=(x_i,y_i,z_i) for i=1, 2, 3 are collinear iff the proportions of separations fulfill
A somewhat progressively tractable condition is gotten by taking note of that the territory of a triangle controlled by three will be zero iff they are collinear (counting the ruffian instances of two or each of the three being simultaneous),
or on the other hand, in extended structure,
This can likewise be written in vector structure as
where Tr(A) is the aggregate of parts, x=(x_1,x_2,x_3), and y=(y_1,y_2,y_3).
The condition for three x_1, x_2, and x_3 to be collinear can likewise be communicated as the explanation that the separation between any one point and the line dictated by the other two is zero. In three measurements, this implies setting d=0 in the point-line separation
Level: High School.
For further Evaluation
for 2 answer is Any.
the final price would be 29.6925
39.59 minus 25% equals 29.6925