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HEEEELP!!!!! 15 POINTS!

Conjecture: Points A, B, and C are noncollinear.



Is this conjecture true?


No, points A and B lie on the same line, C and B lie on the same line, and A and C lie on the same line so all three points are collinear.

Yes.

No, points A and B lie on the same line so they are collinear.

No, points C and B lie on the same line so they are collinear.

No, points A and C lie on the same line so they are collinear.

HEEEELP 15 POINTS Conjecture Points A B and C are noncollinear Is this conjecture true No points A and B lie on the same line C and B lie on the same line and A class=

Respuesta :

no points A and C lie on the same line so they are collinear........but not sure

The 3 vertices of the triangle were represented by the points A, B, and C in the picture that is collinear, forming a line and preventing the formation of the closed graph and over two points are collinear when you lie on the same straight line and non-collinear if they do not.

  • We know that two components always are collinear if they lie on a straight line.
  • We are requested to take 3 points A, B, and C on a piece of paper to create as many lines as feasible through possible combinations of the points.
  • All points A, B, and C are non-collinear, which implies all would not lie in a single straight line.

Therefore, the answer is "yes".

Learn more:

brainly.com/question/17507433

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