Question

select whether the conjecture is true or false. if you have three points a, b, and c then a, b, and c are non - collinear. select choice

Explanation:

Step1: Define collinear points

Collinear points are points that lie on the same straight - line. Three points A, B, and C can either be collinear or non - collinear.

Step2: Analyze the conjecture

The conjecture says that if you have three points A, B, and C, then they are non - collinear. But it is possible for three points to be collinear. For example, if you mark three points on a straight line, they are collinear. So the statement is not always true.

Answer:

False