QUESTION IMAGE
Question
click on the graphic until the one that best represents the statement is shown. three noncollinear points.
To solve the problem of identifying three noncollinear points, we first recall the definition of noncollinear points: points that do not lie on the same straight line.
Step 1: Understand the concept of collinearity
Collinear points lie on a single straight line. Noncollinear points do not all lie on the same line (i.e., at least one point is not on the line containing the other two).
Step 2: Analyze the graphical representation (implied by the "click on the graphic" instruction)
We need to identify a set of three points where not all three lie on the same straight line. For example, if there is a line with two points and a third point off that line, those three are noncollinear.
Step 3: Select the correct graphic
Click on the graphic until you find one with three points where at least one point is not on the line formed by the other two. This satisfies the definition of noncollinear points (three points not all on the same line).
(Note: Since the actual graphic is not visible here, the key is to apply the definition of noncollinearity: three points with at least one not on the line of the other two.)
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To solve the problem of identifying three noncollinear points, we first recall the definition of noncollinear points: points that do not lie on the same straight line.
Step 1: Understand the concept of collinearity
Collinear points lie on a single straight line. Noncollinear points do not all lie on the same line (i.e., at least one point is not on the line containing the other two).
Step 2: Analyze the graphical representation (implied by the "click on the graphic" instruction)
We need to identify a set of three points where not all three lie on the same straight line. For example, if there is a line with two points and a third point off that line, those three are noncollinear.
Step 3: Select the correct graphic
Click on the graphic until you find one with three points where at least one point is not on the line formed by the other two. This satisfies the definition of noncollinear points (three points not all on the same line).
(Note: Since the actual graphic is not visible here, the key is to apply the definition of noncollinearity: three points with at least one not on the line of the other two.)