Answered

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If A, B, C, and D are collinear, then
they lie in the same plane. A, B, C,
and D lie in the same plane.

If BD bisects ABC, then D lies in
the interior of ABC. D lies in the
interior of ABC.

Sagot :

The hypothesis of both statements are false.

How to Interpret Collinear Points?

1) Collinear points are the points that lie on the same straight line or in a single line. If two or more than two points lie on a line close to or far from each other, then they are said to be collinear,

Thus, if A, B, C, and D are collinear, then they cannot lie in the same plane.

Thus, the hypothesis is not true.

2) When we bisect an angle, it is possible that one of the endpoints of the line may be outside the interior of the bisected angle. Thus, the hypothesis is Not true.

Read more about Collinear Points at; https://brainly.com/question/1593959

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