Question

refer to the figure at the right. indicate whether each statement is true or false. a. points a, b, and c are collinear. false not on the same line b. the intersection of plane abc and line m is point p. c. line ℓ and line m do not intersect. d. points a, p, and b can be used to name plane u. e. line ℓ lies in plane acb. refer to the figure. 1. name a line that contains points t and p.

Explanation:

Part a:

Step1: Recall collinear points

Collinear points lie on the same line. From the figure (assuming standard plane - line - point setup), if A, B, C are in plane ABC, but if they don't lie on a single line, they are non - collinear. So the statement "Points A, B, and C are collinear" is False.

Step2: Conclusion

Based on the definition of collinear points and the figure (implied non - collinear nature of A, B, C), the statement is false.

Step1: Intersection of plane and line

The intersection of a plane and a line is either a point (if the line is not entirely in the plane) or the line itself (if the line is in the plane). From the figure, plane ABC and line \(m\) intersect at point P (as per the diagram's context). So the statement "The intersection of plane ABC and line \(m\) is point P" is True.

Step2: Conclusion

Using the concept of plane - line intersection, the statement is true.

Step1: Intersection of two lines

Two lines in a plane (or in space) either intersect (at a point) or are parallel (in a plane) or skew (in space). From the figure, line \(\ell\) and line \(m\) intersect at a point (implied by the diagram's structure). So the statement "Line \(\ell\) and line \(m\) do not intersect" is False.

Step2: Conclusion

Based on the visual (or implied) intersection of line \(\ell\) and line \(m\), the statement is false.

Answer:

False

Part b: