Question

which of the following statements must be true based on the diagram below? select all that apply. (diagram is not to scale.) answer attempt 1 out of 2 $overline{qs}$ is a perpendicular bisector. $overline{qs}$ is an angle bisector. $q$ is the vertex of a right angle. $s$ is the vertex of a right angle. $q$ is the midpoint of a segment in the diagram. none of the above.

Explanation:

Step1: Analyze perpendicular bisector

There is no indication that $\overline{QS}$ intersects any segment at a right - angle and divides it into two equal parts, so $\overline{QS}$ is not a perpendicular bisector.

Step2: Analyze angle bisector

There is no information suggesting that $\overline{QS}$ divides an angle into two equal angles, so $\overline{QS}$ is not an angle bisector.

Step3: Analyze right - angle vertices

There are no right - angle markings at either $Q$ or $S$, so $Q$ is not the vertex of a right - angle and $S$ is not the vertex of a right - angle.

Step4: Analyze mid - point

There is no evidence that $Q$ is the mid - point of any segment in the diagram.

Answer:

None of the above.