The statement that is true about the geometric figure that can contain points R, S, and T is: One plane can be drawn so it contains all three points.
True statement on geometric figure
The statement that is true about the geometric figure that can contain points R, S, and T is: One plane can be drawn so it contains all three points.
Here's why the other options are incorrect:
No line can be drawn through any pair of the points: This statement is not necessarily true. If the three points are collinear (lie on a straight line), then a line can be drawn through any pair of them.
One line can be drawn through all three points: This statement is also not necessarily true. If the three points are not collinear but lie on a plane, then only one plane can contain all three points, not just one line.
Two planes can be drawn so that each one contains all three points: This statement is impossible. If three distinct points lie on a plane, there is only one plane that can contain all three points.
Therefore, the only remaining option, One plane can be drawn so it contains all three points, is the correct statement.
Regardless of the specific configuration of points R, S, and T, as long as they are not collinear, they can always be contained in a single plane.
Complete question
Consider points R, S, and T. Point S is in the middle. Point R is below and to the left of point S. Point T is below and to the right of point S. Which statement is true about the geometric figure that can contain these points?
No line can be drawn through any pair of the points.
One line can be drawn through all three points.
One plane can be drawn so it contains all three points.
Two planes can be drawn so that each one contains all three points.