Answer:
B.
Step-by-step explanation:
First, we need to compare vertices from the original figure and the transformed one.
[tex]P(-3,-2) \implies P'(2,3)\\Q(-2,-3) \implies Q'(3, 2)\\R(-3,-4) \implies R'(4,3)\\S(-4,-4) \implies S'(4,4)[/tex]
You can observe that coordinates where changed of position. Also, the vertical coordinate of the transformed figure has opposite sign.
In other words, the transformation follows the rule
[tex](x,y) \implies (-y,x)[/tex]
[tex]P'(2,-3)\\Q'(3,-2)\\R'(4,-3)\\S'(4,-4)[/tex]
However, notice that the coordinates are not the same as the given transformation. That is because the second transformation applied was a reflection accros the x-axis which follows the rule
[tex](x,y) \implies (x,-y)[/tex]
Applying the rule, we have
[tex]P'(2,3)\\Q'(3,2)\\R'(4,3)\\S'(4,4)[/tex]
Which are congruent with the given transformed coordinates.
Therefore, the transformations are a 90° rotation counterclockwise and a reflection accros the x-axis. The right answer is B.
