Answer:
A'B'C'D' is obtained by rotating ABCD counterclockwise by 90 degrees about the origin and then reflecting it about the x-axis.
Step-by-step explanation:
ABCD: A(-4,-3), B(-3,-1), C(-2,-3), and D(-3,-4).
If we rotate ABCD counterclockwise by 90 degrees, we obtain the translation
[tex]R$otation of 90\º: (x,y)\rightarrow (-y,x)[/tex]
This gives:
A''(3,-4), B''(1,-3), C''(3,-2), and D''(4,-3).
Next, we reflect A''B''C''D'' across the x-axis. (Note that the x-coordinate remains the same, but the y-coordinate is transformed into its opposite.)
[tex]R$eflection accross the x-axis: (x,y)\rightarrow (x,-y)[/tex]
This then gives us the coordinates
A'B'C'D': A'(3, 4), B'(1, 3), C'(3, 2), and D'(4, 3)
