Final answer:
The angle of rotation between point A(-3, -3) and its counterclockwise rotated position is 0 degrees.
Step-by-step explanation:
The angle of rotation can be found by finding the angle between the original point A(-3, -3) and the rotated point A^1(3, -3).
To find the angle between two points, we can use the inverse tangent function.
Let's call the angle of rotation x.
Using the inverse tangent function, we have: tan(x) = (A^1_y - A_y) / (A^1_x - A_x).
Plugging in the values, we have: tan(x) = (-3 - (-3)) / (3 - (-3)).
Simplifying, we get: tan(x) = 0 / 6 = 0.
Since tangent is 0 at 0 degrees and all multiples of 180 degrees, the angle of rotation is 0 degrees.