Final answer:
The parent function of the given equation is y(x) = -x. The transformed function is y(x) = -(x+3)-2, which is decreasing and odd. The domain is all real numbers.
Step-by-step explanation:
The parent function of the given equation is y(x) = -x. To find the transformation, you subtract 3 and then subtract 2 from the parent function. Therefore, the transformed function is y(x) = -(x+3)-2.
The domain of the transformed function is all real numbers, since there are no restrictions on x. The range of the transformed function will depend on the minimum and maximum values of the transformed function.
The transformed function is decreasing since the coefficient of x is negative. It is also odd since it satisfies the property y(x) = -y(-x), which means it is symmetric about the origin.