Final answer:
g(x) is a translation of f(x) and can be correctly expressed as g(x) = −(x + 2)^5 + 2(x + 2)^4 + 1, revealing a shift two units to the left of f(x).
Step-by-step explanation:
To determine how g(x) can be expressed in terms of f(x), we need to identify the type of transformation that has occurred from f(x) = −x5 + 2x4 + 1 to g(x). Given the description of g(x), it is clear that this translation involves a shift of the original function f(x).
First, we will examine the given points through which y = f(x) passes, namely (−1, 3), (0, 1), and (1.5, 3.8). Then we compare with the corresponding points given for g(x): (−3, 3), (−2, 1), and (−0.5, 3.8). By examining these points, we can see that g(x) is shifted two units to the left of f(x) since each x-value for g(x) is less by 2 compared to the corresponding x-value for f(x).
Therefore, the translation transformation is f(x + 2), which shifts the graph of f(x) two units to the left.
Thus, g(x) can be correctly expressed as g(x) = −(x + 2)5 + 2(x + 2)4 + 1, which is a translation of two units to the left.