To know whether a function is a polynomial function, check whether all variables are raised to non-negative integer powers.

The variables in the function are raised to the following powers: 2, \dfrac{1}{2} and 0. Since \dfrac{1}{2} is not a positive integer, f\left(x\right)= x^{2} + 2x^{\frac{1}{2}} + 3 is not a polynomial function.

Determine the symmetry of the graph. If the graph is symmetrical about the y-axis, it is that of an even function. On the other hand, if it is symmetrical about the origin, it is that of an odd function.

Since the curve is symmetrical about the y-axis, the graph is that of an even function.

Check whether f(-x) is equal to f(x) or -f(x). If f(-x)=f(x), the function is even. On the other hand, if f(-x)=-f(x), the function is odd.

From the table of values, we can see that f(-2)=-f(2), f(-1)=-f(1) and f(-0)=-f(0). Since f(-x)=-f(x), the table of values is that of an odd function.

Determine the values of g(x) for the values of x shown in the table and think how the original function f(x) can be transformed to get these values.

Determining the values of g(x) for the given values of x, we have the following table of values:

From the table of values above, we can see that the values of g(x) are twice that of f(x). Thus, we can express g(x) in terms of f(x) as g \left( x \right) = 2 f \left( x \right).

Check the form of the new function to determine its horizontal and vertical translation.

Horizontal Translation: If the function is in the form y=f(x+a), the graph of y=f(x) is moved to the left by a units when a is positive, and to the right by a units when a is negative.

Vertical Translation: If the function is in the form y=f(x+b), the graph of y=f(x) is moved upward by b units when b is positive, and downward by b units when b is negative.

Since a=2 and b=-1 in y = \left(x + 2\right)^{3} - 1, we can obtain the graph of y = \left(x + 2\right)^{3} - 1 by moving the graph of y = x^{3} to the left by 2 units and down by 1 unit.