Answer:
[tex]\text{C. The relative maximum is at $\boxed{x = -1.83}$}\\\text{and the relative minimum is at }\boxed{x = 0}[/tex]
Step-by-step explanation:
We could solve this problem by using calculus, but the correct answer is one of four options, so let's solve it graphically.
Create a table containing a few values of x and y.
[tex]\begin{array}{rr}\mathbf{x} & \mathbf{y} \\-3 & -4 \\-2 & 13 \\-1 & 12 \\0 & 5 \\1&20\\\end{array}[/tex]
Plot the points and draw a smooth curve between them.
Your graph should resemble the one below.
We see that there is a local maximum between x = -1 and x = -2, probably at x ≈ -1.8.
There is a local minimum at x = 0.
[tex]\text{The relative maximum is at $\boxed{\textbf{x = -1.83}}$}\\ \text{and the relative minimum is at }\boxed{\textbf{x = 0}}[/tex]
