Suppose that the function \( f \) is defined, for all real numbers, as follows. \[ \begin{array}{ll}\frac{1}{2} x-2 & \text { if } x<-1 \\ (x+1)^{2}-2 & \text { if }-1 \leq x \leq 2 \\ -1 & \text { if } x>2\end{array} \] Find \( f(-1), f(0) \), and \( f(4) \) \( f(-1)=\square \) \( f(0)=\square \)

To evaluate the function \( f \) at the given points, we can substitute the values into the appropriate piece of the piecewise function. 1. For \( f(-1) \): Since \(-1\) is in the interval \([-1, 2]\), we use the second part of the function: \[ f(-1) = (-1 + 1)^2 - 2 = 0 - 2 = -2 \] 2. For \( f(0) \): Since \(0\) is also in the interval \([-1, 2]\), we again use the second part of the function: \[ f(0) = (0 + 1)^2 - 2 = 1 - 2 = -1 \] 3. For \( f(4) \): Since \(4\) is greater than \(2\), we use the third part of the function: \[ f(4) = -1 \] Putting it all together: \( f(-1) = -2 \) \( f(0) = -1 \) \( f(4) = -1 \) So the final output is: \( f(-1) = -2 \) \( f(0) = -1 \) \( f(4) = -1 \)