Graph the function f(x)=e^−x / x(x+2)^2 using a graphing utility. (Experiment with your choice of a graphing window.) Use your graph to determine the following limits.


a. lim x→−2^+ f(x)

Limits are fundamental in calculus, representing the value that a function approaches as the input approaches a certain point. In this context, evaluating the limit as x approaches -2 from the right (denoted as -2^+) involves analyzing the behavior of the function f(x) near that point, which can reveal important characteristics such as continuity and potential asymptotes.

Graphing functions involves plotting the values of a function on a coordinate system to visualize its behavior. For the function f(x) = e^(-x) / (x(x+2)^2), using a graphing utility allows for experimentation with different viewing windows, which can help identify key features such as intercepts, asymptotes, and the overall shape of the graph, aiding in the limit evaluation.

Asymptotic behavior refers to how a function behaves as it approaches a certain point or infinity. In the case of f(x) as x approaches -2, understanding whether the function approaches a finite value, diverges to infinity, or oscillates is crucial for determining the limit. This behavior can often be inferred from the graph and the function's algebraic form.