(a) Suppose f :R → R is a differentiable function of a single variable. Show that if f h...

(a) Suppose f :R → R is a differentiable function of a single variable. Show that if f has a unique critical point at x₀ that is the site of a strict local extremum of f , then f must attain a global extremum at x₀.

(b) Let f (x, y) = 3ye^x − e^3x − y³. Verify that f has a unique critical point and that f attains a local maximum there. However, show that f does not have a global maximum by considering how f behaves along the y-axis. Hence, the result of part (a) does not carry over to functions of more than one variable.