Please see attached file for full problem description.
(a) Over what intervals is f(x) increasing? decreasing?
(b) At what x values does f(x) have a local maximum?
(c) At what x values does f(x) have a local minimum?
(d) Sketch a possible graph of f(x).
Find the volume of the solid obtained by rotating the region bounded by xy = 4 and about the x-axis.
Let f be a function that is defined and twice differentiable for all values of x and has the following properties:
? f(1) = 3 ? ?
Let Find the following
Local Extrema and Volume of a Solid of Revolution are investigated.