2
answers
0
watching
180
views
23 Mar 2020
The graph of the derivative f ‘of a continuous function f is shown.
(a) On what intervals is f increasing? Decreasing?
(b) At what values of x does f have a local maximum? Local minimum?
(c) On what intervals is f concave upward? Concave downward?
(d) State the x-coordinate(s) of the point(s) of inflection
(e) Assuming that f (0) = 0, sketch a graph of f.
![](data:image/png;base64,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)
The graph of the derivative f ‘of a continuous function f is shown.
(a) On what intervals is f increasing? Decreasing?
(b) At what values of x does f have a local maximum? Local minimum?
(c) On what intervals is f concave upward? Concave downward?
(d) State the x-coordinate(s) of the point(s) of inflection
(e) Assuming that f (0) = 0, sketch a graph of f.
1 Feb 2023
Nestor RutherfordLv2
24 May 2020
Already have an account? Log in