Find the intervals where the graph of f(x)=2x^4-3x^2 is
increasing, decreasing, concave up and concave down. Find any
inflection points, local maxima, or local minima. If none exist,
write NONE. You must do number line sign charts to receive any
credit.
For the function f(x)=x^5-5x^3 determine:
a. Intervals where f is increasing or decreasing
b. Local minima and maxima of f,
c. Intervals where f is concave up and concave
down, and,
d. The inflection points of f
e. Sketch the curve and label any points you use in your
sketch.
For Calculus Volume One GIlbert Strange
f(x)= x5 − 5x
Find the x− and y−intercept, critical numbers, increasing and
decreasing intervals, local minimum and maximum, f''(x), intervals
of concavity up and down, and inflection points.
f(x) =2x^5-5x^4-10x^3+1 is defined as all real numbers
a) find the intervals where F is increasing and
decreasing
b) find the intervals where F is concave up and concave
down
c) find the local maximum, minimum and the points of
inflection.
d) find the absolute maximum and minimum of F over
[-2,2]
y=x2/(7x+4) determine the intervals on which the
function is increasing, decreasing, concave up, concave down,
relative maxima and minima, inflection points symmetry vertical and
non vertical asymptotes and those intercepts that can be obtained
conveniently and sketch the graph
Determine where the given function is concave up and where it is
concave down.
f(x)= 2x^3-6x^2-90x
Find the maximum profit and the number of units that must be
produced and sold in order to yield the maximum profit. Assume
that revenue, R(x), and cost, C(x), of producing x units are in
dollars
R(x)=50x-0.1^2, C(x)=4x+10
Find the number of units that must be produced and sold in order
to yield the maximum profit, given the equations below for revenue
and cost....
Please provide the following info for the given function
Increasing:?
Decreasing:?
Local Min(s):?
Local Max(s):?
Concave up:?
Concave down:?
Point(s) of Inflection:?
f(x)= 2sin(x)+sin(2x), over [0,2pi ]