3 parts use these answers/rules Find the relative extrema of the function Specifically: The relative maxima...

(a) Using the second derivative test, find the relative/local extrema (maxima and minima) of the function...

(a) Using the second derivative test, find the relative/local extrema (maxima and minima) of the function f(x) = −x 3 − 6x to the power of 2 − 9x − 2.

3 parts following these instructions Find the critical numbers for f and the open intervals on...

3 parts following these instructions Find the critical numbers for f and the open intervals on which f is increasing (decreasing) For the first question, your answer should be a comma-separated list of x values or the word "none". For the other two, your answer should either be a single interval, such as (0,1), a comma-separated list of intervals, such as (-inf, 2), (3,4), or the word "none". answeres needed for each 1.   The critical numbers for f are 2.  ...

Use the first derivative test to find the relative maxima and minima of the function f...

Use the first derivative test to find the relative maxima and minima of the function f (x) = 3x^4 + 8x^3 – 90x^2 + 1,200 on the domain (–∞, 7]. Determine the intervals of increase and decrease on this domain. Complete the answer box, if there are no answers, write “NONE.” SHOW WORK. Crit Points: Intervals of increase: Intervals of decrease: Coords of relative max Coords of relative min

Find all relative extrema and classify each as a maximum or minimum. Use the​ second-derivative test...

Find all relative extrema and classify each as a maximum or minimum. Use the​ second-derivative test where possible. ​f(x)equals=125 x cubed minus 15 x plus 2125x3−15x+2 Identify all the relative minima. Select the correct choice below​ and, if​ necessary, fill in the answer box to complete your choice. A.The relative minima are nothing. ​(Simplify your answer. Type an ordered pair. Use integers or fractions for any numbers in the expression. Use a comma to separate answers as​ needed.) B. There...

Let f(x)=6x^2−2x^4. Find the open intervals on which f is increasing (decreasing). Then determine the x-coordinates...

Let f(x)=6x^2−2x^4. Find the open intervals on which f is increasing (decreasing). Then determine the x-coordinates of all relative maxima (minima). 1.   f is increasing on the intervals 2.   f is decreasing on the intervals 3.   The relative maxima of f occur at x = 4.   The relative minima of f occur at x =

Find Relative maxima and minima. y= x^3+3x^2-9x-5

Find Relative maxima and minima. y= x^3+3x^2-9x-5

Find all relative extrema of the function. (Be sure to give the exact coordinates of each...

Find all relative extrema of the function. (Be sure to give the exact coordinates of each and classify as relative minimum or maximum.) f(x) = 2x^3 + 4x^2 + 3

Find the absolute maximum and minimum values of f(x)= −x^3−3x^2+4x+3, if any, over the interval (−∞,+∞)(−∞,+∞)....

Find the absolute maximum and minimum values of f(x)= −x^3−3x^2+4x+3, if any, over the interval (−∞,+∞)(−∞,+∞). I know it doesn't have absolute maxima and minima but where do they occur? In other words x= ? for the maxima and minima?

question #1: Consider the following function. f(x) = 16 − x2,     x ≤ 0 −7x,     x...

question #1: Consider the following function. f(x) = 16 − x2,     x ≤ 0 −7x,     x > 0 (a) Find the critical numbers of f. (Enter your answers as a comma-separated list.) x = (b) Find the open intervals on which the function is increasing or decreasing. (Enter your answers using interval notation. If an answer does not exist, enter DNE.) increasing     decreasing   question#2: Consider the following function. f(x) = 2x + 1,     x ≤ −1 x2 − 2,     x...

Use Lagrange multipliers to find all relative extrema of the function subject to the given constraint....

Use Lagrange multipliers to find all relative extrema of the function subject to the given constraint. f(x,y)=x^2+2y^3 constraint: 2x+y^2-8=0