If f"(c)=0 or indefinite then we can say that (c,f(c)) it is: a. A possible maximum...

If at x = n the derivative is 0 b) f (x) = 0 c) we...

If at x = n the derivative is 0 b) f (x) = 0 c) we have a minimum but not a maximum d) we have a maximum but not a minimum e) we can have a minimum or a maximum

Suppose that f(4) is continuous and f′(c) = f′′(c) = f′′′(c) = 0, but f(4) is...

Suppose that f(4) is continuous and f′(c) = f′′(c) = f′′′(c) = 0, but f(4) is not =0. Does f(x) have a local maximum, minimum or a point of inflection at c? Justify your answer.

Consider the function y=[(x-7)x]^2 1. At what value(s) of x is it possible that we have...

Consider the function y=[(x-7)x]^2 1. At what value(s) of x is it possible that we have a local maximum or minimum, or an inflection point? 2. Use the general test to determine whether we have a maximum, minimum, or inflection point, for each of the critical values you found in part (1).

(i) Given the function f(x) = x3 − 3x + 2 (a) What are the critical...

(i) Given the function f(x) = x3 − 3x + 2 (a) What are the critical values of f? (b) Find relative maximum/minimum values (if any). (c) Find possible inflection points of f. (d) On which intervals is f concave up or down? (e) Sketch the graph of f. (ii) Find a horizontal and a vertical asymptote of f(x) = 6x . 8x+3

Which of the following is true about the graph of f(x)=8x^2+(2/x)−4? a) f(x) is increasing on...

Which of the following is true about the graph of f(x)=8x^2+(2/x)−4? a) f(x) is increasing on the interval (−∞,0). b) f(x) has a vertical asymptote at x=2. c) f(x) is concave down on the interval (0,∞). d) f(x) has a point of inflection at the point (0,−4). e) f(x) has a local minimum at the point (0.50,2). Suppose f(x)=12xe^(−2x^2) Find any inflection points.

1. (Continued) Consider the function (e) (f) f (x) = x3 − 7 x + 5....

1. (Continued) Consider the function (e) (f) f (x) = x3 − 7 x + 5. 2 (0.5 pt) Find the possible inflection points of f(x). Show work. (0.5 pt) Test the possible inflection points of f(x) to determine if each point is or is not an inflection point. Your work must show that you tested each point properly and support your conclusion. Be sure to state your conclusion. Show work. (g) (1 pt) Find the global minimum and global...

In each part below, sketch a graph of a function whose domain is [0, 4] that...

In each part below, sketch a graph of a function whose domain is [0, 4] that has the desired property. No justification is needed in any part. (a) f(x) has an absolute maximum and absolute minimum on [0, 4]. (b) g(x) has neither an absolute maximum nor an absolute minimum on [0, 4]. (c) h(x) has exactly two local minima and one local maximum on [0, 4]. (d) k(x) has one inflection point and no local extrema on [0, 4].

If f(x)-x^3-3x; a) find the intervals on which f is increasing or decreasing. b)find the local...

If f(x)-x^3-3x; a) find the intervals on which f is increasing or decreasing. b)find the local maximum and minimum values c)find the intervals of concavity and inflection points d)use the information above to sketch and graph of f

Find the absolute maximum and minimum of f(x,y)=5x+5y with the domain x^2+y^2 less than or equal...

Find the absolute maximum and minimum of f(x,y)=5x+5y with the domain x^2+y^2 less than or equal to 2^2 Suppose that f(x,y) = x^2−xy+y^2−2x+2y with D={(x,y)∣0≤y≤x≤2} The critical point of f(x,y)restricted to the boundary of D, not at a corner point, is at (a,b)(. Then a= and b=     Absolute minimum of f(x,y) is      and absolute maximum is     .

2. The function f(x) = 1 1 + 1.25x 2 has one inflection point on the...

2. The function f(x) = 1 1 + 1.25x 2 has one inflection point on the interval 0 ≤ x ≤ 2. (a) Find the inflection point of the function f(x). Write the answer with ALL the decimal places the calculator gives. Do not round the calculator answer. calculator answer: (b)Sketch the graph of f(x) over the interval 0 ≤ x ≤ 2. Label the inflection point of f(x) in your sketch. Give the window you use. (c)(2 points) Use...