The function g(x)=x^2/3+x is decreasing on the interval: a) (-1,0) b) (-1/3,0) c) (-3/10,0) d) (-8/27,...

find the interval where the function is increasing and decreasing f(x) =(x-8)^2/3 a) decreasing (8, infinity)...

find the interval where the function is increasing and decreasing f(x) =(x-8)^2/3 a) decreasing (8, infinity) increasing (-infinity, 8) local max f(8)=0 a) decreasing (- infinity, 8) increasing (8, infinity) local max f(8)=0 a) decreasing (-infinity, infinity) no extrema a) increasing (-infinity, infinitely) no extrema

Find absolute minimum and maximum of the function F(x)=x^3+x^2-x+2 on closed interval (-3,0)

Find absolute minimum and maximum of the function F(x)=x^3+x^2-x+2 on closed interval (-3,0)

1. The critical point(s) of the function 2. The interval(s) of increasing and decreasing 3. The...

1. The critical point(s) of the function 2. The interval(s) of increasing and decreasing 3. The local extrema 4. The interval(s) of concave up and concave down 5. The inflection point(s). f(x) = (x^2 − 2x + 2)e^x

1. For the function y=x^1/3(x+4), find a. Find where the function is increasing and decreasing b....

1. For the function y=x^1/3(x+4), find a. Find where the function is increasing and decreasing b. Local max and mins c. Intervals of concave up and concave down d. Points of inflection. Include y-values

Given the function g(x)=x-3x-52     g'(x)=-4(x-3)(x-5)3        g''(x)=8(x-2)(x-5)4 Find the intervals where g(x)...

Given the function g(x)=x-3x-52     g'(x)=-4(x-3)(x-5)3        g''(x)=8(x-2)(x-5)4 Find the intervals where g(x) is increasing and decreasing Find intervals of concavity

Define g(x) = f(x) + tan-1 (2x) on [−1, √3/2 ]. Suppose that both f'' and...

Define g(x) = f(x) + tan-1 (2x) on [−1, √3/2 ]. Suppose that both f'' and g'' are continuous for all x-values on [−1, √3/2 ]. Suppose that the only local extrema that f has on the interval [−1, √3/2 ] is a local minimum at x = 1/2 . (a) Determine the open intervals of increasing and decreasing for g on the interval [1/2 , √3/2] . (b) Suppose f(1/2) = 0 and f(√3/2) = 2. Find the absolute...

find the following for the function f(x)=3x^2+4x-4 a. f(0) b. f(3) c. f(-3) d. f(-x) e....

find the following for the function f(x)=3x^2+4x-4 a. f(0) b. f(3) c. f(-3) d. f(-x) e. -f(x) f. f(x+2) g. f(4x) h. f(x+h)

a) If g(x) = x3−6x2 −15x + 7, find the interval(s) on which g is increasing/decreasing,...

a) If g(x) = x3−6x2 −15x + 7, find the interval(s) on which g is increasing/decreasing, and identify the location(s) of any local max/mins. Make a sign chart for g' b)  Suppose f(x) =(x2 −3)/(x2 + 3) [Note that x2 + 3 > 0 for all x.] Using the fact that f''(x) = −36(x2 −1)/(x2 + 3)3 find the interval(s) on which f is concave up/concave down, and identify the location(s) of any inflection points. Make a sign chart for f''

the function g(x) is increasing on (-infinity, 2) and (5, infinity). The function is decreasing on...

the function g(x) is increasing on (-infinity, 2) and (5, infinity). The function is decreasing on (2,4) and (4,5). The function is concave down on (-infinity, 3) and (4,5) and (5, infinity). The function is concave up on (3,4). Give a sketch of the curve. (you do not need precise y-values. You need the correct shape of the curve)

1.) Suppose g(x) = x2− 3x. On the interval [0, 4], use calculus to identify x-coordinate...

1.) Suppose g(x) = x2− 3x. On the interval [0, 4], use calculus to identify x-coordinate of each local / global minimum / maximum value of g(x). 2.) For the function f(x) = x 4 − x 3 + 7... a.) Show that the critical points are at x = 0 and x = 3/4 (Plug these into the derivative, what you get should tell you that they are critical points). b.) Identify all intervals where f(x) is increasing c.)...