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

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.)...

4. For the function g(x)= 3x+3 /x2-3x-4, find any x-values where g is discontinuous. Identify each...

4. For the function g(x)= 3x+3 /x2-3x-4, find any x-values where g is discontinuous. Identify each discontinuity as a jump, removable (point), or infinite discontinuity. Kindly show all working. 5. Find y'. y=3x2-14x+42. Kindly show all working. 6. Find h'(x). h(x)=tan (pi x2). Kindly show all working.

Use f(x) = 3x − 2 and g(x) = 5 − x2 to evaluate the expression....

Use f(x) = 3x − 2 and g(x) = 5 − x2 to evaluate the expression. (a)     f(f(2)) (b)     g(g(3))

. Let f(x) = 3x^5/5 −2x^4+1. Find the following: (a) Interval of increasing: (b) Interval of...

. Let f(x) = 3x^5/5 −2x^4+1. Find the following: (a) Interval of increasing: (b) Interval of decreasing: (c) Local maximum(s) at x = d) Local minimum(s) at x = (e) Interval of concave up: (f) Interval of concave down: (g) Inflection point(s) at x =

) Let .f'(x)=x2-4x-5 Determine the interval(s) of x for which the function is increasing, and the...

) Let .f'(x)=x2-4x-5 Determine the interval(s) of x for which the function is increasing, and the interval(s) for which the function is decreasing. Find the local extreme values of f(x) , specifying whether each value is a local maximum value or a local minimum value of f. Graph a sketch of the graph with parts (a) and (b) labeled

Given the function and the bounded interval, f x( )= x3 −6x2 − 45x+ 4 [-5,10]...

Given the function and the bounded interval, f x( )= x3 −6x2 − 45x+ 4 [-5,10] F. The interval where the function is concave down is _______. G. The interval where the function is concave up is __________. H. The global maximum value in the bounded interval [-5, 10] is __________. (y coordinate). I. The global minimum value in the bounded interval [-5, 10] is ___________. (y coordinate). Show your work please.

The function f(x)=−6x3−6.93x2+52.7724x−2.19f(x) is increasing on the open interval (  ,  ). It is decreasing on the open...

The function f(x)=−6x3−6.93x2+52.7724x−2.19f(x) is increasing on the open interval (  ,  ). It is decreasing on the open interval ( −∞,  ) and the open interval (  , ∞ ). The function has a local maximum at . Question #2 The function f(x)=3x+9x−1 has one local minimum and one local maximum. This function has a local maximum at x=    with value     and a local minimum at x= with value

Let f(x) = 3x^5/5 −2x^4+1 Find the following -Interval of increasing -Interval of decreasing -Local maximum(s)...

Let f(x) = 3x^5/5 −2x^4+1 Find the following -Interval of increasing -Interval of decreasing -Local maximum(s) at x = -Local minimum(s) at x = -Interval of concave up -Interval of concave down -Inflection point(s) at x =

Let f(x) = 3x^5/5 −2x^4+1 Find the following -Interval of increasing -Interval of decreasing -Local maximum(s)...

Let f(x) = 3x^5/5 −2x^4+1 Find the following -Interval of increasing -Interval of decreasing -Local maximum(s) at x = -Local minimum(s) at x = -Interval of concave up -Interval of concave down -Inflection point(s) at x =

Suppose that f(x,y) = x2−xy+y2−3x+3y with −3≤x,y≤3 1. The critical point of f(x,y) is at (a,b)....

Suppose that f(x,y) = x2−xy+y2−3x+3y with −3≤x,y≤3 1. The critical point of f(x,y) is at (a,b). Then a= and b= 2.Absolute minimum of f(x,y) is and absolute maximum is