Consider the function f(x)=x^2. Find the instantaneous rate of change at x=2. 

Use the table to estimate the derivative at the given point.

x hours               1       3       4       7       9

v(x) visitors      120    476   595    807    902

f'(8) =

The following table lists the values of the functions f and g, and of their derivatives, f' and g', for x=4.

x= 4

f(x)= -4

g(x)= 13

f'(x)= 0

g'(x)= 8

Let function F be defined as F'(x) = f(x)g(x)

F'(4) =

Let g(x)=x^3-16x and let c be the number that satisfies the Mean Value Theorem for g on the interval [-4,2].

What is c?

What is the derivative of f(x) = tan (x)?

Find the slope of the tangent line to y= Ax² - 4 at x=-3, where A is a constant.

Write the equation of the tangent line at the given value of x. You may use a calculator.

f(x) = ln 2x / 4x at x = 1

What is the derivative of the following?

f(x) = (6x³) / ln (x)

Determine if the Mean Value Theorem can be applied to the following function on the given closed interval. If so, find all possible values of c. f(x) = 3 + square root of x on [0, 4]. 

What is the derivative of f(x) = 2tan(x) - 3cot(x)?

If a rock is thrown upward on Mars, its height (in meters) after t seconds is given by s(t) = 16t - 1.86t². At what time is the instantaneous rate of change of the rock equal to -2.6 m/s?

*Use one of the instantaneous rates of change formulas

The graph of y = 3 - e^5x crosses the x-axis at one point. What is the slope of the graph at this point?

Find the derivative of the given function:

f(x) = x⁷ sin (sin^-1 (x))

Let f be a function defined for all real numbers except for 0.

Also let f', the derivative of f, be defined as 

f'(x)= ((x-2)^3)/x.

On which intervals is f increasing?

Find the derivative of f(x) = csc x + x tan x