the values of two functions, f and g, are given in a table. One, both, or...

For each of the following pairs of functions f and g (both of which map the...

For each of the following pairs of functions f and g (both of which map the naturals N to the reals R), show that f is neither O(g) nor Ω(g). Prove your answer is correct. 1. f(x) = cos(x) and g(x) = tan(x), where x is in degrees.

Q 1) Consider the following functions. f(x) = 2/x,  g(x) = 3x + 12 Find (f ∘...

Q 1) Consider the following functions. f(x) = 2/x,  g(x) = 3x + 12 Find (f ∘ g)(x). Find the domain of (f ∘ g)(x). (Enter your answer using interval notation.) Find (g ∘ f)(x). Find the domain of (g ∘ f)(x).  (Enter your answer using interval notation.) Find (f ∘ f)(x). Find the domain of (f ∘ f)(x).  (Enter your answer using interval notation.) Find (g ∘ g)(x). Find the domain of (g ∘ g)(x). (Enter your answer using interval notation.) Q...

a) Suppose that we have two functions, f (x) and g (x), and that: f(2)=3, g(2)=7,...

a) Suppose that we have two functions, f (x) and g (x), and that: f(2)=3, g(2)=7, f′(2)=−4, g′(2)=6 Calculate the values of the following derivative when x is equal to 2: d ?x2 f (x)?|x=2 b) A spherical ice ball is melting, and its radius is decreasing at a rate of 0.8 millimeters per minute. At what rate is the volume of the ice cube decreasing when the radius of the sphere is equal to 12 millimeters? Give your answer...

For each of the given functions f(x), find the derivative (f^−1)′(c) at the given point c,...

For each of the given functions f(x), find the derivative (f^−1)′(c) at the given point c, first finding a=f^−1(c). (See Theorem 7, page 156 of the Stewart Essential Calculus textbook) 1. f(x)=6x+10x^17; c= −16 a= (f^-1)' (c) = f(x)=x^2−9x+27 on the interval [4.5,∞); c=9 a= (f^-1)' (c) =

For each of the following pairs of functions f and g (both of which map the...

For each of the following pairs of functions f and g (both of which map the naturals N to the reals R), state whether f is O(g), Ω(g), Θ(g) or “none of the above.” Prove your answer is correct. 1. f(x) = 2 √ log n and g(x) = √ n. 2. f(x) = cos(x) and g(x) = tan(x), where x is in degrees. 3. f(x) = log(x!) and g(x) = x log x.

6. Suppose that functions f and g and their derivatives with respect to x have the...

6. Suppose that functions f and g and their derivatives with respect to x have the following values at x = 3 X f(x) g(x) f’(x) g’(x) 2 8 2 1 -3 3 1 4 2 4 Find the derivatives with respect to x. √(f(x)g(x)), x = 3 Derivative: ___________________

1) Use the First Derivative Test to find the local maximum and minimum values of the...

1) Use the First Derivative Test to find the local maximum and minimum values of the function. (Enter your answers as a comma-separated list. If an answer does not exist, enter DNE.): g(u) = 0.3u3 + 1.8u2 + 146 a) local minimum values:    b) local maximum values:    2) Consider the following: f(x) = x4 − 32x2 + 6 (a) Find the intervals on which f is increasing or decreasing. (Enter your answers using interval notation.) increasing:    decreasing:...

Write a Racket function "combine" that takes two functions, f and g, as parameters and evaluates...

Write a Racket function "combine" that takes two functions, f and g, as parameters and evaluates to a new function. Both f and g will be functions that take one parameter and evaluate to some result. The returned function should be the composition of the two functions with f applied first and g applied to f's result. For example (combine add1 sub1) should evaluate to a function equivalent to (define (h x) (sub1 (add1 x))). You will need to use...

Write a Racket function "combine" that takes two functions, f and g, as parameters and evaluates...

Write a Racket function "combine" that takes two functions, f and g, as parameters and evaluates to a new function. Both f and g will be functions that take one parameter and evaluate to some result. The returned function should be the composition of the two functions with f applied first and g applied to f's result. For example (combine add1 sub1) should evaluate to a function equivalent to (define (h x) (sub1 (add1 x))). You will need to use...

Problem: A non-linear system consists of two functions: Complete the following three parts. Make a table...

Problem: A non-linear system consists of two functions: Complete the following three parts. Make a table of values for the functions. The table can be similar to the one below, or it can be vertical, but it must have a minimum of five x-values and the corresponding function values. Using your table indicate the solution to the system by marking the function values that are equal. x f(x) g(x) Plot a graph of the functions over an interval sufficient to...