x    3 6 9 15 21 f(x) 7.17 8.102 9.155 10.346 11.69 Could the function...

Write the Taylor series for the function f(x) = x 3− 10x 2 +6, using x...

Write the Taylor series for the function f(x) = x 3− 10x 2 +6, using x = 3 as the point of expansion; that is, write a formula for f(3 + h). Verify your result by bringing x = 3 + h directly into f (x).

9 19 20 20 21 21 22 22 F(x) F ( x ) 24 24 2...

9 19 20 20 21 21 22 22 F(x) F ( x ) 24 24 2 2 6 6 7 7 1 1 Let x x be the ages of students in a class. Given the frequency distribution F(x) F ( x ) above, determine the following probabilities: (a) P(18≤x<20)= P ( 18 ≤ x < 20 ) = (b) P(x=18)= P ( x = 18 ) = (c) P(x>19)= P ( x > 19 ) = RandomVariables: x 18...

2) Find the function f if a) f '' (x) = 6 x + 12 x...

2) Find the function f if a) f '' (x) = 6 x + 12 x 2 b) f ''' (t) = et c) f ' (x) = 8 x 3 + 12 x + 3 , f(1) = 10 d) f'' (x) = 2 - 12 x , f(0) = 9 , f(2) = 15 e) f '' (t) = 2 et + 3 sin t , f(0) = 0 , f(π) = 0

Suppose f(x) is a differentiable function such that f(2)=3 and f'(x) is less than or equal...

Suppose f(x) is a differentiable function such that f(2)=3 and f'(x) is less than or equal to 4 for all x in the interval [0,5]. Which statement below is true about the function f(x)? The Mean Value Theorem implies that f(4)=11. The Mean Value Theorem implies that f(5)=15. None of the other statements is correct. The Intermediate Value Theorem guarantees that there exists a root of the function f(x) between 0 and 5. The Intermediate Value Theorem implies that f(5)...

For the function f(x)=−3x^3+36x+6 (a) Find all intervals where the function is increasing. Answer: ff is...

For the function f(x)=−3x^3+36x+6 (a) Find all intervals where the function is increasing. Answer: ff is increasing on= (b) Find all intervals where the function is decreasing. Answer: ff is decreasing on= (c) Find all critical points of f(x) Answer: critical points: x= Instructions: For parts (a) and (b), give your answer as an interval or a union of intervals, such as (-infinity,8] or (1,5) U (7,10) . For part (c), enter your xx-values as a comma-separated list, or none...

1. Consider the function. f(x) = 6x − 9 (a) Find the inverse function of f....

1. Consider the function. f(x) = 6x − 9 (a) Find the inverse function of f. (b) Graph f and f −1 on the same set of coordinate axes. (c) Describe the relationship between the graphs. The graphs of f and f −1 are reflections of each other across the line y = (d) State the domain and range of f and f −1. (Enter your answers using interval notation.) 2. Consider the function. f(x) = x+3/x (a) Find the...

Suppose f is a function with f(1) = f′(1) = ··· = f^(9) (1) = 0,...

Suppose f is a function with f(1) = f′(1) = ··· = f^(9) (1) = 0, f^(10) (1) = −2, and f^(11) (1) = 3. Write the 11-th Taylor polynomial of f at a = 1, and determine if f has a local maximum or a local minimum or neither at 1.

Suppose the derivative of a function f is f '(x) = (x + 1)2(x − 4)3(x...

Suppose the derivative of a function f is f '(x) = (x + 1)2(x − 4)3(x − 6)4. On what interval is f increasing? (Enter your answer in interval notation.)

Consider the following function with a real variable, x: ?(?) = ?3 - 3?2 + 6?...

Consider the following function with a real variable, x: ?(?) = ?3 - 3?2 + 6? + 10 Write a Python function for the derivative of f(x) that takes x and returns the derivative of f(x). Take the derivative of f(x) analytically with respect to x before writing the function.

In class I gave a general formula for derivative of an exponential function f(x) = loga...

In class I gave a general formula for derivative of an exponential function f(x) = loga u(x); where "a" is called Base, and u(x) is called the argument of the log function, which is also given below. Note, the derivative of a logarithmic function f(x) has three parts and is given here: f ' (x) = 1/ln (a) .   1/u(x) . u ' (x) In your words, describe (in words only)  each one of the three parts shown above: a- describe...