Given the function f(x) = 6x2 + 72 – 4. Calculate the following values: f(0) =...
• Question 10 < > Given the function f(2) = 72 – 41, calculate the following values f(0) = f(2)= f( - 2) = f(x + 1) = f(x + 2) = Note: In your answer, you may use abs(g(x)) for g(x). ne
Given the function f(x) = 722 +62 – 1. Calculate the following values: f(0) = f(2)= f( – 2) = f(x + 1) =
(1 point) Find the critical numbers of the function f(x) = 2x3 + 6x2 - 48.. Answer (separate by commas): <= (1 point) List the critical numbers of the following function separating the values by commas. f(x) = 6x2 + 4 List the critical numbers of the following function in increasing order. Enter N in any blank that you don't need f(x) = 2x3 + 2x2 + 20
Question 10 1 pts f(x) = 6x2 - 9,2 > 0 If the function is one-to-one, find its inverse. If not, write "not one-to-one." ºp(x) = V0 * 0, 22-4 ºg'(x) = vet2 not a one-to-one function
Given the following functions, find each of the values: f(x) = 72 - 6x +9 g(x) = 2 - 3 (f +9)( - 2) = ne (f-9)(5) = (fog)(0) = ()(1) =
it S(z) = (x2 + 4x + 3)'. then f'(x) = 4(72 + 4x + 3) (2. +3) ° ( 22 + 4) f'(2) - question Heln
Consider the function f(x)=3−6x2, −4≤x≤2f(x)=3-6x2, -4≤x≤2. The absolute maximum value is: and this occurs at: x= The absolute minimum value is: and this occurs at: x=
A function, f. has the following table of values: 4 6 X 0 f(x) 2 23 43 -2 - 1 -4 1 Approximate] пом. Approximate f(x)d.r using a Riemann sum with 2 rectangles and midpoints. 6 0 -2 4 O2 Question 4(5 points) ✓ Saved firmaland itsdaluritius Р w o 19 MacBou
1. Use the given graph of f(x) to find the following values of the function and limits: 0 (d) (e) (a) (b) (C) f(-3) - 80- f(2)= (4) lim f(x) lim f(x)= lim f(x)- lim f(x)= lim /(x)- lim f(x)= lim f(x)= lim f(x)- lim f(x)= lim /(x)= lim f(x)= 2. Use the given graph of f(x) to find the following values of the function and limits: lim f(x)= x = 1) AD 2 3 (a) (c) (d) e) (b)...
Given the function: 6x - 1 2 < 0 63 - f(x) = 62 – 2 x > 0 Calculate the following values: f( - 1) = |-7 f(0) = f(2)