(1 point) Let F(x) = f(x) and G(x) = (f(x))8 . You also know that a'...
Let F(x) = f(x®) and G(x) = (f(x))8 . You also know that a? = 13, f(a) = 3, f'(a) = 4, f'(a) 12 Then F'(a) and G'(a) = Submit Question
Let F(x) = f(f(x)) and G(x) = (F(x))2 You also know that f(6) = 10, f(10) = 3, f'(10) = 4, f'(6) = 10 Find F'(6) and G'(6) =
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1.Let g(x) = log3(x +3)-1 . d. (3 pts) f(8)-3, the corresponding point on the graph of f(x)is.H The transformed point on the graph of g(x) is . e. (2 pts) Find the domain and the range. Write in interval notation. 1d. point on f(x): point on g(x): f. (1 pt) What is the vertical asymptote? That is, as x→ 1e. D: R: 1f. 8. (5 pts) Find the equation of the inverse, g(x). 1g.
1.Let g(x)...
Let ?(?)=?2−8?+4f(x)=x2−8x+4.
(1 point) Let f(x) = x2 – 8x + 4. Find the critical point c of f(x) and compute f(c). The critical point c is = The value of f(c) = Compute the value of f(x) at the endpoints of the interval [0, 8]. f(0) = f(8) = Determine the min and max Minimum value = Maximum value = Find the extreme values of f(x) on [0, 1]. Minimum value = Maximum value =
Question 16 (1 point) N 1 3 Let f(x) = and g(x) + 4. X – 6 х Find the domain of the composition f(g(x)). The domain of f(g(x)) is all real numbers except Note: You are only finding the values to exclude. Enter answers separated by commas. Answers should be an integer or reduced fraction. Do not provide decimal answers.
(1 point) Let [ f(z)dx=-13, 5° f(x) dx = 3, $*g(x) dx = 6, §*9(a) dx = 1, J2 Use these values to evaluate the given definite integrals. a) ["{$(2) + 9()) dx = 6 .) – g(x)) dx = * (31(2) + 29(2) de = (af(x) + g()) dc = 0. d) Find the value a such that a=
2. True or false? f(g(x) (f g)(x) Explain (just enough for me to know that you know why it's true or false) a ies 3. Let f(x)and g(x) (a) The domain of f(x) is vx-1. (b) The domain of g(x) is: (e) f(g(x)) (d) The domain of f(g(x)) is: (e) f(g(10))-
Use for #4, 5. Let f(x) = 3* and g(x)= (1/2)". Find each function value. Circle the correct choice. 4. Find f(-2) a. 9 b. -9 c. = ICE d. - 5. Find g(-3) a. - b. 8 d. d. - 8 ( EX
Let f(x)=7x-8/3 and g(x)=3x+8/7. Find (f o g)(x) and (g o f)(x).
(1 point) Let f(x) = 0 if x < -4 5 if – 4 < x < 0 -3 if 0 < x < 3 0 if x 2 3 and g(x) = Los f(t)dt Determine the value of each of the following: (a) g(-8) = 0 (b) g(-3) = 5 (c) g(1) = (d) g(4) = (e) The absolute maximum of g(x) occurs when x = 0 and is the value It may be helpful to make a graph...