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Question 3 of 11, Step 1 of 1 2/11 Correct Given g(x) = 5x + 2x7,...
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Given the functons: f(x)=xº+5x g(x)=5x h(x) = 5x-3 Evaluate the function (f •)(r) for x =-2. Write your answer
Question 5 of 12, Step 1 of 1 3/15 Correct Given g(x) = (2x + 2 , find 8(13). Your answer should be simplified and written in radical notation. Answer (13) -
Find the derivative of the function. y sin-1(5x+ 1) Part 1 of 3 The function y - sin-1(5x + 1) is a composition, and so we must use the Chain Rule, given below, to find the derivative dx[f(g(x))) = f '(g(x))g'(x) For the given function sin 1(5x+ 1), the "inside" function is Sx + and the foutside" function is arcsin (a) Part 2 of 3 Recall that the derivative of y sin-1(x) is 1-(5x - 1)2
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Find the requested composition of functions. Given f(x) = 7x + 11 and g(x) = 5x - 1, find (f ∘ g)(x).
This Question: 2 pts For the given functions fand g, find (f.g)(x). f(x) = 5x + 2, g(x) = 6x + 6 O A. 30x2 + 12 O B. 30x2 + 18x + 12 O C. 30x2 +42x + 12 O D. 11x2 + 42x + 8 Mika's ag rages wil es us r = oblems in t problems, so Click to select your answer
Find g'(x) for the given function. Then find g'(-2), g'(0), and g'(2). g(x) = V7x Find g'(x) for the given function. g'(x) = 0 Find g'(-2). Select the correct choice below and, if necessary, fill in the answer box to complete your choice. O A g'(-2) = (Type an exact answer.) OB. The derivative does not exist. Find g'(0). Select the correct choice below and, if necessary, fill in the answer box to complete your choice. O A. g'(0) =...
= x-2 2x+1 Given the functions f(x) = x²+x-1, and g(x) x2 +5x+6 a. Which function has an oblique asymptote? [10] b. Determine the equation and end behavior of the oblique asymptote. [3A]
Step 2: x+2x+2 X+5x-1 (x+2)(x+2) (x+5)(x-1) x2+4 Step 3: Step 4: Part A: At which step did Nicolette make her first error? Part B: What was her first error? Part C: What is the correct product? Select one answer each for Part A, Part B, and Part C.
4 - Let f(x) = 4 – 5x and g(x) = 2 4 be functions from R into R. Prove that f and g are inverse functions by demonstrating that fog=iR and go f = ir.
Lesson: nbining Functions KAITLYN TUCKER Question 1 of 11, Step 4 of 4 2/24 Correct Consider the following functions. f = {0,-2), (2, 1), (1, -1)} and 8 = {(2,-4), (3, -3), (1,4)} Step 4 of 4: Find () Answer How to enter your answer Subre