Investigate the nature of the fixed points of the function g(x) = 5x - 6.
The function g is defined by g(x) = 3x2 +7. Find g(5x). 8 (5x) = 0 xo 5 ?
= 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]
8 and 9 plz Multiply or divide. Simplify. (4 points each) 5x x+x-6 3x 5x+5 6) 0 Add or subtract. Simplify. (3 points) -? 9 120S 21-7 2-7 x-1 x-1
- 1 POINTS GHCOLALG11 3.6.042. Let f(x) = 2x - 5 and g(x) = 5x – 2. Find the value. (gog) (909({}) - Need Help? Read It Watch It Talk to a Tutor -/1 POINTS GHCOLALG11 3.6.044.MI. Let f(x) = 5x2 - 4 and g(x) = 6x + 6. Find the value. (go (2) (gon(2) =
write answer in exact simplified form 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
Find the domain of the function. g(x)-9-5x Choose the correct domain below. O A· (x | x is a real number and x O B. {x | x is a real number and xヂ6) O c· (x | x is a real number and x2 0 D. (x 1 x is a real number and x #0)
identify the parent function f associated with g? - 9(x) = -5x – 2+4.
For the polynomial function f(x) = −5x(x + 2)2(x − 1)3: For the polynomial function f(x) = -5x(x + 2)(x - 1)": 7. (4 points) The leading term when expanded is -5.2". Use this to describe the end be havior of f(x): as r → , f(x) → as I + -00, f(x) → 8. (4 points) Name the zeros of f(x) and each of their multiplicities. 9. (4 points) Come up with a rational function which has y =...
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 Find the derivative of...
For f(x) = 5x - 6 and g(x) = 6x4 - 1 find the following. a. (fog)(x) b. (gof)(x) c. (fog)(2) a. What is (f o g)(x)? (fog)(x) = (Simplify your answer.) b. What is (g of)(x)? (g of)(x)=(Simplify your answer.) c. What is (fog)(2)? (fog)(2)=(Simplify your answer.)