For the function f(3) = 622 - 4x + 4, evaluate and fully simplify each of...
For the function f(x) 52-7, evaluate and fully simplify each of the following. Preview f(a + h) - f() Preview
Evaluate the function at the given values of the independent variable and simplify. f(x) = 4x -- (a) f(2) (b) f(-2) (c) f( - x) (a) f(2)= * (Type an integer or a fraction. Simplify your answer.) (b) f(-2)= 3 (Type an integer or a fraction Simplify your answer) (c) f(-x) = 4x+, 1 (Simplify your answer)
Evaluate piecewise-defined functions Question Given the following piecewise function, evaluate /(-4). - 4x + 3 f(x) = x < 0 Osr<3 3S 2? + 2 Do not include "f(-4) =" in your answer. Provide your answer below:
For the function f(x)= 6x+3, evaluate and simplify. f(x+h)-f(x)=?
Evaluate the difference quotient for the given function. Simplify your answer. f(x) = x2 + 3, f(4 + h) − f(4) h
Evaluate the piecewise-defined function for the given values. f(x) = 4x for x 20 - 4x for x < 0 Find f(1), f(2), f(-1), and f(-2). f(1) f(2) f(-1) = f(-2) =
(5 pts) Let f(x)=-3x? +5x+2. Evaluate and fully simplify the difference quotient f(x+h)-f(x) h You must show all work to receive credit.
any ideas? 1. Spts) Let /(x)=x2-5x+2. Evaluate and fully (x+h)-(x) simplify the difference quotient #1: . You must show all work to receive credit #2: 2. (5 pts) Let S(x)=x? -5x and g(x) = 3x -2. Find the composite function f(g(x)). y 1x x=0 3. (6 pts) Graph the function S(x)= 7+1 X20 Use open and closed circles where necessary. Label at least two points on each piece with their coordinates. Show your work. USE THE VALUES FOR X, X...
Compute the inverse function of each of the following bijections. a. f: R → R,f(x) 4x + 7 ,b,f: (0,oo) → R,f(x)-log8x + 5 c. f: R → R,f(x)--7(x-2)3 + 11, d. f: RM0)-A(0), f(x) = x
Write the domain of the function using interval notation. 6 5 4 3 -6 -5 -4 -3 -2 - - 2 -3 -4 -5 -6- The domain is: NOTE: If you do not see an endpoint, assume that the graph continues forever in the sa direction. Entry example:[2,3) or (-00,5). Enter -oo for negative infinity and oo for infinity. Question Help: video Submit Question imprivata