111 OGRAPHS AND FUNCTIONS Inverse functions: Cubic, cube root The one-to-one function f is defined below....
GRAPHS AND FUNCTIONS Inverse functions: Cubic, cube root The one-to-one function f is defined below. f(x) = 5x-2 1 Find f-1(x), where f' is the inverse of f. (x) .
= O GRAPHS AND FUNCTIONS Inverse functions: Cubic, cube root v The one-to-one function f is defined below. F(x) = 9-x+6 Find f-'(x), where f-' is the inverse of f. -1 f (x) = 1
= OGRAPHS AND FUNCTIONS Inverse functions: Linear, discrete The one-to-one functions g and h are defined as follows. g(x) = 4x -9 h={(3, 5), (4, - 7), (5, 4), (8, 1), (9, 3)} Find the following. DO 8-'(x) = 0 (es)6) = 0 X Ś ?
OGRAPHS AND FUNCTIONS Finding a difference quotient for a linear or quadratic function f(x+h)-f(x) Find the difference quotient h where h#0, for the function below. F f(x) = -372 -4x+9 Simplify your answer as much as possible. $(x + n) - f(x) h I
Español The one-to-one function f is defined below. Find f '(x), where f-'is the inverse of f. Also state the domain and range of f" in interval notation. '(x) = 0 • (0,0) (0,0) duo (0,0) [0,0) Domain off' : 0 Range of 5' : 0 x 6 ?
OGRAPHS AND FUNCTIONS Variable expressions as inputs of functions: Problem type 2 9 The function h is defined as h(x)= 6x² – 7x Find h(x+2). Write your answer without parentheses, and simplify it as much as possible. h (x+2) = 0 X ?
= The one-to-one function f is defined below. f(x) = (x-9) Find f-'(x), where s-l is the inverse of f. DO X I Don't Know Submit
The one-to-one function f is defined below. 8x-9 7x+4 Find f '(x), where s' is the inverse of f. Also state the domain and range of fin interval notation. (0,0) 0,0 DUD (0,0] [0,0) 1 - Domain off o -00 Range of X 5 ?
find the inverse of f-1(x) of the function f(x)= ^3 root x-5 3) find the inverse f(x) of the function, f(x) = 3JX-5 3x = 14-5 deel X² = Jy - 5
The one-to-one function f is defined below. 1. f(x) = 2 2 B Find f'(x), where f is the inverse of f. Also state the domain and range of f in interval notation. 5 "(t) = 0 H (0,0) [0,0] OVO (0,0] [0,0) Domain of f : Ø -00 Range of f1? : 0 x 3 ?