Below is the graph of y = f(x). Find the function of the transformed graph. 1...
4. Below is the graph of a transformed function of f(x) = x a. List the transformations (like shifted right 10, vertically stretched by a factor of 7, etc.) needed to transform f(x) into the graph below. b. Write the function for the graph below. g(x) =
Given the graph of y=f(x) below, find the value f(1) Given the graph of y = f(x) below, find the value f(1). Сл N 111 -6 -5 -4 -3 -2 -1 2 3 4 5 6 2. 1 1 w -41 - -5 1
Use the graph of y=f(x) to graph the function gx)=f(x+2). 1. Choose the correct graph of g below. The function f(x)= x + 6 is one-to-one. Find an equation for f'(x), the inverse function. (Type an expression for the inverse. Use integers or fractions for any numbers in the expression.)
The graph of a function y=f(x) is given below a) Find the domain and range b) Find the absolute maximum and the absolute minimum, if they exist c) Identity any local maximum or local minimum values a function y = f(x) is given below. 2 (0,2) (1.1) (5.0) 13 and range
The graph of a function f is shown below. Find f (3) and find one value of x for which f(x) = 2. (a) f(3) = 0 (b) One value of x for which f (x) = 2 : 1 LLLLE! - 4 -3 -2 -1 17 i x o
Sketch the graph of y=f'(x) 13. Below you are given the graph of the function y(x). Use the graph to answer the questions that follow. y- . O-
5) The level curves of a function f(x,y) are given in the graph below. 2 X -1 -2 i Estimate f(3,3) ii Estimate Vf(-3, 1) Let u be a unit vector parallel to (1,4). Calculate Daf using your answer from i iv) Find the location of all critical points of the function f, on the set -5 <r< of these is a saddle point) iii) Let D be the domain bounded between the curves y = x and y= 2...
1a. Find the equation y-f(x)-f'(x.)*(x-%) of a tangent line to the graph of a polynomial function f(x) -2xN4-x+3 3x^*2 at the point x, -1. (See the files Derivatives.doc and Derivatives of a power function.doc) N-16 1 b. Find the equation y-f(xi)-f'(x.)*(x-%) tangent line to the graph of a function of a f(x)-4x atx, 2. (Use the chain rule of differentiation for finding f'(x,).)
Suppose the point (2, 4) is on the graph of y = f(x). Find a point on the graph of the given function. The reflection of the graph of y = f(x) across the y-axis O (-2,4) O (2,-4) O (-2,-4) O (2.4)
Find the exponential function f(x)=a^x whose graph is given. Find the exponential function f(x) = ax whose graph is given. f(x) y 20 (2, 16) 15 10 5 -3 -2 - 1 2 3