Write an equation for a rational function with: Vertical asymptotes at x = -3 and x...
Write an equation for a rational function with: vertical asymptotes at x = 4 and x =-4 x intercepts at x =-2 and x = 5 y intercept at9 Preview Get help: Video Points possible: 1 Unlimited attempts. Submit
Define a rational function with all of the following properties: The vertical asymptotes are t = 2 and t - 4 There is a horizontal asymptote at y = 0 The vertical intercept is at y = 3 The horizontal intercept is at t = 5
Determine the L- and y-intercepts (if any), and vertical and horizontal asymptotes of the rational function r, given by 3.x2 + 18x + 24 r(x) = x2 – 3x + 2 and then use this information to sketch a graph of r. As part of your analysis, you should explicitly examine the behaviour of the function on both sides of each vertical asymptote, and evaluate the function at appropriate test points.
5. (5 pts) a. Write the equation for a rational function r(x) that has a vertical asymptote at x = 8, a horizontal asymptote at y=1, and a y-intercept at (0, -1). #5a: b. Find the x-intercept for your function.
The graph of a rational function fis shown below. Assume that all asymptotes and intercepts are shown and that the graph has no "holes". Use the graph to complete the following. (a) Find all x-intercepts and y-intercepts. Check all that apply. X-intercept(s): 4 00 01 None . : O=D y-intercept(s): 01 04 00 None Dando None (0,0) HHH [0,0] (0,0] [0,0) (b) Write the equations for all vertical and horizontal asymptotes. Enter the equations using the "and" button as necessary....
Create a rational function such that the graph of has vertical asymptotes at x=5 and x= -7, a hole at x=2 , and a horizontal asymptote at y = 14. By creating a rational function, you are to write rule for this function. There are many correct solutions here.
5x2 3. Find all of the asymptotes of the rational function f(x) = Vertical Asymptote(s): Horizontal Asymptote: Slant/Oblique Asymptote:
The graph of a rational function f is shown below. Assume that all asymptotes and intercepts are shown and that the graph has no "holes", Use the graph to complete the following. (a) Write the equations for all vertical and horizontal asymptotes. Enter the equations using the "and" button as necessary. Select "None" as necessary. : None O=o (0,0) Dando Vertical asymptote(s): 1 Horizontal asymptote(s): U [0,0] (0,0) (0,0) O ovo 00 - - -8 EEE-- - -6 1 (b)...
The figure below shows the graph of a rational function. It has vertical asymptotes x = 1 and x = 6, and horizontal asymptote y=0. The graph has x-intercept 3, and it passes through the point (5,-2). The equation for f(x) has one of the five forms shown below. Choose the appropriate form for f(x), and then write the equation. You can assume that f(x) is in simplest form. :() (*) - a(x-6) X- 10 S(x) = (x - 2)(x...
QUESTION 8 Find the equation(s) of all vertical and horizontal asymptotes for the function f(x) = (5x + 2)(3x-2) x² - 16 Vertical Asymptote(s): X = - Horizontal Asymptote(s): y = 15 Vertical Asymptote(s): X = -4,x = 4: Horizontal Asymptote(s): None Vertical Asymptote(s): X = -4,x = 4: Horizontal Asymptote(s): y = 15 лм am Vertical Asymptote(s): X= -4,x = 4: Horizontal Asymptote(s): y = Vertical Asymptote(s): X UN 5 Horizontal Asymptote(s): None