The figure below shows the graph of a rational function. It has vertical asymptotes x =...
The figure below shows the graph of a rational functionſ. It has vertical asymptotes x-1 and x-5, and horizontal asymptote y 0. The graph does not have an x-intercept, and it passes through the point (-4,-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. (0) -8 X-b a(x - 1) X-C (x - 2) (x -...
O POLYNOMIAL AND RATIONAL FUNCTIONS Writing the equation of a rational function given its graph 3 . The figure below shows the graph of a rational functionſ. It has vertical asymptotes x -1 and x=6, and horizontal asymptote y The graph has x-intercept 4, and it passes through the point (2, -1). 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...
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....
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)...
Give the equations of any vertical, horizontal, or oblique asymptotes for the graph of the rational function. 3x2+6 f(x)x+2 Select the correct answer below and, if necessary, fill in the answer box to complete your choice. O A. The equation of the vertical asymptote is O B. There is no vertical asymptote. (Type an equation.)
el Find the horizontal asymptotes 14. The graph of a rational functionf(x) is shown, together with its vertical and horizontal asymptotes. a. As x → +00, f (x) → ? b. As x-+-oo, f (x) → ? .5 C. As x →-1+, f(x)-? 5 4 3 2 el Find the horizontal asymptotes 14. The graph of a rational functionf(x) is shown, together with its vertical and horizontal asymptotes. a. As x → +00, f (x) → ? b. As x-+-oo,...
7. Graph the rational function and answer following question hx) 2 -2x+7 horizontal and vertical asymptotes (if any) also plot at least two points on each piece of the graph. And answer the following questions Vertical asymptote Horizontal asymptote Holes x-intercept y-intercept
Give the equations of any a) vertical and (b) horizontal asymptotes for the graph of the rational function y=f(x). 4-6x fx)-3x+6 a. Select the correct choice below and, if necessary, il in the answer box to complete your choice. A. There is one vertical asymptote The equation of the vertical asymptote is ied OB There are two vertical asymptotes From left to right on the graph, the equations of the vertical asymptotes are囚and ° C. There are no vertical asymptotes....
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.
12 (Rational Functions) For each rational function below, find (a) the vertical asymptote(s). (b) the horizontal asymptote. (c) the x-intercept(s). (d) the y-intercept. (e) the graph of the function. 2x-6 (1) y X-2 x-5 (2) y 1+ x2-1 12 (Rational Functions) For each rational function below, find (a) the vertical asymptote(s). (b) the horizontal asymptote. (c) the x-intercept(s). (d) the y-intercept. (e) the graph of the function. 2x-6 (1) y X-2 x-5 (2) y 1+ x2-1