. A cubic function has just two x-intercepts, one at x -0 and the other at...
Find the two x-intercepts of the function f and show that f'(x) = 0 at some point between the two x-intercepts. f(x) = -4xVx+1 (x, y) - (smaller X-value) (x, y) = (larger x-value) Find a value of x such that f'(x) = 0. X
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 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....
Which of the following combinations represents the vertex and two x-intercepts of the function given below? y=x2-2x-24 O A. Vertex: (-1,-21); Intercepts: x = 6,4 O B. Vertex: (7,5); Intercepts. x = 6,8 o c. vertex. (1,-25): Intercepts: x = 6,4 O D. Vertex: (0,0); Intercepts: x =-4, 6
5 6 8 The graph of a function is given below. Give all y-intercepts and x-intercepts shown If there is more than one answer, separate them with commas. Click on "None" if applicable y intercept(s): x -intercept(s): I ..None
for the function f(x) = 3x-x^3, find: 1) Domain 2) Intercepts (if possible) 3) Intervals of increasing/decreasing and Relative max/min 4) Intervals of concavity and point of inflection 5) End behavior 6) Any vertical and horizontal asymptote 7) Use all the above to make a detailed graph of the function on a grid please write everything clearly and i'l rate you depending on the work, thanks.
Please draw a graph for each function and contain units, and any asymptotes and intercepts must be clearly labeled A one-to-one function F(x) with domain ?−π, π?, range [1,2] and such that F ?−π? = 1 A function s(x) that is obtained first by vertically stretching y = sin(2πx) by a factor of a (a is a positive integer greater than 1) and then by horizontally shifting by 1 unit to the right. A one-to-one function Q(x) with domain (−∞,...
Identify the vertex, axis of symmetry, and intercepts for the graph of the function. 6) g(x) = x2-8x + 7 A) Vertex at (4, -9); axis: y = -9; x-intercepts: none; y-intercept: (1,0) B) Vertex at (-4,55); axis: x = -4; x-intercepts: none; }-intercept: (1,0) Vertex at (-4,55); axis: y = 55; x-intercepts: (1, 0) and (7,0); z-intercept: (0,7) D) Vertex at (4, -9); axis: x = 4; x-intercepts: (1,0) and (7,0); p-intercept: 0,7)
The graph of a cubic polynomial functiony = f(x)is shown. It is known that one of the zeros is1 + i.Write an equation for f.
I also tried (-pi,0)(pi,0) for points of inflection as well as DNE. Function Interval intercepts g(x) = x tanx - 34 <x< 37 (x, y) = (1 -7,0 (x, y) = (0,0 (x, y) = ( 1,0 - ) (smallest x-value) ) ) (largest x-value) relative minimum (x, y) = (0,0 ) relative maximum (x, y) = DNE points of inflection (x, y) = (smaller x-value) relative maximum (x, y) = ( DNE points of infection (x, y) = (-2,0...