Consider the function f(1) = 22 + 12x +11 (e) Sketch a graph of f(I) =...
Consider the function f(1) = 22 +82-9 Answer all parts: (a)-(). (a) The vertex is (b) The axis of symmetry is (c) The I-intercept(s) is (are) fa (Enter the list, separated by a comma) (d) The y-intercept is y= (e) Sketch a graph of f(x) = 22 +81 - 9 on a piece of scrap paper, then scan and upload your graph, Upload Choose File No file chosen Allowed Extensions: gif jpeg jpg pdf png After graphing answer the following:...
Consider the function f(1) = 22 - 62+5 Answer all parts: (a) - (). (a) The vertex is (b) The axis of symmetry is (c) The 2-intercept(s) is (are) (Enter the list, separated by a comma. (d) The y-intercept is y = (e) Sketch a graph of f(x) = 22 - 61 +5. Instructions: To sketch the graph, click on the following locations: (1) vertex (2) the x--intercepts 10 10 0 -10 After graphing answer the following: (f) What is...
Find the domain of the function. f(x) = 7(x + 11) What is the domain of f? O A. (-00,-11)U( - 11,0)U(0,00) O B. (-00,000(0,00) O C. (-00,- 11)U( - 11,00) OD. (-00,00)
First find f+g, f-g, fg and Then determine the domain for each function. f(x) = 4x + 1, g(x) = x - 9 (f+g)(x) = (Simplify your answer.) What is the domain off+g? O [0,00) 0 (-00,00) (4-9)(x) = (Simplify your answer.) What is the domain off-g? O O o [0,00) (-00,00) ( 10 ) Click to select your answer(s). First find f+g, f-g, fg and - Then determine the domain for each function. f(x) = 4x + 1, g(x)=x-9...
11) 11. Solve the following absolute value equation for x: 12x - 3) = 5 A) X= 4 B) x = -1 C) x €{-1,4) D) No Solutions E) None of the Above 12. Which of the following is a true statement about the following function: f(x) = 2*? A) (0,1), (1, 2), and (-1,5) are three points on the graph of f(x) B) The Range of f(x) is (-0,00) C) There is an x-intercept at (0,1) D) The Domain...
Sketch a non-constant function that is continuous on (-00,00) and has the following properties. Use a number line to summarize information about the function. f(-6)=f(-2)=f'(-6)=f(-4)= f'(-2) = 0; f(x)20 on (-00,00) Which of the following graphs matches the description of the given properties? OA. OB. OC. 1 SO 13 501 50. 2 50- Which number line summarizes the information about the non-constant function? The function is decreasing in red and the function is increasing on blue. f'>0 p <0 '>0...
Sketch a graph on the right side of the problem of a single function that has these properties. 5) (a) defined for all real numbers (b) increasing on (-3,-1) and (2, oo) (c) f '(x) < 0 on (-00-3) and (-1,2) (d)f"x)>0 on (0, 00) (e) concave down on (-oo, -3), (-3, o) 6) (a) defined for all real numbers (b) increasing on (-3, 3) (c) decreasing on (, -3) and (3, ) (d) fix) <0 on (0, (e) f(x)>...
Determine the domain, range, and horizontal asymptote of the function. f(x) = e-* + 3 o domain: (-00, 0); range: (3,0) horizontal asymptote: x = 3 o domain: (3, 0); range: (-00,00) horizontal asymptote: y = 3 o domain: (-0, 0); range: (-00,00) horizontal asymptote: None O domain: (-0, 0); range: (3, 0) horizontal asymptote: y = 3 O None of these
please explain each step, give all the reasoning, don’t just give the graph, I have already gotten the graph 1. Sketch the graph of the function that satisfies all the given conditions. (a) f"()>0 on (-0, -4) and (4,oo); f"(x) <0 on (-4,0) and (0,4); lim f()2, lim f(r) -2 ェ→00 (b) f(x) c0 on (-o,-3) and (0, 0) ()>0 on-3,0) f"(z) < 0 on (-00 ,-), f"(z) > 0 on (- 0) and (0,00) f,() = 0, f(-2)--21, f(0)...
12. (20 points) Sketch the graph of the function f(x) which satisfies the following conditions. Using interval notation list all intervals where the function f is decreasing, increasing, concave up, and concave down. List the x-coordinates of all local maxima and minima, and points of inflection Show asymptotes with dashed lines and give their equations. Label all important points on the graph. -1 2 a. f(x) is defined for all real numbers 2x b. f'(x) = c. f"(x) = (x-1)...