Graph the function. Then estimate any relative extrema. f(x) = - x - 5x + 49x + 122x -315x - 900x +5,000 X = [- 10,10] X = [- 10,10] X = [ - 10,10] X = [ - 10,10] Y = [-10000,10000] Y = [0,6000] Y = [- 30000,40000] Y = [- 40000,30000] Estimate any relative maxima. Select the correct choice below and, if necessary, fill in the answer box to complete your choice. O A. (Round to three decimal places as needed. Use a comma to separate answers as needed. Type an ordered pair.) O B. There are no relative maxima.Graph the function. Then estimate any relative extrema. 6 f(x) = -x - 5x + 49x + 122x -315x - 900x + 5,000 OA. O B. c. O D. 40080 20909 2080 X = [ - 10,10] X = [- 10,10] X = [- 10,10] X = [ - 10,10] Y = [-10000,10000] Y = [0,6000] Y = [- 30000,40000] Y = [- 40000,30000] Estimate any relative maxima. Select the correct choice below and, if necessary, fill in the answer box to complete your choice. O A.View an example | All parts showing Graph the function. Then estimate any relative extrema. f(x) = - 3x - 8x + 108x#+ 200x"- 700x- - 1000x + 1,000 Recall the definition of a relative maximum. Let I be the domain of f. The value f(c) is a relative maximum if there exists within I an open interval I, containing c such that f(c) 2 f(x) for all x in ly . In other words, relative maxima correspond to "peaks" on the graph of f(x) The graph of f(x) is shown to the right. Note that there appear to be three relative maxima, which are 10000 O also shown to the right. Estimate the three relative maxima using a graphing utility. Rounding to three decimal places, the relative maxima are given below. ( - 5.137,9249.780), (- 0.625,1319.798), (4. 180,5956.106) X = [- 10,10] Y =[- 8000, 10000]View an example | All parts showing Graph the function. Then estimate any relative extrema. f(x) = - 3x - 8x + 108x#+ 200x" - 700x- - 1000x + 1,000 . . . Recall the definition of a relative minimum. Let I be the domain of f. The value f(c) is a relative minimum if there exists within I an open interval I, containing c such that f(c)