return this question to its initial state Consider the applet above. The blue graph shows the function f that is continuous on [7r,1r] and differentiable on (7r, 7r). Leta: 7randb=7r. Move the point along the graph to nd all the numbers c between a and b so that m = m; 1(a) List your answers:D [1 point) Find a point c satisfying the conclusion of the Mean Value Theorem for the function f(m) = w'4 on the interval [1, 8]. =8 Consider the function below defined on the indicted interval. f(z) = 12 - 12x + 25, [4, 8] Follow the steps below to determine if you can apply Rolle's Theorem. Part 1: Part 2: V Part 3: V Part 4: Find the the solutions to f' (x) = 0 on the interval [4, 8]. Answer:Consider the function f(x) = x2 - 4x + 3 on the interval [0, 4]. Verify that this function satisfies the three hypotheses of Rolle's Theorem on the inverval. f(x) is on [0, 4]; f(x) is on (0, 4); and f(0) = f(4) = Then by Rolle's theorem, there exists at least one value c such that f'(c) = 0. Find all such values c and enter them as a comma-separated list. Values of c = The answer to all questions is on this page.Consider the function below defined on the indicted interval. f(z) = -(2x + 12), [-2, 0] Follow the steps below to determine if you can apply Rolle's Theorem. Part 1: Part 2: Part 3: V Part 4: Find the the solutions to f'(x) = 0 on the interval [-2, 0]. Answer:Find all numbers c that satisfy the conclusion of the Mean Value Theorem for the following function and interval. Enter the values in increasing order and enter N in any blanks you don't need to use. f(x) = 12x2 + 8x +6, [-1, 1]. The answer to all questions is on this page. Note: You can earn partial credit on this problem.Consider the function f(x) = x2 + 4x + 4 defined on the interval [-4, -1]. Verify the Mean Value Theorem by finding all the numbers c on the interval [-4, -1] so that f'(c) = f(-1) - f(-4) b - aFind the critical points and determine if the function is increasing or decreasing on the given intervals. y = 3x4+ 6x3 Left critical point: c1 Right critical point: C2 - The function is: ? on ( -co, c1). ? on (C1, C2). ? on (C2, 00 ).Not Secure - webwork.bmcc.cuny.edu Motown My Citation B Welcome,-. WeBWork. Bb Assignmen.. Google Dich Tai lieu 2.d.. Tai ligu 2d Previous Problem Problem List Next Problem Results for this submission Entered Answer Preview Yes Yes Consider the function below defined on the indicted interval. f(I) = -(22 + 12), [-2, 0] Follow the steps below to determine if you can apply Rolle's Theorem. V Part 1: Part 2: Compute the indicated function values. f ( - 2 ) = [ f (0 ) = 0 Part 3 : Part 4: Note: You can earn partial credit on this problem. Preview My Answers Submit Answers You have attempted this problem 0 times. You have unlimited attempts remaining. DII DD 20 F10 F11 F12 E6 F7 F8 F3 F1 F2 A @ # 8 O O 3 5 N O P R T Y U W E D F G H C K SFind the critical point and determine if the function is increasing or decreasing on the given intervals. y = -22+2x+6 click here to read examples. Critical point: c = The function is: ? on (-co, c). ? on (c, co)