(1 point) Find the average value of : f(x) = 6/ on the interval [1, 36)....
6. Find the average value for of the function f(x) = cost over the interval [0.21] and find c such that f(c) equals the average value of the function over [0, 2x].
(1 point) Consider the function f(x) = on the interval [4,9]. Find the average or mean slope of the function on this interval. By the Mean Value Theorem, we know there exists a c in the open interval (4,9) such that f'(c) is equal to this mean slope. For this problem, there is only one c that works. Find it.
4. Let f(x) = (in x)? (a) Find the average value of f on the interval (1, e]. (Hint: use integration by parts.) (b) Find the value c such that f(c) equals the average value found in part (a).
10. -/1 POINTS TANAPCALC10 6.R.062. Find the average value of the function f(x) = V x2 + 36 over the interval [0, 8]. 114
Find the average value fave of the function f on the given interval. f(x) = x2/(x3 + 6)2, [-1, 1] fave =
(1 point) What is the average value of f(x) = x2 over the interval [5,6]?
Find the average value of the function on the given interval
f(x)=e^x/7
IN DECIMAL FORM
Find the average value of the function on the given interval. f(x)=eX/7: [0, 1] The average value is . (Round to three decimal places as needed.)
answer please
#6
for (a) Find the average value of f on the given interval. (b) Find c such that fave = f(c). (C) Sketch the graph of f and a rectangle whose area is the same as the area under the graph of f. 200 Sale 5. f(x) = (x – 3), [2,5] 6. f(x) = ln x, [1,3] an
(1 point) Let f(x) = xvx + 6. Answer the following questions. 1. Find the average slope of the function f on the interval [-6,0). Average Slope: m= 2. Verify teh Mean Value Theorem by finding a number c in (-6,0) such that '(c) = m. Answer: m20-mingla-0165 / application_-_mean_value_theorem / 2 Application - Mean Value Theorem: Problem 2 Next Problem Previous Problem Problem List (1 point) Consider the function f(x) = x2 - 4x + 9 on the interval...
(1 point) Suppose the average value of f(x) on the interval (5,9) is 65. Calculate s ro f(x) dx. The integral equals Suppose a car travels in a straight line at an average velocity of 65 miles per hour. How far does the car travel from 5:00pm to 9:00pm? The car travels miles.