Calculus

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1. Quick calc question

   Write the Riemann sum to find the area under the graph of the function f(x) = x2 from x = 1 to x = 5. 1. the summation from i equals 1 to n of the product of the quantity squared of 1 plus 5 times i over n and 4 over n 2. the

2. Calculus

   Use midpoints to approximate the area under the curve (see link) on the interval [0,1] using 10 equal subdivisions. imagizer.imageshack.us/v2/800x600q90/707/5b9m.jpg 3.157---my answer (but I don't understand midpoints) 3.196 3.407

3. Calculus

   Write the Riemann sum to find the area under the graph of the function f(x) = x4 from x = 5 to x = 7.

4. Calculus

   Use this definition with the right endpoints to find an expression for the area under the graph of f as a limit. Do not evaluate the limit. f(x)= 3+sin^2(x) 0

1. Calculus integrals

   Find the value of the right-endpoint Riemann sum in terms of n f(x)=x^2 [0,2]

2. hi calculus asap

   the graph of a piecewise linear function f, for -1

3. Calculus

   1. The function is continuous on the interval [10, 20] with some of its values given in the table above. Estimate the average value of the function with a Left Hand Sum Approximation, using the intervals between those given

4. Calculus

   1. The graph of f ′′(x) is continuous and decreasing with an x-intercept at x = –3. Which of the following statements must be true? A. The graph of f is always concave down. B. The graph of f has an inflection point at x =

1. Calculus

   The area A of the region S that lies under the graph of the continuous function is the limit of the sum of the areas of approximating rectangles. A = lim n → ∞ [f(x1)Δx + f(x2)Δx + . . . + f(xn)Δx] Use this definition to

2. Gr.11 - Rational functions graphing.

   1. Identify a rational function whose graph is a horizontal line except for two holes. Graph the function. 2. Identify a rational function who graph lies entirely above the x-axis and has a single vertical asymptote. Graph the

3. Calculus

   The graph of a function f is shown. Let g be the function that represents the area under the graph of f between 0 and x. (a) Use geometry to find a formula for g(x). (b) Verify that g is an antiderivative of f and explain how this

4. Calculus

   f is a differentiable function on the interval [0, 1] and g(x) = f(2x). The table below gives values of f '(x). What is the value of g '(0.1) x| .1 .2 .3 .4 .5 f'(x)| 1 2 3 -4 5 So I know f(x) would be the integral of f'(x) which

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