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Help please !!! answer all questions. thank u so much~! 1 Estimate the area under the graph of f(x) rectangles and right endpoints. over the interval [0, 4] using five approximating x +4 Rn = Repeat the approximation using left endpoints. Ln= Report answers accurate to 4 places. Remember not to round too early in your calculations. Using Left Endpoint approximation, complete the following problems. Approximate the area under the curve f(x) = – 0.4x2 + 22 between x =...
Approximate the area under a curve using left-endpoint approximation Question Given the graph of the function f(a) below, use a left Riemann sum with 4 rectangles to approximate the integral So f(x) dr. 00 7 6 5 4 3 N 1 2 3 Select the correct answer below: BI Ne
4. Suppose you approximate the area under f(x) = sin(x)+2 on the domain sxs with n=4 rectangles, using right endpoints. Hint- Be sure your calculator is in radian mode. a. Find the width of each rectangle. b. What are the x-values of the right endpoints that you will need? c. Draw a sketch of this function and the 4 right rectangles. d. How will this approximation of the area under the curve compare to the actual area under it? (You...
Please answer with work Graph the function f(x) over the given interval. Partition the interval into 4 subintervals of equal length. Then add to 4 your sketch the rectangles associated with the Riemann sum f(ck) Axk, using the indicated point in the kth k=1 subinterval for ck. Then approximate the area using these rectangles. 20) f(x) = cos x + 4, [0, 2TT), right-hand endpoint a) Graph: 2 7 22 b) What is the right Riemann sum from 0 to...
please do not answer question if unsure & show work, first question must bw written as a fraction Approximate the area under the parabola y = 16 - x? from 0 to 4, using six equal subintervals. The approximate area is (Simplify your answer.) 2 Approximates 2x dx using three equal subintervals. - 1 An approximation for the integral using three equal subintervals is . (Type an integer or decimal rounded to three decimal places as needed.)
5. Consider the area under the curve f(x)-on the interval [1.4), (a) Sketch the curve and identify the area of interest. (b) Approximate the area using a right-hand Riemann sum with three rectangles. (c) Find the exact area under the curve. We were unable to transcribe this image 5. Consider the area under the curve f(x)-on the interval [1.4), (a) Sketch the curve and identify the area of interest. (b) Approximate the area using a right-hand Riemann sum with three...
Need help with #9 and #10 Question 9 B0/1 pt 1099 Details 1 Approximate dx using the midpoint rule with In(x) five subdivisions to four decimal places. es, The approximation is: Question Help: Message instructor Submit Question Question 10 B0/1 pt 3 10 399 Details Use Simpson's Rule and all the data in the following table to estimate the value of the integrat ]," f(a)dz. f(x) 9 6 10 х 9 11 13 15 17 19 21 4 2 1...
Please show all work and answer 5) For each of the integrals in problems a c below, first sketch the corresponding area, and then approximate the area using the right and left endpoint approximations and the Trapezoid Rule, all with n = 4 . From your sketch alone determine if each approximation is an overestimate, an underestimate, or if there is not enough information to tell. Finally determine the value of n for which the Simpson Rule would approximate the...
6. [10 pts] The table below gives the values of a function f(x, y) on the square region R-[0,4] x [0,4]. -2-4-3 You have to approximate f(r, y) dA using double Riemann sums. Riemann sum given (a) What is the smallest AA ArAy you can use for a double the table above? (b) Sketch R showing the subdivisions you found in part (a). (e) Give upper and lower estimates of y) dA using double Riemann sums with subdivisions you found...
10. Trapezoidal Rule is used to approximate the integral f(a) dx using 1- (yo +2y1 + 2y2 + x-na b-a + 2yn-1 +%),where Use this approximation technique to estimate the area under the curve y = sinx over。 a. π with n 4 partitions. x A 0 B: @ Δy B-A b. The error formula for the trapezoidal rule is RSL (12ba)1 where cischosen on the interval [a, b] to maximize lf" (c)l. Use this to compute the error bound...