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(a) Estimate So sin(x + 1) dx by using either Simpson's Rule or Trapezoidal Rule with...
-4 using Estimate the minimum number of subintervals to approximate the value of 5 sin (x9)dx with an error of magnitude less than 2x 10 -6 a. the error estimate formula for the Trapezoidal Rule. b. the error estimate formula for Simpson's Rule. The minimum number of subintervals using the trapezoidal rule is (Round up to the nearest whole number.) The minimum number of subintervals using Simpson's rule is (Round up to the nearest even whole number.) -4 using Estimate...
J(se.7)dt Estimate the minimum number of subintervals to approximate the value of with an error of magnitude less than 104 using a. the error estimate formula for the Trapezoidal Rule. b. the error estimate formula for Simpson's Rule The minimum number of subintervals using the Trapezoidal Rule is (Round up to the nearest whole number.) J(se.7)dt Estimate the minimum number of subintervals to approximate the value of with an error of magnitude less than 104 using a. the error estimate...
3 11 Use Simpson's rule with n=1 (so there are 2n = 2 subintervals) to approximate dx. 1 + x2 The approximate value of the integral from Simpson's rule is (Round the final answer to two decimal places as needed. Round all intermediate values to four decimal places as needed.) 5 Use Simpson's rule with n=4 (so there are 2n = 8 subintervals) to approximate OX dx and use the fundamental theorem of calculus to find the exact value of...
Estimate the error from the trapezoidal rule and Simpson's rule when finding an approximation to So Vædæ with 4 equally spaced subintervals of (0,1).
estimaye error from trapezoidal rule & simpson Estimate the error from the trapezoidal role and Simpson's rule when finding an approximation Soux dx with 4 equally spaced subintervals [0, 1]
5 AY Estimate the minimum number of subintervals to approximate the value of (31° + 5t) dt with an error of magnitude less than 10 a. the Trapezoidal Rule. b. Simpson's Rule. a. The minimum number of subintervals using the Trapezoidal Rule is (Round up to the nearest whole number.)
Estimate the error from the trapezoidal rule and Simpson's rule when finding an approximation So væde with 4 equally spaced subintervals of (0,1). to
Use the Trapezoidal Rule, the Midpoint Rule, and Simpson's Rule to approximate the given integral with the specified value of n. (Round your answers to six decimal places.) 1/2 0 10 sin(x2) dx, n = 4
7 Use Simpson's rule with n=1 (so there are 2n = 2 subintervals) to approximate 8 dx. The approximate value of the integral from Simpson's rule is (Round the final answer to two decimal places as needed. Round all intermediate values to four decimal places as needed.)
Let x In I dx. a) Find the exact value of 1 b) Use composite trapezoidal rule with n = 4 subintervals to approximatel. Calculate the exact error c) Use composite simpson's rule with n = 4 subintervals to approximatel. Calculate the d) Use composite simpson's rule with n = 6 subintervals to approximate I. Calculate the exact error exact error