14 3. . a. Using Simpson's Rule (n-6). approximatevx +1 de b. Determine the upper bound on the error in part a. Hint56r - 80) dx 16(r 1) If the absolute error in the approximation of the inte...
FEEDBACK Content attribution QUESTION 14 . 1 POINT Using Simpson's rule with 6 subintervals, determine an upper bound for the error in estimating (3x + 2x²) dx. Provide your answer below: FEEDBACK Content attribution SUBMIT
4. Consider using the Simpson's 1/3 rule to estimate the following integral I[cos(x 3)l dx (a) Find the approximate values of 1 when the step size h-: 2 and h 1 , respectively. (b) Find an upper bound of the step size h in order to guarantee that the absolute error (in absolute value) of the estimate is less than 0.001. Hint: 2 sin x cos x = sin (2x). I cos x I " The arguments of all trigonometric...
Consider the integral 8. eT dx Use Simpson's Rule with n = 6 to estimate the value of the integral. (a) (b) Your friend chose instead to estimate the integral above using the Midpoint Rule with n = 6, Noting that the second derivative: 4x2-4r +3)e z5/2 is an increasing function over the interval [1, 4], determine the maximum possible error in your friend's estimate Consider the integral 8. eT dx Use Simpson's Rule with n = 6 to estimate...
(a) Estimate So sin(x + 1) dx by using either Simpson's Rule or Trapezoidal Rule with n= 6 (Round the answer to 6 decimal places). (b) Estimate the minimum number of subintervals needed to approximate the integrals with an error of magnitude less than 10-4 by the rule you used in part (a).
Use the midpoint rule to calculate the absolute error of (8x? + 6) dx using 3 subintervals. Enter an exact value. Do not enter the answer as a percent. Provide your answer below:
Question 6 [10 marks a) Let f(x) = x for each xe [a,b]. Show that for any number of subintervals, the global error js(x)dx-SUS J) = 0. [6] Hint: Obtain the local error first and then calculate the global error. SCS ,h) denotes approximation using the composite Simpson's Rule. b) Determine the minimum number of subintervals so that the upper bound of the (absolute) global error for the composite Simpson's Rule applied to ja?-10x”) dx is less than 10%. [41...
Question involving Simpon's rule, Midpoint rule, and the error bound rule. How do I solve for b), d), and g)? Let f(x)-ecos(x) and 1 -Ís2π f(x) dx (a) Use M1o to approximate I to six decimal places. M17.95492651755339 (b) Use the fact that |f"(x)| e on [0, 2T to obtain an upper bound on the absolute error EM of the approximation from (a). Make sure your answer is correct to six decimal places EM0.16234848503 (c) Use Si0 to approximate I...
upson's Rule with n=4 #5 (9) Use Simpson's Rule wi intervals to estimate ex-l at 16 Find the exact value - A the error. drant of the integral linpartas) and the =0: #5, Use integration by. Seť Int de #7 (a) Evaluate St sin x cos x dic (6) If g(x) = 5 Je tidt, find g'(x) and g'(o). |#8 use partial fractions to find substitution to evaluate $3x(x-3) dx #0 (a). Find 52 sin o do (6) Find the...
Find the indicated Midpoint Rule approximation to the following integral. 12 S22 2x dx using n=1, 2, and 4 subintervals 4 12 The Midpoint Rule approximation of S xx? dx with n= 1 subinterval is (Round to three decimal places as needed.)
3. Evaluate the triple integral below (a) analytically, (b) using the composite trapezoidal rule with n 2, (c) a single application of Simpson's 1/3 rule, and (d) for each approximation, determine the true percent relative error based on (a). 2yz)dx dy dz 3. Evaluate the triple integral below (a) analytically, (b) using the composite trapezoidal rule with n 2, (c) a single application of Simpson's 1/3 rule, and (d) for each approximation, determine the true percent relative error based on...