its asking to use the alternating series estimation theorem 12. Use the inequality in (2) to...
is the answer 5 or more terms? Use the alternating series estimation theorem to determine how many terms should be used to estimate the sum of the entire series with an error of less than 0.001. (-1)"337. n=1 n+5 or more terms should be used to estimate the sum of the entire series with an error of less than 0.001.
Use the alternating series estimation theorem to determine how many terms should be used to estimate the sum of the entire series with an error of less than 0.001 1 (-1)n +1 3 n=1 26n n + or more terms should be used to estimate the sum of the entire series with an error of less than 0.001
Use the Alternating Series Estimation Theorem to estimate the error that results from replacing e^-x by 1-x+ (x^2)/2 when 0< x < 0.5 please show work
5) a) Use the alternating estimation theorem to give the maximum error for approximating sin 3 using a third degree Maclaurin polynomial for sin a. b) Use Taylor's inequality to estimate the accuracy of a fourth degree Taylor polynomial for sin a centered atfor 0 s a s 5) a) Use the alternating estimation theorem to give the maximum error for approximating sin 3 using a third degree Maclaurin polynomial for sin a. b) Use Taylor's inequality to estimate the...
16) Approximate the definite integral using power series. If the antiderivative obtained is an alternating series, use the Alternating Series Estimation Theorem to ensure the error is less than 0.001; otherwise, use at least four nonzero terms to approximate the integral. (a) { er at 6) ſ'cos(x) dx
The series converges by the Alternating Series Test. Use Theorem 9.9: Error Bounds for Alternating Series to find how many terms give a partial sum, Sn, within 0.01 of the sum, S, of the series. -1 I n Theorem 9.9: Error Bounds for Alternating Series Let n = Σ Suppose that 0 < an+1 < an for all n and limn-too an-0. Then (- 1)i-lai be the nth partial sum of an alternating series and let S = lim Sn....
Use the Alternating Series Remainder Theorem to determine the smallest number of terms required to approximate the sum of the series with an error of less than 0.00 (-1) + 1 11 5 X
Use the Alternating Series Remainder Theorem to determine the smallest number of terms required to approximate the sum of the series with an error of less than 0.001.
Question 11 0/5 points n+1 satisfies all requirements of the Alternating Series Test. (You don't It 2n=1 have to check that - trust me on this one.) (2n+1) (a) Use a calculator to evaluate the partial sum S3 of this series. Give the answer rounded to four decimal places. (b) Estimate the error of using S3 as an approximation to the sum of the series, i.e. estimate the remainder R3. Recall that the remainder estimate of the Alternating Series Test...
The Alternating Series Test and convergence. 8 = angle Pod sino g 3! as 3! a 7 " Functions can often be represented by an infinite series. A series reprezentation can help to solve differential equations, to fin derivatives, or to compute integrals involving the function. Computers also use these series representations to perform calculations. For example sin (0) 0 +... allows a calculator to give a decimal approximation of values of sine. Click here to access the Exo ore...