Problem Statement: Let f(x) = V1 + x. Back in our first semester of calculus, we...
2. Since it is difficult to evaluate the integral dr exactly, we will approximate it using Maclaurin polynomials (a) Determine P4(x), the 4th degree Maclaurin polynomial of the integrand e". (b) Obtain an upper bound on the error in the integrand for r in the range 0-x 1/2, when the integrand is approximated by Pi(x). (c) Find an approximation to the original integral by integrating P4(r (d) Obtain an upper bound on the error in the integration in (c) (e)...
2. Since it is difficult to evaluate the integral / e dx exactly, we will approximate it using Maclaurin 0 polynomials (a) Determine Pa(x), the 4th degree Maclaurin polynomial of the integrand e (b) Obtain an upper bound on the error in the integrand for a in the range 0 S x 1/2, when the integrand is approximated by Pi (r) (c) Find an approximation to the original integral by integrating Pa(x) (d) Obtain an upper bound on the error...
Compute the Taylor polynomial indicated f(x)-V1 a 8 3888 Use the error bound to find the maximum possible size of the error. (Round your answer to five decimal places.) lva02-ncs.oz기 s-x 10-12 T3(8.02) S Compute the Taylor polynomial indicated f(x)-V1 a 8 3888 Use the error bound to find the maximum possible size of the error. (Round your answer to five decimal places.) lva02-ncs.oz기 s-x 10-12 T3(8.02) S
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...
Sec6.5: Problem 6 Previous Problem List Next (2 points) Book Problem 17 4, to approximate the integral 7e dx (a) Use the Midpoint Rule, with n MA (Round your answers to six decimal places.) (b) Compute the value of the definite integral in part (a) using your calculator, such as MATH 9 on the TI83/84 or 2ND 7 on the TI-89. 7edx (c) The error involved in the approximation of part (a) is Ем — Те ах Ма (d) The...
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...
8. (13 points) Let g(x) = /3 + x2. (a) Find Ti (r), the first Taylor polynomial for g(x) based at b 1 (b) Use your answer to (a) to approximate the value of 3.25 (c) Use Taylor's inequality to find an upper bound for the error in your approximation in part (b) 8. (a) Ti(r)2 +3(x - 1) (b) 3.25 g(0.5) Ti(0.5) = 1.75 (c) HINT: |g"(x)| = 3 + x2)3/2° This is positive and decreasing on [0.5, 1]....
Let f(x) = cos(x2). Use (a) the Trapezoidal Rule and (b) the Midpoint Rule to approximate the integral ſo'f(x) dx with n = 8. Give each answer correct to six decimal places. To Mg = (c) Use the fact that IF"(x) = 6 on the interval [0, 1] to estimate the errors in the approximations from part (a). Give each answer correct to six decimal places. Error in Tg = Error in Mg = (d) Using the information in part...
1. Linear Approximation First, read Section 4.1 and the lecture notes of days 16 and 17. The steps for linear approximation of are as follows 1. Choose an objective function f whose value at r we want to estimate and choose a center value a closed to r 2. Compute the linearization L(x) - f(a)f'(a) (z - a) of the objective function 3. Compute L(x) to get the required approximation 4. Compute the second derivative and decide whether the linear...
2. Inorder for your phone to calibrate, it's important to have a good idea of how different T and T really are but also to be able to do that on the fly, without too much computation TO do this, we'll use linear approx inution. Specifically, we'll letェ= u2/02, so that and then approximate the function 1/V1-2. (a) Calculate the equation of the tangent line to the function f(z) = atェ= 0. (b) Use the tangent line to approximate the...