The second-order Taylor polinomial for the function about is . Using the given Taylor polinomial approximate f(1.05) with 2-digits rounding and find the relative error of the cobtained value (Note f(0.05)= 1.0759). Write down the answer and all the calculations steps in the text field below.(numerical analysis question)
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The second-order Taylor polinomial for the function about is . Using the given Taylor polinomial approximate f(1.05) with...
Find the second Taylor polynomial P2(x) for the function f(x) = ex cos x about xo = 0. Using 4-digit rounding arithmatic. (a). Use P2(0.7) to approximate f(0.7). (b). Find the actual error. (c). Find a bound for the error |f(x) – P2(x) in using P2(x) to approximate f(x) on the interval [0, 1].
Question 1 (20 Points) Find the second Taylor polynomial P2(x) for the function f(x) = ex cos x about Xo = 0. Using 4-digit rounding arithmatic. (a). Use P2(0.7) to approximate f(0.7). (b). Find the actual error. (c). Find a bound for the error f(x) - P2(x) in using P2(x) to approximate f(x) on the interval [0, 1].
Write the Taylor series expansion for the following function up to the second order terms about point (1,1). Then, compare approximate and exact values of the function at (1.2,0.8). f(x1, x2) = 10x1 – 20x{x2 + 10xż + x– 2x1 + 5
4. Given a function f(x), use Taylor approximations to derive a second order one-sided ap- proximation to f'(ro) is given by f(zo + h) + cf (zo + 21) + 0(h2). f' (zo) = af(xo) + What is the precise form of the error term? Using the formula approximate f' (1) where r) = e* for h 1/(2p) for p = 1 : 15, Form a table with columns giving h, the approximation, absolute error and absolute error divided by...
2 1. The Taylor series for a function f about x =0 is given by k=1 Ikitt (a) Find f(")(). Show the work that leads to your answer. (b) Use the ratio test to find the radius of convergence of the Taylor series for f about x=0. c) Find the interval of convergence of the Taylor series of f. (a) Use the second-degree Taylor polynomial for f about x = 0 to approximate s(4)
4. a) Find a second order Taylor ser XN-[ 1]Tand then use it to find an approximate value of fX) at Note: the superscript "T" denotes the transpose of the vector) ies approximation of the following function about the point, a X - [0.8 1.2]. b) Consider the following multivariable cost function: f(X) (a x)(bx) where "a" and "b" denote nx1 constant vectors and X is a nx1 vector of decision variables. Find the gradient vector and Hessian matrix of...
The nth-order Taylor polynomial for a function f(x) using the h notation is given as: Pa (x + h) = f(x) + f'(a)h + salt) 12 + () +...+ m (s) n." The remainder of the above nth-order Taylor polynomial is defined as: R( +h) = f(n+1)(C) +1 " hn+1, where c is in between x and c+h (n+1)! A student is using 4 terms in the Taylor series of f(x) = 1/x to approximate f(0.7) around x = 1....
4. [MT, p. 166] Determine the second-order Taylor formula for the given function about the given point (xo, yo). (a) f(x,y) = (x+y, where to = 0, yo = 0. (b) f(x, y) = sin(xy) + cos(x), where xo = 0, yo = 0.
Exam 2018s1] Consider the function f R2 R, defined by f(x,y) =12y + 3y-2 (a) Find the first-order Taylor approximation at the point Xo-(1,-2) and use it to find an approximate value for f(1.1,-2.1 (b) Calculate the Hessian 1 (x-4)' (Hr(%)) (x-%) at X-(1-2) c) Find the second-order Taylor approximation at xo- (1,-2) and use it to find an approximate value for f(1.1,-2.1 Use the calculator to compute the exact value of the function f(11,-2.1) Exam 2018s1] Consider the function...
Question No.8 (a) Find the third-degree Taylor polynomial for f() = r3+7x2-5r1 about 0. What did you notice? (b) Use a calculator to calculate sin(0.1) cos(0.1). Now, using the second order Taylor polynomial, give an estimate for sin(0.1)+cos(0.1). Estimate the expression using the third-order Taylor polynomial, and compare the two approximations. Note that your estimates should be rounded to seven digits after the decimal place. same Question No.8 (a) Find the third-degree Taylor polynomial for f() = r3+7x2-5r1 about 0....