-. The function f has derivatives of all orders for -1 << < 1. The derivatives...
4. The function f has derivatives of all orders for -1 << < 1. The derivatives of f satisfy the following conditions: -n. f(0) = 0 f(0) = 1 f(n+1) - f(n)(0) for all n > 1 The Maclaurin series for f converges to f(x) for all <1. (a) (5 points) Write the first four nonzero terms of the Maclaurin series for f. (b) (5 points) Determine whether the Maclaurin series described in part(a) converges abso- lutely, converges conditionally, or...
The function g has derivatives of all orders, and the Maclaurin series for g is Question 1 (5 points) Using the ratio test, determine the interval of convergence of the Maclaurin series for . Question 2 (2 points) The Maclaurin series for g evaluated at Z-可is an alternating series whose terms decrease in absolute value to 0. The approximation for g ( using the first two nonzero terms of this series is 120 Show that this approximation differs from 9...
Let f(z-y2 sin(x+-) Answer the following. Show and explain your work. (a) Find the Taylor polynomial of order 4. generated by f(x) at zo (b) Describe the MacLaurin series of f (with or without the sigma notation). (Hint: What pattern do the derivatives of f at z-0 follow?) (c) Does the MacLaurin series of f converges absolutely, converges conditionally or diverges at -1? Let f(z-y2 sin(x+-) Answer the following. Show and explain your work. (a) Find the Taylor polynomial of...
Suppose that a function f has derivatives of all orders at a. The the series Σ f(k) (a) 2(x - ak k! k=0 is called the Taylor series for f about a, where f(n) is the n th order derivative of f. Suppose that the Taylor series for e2x sin (x) about 0 is 20 + ajx + a2x2 + ... + agr8 + ... Enter the exact values of an and ag in the boxes below. 20 = ag...
Let f be a function having derivatives of all orders for all real numbers. Selected values of f and its first four derivatives are shown in the table above. (a) Write the second-degree Taylor polynomial for f about x = 0 and use it to approximate f(0.2). (b) Let g be a function such that g(x) =f(x3). Write the fifth-degree Taylor polynomial for g', the derivative of g, about x = 0. (c) Write the third-degree Taylor polynomial for f about x =...
a. Find the first four nonzero terms of the Maclaurin series for the given function. b. Write the power series using summation notation. c. Determine the interval of convergence of the series. f(x)=92 -2x a. The first nonzero term of the Maclaurin series is The second nonzero term of the Maclaurin series is The third nonzero term of the Maclaurin series is The fourth nonzero term of the Maclaurin series is b. Write the power series using summation notation. 00...
1. For each function: (a) Determine the first four nonzero terms of the Maclaurin series for f.). (b) Write the power series using summation notation. (c) Determine the interval of convergence of the series. (a) f(x) = In(+1) (b) f(x) = sin 3.0
10. (4 points) a. Use the Maclaurin series for function to find the first three nonzero terms of the Maclaurin series for the following function. b. Then use these terms (above) to approximate the integral 10.(4 points) a. Use the Maclaurin series for function f(x) = tan-?x to find the first three nonzero terms of the Maclaurin series for the following function g(x) = x tan-1x3. b. Then use these terms (above) to approximate the integral $0.5 x tan-1 x...
1/2 POINTS S CALL 9.5.210. State whether the series converges absolutely, conditionally, or not at all cos(n) The series converges absolutely The series converges conditionally. The series diverges.
15 4 23 Let fbe a function having derivatives of all orders for all real numbers. Selected values of fand its first four derivatives are shown in the table above. 6. a) Write the second-degree Taylor polynomial for faboutx0 and use it to approximate f(0.2). (b) Let g be a function such that g(x) -fx Write the fifth-degree Taylor polynomial for g', the derivative of g, about x = 0 We were unable to transcribe this image 15 4 23...