Problema Given that the Taylor series for r1-0-ry2 s Σ(k + 1)r*. answer the following questions. ...
Solve the taylor series and include every steps.
I. (a) Use the root test to find the interval of convergence of Σ(-1)4. (b) Demonstrate that the above is the taylor series of _ by writing a formula for f via taylors theorem at a = 0. That is write /(z) = P(z) + R(z) where P(z) is the nth order taylor polynonial centered at a point α and the remainder term R(r)- sn+(e)(-a)t1 for some e 0 O. Show that...
Solve the Taylor Series.
1. (a) Use the root test to find the interval of convergence of-1)* に0 (b) Demonstrate that the above is the taylor series of f()- by writing a formula for f via taylor's theorem at α-0. That is write f(x)-P(z) + R(x) where P(r) is the nth order taylor polynomial centered at a point a and the remainder term R(x) = ((r - a)n+1 for some c between z and a where here a 0. Show...
Please answer all the questions, don't just answer one please
answer all of them and show all the steps
11. (a) Use known scries to obtain the Maclaurin series (that is, the Taylor series Express your answer using summation 509 centered at 0) for() (b) Use your answer to part (a) to obtain the Maclaurin series for g(r) arctan(r) (a) Write the first three nonzeTo terms of the Maclaurin series of sin(r). 8. (b) Write the first three nonzero terms...
Problem 2 Statement: We know that the binomial series k k(k-1) k1 2)(k -n+1 n=0 converges for l < 1. (a) Use the binomial series to find the Taylor series for f(x)Va centered at z 16. What is the radius 16+ ( 16). of convergence R for your Taylor series? Hint:
Problem 2 Statement: We know that the binomial series k k(k-1) k1 2)(k -n+1 n=0 converges for l
For each of the following functions indicate the matching Taylor Series centered at r=0. 1) sin(2) 2) cos(2) 3) 4) e 5) 1.2 6) D 7) 12:22 8) - In(1 - 1) 9) e--- 10) S* cos(t)dt Taylor Series Choices: a) § 3 b) (-1)=-17 c) Š(-1)" N=0 no NEO d) nr-1 e) Σα" f) 2.2 no n=0 g) 2nx2n-2 h) (-1)" (an+1)+(2n) 4+1 i) (-1)n-1 nel n=0 n=0 j) (-1)" (2n+1)! 2+1 k) § 21 k) 2ne2n-1 1) (-1)"?"...
Determine whether the following series converges. Justify your answer. Σ 2 (k+5)3 k= 1 Select the correct choice below and fill in the answer box to complete your choice. (Type an exact answer.) O A. The series is a p-series with p= so the series converges by the properties of a p-series. OB. The series is a geometric series with common ratio so the series converges by the properties of a geometric series. OC. The series is a p-series with...
1. (Exercise 4.10, modified) Given a series Σ 1 ak with ak 0 for all k and lim Qk+1 k0oak we will prove that the series converges absolutely. (This is part of the ratio test sce the handout.) (a) Fix a valuc q with r <<1. Use the definition of r to prove that there exists a valuc N such that for any k 2 N. (b) Prove that Σο, laNIqk-1 converges, where N is the value from part (a)....
1. Answer the following questions. Justify your answers. a. (8pts) Find the Taylor series for f(x) = (5x centered at a = 1 using the definition of the Taylor series. Also find the radius of convergence of the series. b. (8pts) Find a power series representation for the function f(x) = 1 5+X C. (4pts) Suppose that the function F is an antiderivative of a function f. How can you obtain the Maclaurin series of F from the Maclaurin series...
part e and f
0 for all k E N and Σ at oo. For each of the following, either prove that the given series con- 4. Suppose ak verges, or provide an example for which the series diverges. ak 1 + at ar ai ak
0 for all k E N and Σ at oo. For each of the following, either prove that the given series con- 4. Suppose ak verges, or provide an example for which the series...
Whats the answer to number
1?
1. Let r(t) = -i-e2t j + (t? + 2t)k be the position of a particle moving in space. a. Find the particle's velocity, speed and direction at t = 0. Write the velocity as a product of speed and direction at this time. b. Find the parametric equation of the line tangent to the path of the particle at t = 0. 2. Find the integrals: a. S (tezi - 3sin(2t)j + ick)...