Use the Taylor Polynomial of degree 4 for ln(1 − 4?)to approximate the value of ln(2)

approximate the value of ln(5.3) using fifth degree taylor polynomial of the function f(x) = ln(x+2)....

approximate the value of ln(5.3) using fifth degree taylor polynomial of the function f(x) = ln(x+2). Find the maximum error of your estimate. I'm trying to study for a test and would be grateful if you could explain your steps. Saw comment that a point was needed but this was all that was provided

approximate the function f(x)= 1/sqrt(x) by a taylor polynomial with degree 2 and center a=4. how...

approximate the function f(x)= 1/sqrt(x) by a taylor polynomial with degree 2 and center a=4. how accurate is this approximation on the interval 3.5<x<4.5?

1. Find the Taylor polynomial, degree 4, T4, about 1/2 for f (x) = tan-inv (x)...

1. Find the Taylor polynomial, degree 4, T4, about 1/2 for f (x) = tan-inv (x) and use it to approximate tan-inv (1/16). 2. Find the taylor polynomial, degree 4, S4, about 0 for f (x) = tan-inv (x) and use it to approximate tan-inv (1/16). 3. who provides the best approximation, S4 or T4? Prove it.

let f(x)=cos(x). Use the Taylor polynomial of degree 4 centered at a=0 to approximate f(pi/4)

let f(x)=cos(x). Use the Taylor polynomial of degree 4 centered at a=0 to approximate f(pi/4)

1- Please explain the difference between a Taylor Polynomial of degree 4 and a Taylor Polynomial...

1- Please explain the difference between a Taylor Polynomial of degree 4 and a Taylor Polynomial of degree 100. How would they be different from each other? Assuming your computer has the specs to handle either with ease, which is going to be the more desirable one to utilize and why?

i) Approximate the function f(x) = cos x by a Taylor polynomial of degree 3 at...

i) Approximate the function f(x) = cos x by a Taylor polynomial of degree 3 at a = π/3 ii) What is the maximum error when π/6 ≤ x ≤ π/2? (this is the continuation of part i))

1. Use a definition of a Taylor polynomial to find the Taylor polynomial T2(x) for f(x)...

1. Use a definition of a Taylor polynomial to find the Taylor polynomial T2(x) for f(x) = x^3/2 centered at a = 4. We use T1(3.98) to approximate (3.98)^3/2. Apply Taylor’s inequality on the interval [3.98,4.02] to answer the following question: can we guarantee that the error |(3.98)^3/2 −T1(3.98)| of our approximation is less than 0.0001 ?

Use a 2nd order Taylor polynomial centered at x = 4 to approximate √4.001 You can...

Use a 2nd order Taylor polynomial centered at x = 4 to approximate √4.001 You can leave your answer as the sum or difference of fractions.

Use Taylor Series to estimate the value of ln(3.4) knowing that the value of ln(1)=0 ,Perform...

Use Taylor Series to estimate the value of ln(3.4) knowing that the value of ln(1)=0 ,Perform the calculations until the 4th order term of the series. At each step of your calculation, find the relative approximate error.

Find the Taylor degree 4 polynomial of ? (?) = −? ∗ ??? (?) centered on...

Find the Taylor degree 4 polynomial of ? (?) = −? ∗ ??? (?) centered on 0 and find the interval for which the approximation has a smaller error or than a. ???.