Question

For the function f(x) = ln(4x), find the 3rd order Taylor Polynomial centered at x = 2.

Answer #1

find the 6th order taylor polynomial for f(x) = xsin(x^2)
centered at a=0.

Find the Taylor polynomial of degree 3, centered at a=4 for the
function f(x)= sqrt (x+4)

PART A: Find the Taylor series for ln x
centered at x = 5
PART B: Find the second degree Taylor
polynomial for f (x) = arctan x centered at x = 0

Find the degree 3 Taylor polynomial T3 (x) centered
at a = 4 of the function f(x) = (-7x+36)4/3

(1 point) Find the degree 3 Taylor polynomial T3(x) centered
at a=4 of the function f(x)=(7x−20)4/3.
T3(x)=
? True False Cannot be determined The function f(x)=(7x−20)4/3
equals its third degree Taylor polynomial T3(x) centered at a=4.
Hint: Graph both of them. If it looks like they are equal, then do
the algebra.

Find a Taylor series centered at c for f(x) = ln(x^2), c=1

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

Find the taylor series for f(x) = ln (1-x) centered at x = 0,
along with the radius and interval of convergance?

Find the 4th degree, T4 taylor polynomial for f(x)=arctan (x)
centered at c=1/2 and use it to aproximate f(x)= arctan
(1/16)

find the taylor series of ln 2x centered at x=2

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