Mathematics Calculus Taylor series expansion
1-Use Taylor series expansion (degree 0 to 6) about x’=pi/4 to find an approximation for f(x) = cosx at point x=pi/3 and then compare the result with the exact data.(show the results in a table).
Indicate your specific subject in the "School Subject" box, so those with expertise in the area will respond to the question.
answered by
PsyDAG
0
0
You can ask a new question or answer this question .
Similar Questions
Top answer:
The Taylor expansion abour x = pi/4 to sixth order is f(x) = f(pi/4) + f'(pi/4)*(x-pi/4) +
Read more.
Hello, I am learning about Taylor series in school, but they are quite confusing.. Can you please explain how I should do this
Top answer:
If "I know the series of sinx = x - ((x^3)/(3!)) + ((x^5)/(5!))-...+..." this is given, you only
Read more.
Top answer:
To find the Taylor series about 0 for the function f(x) = (1+x)^(-3/5), we can use the binomial
Read more.
Top answer:
Looks good, assuming your arithmetic is ok.
Read more.
Top answer:
thats wrong a) is 1+2x^2 I need help with the answering b if you don't mind
Read more.
Top answer:
To approximate the function f(x) = e^(2x^2) using a Taylor polynomial with degree n at the number a,
Read more.
Top answer:
To find the Taylor polynomial with degree n for the given function f(x) = e^(2x^2) at the number a =
Read more.
Top answer:
It turns out that if you had done your derivatives correctly, you would have found the rule: for
Read more.
Top answer:
Go to http://www.wolframalpha.com/input/?i=8ln%28sec%28x%29%29+ and scroll down a bit.
Read more.
Top answer:
To write the third degree Taylor polynomial for f about x=5, we need the values of f(5), f'(5),
Read more.
