Taylor series of x22-1+cosx using power series operations

Answered question

2022-03-31

Taylor series of x22-1+cosx using power series operations

Answer & Explanation

alenahelenash

alenahelenash

Expert2023-04-26Added 556 answers

To find the Taylor series of the function f(x) = x^2/2 - 1 + cos x, we can use the formula for the Taylor series:
f(x)=n=0f(n)(a)n!(xa)n
where f^(n)(a) denotes the nth derivative of f evaluated at x=a.
First, let's find the derivatives of f(x):
f(x)=xsinx
f(x)=1cosx
f(3)(x)=sinx
f(4)(x)=cosx
f(n)(x)={sinxn=3+4kcosxn=4k0otherwise
where k is a non-negative integer.
Next, let's evaluate these derivatives at x=0:
f(0)=0221+cos0=12+1=12
f(0)=0sin0=0
f(0)=1cos0=0
f(3)(0)=sin0=0
f(4)(0)=cos0=1
f(n)(0)={0n=0,1,2,3(1)kn=4k0n=4k+1,4k+2,4k+3
where k is a non-negative integer.
Now we can substitute these values into the Taylor series formula to get:
f(x)=12+k=1(1)k(4k)!x4k
Therefore, the Taylor series of f(x) is f(x)=12+k=1(1)k(4k)!x4k.

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