How to prove that coefficients of Maclaurin series of \frac{\arccos(1-2x)}{\sqrt{x}}

Ingrid Senior

Ingrid Senior

Answered question

2022-02-27

How to prove that coefficients of Maclaurin series of arccos(12x)x decrease as polynomial degree increases?

Answer & Explanation

an2gi2m9gg

an2gi2m9gg

Beginner2022-02-28Added 9 answers

This was done before the edit of the question
f(x)=cos1(12x)x=1cos[f(x)]2=hav[f(x)]
where appears the haversine function which is one of the many trigonometric functions.
So, basically, you are looking for the Taylor expansion of its inverse.
hav1(z)=2sin1(z)
and everything becomes simpler
hav1(x)=n=0(2nn)22n1(2n+1)xn+12
an=(2nn)22n1(2n+1)an+1an=(2n+1)22(2n2+5n+3)
=16n+52(2n2+5n+3)

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