Power Series Expansion for Real Area Hyperbolic Sine

Theorem
The (real) area hyperbolic sine function has a Taylor series expansion:

Proof
We have:

for $-1 < x < 1$.

From Power Series is Termwise Integrable within Radius of Convergence, $(1)$ can be integrated term by term:

We will now prove that the series converges for $-1 \le x \le 1$.

By Stirling's Formula:

Then:

Hence by Convergence of P-Series:


 * $\ds \sum_{n \mathop = 1}^\infty \frac 1 {n^{3/2} }$

is convergent.

So by the Comparison Test, the Taylor series is convergent for $-1 \le x \le 1$.

Now we consider:

Also see

 * Power Series Expansion for Real Area Hyperbolic Cosine
 * Power Series Expansion for Real Area Hyperbolic Tangent
 * Power Series Expansion for Real Area Hyperbolic Cotangent
 * Power Series Expansion for Real Area Hyperbolic Secant
 * Power Series Expansion for Real Area Hyperbolic Cosecant