The function $y = x^{x}$ $y = x^x$ is differentiable at x = 1/e, What is the Taylor series ( if any ) for y, about x = 1/e?

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The function $y = x^{x}$ $y = x^x$ is differentiable at x = 1/e, What is the Taylor series ( if any ) for y, about x = 1/e?

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Answer 1 · 2016-08-27T09:21:25

The function $x^{x}$ $x^x$ appears to be a constant, in an infinitesimal) interval $x \in (\frac{1}{e} - \in, \frac{1}{e} + \in)$ $x in (1/e-in, 1/e+in)$ .

Explanation:

At x = 1/e, y = ${(\frac{1}{e})}^{\frac{1}{e}}$ $(1/e)^(1/e)$ , and this is also transcendental.

It is easy to prove that the derivatives of all orders vanish at x = 1/e.

So, the function should behave as

$y = {(\frac{1}{e})}^{\frac{1}{e}}$ $y=( 1/e)^(1/e)$

in an infinitesimal neighborhood

$x \in (\frac{1}{e} - \in, \frac{1}{e} + \in)$ $x in(1/e-in, 1/e+in)$

The graph of $y = x^{x}$ $y = x^x$ is having a multiple (?) -point

contact, with the bracing tangent

$y = {(\frac{1}{e})}^{\frac{1}{e}}$ $y = (1/e)^(1/e)$ ,

at $(\frac{1}{e}, {(\frac{1}{e})}^{\frac{1}{e}})$ $(1/e, (1/e)^(1/e))$ .

In my opinion, this contact is transcendental..

.

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The function $y = x^{x}$ $y = x^x$ is differentiable at x = 1/e, What is the Taylor series ( if any ) for y, about x = 1/e?

1 Answer

Explanation:

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The function $y = x^{x}$ $y = x^x$ is differentiable at x = 1/e, What is the Taylor series ( if any ) for y, about x = 1/e?