Derivatives

The derivative of ${\frac {d}{dx}}x^{x}$

Question

What is ${\frac {d}{dx}}x^{x}$ ?

Solution 1

Let $y=x^{x}$ .
Take $\ln$ of both sides: $\ln y=x\ln x$ .
Differentiate both sides: ${\frac {d}{dx}}\ln y={\frac {d}{dx}}x\ln x$ .
Apply the chain rule on the left-hand side: ${\frac {d}{dx}}\ln y={\frac {1}{y}}\cdot {\frac {dy}{dx}}$ .
Apply the product rule on the right-hand side: ${\frac {d}{dx}}x\ln x=1\cdot \ln x+x\cdot {\frac {1}{x}}=\ln x+1$ .
Putting it together, we have ${\frac {1}{y}}\cdot {\frac {dy}{dx}}=\ln x+1$ .
Hence ${\frac {dy}{dx}}=y(\ln x+1)=x^{x}(\ln x+1)$ .

Solution 2

Note that $x=e^{\ln x}$ , so $x^{x}=(e^{\ln x})^{x}=e^{x\ln x}$ .
Applying the chain rule, ${\frac {d}{dx}}x^{x}={\frac {d}{dx}}e^{x\ln x}=e^{x\ln x}{\frac {d}{dx}}x\ln x$ .
Applying the product rule, ${\frac {d}{dx}}x\ln x=1\cdot \ln x+x\cdot {\frac {1}{x}}=\ln x+1$ .
Therefore ${\frac {d}{dx}}x^{x}=e^{x\ln x}(\ln x+1)=x^{x}(\ln x+1)$ .

Integrals

The integral $\int x^{x}\,dx$

Question

What is $\int x^{x}\,dx$ ?

Solution

We can write $x^{x}$ as $(e^{\ln x})^{x}=e^{x\ln x}$ .
Consider the series expansion of $e^{x\ln x}$ :

    $e^{x\ln x}=1+(x\ln x)+{\frac {(x\ln x)^{2}}{2!}}+{\frac {(x\ln x)^{3}}{3!}}+\ldots +{\frac {(x\ln x)^{i}}{i!}}+\ldots =\sum _{i=0}^{\infty }{\frac {(x\ln x)^{i}}{i!}}$ .

We can interchange the integration and summation (we can recognize this as a special case of the Fubini/Tonelli theorems) and write

    $\int x^{x}\,dx=\int \left(\sum _{i=0}^{\infty }{\frac {(x\ln x)^{i}}{i!}}\right)\,dx=\sum _{i=0}^{\infty }\left(\int {\frac {(x\ln x)^{i}}{i!}}\,dx\right)=\sum _{i=0}^{\infty }\left({\frac {1}{i!}}\int x^{i}(\ln x)^{i}\,dx\right).$

Limits

The limit of $\lim _{x\rightarrow 0^{+}}x^{x}$

Question

What is $\lim _{x\rightarrow 0^{+}}x^{x}$ ?

Solution

Note that $x=e^{\ln x}$ , so $x^{x}=(e^{\ln x})^{x}=e^{x\ln x}$ .
We can further rewrite this as $x^{x}=e^{x\ln x}=e^{\frac {\ln x}{\frac {1}{x}}}$ .
As long as $f$ is continuous and the limit of $g$ exists at the point in question, the limit will commute with composition:

    $\lim _{x\rightarrow t}f(g(x))=f(\lim _{x\rightarrow t}g(x)).$

In our case, $e(\cdot )$ is continuous, so

    $\lim _{x\rightarrow 0^{+}}x^{x}=e^{\lim _{x\rightarrow 0^{+}}{\frac {\ln x}{\frac {1}{x}}}}.$

The question, then, is what is $\lim _{x\rightarrow 0^{+}}{\frac {\ln x}{\frac {1}{x}}}$ .
As $x\rightarrow 0^{+}$ , $\ln x\rightarrow -\infty$ , ${\frac {1}{x}}\rightarrow +\infty$ . In this situation we can apply l'Hôpital's rule:

    $\lim _{x\rightarrow 0^{+}}{\frac {\ln x}{\frac {1}{x}}}=\lim _{x\rightarrow 0^{+}}{\frac {{\frac {d}{dx}}\ln x}{{\frac {d}{dx}}{\frac {1}{x}}}}={\frac {\frac {1}{x}}{-{\frac {1}{x^{2}}}}}={\frac {{\frac {1}{x}}\cdot x^{2}}{-{\frac {1}{x^{2}}}\cdot x^{2}}}=-x.$

Hence $\lim _{x\rightarrow 0^{+}}x^{x}=e^{0}=1$ .

The limits of $\lim _{x\rightarrow +\infty }x\sin {\frac {1}{x}}$ and $\lim _{x\rightarrow -\infty }x\sin {\frac {1}{x}}$

Question

What are $\lim _{x\rightarrow +\infty }x\sin {\frac {1}{x}}$ and $\lim _{x\rightarrow -\infty }x\sin {\frac {1}{x}}$ ?

Solution

Let us rewrite $x\sin {\frac {1}{x}}$ as ${\frac {\sin {\frac {1}{x}}}{\frac {1}{x}}}$ .
As $x\rightarrow +\infty$ , ${\frac {1}{x}}\rightarrow 0$ and $x\sin {\frac {1}{x}}\rightarrow 0$ .
We have " ${\frac {0}{0}}$ ", so we can apply l'Hôpital's rule.
Differentiating the numerator in ${\frac {\sin {\frac {1}{x}}}{\frac {1}{x}}}$ , we obtain $\left(\cos {\frac {1}{x}}\right)\left(-{\frac {1}{x^{2}}}\right)$ .
Differentiating the denominator in ${\frac {\sin {\frac {1}{x}}}{\frac {1}{x}}}$ , we obtain $-{\frac {1}{x^{2}}}$ .
Thus

    $\lim _{x\rightarrow +\infty }x\sin {\frac {1}{x}}=\lim _{x\rightarrow +\infty }{\frac {\sin {\frac {1}{x}}}{\frac {1}{x}}}=\lim _{x\rightarrow +\infty }{\frac {\left(\cos {\frac {1}{x}}\right)\left(-{\frac {1}{x^{2}}}\right)}{-{\frac {1}{x^{2}}}}}=\lim _{x\rightarrow +\infty }\cos {\frac {1}{x}}=1.$

Similarly we can find that $\lim _{x\rightarrow -\infty }x\sin {\frac {1}{x}}=1$ .

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Derivatives

The derivative of ${\frac {d}{dx}}x^{x}$

Question

Solution 1

Solution 2

Integrals

The integral $\int x^{x}\,dx$

Question

Solution

Limits

The limit of $\lim _{x\rightarrow 0^{+}}x^{x}$

Question

Solution

The limits of $\lim _{x\rightarrow +\infty }x\sin {\frac {1}{x}}$ and $\lim _{x\rightarrow -\infty }x\sin {\frac {1}{x}}$

Question

Solution

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Mathematics/Calculus/Corner cases

Derivatives

The derivative of d d x x x {\displaystyle {\frac {d}{dx}}x^{x}}

Question

Solution 1

Solution 2

Integrals

The integral ∫ x x d x {\displaystyle \int x^{x}\,dx}

Question

Solution

Limits

The limit of lim x → 0 + x x {\displaystyle \lim _{x\rightarrow 0^{+}}x^{x}}

Question

Solution

The limits of lim x → + ∞ x sin ⁡ 1 x {\displaystyle \lim _{x\rightarrow +\infty }x\sin {\frac {1}{x}}} and lim x → − ∞ x sin ⁡ 1 x {\displaystyle \lim _{x\rightarrow -\infty }x\sin {\frac {1}{x}}}

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The derivative of ${\frac {d}{dx}}x^{x}$

The integral $\int x^{x}\,dx$

The limit of $\lim _{x\rightarrow 0^{+}}x^{x}$

The limits of $\lim _{x\rightarrow +\infty }x\sin {\frac {1}{x}}$ and $\lim _{x\rightarrow -\infty }x\sin {\frac {1}{x}}$