Analysis 2/Gemischte Definitionsabfrage/Test 1/Aufgabe/Lösung

${\displaystyle {}x\in \mathbb {R} }$

${\displaystyle {}x>-1}$

${\displaystyle x\longmapsto \operatorname {Fak} \,(x):=\int _{0}^{\infty }t^{x}e^{-t}\,dt}$

die Fakultätsfunktion.

${\displaystyle {}d\colon M\times M\to \mathbb {R} }$

${\displaystyle {}x,y,z\in M}$

1. ${\displaystyle {}d\left(x,y\right)=0\Longleftrightarrow x=y}$ (Definitheit),
2. ${\displaystyle {}d\left(x,y\right)=d(y,x)}$ (Symmetrie), und
3. ${\displaystyle {}d\left(x,y\right)\leq d(x,z)+d(z,y)}$ (Dreiecksungleichung).

${\displaystyle {}{\left(x_{n}\right)}_{n\in \mathbb {N} }}$

${\displaystyle {}M}$

${\displaystyle {}\epsilon \in \mathbb {R} }$

${\displaystyle {}\epsilon >0}$

${\displaystyle {}n_{0}\in \mathbb {N} }$

${\displaystyle {}n,m\geq n_{0}}$

${\displaystyle d{\left(x_{n},x_{m}\right)}\leq \epsilon }$

gilt.

${\displaystyle {}f}$

${\displaystyle L(f)={\operatorname {sup} \,(L(f(t_{0}),\ldots ,f(t_{k})),a=t_{0}\leq t_{1}\leq \ldots \leq t_{k-1}\leq t_{k}=b{\text{ Unterteilung}},\,k\in \mathbb {N} )}.}$

${\displaystyle {}\operatorname {Jak} (f)_{P}:={\begin{pmatrix}{\frac {\partial f_{1}}{\partial x_{1}}}(P)&\ldots &{\frac {\partial f_{1}}{\partial x_{n}}}(P)\\\vdots &\ddots &\vdots \\{\frac {\partial f_{m}}{\partial x_{1}}}(P)&\ldots &{\frac {\partial f_{m}}{\partial x_{n}}}(P)\end{pmatrix}}\,}$

heißt die Jacobi-Matrix zu ${\displaystyle {}f}$ im Punkt ${\displaystyle {}P}$.

${\displaystyle {}f}$

${\displaystyle {}c}$

${\displaystyle {}N_{c}={\left\{x\in \mathbb {R} ^{n}\mid f(x)=c\right\}}\,.}$