Mathematik für Anwender 1/Gemischte Definitionsabfrage/25/Aufgabe/Lösung

${\displaystyle {}f}$

${\displaystyle {}x\in D}$

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

${\displaystyle {}x'\in D}$

${\displaystyle {}\vert {x-x'}\vert \leq \epsilon }$

${\displaystyle {}f(x)\geq f(x')\,}$

gilt.

${\displaystyle {}b}$

${\displaystyle {}b^{x}:=\exp(x\ln b)\,}$

definiert.

${\displaystyle {}K}$

${\displaystyle {}V}$

${\displaystyle {}n}$

${\displaystyle {}{\mathfrak {v}}=v_{1},\ldots ,v_{n}}$

${\displaystyle {}W}$

${\displaystyle {}m}$

${\displaystyle {}{\mathfrak {w}}=w_{1},\ldots ,w_{m}}$

${\displaystyle {}M=(a_{ij})_{ij}\in \operatorname {Mat} _{m\times n}(K)}$

${\displaystyle v_{j}\longmapsto \sum _{i=1}^{m}a_{ij}w_{i}}$

gemäß Fakt definierte lineare Abbildung ${\displaystyle {}\varphi _{\mathfrak {w}}^{\mathfrak {v}}(M)}$ die durch ${\displaystyle {}M}$ festgelegte lineare Abbildung.

${\displaystyle {}\operatorname {Eig} _{\lambda }{\left(\varphi \right)}:={\left\{v\in V\mid \varphi (v)=\lambda v\right\}}\,}$

den Eigenraum von ${\displaystyle {}\varphi }$ zum Wert ${\displaystyle {}\lambda }$.