$f(n)=\begin{cases} n/2, & \mbox{wenn }n\mbox{ gerade} \\ 3n+1, & \mbox{wenn }n\mbox{ ungerade} \end{cases}$

Parameter	$a \in ]-\infty,\infty[$ $b \in ]-\infty,\infty[,\,b>a$ $c \in ]a,b[$ $m := \frac{c-a}{b-a},\,1-m=\frac{b-c}{b-a}$
Dichtefunktion	$f(x) = \begin{cases} \frac{2(x-a)}{(b-a)(c-a)}, & \mbox{wenn } a \le x \le c \\ \frac{2(b-x)}{(b-a)(b-c)}, & \mbox{wenn } c < x \le b \end{cases}$
Träger	$]a,b[ \!$
Verteilungsfunktion	$F(x) = \begin{cases} \frac{(x-a)^2}{(b-a)(c-a)}, & \mbox{wenn } a \le x \le c \\ 1-\frac{(b-x)^2}{(b-a)(b-c)}, & \mbox{wenn } c < x \le b \end{cases}$
Modus	$c\,$
Erwartungswert	$\mu = \frac{a+b+c}{3},$
Median	$F^{-1}(0,5) = \begin{cases} a+\frac{\sqrt{2(b-a)(c-a)}}{2}, & \mbox{wenn } c\!\ge\!\frac{b\!-\!a}{2} \\ b-\frac{\sqrt{2(b-a)(b-c)}}{2}, & \mbox{wenn } c\!\le\!\frac{b\!-\!a}{2} \end{cases}$
Varianz	$\operatorname{var}(x) = \frac{a^2+b^2+c^2-ab-ac-bc}{18}$
Standardabweichung	$\sigma = \frac{1}{6} \sqrt{2(a^2+b^2+c^2-ab-ac-bc)}$
Schiefe	$\frac{\sqrt 2 (a\!+\!b\!-\!2c)(2a\!-\!b\!-\!c)(a\!-\!2b\!+\!c)}{5(a^2\!+\!b^2\!+\!c^2\!-\!ab\!-\!ac\!-\!bc)^\frac{3}{2}}$
Wölbung	$\frac{12}{5}$
Entropie	$\frac{1}{2}+\ln\left(\frac{b-a}{2}\right)$
Momenterzeugende Funktion	$2\frac{(b\!-\!c)e^{at}\!-\!(b\!-\!a)e^{ct}\!+\!(c\!-\!a)e^{bt}} {(b-a)(c-a)(b-c)t^2}$
Charakteristische Funktion	$-2\frac{(b\!-\!c)e^{iat}\!-\!(b\!-\!a)e^{ict}\!+\!(c\!-\!a)e^{ibt}} {(b-a)(c-a)(b-c)t^2}$

Quellen

Anonym