We toss a fair coin 60 times and get the following initial population:
s 1 = 1111010101 f ( s 1 ) = 7 {\displaystyle s_{1}=1111010101\qquad \color {red}f(s_{1})=7}
s 2 = 0111000101 f ( s 2 ) = 5 {\displaystyle s_{2}=0111000101\qquad \color {red}f(s_{2})=5}
s 3 = 1110110101 f ( s 3 ) = 7 {\displaystyle s_{3}=1110110101\qquad \color {red}f(s_{3})=7}
s 4 = 0100010011 f ( s 4 ) = 4 {\displaystyle s_{4}=0100010011\qquad \color {red}f(s_{4})=4}
s 5 = 1110111101 f ( s 5 ) = 8 {\displaystyle s_{5}=1110111101\qquad \color {red}f(s_{5})=8}
s 6 = 0100110000 f ( s 6 ) = 3 {\displaystyle s_{6}=0100110000\qquad \color {red}f(s_{6})=3}
Fehler beim Parsen (http://mathoid.testme.wmflabs.org Serverantwort ist ungültiges JSON.): \color{red}\sum_{i=1}^{6}f(s_i)=34
