TitelStellenwertsysteme
Autorttry-Katalog
veröffentlicht06.10.2020
FachMathematik
Klassenstufen5, 6

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Übertrage die Zahlen aus dem Dezimalsystem ins Binärsystem.

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 27 = \cloze{16} + \cloze{8} + \cloze{0} + \cloze{2} + \cloze{1} = ( \cloze{1 1 0 1 1} )_2$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 121 = \cloze{64} + \cloze{32} + \cloze{16} + \cloze{8} + \cloze{0} + \cloze{0} + \cloze{1} = ( \cloze{1 1 1 1 0 0 1} )_2$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 8 = \cloze{8} + \cloze{0} + \cloze{0} + \cloze{0} = ( \cloze{1 0 0 0} )_2$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 65 = \cloze{64} + \cloze{0} + \cloze{0} + \cloze{0} + \cloze{0} + \cloze{0} + \cloze{1} = ( \cloze{1 0 0 0 0 0 1} )_2$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 38 = \cloze{32} + \cloze{0} + \cloze{0} + \cloze{4} + \cloze{2} + \cloze{0} = ( \cloze{1 0 0 1 1 0} )_2$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 15 = \cloze{8} + \cloze{4} + \cloze{2} + \cloze{1} = ( \cloze{1 1 1 1} )_2$

Natürliche Zahlen im Fünfersystem

Übertrage die Zahlen ins Dezimalsystem.

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (3 3)_5 = \cloze{3} \cdot 5^\cloze{1} + \cloze{3} \cdot 5^\cloze{0} = \cloze{15} + \cloze{3} = \cloze{18}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 3)_5 = \cloze{1} \cdot 5^\cloze{1} + \cloze{3} \cdot 5^\cloze{0} = \cloze{5} + \cloze{3} = \cloze{8}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (2 0)_5 = \cloze{2} \cdot 5^\cloze{1} + \cloze{0} \cdot 5^\cloze{0} = \cloze{10} + \cloze{0} = \cloze{10}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (4 2)_5 = \cloze{4} \cdot 5^\cloze{1} + \cloze{2} \cdot 5^\cloze{0} = \cloze{20} + \cloze{2} = \cloze{22}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (4 3)_5 = \cloze{4} \cdot 5^\cloze{1} + \cloze{3} \cdot 5^\cloze{0} = \cloze{20} + \cloze{3} = \cloze{23}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (3 2)_5 = \cloze{3} \cdot 5^\cloze{1} + \cloze{2} \cdot 5^\cloze{0} = \cloze{15} + \cloze{2} = \cloze{17}$

Bei der ersten Ziffer sollte die 0 ausgeschlossen werden

Übertrage die Zahlen ins Dezimalsystem.

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 0 0)_5 = \cloze{1} \cdot 5^\cloze{2} + \cloze{0} \cdot 5^\cloze{1} + \cloze{0} \cdot 5^\cloze{0} = \cloze{25} + \cloze{0} + \cloze{0} = \cloze{25}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (3 2 2)_5 = \cloze{3} \cdot 5^\cloze{2} + \cloze{2} \cdot 5^\cloze{1} + \cloze{2} \cdot 5^\cloze{0} = \cloze{75} + \cloze{10} + \cloze{2} = \cloze{87}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (4 0 1)_5 = \cloze{4} \cdot 5^\cloze{2} + \cloze{0} \cdot 5^\cloze{1} + \cloze{1} \cdot 5^\cloze{0} = \cloze{100} + \cloze{0} + \cloze{1} = \cloze{101}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (2 3 3)_5 = \cloze{2} \cdot 5^\cloze{2} + \cloze{3} \cdot 5^\cloze{1} + \cloze{3} \cdot 5^\cloze{0} = \cloze{50} + \cloze{15} + \cloze{3} = \cloze{68}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 2 4)_5 = \cloze{1} \cdot 5^\cloze{2} + \cloze{2} \cdot 5^\cloze{1} + \cloze{4} \cdot 5^\cloze{0} = \cloze{25} + \cloze{10} + \cloze{4} = \cloze{39}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 0 1)_5 = \cloze{1} \cdot 5^\cloze{2} + \cloze{0} \cdot 5^\cloze{1} + \cloze{1} \cdot 5^\cloze{0} = \cloze{25} + \cloze{0} + \cloze{1} = \cloze{26}$

Wenn man zwei- und dreistellige Fünferzahlen in einer Aufgabe kombinieren möchte (siehe nächste Aufgabe), ist das ein wenig komplizierter als im Dualsytem - die Variable #a1 ist hier für die dreistellige Ausgabe nicht verwendbar, da sonst an zweiter Stelle keine 0 stehen könnte; deshalb werden die Variablen #a10 und #b10 eingeführt.

Natürliche Zahlen im Binärsystem (Zweiersystem)

Übertrage die Zahlen ins Dezimalsystem.

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 1)_2 = \cloze{1} \cdot 2^\cloze{1} + \cloze{1} \cdot 2^\cloze{0} = \cloze{2} + \cloze{1} = \cloze{3}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 0 1)_2 = \cloze{1} \cdot 2^\cloze{2} + \cloze{0} \cdot 2^\cloze{1} + \cloze{1} \cdot 2^\cloze{0} = \cloze{4} + \cloze{0} + \cloze{1} = \cloze{5}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 0)_2 = \cloze{1} \cdot 2^\cloze{1} + \cloze{0} \cdot 2^\cloze{0} = \cloze{2} + \cloze{0} = \cloze{2}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 1 0)_2 = \cloze{1} \cdot 2^\cloze{2} + \cloze{1} \cdot 2^\cloze{1} + \cloze{0} \cdot 2^\cloze{0} = \cloze{4} + \cloze{2} + \cloze{0} = \cloze{6}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 1 1)_2 = \cloze{1} \cdot 2^\cloze{2} + \cloze{1} \cdot 2^\cloze{1} + \cloze{1} \cdot 2^\cloze{0} = \cloze{4} + \cloze{2} + \cloze{1} = \cloze{7}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} \begin{aligned} (1 0 0 0)_2 &= \cloze{1} \cdot 2^\cloze{3} + \cloze{0} \cdot 2^\cloze{2} + \cloze{0} \cdot 2^\cloze{1} + \cloze{0} \cdot 2^\cloze{0} \\ &= \cloze{8} + \cloze{0} + \cloze{0} + \cloze{0} = \cloze{8} \end{aligned}$

Übertrage die Zahlen ins Dezimalsystem. Wandle zunächst jede Stelle einzeln um. Tipp: Beginne bei der letzten Stelle.

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 1 1 0 0)_2 = \cloze{16} + \cloze{8} + \cloze{4} + \cloze{0} + \cloze{0} = \cloze{28}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 0 1 0 1 1)_2 = \cloze{32} + \cloze{0} + \cloze{8} + \cloze{0} + \cloze{2} + \cloze{1} = \cloze{43}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 1 0 0 1 0)_2 = \cloze{32} + \cloze{16} + \cloze{0} + \cloze{0} + \cloze{2} + \cloze{0} = \cloze{50}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 1 1 1)_2 = \cloze{8} + \cloze{4} + \cloze{2} + \cloze{1} = \cloze{15}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 0 1 0 0 1 1)_2 = \cloze{64} + \cloze{0} + \cloze{16} + \cloze{0} + \cloze{0} + \cloze{2} + \cloze{1} = \cloze{83}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 1 0 1)_2 = \cloze{8} + \cloze{4} + \cloze{0} + \cloze{1} = \cloze{13}$

An der ersten Stelle sollte immer eine 1 stehen

Übertrage die Zahlen aus dem Dezimalsystem ins Binärsystem.

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 3 = \cloze{2} + \cloze{1} = ( \cloze{1 1} )_2$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 2 = \cloze{2} + \cloze{0} = ( \cloze{1 0} )_2$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 5 = \cloze{4} + \cloze{0} + \cloze{1} = ( \cloze{1 0 1} )_2$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 15 = \cloze{8} + \cloze{4} + \cloze{2} + \cloze{1} = ( \cloze{1 1 1 1} )_2$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 6 = \cloze{4} + \cloze{2} + \cloze{0} = ( \cloze{1 1 0} )_2$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 4 = \cloze{4} + \cloze{0} + \cloze{0} = ( \cloze{1 0 0} )_2$

Übertrage die Zahlen ins Dezimalsystem.

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (3 0)_5 = \cloze{3} \cdot 5^\cloze{1} + \cloze{0} \cdot 5^\cloze{0} = \cloze{15} + \cloze{0} = \cloze{15}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (1 3)_5 = \cloze{1} \cdot 5^\cloze{1} + \cloze{3} \cdot 5^\cloze{0} = \cloze{5} + \cloze{3} = \cloze{8}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (2 3)_5 = \cloze{2} \cdot 5^\cloze{1} + \cloze{3} \cdot 5^\cloze{0} = \cloze{10} + \cloze{3} = \cloze{13}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (2 4 1)_5 = \cloze{2} \cdot 5^\cloze{2} + \cloze{4} \cdot 5^\cloze{1} + \cloze{1} \cdot 5^\cloze{0} = \cloze{50} + \cloze{20} + \cloze{1} = \cloze{71}$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} (2 1 3)_5 = \cloze{2} \cdot 5^\cloze{2} + \cloze{1} \cdot 5^\cloze{1} + \cloze{3} \cdot 5^\cloze{0} = \cloze{50} + \cloze{5} + \cloze{3} = \cloze{58}$

Übertrage die Zahlen ins Fünfersystem.

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 10 = \cloze{10} + \cloze{0} = \cloze{2} \cdot 5^\cloze{1} + \cloze{0} \cdot 5^\cloze{0} = ( \cloze{2 0} )_5$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 6 = \cloze{5} + \cloze{1} = \cloze{1} \cdot 5^\cloze{1} + \cloze{1} \cdot 5^\cloze{0} = ( \cloze{1 1} )_5$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 13 = \cloze{10} + \cloze{3} = \cloze{2} \cdot 5^\cloze{1} + \cloze{3} \cdot 5^\cloze{0} = ( \cloze{2 3} )_5$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 12 = \cloze{10} + \cloze{2} = \cloze{2} \cdot 5^\cloze{1} + \cloze{2} \cdot 5^\cloze{0} = ( \cloze{2 2} )_5$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 5 = \cloze{5} + \cloze{0} = \cloze{1} \cdot 5^\cloze{1} + \cloze{0} \cdot 5^\cloze{0} = ( \cloze{1 0} )_5$

Übertrage die Zahlen ins Fünfersystem.

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 89 = \cloze{75} + \cloze{10} + \cloze{4} = \cloze{3} \cdot 5^\cloze{2} + \cloze{2} \cdot 5^\cloze{1} + \cloze{4} \cdot 5^\cloze{0} = ( \cloze{3 2 4} )_5$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 98 = \cloze{75} + \cloze{20} + \cloze{3} = \cloze{3} \cdot 5^\cloze{2} + \cloze{4} \cdot 5^\cloze{1} + \cloze{3} \cdot 5^\cloze{0} = ( \cloze{3 4 3} )_5$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 83 = \cloze{75} + \cloze{5} + \cloze{3} = \cloze{3} \cdot 5^\cloze{2} + \cloze{1} \cdot 5^\cloze{1} + \cloze{3} \cdot 5^\cloze{0} = ( \cloze{3 1 3} )_5$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 107 = \cloze{100} + \cloze{5} + \cloze{2} = \cloze{4} \cdot 5^\cloze{2} + \cloze{1} \cdot 5^\cloze{1} + \cloze{2} \cdot 5^\cloze{0} = ( \cloze{4 1 2} )_5$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 73 = \cloze{50} + \cloze{20} + \cloze{3} = \cloze{2} \cdot 5^\cloze{2} + \cloze{4} \cdot 5^\cloze{1} + \cloze{3} \cdot 5^\cloze{0} = ( \cloze{2 4 3} )_5$

Übertrage die Zahlen ins Fünfersystem.

$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 63 = \cloze{50} + \cloze{10} + \cloze{3} = \cloze{2} \cdot 5^\cloze{2} + \cloze{2} \cdot 5^\cloze{1} + \cloze{3} \cdot 5^\cloze{0} = ( \cloze{2 2 3} )_5$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 16 = \cloze{15} + \cloze{1} = \cloze{3} \cdot 5^\cloze{1} + \cloze{1} \cdot 5^\cloze{0} = ( \cloze{3 1} )_5$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 57 = \cloze{50} + \cloze{5} + \cloze{2} = \cloze{2} \cdot 5^\cloze{2} + \cloze{1} \cdot 5^\cloze{1} + \cloze{2} \cdot 5^\cloze{0} = ( \cloze{2 1 2} )_5$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 15 = \cloze{15} + \cloze{0} = \cloze{3} \cdot 5^\cloze{1} + \cloze{0} \cdot 5^\cloze{0} = ( \cloze{3 0} )_5$
$\gdef\cloze#1{{\raisebox{-.05em}{\colorbox{none}{\color{transparent}{\large{$\displaystyle #1$}}}}}} 106 = \cloze{100} + \cloze{5} + \cloze{1} = \cloze{4} \cdot 5^\cloze{2} + \cloze{1} \cdot 5^\cloze{1} + \cloze{1} \cdot 5^\cloze{0} = ( \cloze{4 1 1} )_5$