Konvertierung Zahlensysteme (convert base number)
Rechner.js
JavaScripted
a,b,c,d (base,value(decimal))
set[variable,base,value] variable=(base,value), variable = a,b,c,d
fracb fraction base b
b, decimal places
frac10 decimal fraction
fracb ↷ write fracb to frac10
frac10 = convert to base b and calc Δ difference to fracb
there is no error management in js script code - js will report an script error
260.837759534110546_10 ~ 521.5602314_7
Umrechnung Division mit Rest - conversion by division with remainder
B1 Ganzzahlwert (integer) C1 dezimaler Anteil als Rest (remainder modulo)
teile B-Werte durch Basiszahl D1
notiere in Spalte A die Divisionsreste und in Spalte B die Ganzzahl der Division ergibt von unten nach oben gelesen die b-adische Zahl in Spalte A
A - von unten nach oben gelesen Ganzzahl (digit) der Basis D1
D - von oben nach unten gelesen Basis Burchzahl (base places) der Basis D1
![](data:image/png;base64,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)
A | B | Calc/Excel | |
A2=Mod(B1,D$1) | B2=floor(B1 / D$1) | =REST(B1; D$1) | =GANZZAHL(B1 / D$1) |