Pagina:Gauss, Carl Friedrich - Werke (1870).djvu/392

382

variae disquisitionum praecedentium applicationes.

atque etiam ${\displaystyle \alpha '}$, ${\displaystyle \beta '}$ etc. positivos ac minores quam ${\displaystyle a}$, ${\displaystyle b}$ etc., necessario erit ${\displaystyle \alpha =\alpha '\!}$, ${\displaystyle \beta =\beta '\!}$, ${\displaystyle \gamma =\gamma '\!}$ etc., ${\displaystyle k=k'\!}$. Multiplicando enim per ${\displaystyle n=abc}$ etc., patet fieri ${\displaystyle m\equiv \alpha bcd}$ etc. ${\displaystyle \equiv \alpha 'bcd}$ etc. ${\displaystyle \!\!\textstyle {\pmod {a}}\!\!}$, unde, quoniam ${\displaystyle bcd}$ etc. ad ${\displaystyle a}$ primus est, necessario ${\displaystyle \alpha \equiv \alpha '\!}$ adeoque ${\displaystyle \alpha =\alpha '\!}$, et perinde ${\displaystyle \beta =\beta '\!}$ etc., unde etiam sponte ${\displaystyle k=k'\!}$. Iam quum prorsus arbitrarium sit, cuiusnam denominatoris numerator primus supputetur, manifestum est, omnes numeratores ita investigari posse, ut ${\displaystyle \alpha }$ in art. praec., puta ${\displaystyle \beta }$ per congruentiam ${\displaystyle \beta acd}$ etc. ${\displaystyle \textstyle \equiv m{\pmod {b}}}$, ${\displaystyle \gamma }$ per hanc ${\displaystyle \gamma abd}$ etc. ${\displaystyle \textstyle \equiv m{\pmod {c}}}$ etc.; summa omnium fractionum sic inventarum vel propositae ${\displaystyle {\tfrac {m}{n}}}$ aequalis erit, vel differentia numerus integer ${\displaystyle =k}$, qua via simul confirmationem calculi nanciscimur. Ita in ex. art. praec. valores expr. 391/231 (mod. 4), 391/208 (mod. 3), 391/132 (mod. 7), 391/84 (mod. 11) statim suppeditant numeratores 1, 2, 1, 4 denominatoribus 4, 3, 7, 11 respondentes, summaque harum fractionum propositam unitate superare invenitur.

Conversio fractionum communium in decimales.

312.

Definitio. Si fractio communis in decimalem convertitur, seriem figurarum decimalium^[1] (excluso si quis adest numero integro), sive finita sit, sive in infinitum excurrat, fractionis mantissam vocamus, expressionem, alias tantummodo apud logarithmos usitatam, in significatione latiori accipientes. Ita e. g. fractionis 1/8 mantissa est 125, mantissa fractionis 35/16 1875, fractionis 2/37 mantissa 054054… in inf.

Ex hac definitione statim patet, fractiones eiusdem denominatoris ${\displaystyle {\tfrac {l}{n}}}$, ${\displaystyle {\tfrac {m}{n}}}$ easdem vel diversas mantissas habere, prout numeratores ${\displaystyle l}$, ${\displaystyle m}$ secundum ${\displaystyle n}$ congrui sint vel incongrui. Mantissa finita non mutatur, si ad dextram cifrae quotcunque apponantur. Mantissa fractionis ${\displaystyle {\tfrac {10m}{n}}}$ obtinetur, rescindendo a mantissa fractionis ${\displaystyle {\tfrac {m}{n}}}$ figuram primam et generaliter mantissa fractionis ${\displaystyle {\tfrac {10^{\nu }m}{n}}}$ invenitur rescindendo ${\displaystyle \nu }$ figuras primas mantissae ipsius ${\displaystyle {\tfrac {m}{n}}}$. Mantissa fractionis ${\displaystyle {\tfrac {1}{n}}}$ statim figura significativa (i. e. a cifra diversa) incipit, si ${\displaystyle n}$ non ${\displaystyle >10}$; si vero ${\displaystyle n>10}$ ac nulli potestati ipsius ${\displaystyle 10}$ aequalis, multitudoque figurarum e quibus constat est ${\displaystyle k}$, primae ${\displaystyle k-1}$ figurae mantissae ipsius ${\displaystyle {\tfrac {1}{n}}}$ erunt cifrae atque demum sequens ${\displaystyle k}$^ta erit significativa. Hinc facile deducitur, si ${\displaystyle {\tfrac {l}{n}}}$, ${\displaystyle {\tfrac {m}{n}}}$ mantissas diversas habeant (i. e.

1. Brevitatis caussa disquisitionem sequentem ad systema vulgare decadicum restringimus, quum facile ad quodvis aliud extendi possit.