Pagina:Gauss, Carl Friedrich - Werke (1870).djvu/35

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solutio congruentiarum.

non modo impossibilitatem, si quam forte conditiones propositae implicent, statim detegendi, sed etiam calculum commodius atque concinnius instituendi.

34.

Sint ut supra conditiones propositae, ut sit ${\displaystyle \textstyle z\equiv a{\pmod {A}}}$, ${\displaystyle \textstyle z\equiv b{\pmod {B}}}$, ${\displaystyle \textstyle z\equiv c{\pmod {C}}}$. Resolvantur omnes moduli in factores inter se primos, ${\displaystyle A}$ in ${\displaystyle A\ A'\ A''}$ etc.; ${\displaystyle B}$ in ${\displaystyle B\ B'\ B''}$ etc. etc., et quidem ita, ut numeri ${\displaystyle A\ A'}$ etc. ${\displaystyle B\ B'}$ etc. etc. sint aut primi, aut primorum potestates. Si vero aliquis numerorum ${\displaystyle A,B,C}$ etc. iam per se est primus, aut primi potestas, nulla resolutione in factores pro hocce opus est. Tum vero ex praecedentibus patescit, pro conditionibus propositis hasce substitui posse: ${\displaystyle \textstyle z\equiv a{\pmod {A'}}}$, ${\displaystyle \textstyle z\equiv a{\pmod {A''}}}$, ${\displaystyle \textstyle z\equiv a{\pmod {A'''}}}$ etc., ${\displaystyle \textstyle z\equiv b{\pmod {B'}}}$, ${\displaystyle \textstyle z\equiv b{\pmod {B''}}}$ etc. etc. Iam nisi omnes numeri ${\displaystyle A,B,C}$ etc. fuerint inter se primi, ex. gr. si ${\displaystyle A}$ ad ${\displaystyle B}$ non primus, manifestum est, omnes divisores primos ipsorum ${\displaystyle A}$, ${\displaystyle B}$ diversos esse non posse, sed inter factores ${\displaystyle A,A',A''}$ etc, unum aut alterum esse debere, qui inter ${\displaystyle B,B',B''}$etc. aut aequalem aut multiplum aut submultiplum habeat. Si primo ${\displaystyle A'=B'}$, conditiones ${\displaystyle \textstyle z\equiv a{\pmod {A'}}}$, ${\displaystyle \textstyle z\equiv b{\pmod {B'}}}$ identicae esse debent, sive ${\displaystyle \textstyle a\equiv b{\pmod {A'\mathrm {\ vel\ } B'}}}$, quare alterutra reiici poterit. Si vero non ${\displaystyle \textstyle a\equiv b{\pmod {A'}}}$, problema impossibilitatem implicat. Si secundo ${\displaystyle B'}$ multiplum ipsius ${\displaystyle A'}$, conditio ${\displaystyle \textstyle z\equiv a{\pmod {A'}}}$ in hac ${\displaystyle \textstyle z\equiv b{\pmod {B'}}}$ contenta esse debet, sive haec ${\displaystyle \textstyle z\equiv b{\pmod {A'}}}$, quae ex posteriori deducitur cum priori identica esse debet. Unde sequitur, conditionem ${\displaystyle \textstyle z\equiv a{\pmod {A'}}}$, nisi alteri repugnet (in quo casu problema impossibile), reiici posse. Quando omnes conditiones superfluae ita reiectae sunt, patet, omnes modulos ex his ${\displaystyle A',A'',A'''}$ etc., ${\displaystyle B',B'',B'''}$ etc. etc. remanentes inter se primos fore: tum igitur de problematis possibilitate certi esse et secundum praecepta ante data procedere possumus.

35.

Ex. Si ut supra esse debet ${\displaystyle \textstyle z\equiv 17{\pmod {504}}}$, ${\displaystyle \textstyle \equiv -4{\pmod {35}}}$, et ${\displaystyle \textstyle \equiv 33{\pmod {16}}}$; hae conditiones in sequentes resolvi possunt, ${\displaystyle \textstyle z\equiv 17{\pmod {8}}}$, ${\displaystyle \textstyle \equiv 17{\pmod {9}}}$, ${\displaystyle \textstyle \equiv 17{\pmod {7}}}$, ${\displaystyle \textstyle \equiv -4{\pmod {5}}}$, ${\displaystyle \textstyle \equiv -4{\pmod {7}}}$, ${\displaystyle \textstyle \equiv 33{\pmod {16}}}$. Ex his conditiones ${\displaystyle \textstyle z\equiv 17{\pmod {8}}}$, ${\displaystyle \textstyle z\equiv 17{\pmod {7}}}$ reiici possunt, quum prior in conditione ${\displaystyle \textstyle z\equiv 33{\pmod {16}}}$ contineatur, posterior vero cum hac ${\displaystyle \textstyle z\equiv -4{\pmod {7}}}$ sit identica; remanent itaque

I.

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