Whakaoti mō a
a=3
Tohaina
Kua tāruatia ki te papatopenga
a^{3}-27=0
Tangohia te 27 mai i ngā taha e rua.
±27,±9,±3,±1
Tā te Rational Root Theorem, ko ngā pūtake whakahau katoa o tētahi pūrau kei te āhua o \frac{p}{q}, ina wehea e p te kīanga pūmau -27, ā, ka wehea e q te whakarea arahanga 1. Whakarārangitia ngā kaitono katoa \frac{p}{q}.
a=3
Kimihia tētahi pūtake pērā mā te whakamātau i ngā uara tau tōpū katoa, e tīmata ana i te mea iti rawa mā te uara pū. Mēnā kāore he pūtake tau tōpū e kitea, whakamātauria ngā hautanga.
a^{2}+3a+9=0
Mā te whakatakotoranga Tauwehe, he tauwehe te a-k o te pūrau mō ia pūtake k. Whakawehea te a^{3}-27 ki te a-3, kia riro ko a^{2}+3a+9. Whakaotihia te whārite ina ōrite te hua ki te 0.
a=\frac{-3±\sqrt{3^{2}-4\times 1\times 9}}{2}
Ka taea ngā whārite katoa o te momo ax^{2}+bx+c=0 te whakaoti mā te ture pūrua: \frac{-b±\sqrt{b^{2}-4ac}}{2a}. Whakakapia te 1 mō te a, te 3 mō te b, me te 9 mō te c i te ture pūrua.
a=\frac{-3±\sqrt{-27}}{2}
Mahia ngā tātaitai.
a\in \emptyset
Tā te mea e kore te pūrua o tētahi tau tōraro e tautohutia ki te āpure tūturu, kāhore he rongoā.
a=3
Rārangitia ngā otinga katoa i kitea.
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