Енді (31) формуланың оң жағындағы қосылғыштардың әрқайсысына жоғарыдағы ережені қолданып (29) теңдеудің дербес шешімінің түрін анықтауға болады. Демек, егер ![](data:image/png;base64,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) теңдеуінің түбірі болмаса, онда (29) теңдеудің дербес шешімін (31) түрде іздейміз. Ал егер сипаттаушы теңдеудің r еселі түбірі болса, онда (29) теңдеудің дербес шешімі (31) өрнек пен -нің көбейтіндісі түрінде ізделінеді.
Осы ереже f(x) функциясының алғашқы (берілген) өрнегі үшін былай тұжырымдалады:
Достарыңызбен бөлісу: |