Page:Leonhard Euler Letter 1765-XX-XX.pdf/4

C e D obtine

$$x^{\frac{c}{f}}y^{n+2} = Ax^{\frac{c}{f}-m-1}+Bx^{m+2}$$ excitente quod adeo

d. 31 Martii 1765. C e D obtine

$$x^{\frac{c}{f}}y^{n+2} = Ax^{\frac{c}{f}-m-1}+Bx^{m+2}$$ excitente quod adeo feri ulicius potundo V(6-1)-2 641) ab) = V(Co-f3-461) imc+V[ce-f-A(n3)af ito exhiberi potest. y - Ax et By ulog qua forma f forse g friat imaginarium, puta g= hvs ativi kama = x ( A of holy 19 a c£quahones ayPy = 46 y cy&pfxyse unibojuatro ver talem sed, Briplicatorun faullime fresciviran, eeti jari oleh est facten. Sentata ady bay xn-lypl Icebitur per multiplicatorem home & holyPl. XV y u. des multiplicatores inter fe coraguan dantur. oucitet: quo fer cada reun-1 et ub= vftp-1 ve of ec feu tum est uniquele : max.com (n-igal - Goldbe (nabo - paigal (p-dlac - (n-051 x et by Ax atte (n-1)) (p-1) (n-16-(p-1) a Plasa fueinind leeguimos cikguatroner yes multiplicatore vicenden Voi celeberrime to commutusi Jebold. ut ejusmodi sy catrine Jenevole Tu de foc argumento precum et = 0. miceo membrum uiteqatiles & generalius per a posterius cua cab quos unde vero per U et v ub a7-77 af - 62 x af te 4 = 4a-7c differentiales fecwdi guadas expedici, qué alici mettastas frastse tractanten Eguegea autem feest omnino, que Communicast: Vole midage faver vage. Jabarterdiri d. 31 Martii 1765.
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