^,1 ) X02 ( |e 



fe^*dtcoCct~-\- '- — — -fe^^dtCm.ct , crit 



e^UoC.ct }<e^'C\n.ct XX ^^. 

 Je^^dtdn.ct-- +—- -^^.fe^^dtdn.ci 



vnde colligitur 



\e^^ Cm.ct — ce^^ coC.ct 



ce^Tm.ct-^T^e^^cof.ct 

 fe^ ' dtcoC c t — — r -- — — 



quibus valoribus in acquatione integrali fubftitutis erit 



f t I / ( X g -f- ^ e ) |'m e y+ X ^ — o e ) co/. c 

 '^ \' -\\ XX-i-cc 

 I / (X'a+&c )/ m. c I -^! K'b— a c ) c of. c t \ 



x'-xv x'X'-f-ef ; 



§. 24. Quo autem de confenfu huius integralis cum 

 antc iniiento certiores reddamur, introducamus in calcu- 

 lum quantirates m et «, per quas in priori methodo coef- 

 ficientes f ct g definiuimus; et quo hoc facilius fieri poflit, 

 negligamus ftatim partcm confiantes A et A' inuoluen- 

 tem et fupra per A expreflam , quippe quae nulli Qubio 

 eft obnoxia ; alteram \ero partem fecundum Cin. c t ct 

 cof. c t di{ponamu!>, ita vt fit 



'X' — XvXX-i-cc \' K -t-c c ' 



1 > /X6 — ac X' — ac \ _„/• ,. » 



At vero facfta enolutione hoc integrale in fequentem for- 

 Iiiam transfunditur : 



z— A-+- 



((XX' — ec)a->-f>'-t-X )''« )/m.cf 



( X X -4- e c c X' A' -I- c c ) 



(_£>*: V — c^)^'— ( X^-+- \)a_c) c o^. c f 



(XX-+-cc)(X'X'-+-cc) 



§. a5. Cpr^ ipitur fit 

 X ~ w -f- y w w — « et \' — m — Vmm~-ny 



crit 



