210 Sopra l'analisi lineare ec. 



{a,b,c^d,e) = [h)C.jCl.je)a — (a,c,d,e)b •+• {ayb,d^e)c 



— {a^b.jC^e)d ■+■ (a,b^c^d)e 

 (a,b,c,d,f) = {b^c^d,f)a — [a>c,d,f)b ,-^ {a-,b^d,f)c 



T 4 T 



— {ajj,c,f)d -¥- (a:,b^c./l)f 

 ia,b,c,e,f) = {b,c,e,f)a — {a,c,e.f)b -¥■ {a,b,e,f)c 



— {a,b,c,f)e -h [a,b,c,e)f 

 (3a) {a,b,d,e,f) = {b,d,e,f)a — {a,d,ej)b ■+■ {a,b,e,f)d^ 



— {a,b,d,f)e^-\-{a.,b4,e)f^ 

 {a,c,d^ef) = {c.,d-,e^f)a — {a^d.,e^f)c-¥- [a^c^e^f)d 



— {a,c/l,f)e,-\- {a,c4->e)f, 



4 4 



{b,c4,e,f) = {c4>e,f)b — {b,d:e,f)c ,-^ {b,c,e.f)d^ 



— {b,c,d,f)e -h {b,c,d,e)f 



4 4 



Con questi valori si otterrà 



b = a b — a b 



IO 1 



a 



b = a b — ab 



1 a o o a 



(33) b''= ah —a b^ 



^ ' a 3 o o d 



a 



b ■=. a b — a b ^ 



3 4 "^ '^4 



a 



b -^ a b — a b 

 A 5 o o 5 



