Fie a, b, c, d radacinile polinomului, deci avem:
[tex]P(X) =X^4+\alpha X^3- \beta=(X-a) ~(X-b) ~(X-c) ~(X-d), ~(*). [/tex]
Din (*) rezulta ca:
[tex]a+b+c+d=-\alpha, ~(**) ~si~abcd=-\beta. [/tex]
[tex]Pentru~a~arata~ca~a \cdot b~este~radacina~a~polinomului~Q~trebuie~aratat~ca~Q(a \cdot b) =0~adica [/tex]
[tex]\it (ab) ^6+ \beta(ab) ^4+\alpha^2\beta(ab)^3-\beta^2(ab)^2-\beta^3=0[/tex]
care se mai scrie succesiv:
[tex]\it (ab)^3[(ab)^3+\beta(ab)+\alpha^2\beta-\beta^2 \cdot \frac{1}{ab}-\beta^3 \cdot \frac{1}{(ab)^3}]=0,~sau[/tex]
[tex](ab) ^3[(ab)^3+\beta(ab)+\alpha^2\beta+\beta(cd)+(cd)^3]=0[/tex]
si deoarece (ab) ³ ≠ 0 trebuie sa demonstram ca:
[tex](ab) ^3+(cd)^3+\beta(ab+cd)+\alpha^2\beta=0,~~(1). [/tex]
[tex]Pe~de~alta~parte, ~deoarece~a~si~b~sunt~radacinile~polinomului~X^4+\alpha X^3-\beta,~avem~ca~a^3=\frac{\beta}{a+\alpha},~~b^3=\frac{\beta}{b+\alpha} ~si~deci[/tex]
[tex](ab) ^3=\frac{\beta^2}{(a+\alpha)~{(b+\alpha)}},~~(2).[/tex]
[tex]Insa:~-\beta=P(-\alpha) =(a+\alpha) ~(b+\alpha) ~(c+\alpha) ~(d+\alpha), ~~de~unde~rezulta~ca:[/tex]
[tex]\it \frac{\beta^2}{(a+\alpha)~(b+\alpha)}=-\beta(c+\alpha)~(d+\alpha), ~~(3).[/tex]
Din (2) si (3) avem ca
[tex](ab) ^3=-\beta(c+\alpha)~(d+\alpha),~~(4).[/tex]
In mod analog rezulta ca
[tex](cd) ^3=-\beta(a+\alpha)~(b+\alpha),~~(5).[/tex]
Tinand cont de (4) si (5) relatia (1), de demonstrat, devine:
[tex]- \beta(c+\alpha) ~(d+\alpha) - \beta(a+\alpha) ~(b+\alpha) +\beta(ab+cd) +\alpha^2\beta=0~~sau[/tex]
[tex]- \beta~[cd+(a+b+c+d) ~\alpha+2\alpha^2+ab-ab-cd]+\alpha^2\beta=0[/tex]
[tex]sau~tinand~cont~de~(**)~avem~-\beta\alpha^2+\alpha^2\beta=0,~~egalitate~evidenta.[/tex]
