Rui Carpentier Escreveu:
Fazendo a mudança de variáveis b=a+x e c=a+y temos que:
\(\frac{a^3}{(a-b)(a-c)}+\frac{b^3}{(b-a)(b-c)}+\frac{c^3}{(c-a)(c-b)}=\)
\(=\frac{a^3}{xy}+\frac{(a+x)^3}{x(x-y)}+\frac{(a+y)^3}{y(y-x)}=\)
\(\frac{a^3(x-y)}{xy(x-y)}+\frac{(a+x)^3}{x(x-y)}-\frac{(a+y)^3}{y(x-y)}=\)
\(\frac{a^3x}{xy(x-y)}-\frac{a^3y}{xy(x-y)}+\frac{(a+x)^3}{x(x-y)}-\frac{(a+y)^3}{y(x-y)}=\)
\(\frac{a^3}{y(x-y)}-\frac{a^3}{x(x-y)}+\frac{(a+x)^3}{x(x-y)}-\frac{(a+y)^3}{y(x-y)}=\)
\(\frac{a^3}{y(x-y)}-\frac{(a+y)^3}{y(x-y)}+\frac{(a+x)^3}{x(x-y)}-\frac{a^3}{x(x-y)}=\)
\(-\frac{(a+y)^3-a^3}{y(x-y)}+\frac{(a+x)^3-a^3}{x(x-y)}=\)
\(-\frac{y((a+y)^2+(a+y)a+a^2)}{y(x-y)}+\frac{x((a+x)^2+(a+x)a+a^2)}{x(x-y)}=\)
\(-\frac{(a+y)^2+(a+y)a+a^2}{x-y}+\frac{(a+x)^2+(a+x)a+a^2}{x-y}=\)
\(\frac{(a+x)^2-(a+y)^2+(a+x)a-(a+y)a}{x-y}=\)
\(\frac{(x-y)(2a+x+y)+(x-y)a}{x-y}=\)
\(3a+x+y=a+b+c\)
\(\frac{a^3}{(a-b)(a-c)}+\frac{b^3}{(b-a)(b-c)}+\frac{c^3}{(c-a)(c-b)}=\)
\(=\frac{a^3}{xy}+\frac{(a+x)^3}{x(x-y)}+\frac{(a+y)^3}{y(y-x)}=\)
\(\frac{a^3(x-y)}{xy(x-y)}+\frac{(a+x)^3}{x(x-y)}-\frac{(a+y)^3}{y(x-y)}=\)
\(\frac{a^3x}{xy(x-y)}-\frac{a^3y}{xy(x-y)}+\frac{(a+x)^3}{x(x-y)}-\frac{(a+y)^3}{y(x-y)}=\)
\(\frac{a^3}{y(x-y)}-\frac{a^3}{x(x-y)}+\frac{(a+x)^3}{x(x-y)}-\frac{(a+y)^3}{y(x-y)}=\)
\(\frac{a^3}{y(x-y)}-\frac{(a+y)^3}{y(x-y)}+\frac{(a+x)^3}{x(x-y)}-\frac{a^3}{x(x-y)}=\)
\(-\frac{(a+y)^3-a^3}{y(x-y)}+\frac{(a+x)^3-a^3}{x(x-y)}=\)
\(-\frac{y((a+y)^2+(a+y)a+a^2)}{y(x-y)}+\frac{x((a+x)^2+(a+x)a+a^2)}{x(x-y)}=\)
\(-\frac{(a+y)^2+(a+y)a+a^2}{x-y}+\frac{(a+x)^2+(a+x)a+a^2}{x-y}=\)
\(\frac{(a+x)^2-(a+y)^2+(a+x)a-(a+y)a}{x-y}=\)
\(\frac{(x-y)(2a+x+y)+(x-y)a}{x-y}=\)
\(3a+x+y=a+b+c\)
Excelente! Muito obrigado, amigo!
Espero poder contar com sua ajuda com minhas futuras dúvidas.
