已知abc不等于0,且a+b+c=0,则代数式a^2/bc+b^2/ac+c^2/ab的值为______
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已知abc不等于0,且a+b+c=0,则代数式a^2/bc+b^2/ac+c^2/ab的值为______
已知abc不等于0,且a+b+c=0,则代数式a^2/bc+b^2/ac+c^2/ab的值为______
已知abc不等于0,且a+b+c=0,则代数式a^2/bc+b^2/ac+c^2/ab的值为______
a+b+c=0,a+b=-c
a^2/bc+b^2/ac+c^2/ab
通分
=(a^3+b^3+c^3)/abc
=[(a+b)(a^2-ab+b^2)+c^3]/abc
=[-c(a^2-ab+b^2)+c^3]/abc
={-c[(a+b)^2-3ab]+c^3}/abc
=[-c(c^2-3ab)+c^3]/abc
=(-c^2+3abc+c^3)/abc
=3abc/abc
=3
因为a+b+c=0
所以(a+b+c)^3 = a^3+b^3+c^3+3a^2b+3a^2c+3b^2c+3c^2a+3c^2b+6abc=0
abc不等于0,同时除以abc得:
a^2/bc +b^2/ac +c^2/ab +3a/c+3a/b+3b/c+3b/a+3c/b+3c/a+6=0
即:a^2/bc +b^2/ac +c^2/ab +3(b+c...
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因为a+b+c=0
所以(a+b+c)^3 = a^3+b^3+c^3+3a^2b+3a^2c+3b^2c+3c^2a+3c^2b+6abc=0
abc不等于0,同时除以abc得:
a^2/bc +b^2/ac +c^2/ab +3a/c+3a/b+3b/c+3b/a+3c/b+3c/a+6=0
即:a^2/bc +b^2/ac +c^2/ab +3(b+c)/a +3(a+b)/c +3(a+c)/b = -6
因为a+b+c=0,所a+b=-c,a+c=-b,b+c=-a,代入上式
a^2/bc +b^2/ac +c^2/ab +3(-a)/a+3(-c)/c+3(-b)/b =-6
所以a^2/bc +b^2/ac +c^2/ab =-6 + 9 =3
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