解:∵x2+x+1=0,
∴x2=-x-1,x2+x=-1,
x3-x2-x+7=x•x2-x2-x+7=x(-x-1)-x2-x+7=-x2-x-x2-x+7=-2×(x2+x)+7=9.
x3-x2-x+7=x(x^2+x-1)-2x^2+7=-2x^2+7因为x2+x-1=0,所以,x^2=1-x,代入上式得x3-x2-x+7=2x+5x2+x-1=0,解得x=(-1±√5)/2所以x3-x2-x+7=2x+5=4±√5
得X3=1,原式=1+1+7=9
x²+x+1=0
x²+x=-1
x³-x²-x+7
=x³+x²-2x²-x+7
=x(x²+x)-2x²-x+7
=-x-2x²-x+7
=-2(x²+x)+7
=-2x(-1)+7
=9
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