证明极限 当x→0时 (1/(x^2+x))=∞

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证明极限当x→0时(1/(x^2+x))=∞证明极限当x→0时(1/(x^2+x))=∞证明极限当x→0时(1/(x^2+x))=∞lim[1/(x^2+x)]=lim1/[x(x+1)]=lim[1

证明极限 当x→0时 (1/(x^2+x))=∞
证明极限 当x→0时 (1/(x^2+x))=∞

证明极限 当x→0时 (1/(x^2+x))=∞
lim[1/(x^2+x)]
=lim1/[x(x+1)]
=lim[1/x-1/(x+1)]
=lim1/x-lim1/(x+1)
当x→0时,lim1/x=∞,lim1/(x+1)=1
所以lim[1/(x^2+x)]=∞ (当x→0时)