lim x-无穷(1+ 1/x)x+k X+K是次方 K为常数求极限..

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lim x-无穷(1+ 1/x)x+k X+K是次方 K为常数求极限..
lim x-无穷(1+ 1/x)x+k X+K是次方 K为常数
求极限..

lim x-无穷(1+ 1/x)x+k X+K是次方 K为常数求极限..
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解法一：lim(x->∞)[(1+1/x)^(x+k)]=lim(x->∞)[(1+1/x)^x]*lim(x->∞)[(1+1/x)^k]
=lim(x->∞)[(1+1/x)^x] (∵lim(x->∞)[(1+1/x)^k]=1)
=e;

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解法一：lim(x->∞)[(1+1/x)^(x+k)]=lim(x->∞)[(1+1/x)^x]*lim(x->∞)[(1+1/x)^k]
=lim(x->∞)[(1+1/x)^x] (∵lim(x->∞)[(1+1/x)^k]=1)
=e;
解法二：lim(x->∞)[(1+1/x)^(x+k)]=e^{lim(x->∞)[(x+k)ln(1+1/x)]}
=e^【lim(x->∞){ln(1+1/x)/[1/(x+k)]}】
=e^【lim(x->∞)[(1+k/x)²/(1+1/x)]】 (0/0型，应用罗比达法则)
=e^[(1+0)²/(1+0)]
=e.

收起

用洛比达法则在加上重要极限等式就可以解了

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