lim[(1-cosx)^1/2]/sinx,x趋于0,求极限

来源：学生作业帮助网编辑：作业帮时间：2024/07/31 22:38:21

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lim[(1-cosx)^1/2]/sinx,x趋于0,求极限
lim[(1-cosx)^1/2]/sinx,x趋于0,求极限

lim[(1-cosx)^1/2]/sinx,x趋于0,求极限
用等价无穷小替换
原式=lim(x→0)√(2sin^2(x/2))/sinx
=lim(x→0)√2|sin(x/2)|/sinx
因为右极限为lim(x→0+)√2*sin(x/2)/sinx=lim(x→0)√2*(x/2)/2=√2/2
类似地,左极限为-√2/2
所以极限不存在.

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