由于sinx~x、ln(1+x)~x,lim secx=1
lim ∫[0,x]tant^2dt/[(sinx)^2ln(1+x)secx]
分子∫[0,x]tant^2dt,x→0,积分趋近0
故为0/0的不定型,由洛必达法则
=lim ∫[0,x]tant^2dt/x^3=lim tanx^2/(3x^2)
tanx^2~x^2
故极限
=lim x^2/(3x^2)=1/3
lim ∫[0,x]tant^2dt/[(sinx)^2ln(1+x)secx]
分子∫[0,x]tant^2dt,x→0,积分趋近0
故为0/0的不定型,由洛必达法则
=lim ∫[0,x]tant^2dt/x^3=lim tanx^2/(3x^2)
tanx^2~x^2
故极限
=lim x^2/(3x^2)=1/3
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第1个回答 2011-01-05
=lim∫[0,x]tan(t^2)dt/(x^2*x)*lim1/secx
(等价无穷小的替换)
=limtan(x^2)/(3x^2)*1
=lim(x^2)/(3x^2)=1/3
(等价无穷小的替换)
=limtan(x^2)/(3x^2)*1
=lim(x^2)/(3x^2)=1/3
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