设 y = (cosx)^[1/ln(1+x^2)]
则:
lim lny
=lim 1/ln(1+x^2) * ln(cosx)
=lim ln(cosx) /ln(1+x^2) 注:这是一个 0/0 型的极限,可以应用罗必塔法则
=lim (1/cosx) * (cosx)' /[ 1/(1+x^2) * (1+x^2)']
=lim - (sinx/cosx) / [2x /(1 + x^2)]
=lim -tanx * (1+x^2) /(2x) 注:这还是一个 0/0 型的极限,继续使用罗必塔法则
=-1/2 * lim [ (secx)^2 * (1 +x^2) + tanx * (2x)] / 1
=-1/2 * lim [ (sec0)^2 * (1 + 0^2) + tan0 * (2*0)]
=-1/2 * lim 1
=-1/2
所以,
limy = lim e^(lny)
=e^[lim (lny)]
=e^(-1/2)
=1/√e
