u=x^y^z
au/ax=a(x^(y^z))/ax=(y^z) * x^[(y^z)-1]
au/ay=a(x^(y^z))/ay=lnx * x^(y^z) * z*y^(z-1)
au/az=a((x^y)^z)/az=ln(x^y) * (x^y)^z
有不懂欢迎追问求大神给详细过程au/ax=a(x^(y^z))/ax=(y^z) * x^[(y^z)-1]将u=x^y^z看成u=x^a,对x求导即可au/ay=a(x^(y^z))/ay=lnx * x^(y^z) * z*y^(z-1)将u=x^y^z看成u=a^f(y),f(y)=y^b,对y求导,根据链式法则,先对f(y)求导,再f(y)对y求导即可au/az=a((x^y)^z)/az=ln(x^y) * (x^y)^z将u=x^y^z看成u=a^z,对z求导即可上述解释中的ab均看成常数,自己动手做做,不行再向我追问~~~有不懂欢迎追问