偏導関数の求め方を教えてください。

(1)f=(x^2+xy)^(1/2) fx=(1/2)(x^2+xy)^(-1/2)(2x+y)=(x+y/2)(x^2+xy)^(-1/2) =(2x+y)/{2√(x^2+xy)} fxx=(x^2+xy)^(-1/2)-(1/2)(x+y/2)(x^2+xy)^(-3/2)(2x+y) ={x^2+xy-(1/2)(x+y/2)(2x+y)}(x^2+xy)^(-3/2) =(1/4){4x^2+4xy-(2x+y)^2}(x^2+xy)^(-3/2) =-(y^2/4)(x^2+xy)^(-3/2)=-y^2/{4(x^2+xy)√(x^2+xy)} fy=(1/2)(x^2+xy)^(-1/2)x=(x/2)(x^2+xy)^(-1/2) =x/{2√(x^2+xy)} fyy=-(1/2)(x/2)(x^2+xy)^(-3/2)x =-(x^2/4)(x^2+xy)^(-3/2)=-x/{4(x+y)√(x^2+xy)} (2)f=log(x^2+y^2) fx={1/(x^2+y^2)}2x=2x/(x^2+y^2) fxx={2(x^2+y^2)-2x*2x}/(x^2+y^2)^2 =2(y^2-x^2)/(x^2+y^2)^2 fy={1/(x^2+y^2)}2y=2y/(x^2+y^2) fyy={2(x^2+y^2)-2y*2y}/(x^2+y^2)^2 =2(x^2-y^2)/(x^2+y^2)^2 (3)f=xsin(y/x) fx=sin(y/x)+xcos(y/x)*(-y/x^2) =sin(y/x)-(y/x)cos(y/x) fxx=cos(y/x)*(-y/x^2)+(y/x^2)cos(y/x) +(y/x)sin(y/x)*(-y/x^2)=-(y^2/x^3)sin(y/x) fy=xcos(y/x)(1/x)=cos(y/x) fyy=-sin(y/x)(1/x)=-(1/x)sin(y/x)