Functions of Several Variables
Functions of Several Variables
p3=Plot3D[Sin[x y],{x,0,3},{y,0,3}]
Show[p3,ViewPoint->{0,-2,0}]
Show[p3,Shading->False]
Partial derivatives hold one or more of the variables constant and differentiate with respect to the variable that is not fixed.
Here are some first partial derivatives.
D[x^2 y + 2 Sin[y],x]
D[x^2 y + 2 Sin[y],y]
Here are some second partial derivatives.
First Dxy, that is, partial with respect to x first, then with
respect to y.
D[x^2 y + 2 Sin[y],y,x]
Next Dyx
D[x^2 y + 2 Sin[y],x,y]
Now, D^3y, the third partial with respect to y.
D[x^2 y + 2 Sin[y],{y,3}]You will recall that for "nice" functions, that is, functions whose first and second partials, along with f itself, are continuous, we always have the mixed second partials being equal.
Clear[x,y,z,g,h] g[x_,y_]:=Sin[x^2 y] h[x_,y_,z_]:=x Exp[y] Sin[Pi z]
The following (double equal signs, ==) is Mathematica's way of asking if something is true or false.
D[g[x,y],x,y]==D[g[x,y],y,x]
D[h[x,y,z],x,y]==D[h[x,y,z],y,x]
D[h[x,y,z],x,z]==D[h[x,y,z],z,x]
D[h[x,y,z],z,y]==D[h[x,y,z],y,z]