auto ad

Monday, January 16, 2017

if z = xy / (x-y), show that x² (∂ ²z / ∂x²) + 2xy (∂ ²z / ∂x∂y) + y² (∂ ²z / ∂y²) = 0





.Let u be a function of x, y , z where x , y, z are independent variables and u depends on x, y ,z..When doing partial differentiation w.r.t x, we treat x alone as the independent variable and treat  y and z as constants.

The partial derivative of u with respect to x is usually denoted by  ∂u / ∂x

If ∂u / ∂x is again differentiated partially with respect to x we get the partial derivative denoted as ∂ ²u / ∂x²

If  ∂u / ∂x is again differentiated partially with respect to y we get the partial derivative denoted as ∂ ²u /∂y ∂x

If  ∂u / ∂y is again differentiated partially with respect to x we get the partial derivative denoted as ∂ ²u /∂x ∂y






-----------------------------------------------------------

please leave your comments below

------------------------------------------------------------

index of math problems





disclaimer:

There is no guarantee about the data/information on this site. You use the data/information at your own risk. You use the advertisements displayed on this page at your own risk.We are not responsible for the content of external internet sites. Some of the links may not work




No comments:

Post a Comment

please leave your comments