Example: Derivatives in Polar Coordinates - YouTube
Finding Derivatives of Functions Written in Polar Coordinates | Calculus | Study.com
SOLVED: Show that when z is represented by polar coordinates, the derivative of a function f(z) can be written as (d f)/(d z)=e^-i θ((∂ U)/(∂ r)+i (∂ V)/(∂ r)), where U and
Using the Chain Rule With Polar Coordinates - YouTube