Media Summary: Objectives: 9. Use the Chain Rule to find partial derivatives. 10. For F(x,y,z) = c and z = f(x,y), find ∂z/∂x and ∂z/∂y. Ch Objective: 16. Find extrema of a function of two variables and identify saddle points. Ch Objectives: 5. Define the partial derivatives, fx (x,y) and fy (x,y). 6. Compute higher-order partial derivatives. Ch
Calc 3 14 4 Notes - Detailed Analysis & Overview
Objectives: 9. Use the Chain Rule to find partial derivatives. 10. For F(x,y,z) = c and z = f(x,y), find ∂z/∂x and ∂z/∂y. Ch Objective: 16. Find extrema of a function of two variables and identify saddle points. Ch Objectives: 5. Define the partial derivatives, fx (x,y) and fy (x,y). 6. Compute higher-order partial derivatives. Ch Objectives: 7. Define the total differential. 8. Use the total differential to approximate the change in a function. Ch Objectives: 11. Define the directional derivative Duf. 12. Define and compute the gradient of a function. 13. Find the direction in ...
