Chapter 4: Partial Differentiation
Section 4.3: Chain Rule
Example 4.3.9
Let Fx,y=frx,y,sx,y be defined by the composition of fr,s with r=x2−y2, s=y2−x2, for any sufficiently well-behaved function fr,s. Show that yFx+xFy=0.
Solution
Mathematical Solution
y Fx+x Fy
=y fr rx+fs sx+x fr ry+fs sy
=y fr 2 x+fs −2 x+x fr −2 y+fs 2 y
=fr 2 x y−fs 2 x y+fr −2 x y+fs 2 x y
=2 x y−2 x y fr+−2 x y+2 x y fs
=0⋅fr+0⋅fs
=0+0
=0
Maple Solution - Interactive
Define rx,y and sx,y
Context Panel: Assign Name
r=x2−y2→assign
s=y2−x2→assign
Apply the chain rule to obtain xFx+yFy
Calculus palette: Partial-differential operator Press the Enter key.
Context Panel: Simplify≻Simplify
y ∂∂ x fr,s+x ∂∂ y fr,s
y2D1fx2−y2,−x2+y2x−2D2fx2−y2,−x2+y2x+x−2D1fx2−y2,−x2+y2y+2D2fx2−y2,−x2+y2y
= simplify
0
Maple Solution - Coded
Implement the chain rule
Apply the simplify and diff commands.
y difffr,s,x +x difffr,s,y
y2D1fx2−y2,−x2+y2x−2D2fx2−y2,−x2+y2x+x−2D1fx2−y2,−x2+y2y+2D2fx2−y2,−x2+y2y
simplifyy difffr,s,x +x difffr,s,y
<< Previous Example Section 4.3 Next Example >>
© Maplesoft, a division of Waterloo Maple Inc., 2024. All rights reserved. This product is protected by copyright and distributed under licenses restricting its use, copying, distribution, and decompilation.
For more information on Maplesoft products and services, visit www.maplesoft.com
Download Help Document
