Answer Happy

Posted: **Thu Jul 14, 2022 4:36 pm**

: 1 Point Let F X Y 6x2y4 Then Fx X Y Fx 3 Y Fx X 2 Fx 3 2 Fy X Y Fy 3 Y Fy X 2 Fy 3 2 1 Point 1 (65.83 KiB) Viewed 37 times

: 1 Point Let F X Y 6x2y4 Then Fx X Y Fx 3 Y Fx X 2 Fx 3 2 Fy X Y Fy 3 Y Fy X 2 Fy 3 2 1 Point 2 (12.29 KiB) Viewed 37 times

(1 point) Let f(x,y)=6x2y4. Then fx(x,y)=fx(3,y)=fx(x,−2)=fx(3,−2)=fy(x,y)=fy(3,y)=fy(x,−2)=fy(3,−2)=
1 point) Calculate all four second-order partial derivatives and check that fxy=fyz : Assume the variables are restricted to a domain on which the functon is lefined. f(x,y)=e3xy fzz= fyy= fzy= fyz=

Answer Happy

(1 point) Let f(x,y)=6x2y4. Then fx​(x,y)=fx​(3,y)=fx​(x,−2)=fx​(3,−2)=fy​(x,y)=fy​(3,y)=fy​(x,−2)=fy​(3,−2)=​ 1 point)

(1 point) Let f(x,y)=6x2y4. Then fx​(x,y)=fx​(3,y)=fx​(x,−2)=fx​(3,−2)=fy​(x,y)=fy​(3,y)=fy​(x,−2)=fy​(3,−2)=​ 1 point)

(1 point) Let f(x,y)=6x2y4. Then fx(x,y)=fx(3,y)=fx(x,−2)=fx(3,−2)=fy(x,y)=fy(3,y)=fy(x,−2)=fy(3,−2)= 1 point)

(1 point) Let f(x,y)=6x2y4. Then fx(x,y)=fx(3,y)=fx(x,−2)=fx(3,−2)=fy(x,y)=fy(3,y)=fy(x,−2)=fy(3,−2)= 1 point)