设z=f(2x-y,ysinx),其中f(u,v)具有连续的二阶偏导数,求?2z?x?y
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∵z=f(2x-y,ysinx)
∴
z=
f(2x-y,ysinx)
=f1′
(2x-y)+f2'
(ysinx)
=2f1′+ycosxf2'
=
(2f1′+ycosxf2')
=2
f1′+cosx
(yf2')
因为:
f1′=f11″
(2x-y)+f12″
(ysinx)
=-f11″+sinxf12″
(yf2')=f2'+y
f2'
=f2'+y[f21″
(2x-y)+f22″
(ysinx)]
=f2'+y[-f21″+sinxf22″]
=f2'-yf21″+ysinxf22″
所以:
=2
f1′+cosx
(yf2')
=2(-f11″+sinxf12″)+cosx(f2'-yf21″+ysinxf22″)
=-2f11″+2sinxf12″+cosxf2'-ycosf21″+ysinxcosxf22″
又因为函数f具有连续二阶导数,所以其二阶混合偏导数相等,即:
f12″=f21″
所以:
=-2f11″+2sinxf12″+cosxf2'-ycosf21″+ysinxcosxf22″
=-2f11″+(2sinx-ycosx)f12″+cosxf2'+ysinxcosxf22″
故
的值为:
-2f11″+(2sinx-ycosx)f12″+cosxf2'+ysinxcosxf22″
∴
| ? |
| ?x |
| ? |
| ?x |
=f1′
| ? |
| ?x |
| ? |
| ?x |
=2f1′+ycosxf2'
| ?2z |
| ?x?y |
| ? |
| ?y |
=2
| ? |
| ?y |
| ? |
| ?y |
因为:
| ? |
| ?y |
| ? |
| ?y |
| ? |
| ?y |
=-f11″+sinxf12″
| ? |
| ?y |
| ? |
| ?y |
=f2'+y[f21″
| ? |
| ?y |
| ? |
| ?y |
=f2'+y[-f21″+sinxf22″]
=f2'-yf21″+ysinxf22″
所以:
| ?2z |
| ?x?y |
| ? |
| ?y |
| ? |
| ?y |
=2(-f11″+sinxf12″)+cosx(f2'-yf21″+ysinxf22″)
=-2f11″+2sinxf12″+cosxf2'-ycosf21″+ysinxcosxf22″
又因为函数f具有连续二阶导数,所以其二阶混合偏导数相等,即:
f12″=f21″
所以:
| ?2z |
| ?x?y |
=-2f11″+(2sinx-ycosx)f12″+cosxf2'+ysinxcosxf22″
故
| ?2z |
| ?x?y |
-2f11″+(2sinx-ycosx)f12″+cosxf2'+ysinxcosxf22″
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简单计算一下即可答案如图所示
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zx=f1*2+f2
ycosx
=2f1+ycosxf2
zxy=-2f11+2sinxf12+cosxf2+ycosx(-f21+sinxf22)
=-2f11+2sinxf12+cosxf2-ycosxf21+ysinxcosxf22
ycosx
=2f1+ycosxf2
zxy=-2f11+2sinxf12+cosxf2+ycosx(-f21+sinxf22)
=-2f11+2sinxf12+cosxf2-ycosxf21+ysinxcosxf22
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