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xdy?ydx.

x2?y22y?2u? . 4. Éèu?yf()?xg(x),ÆäÖÐf,g¾ßÓжþ½×Á¬ÐøÆ«µ¼Êý,Ôòx?u?yxy?x?y?x2y?y?½â£º?u?yf'()??2??g(x)?xg'(x)1,

?xx?x?yyyy?y2?y2y?2ux1x1x1()xg' '(), 2?yf''(?)4??yf'()3?g'(?)g'?x?x?xxyyyyyy2?x ?y?y2?y2y?2uxxxx2xx 2??f''()?3??f'()2?g'()2?g''()3?g'()2,

x?x?xxyyyyyy?x22?u?ËùÒÔx2?yu?0.

?x?y?x5. Èôº¯Êýz=f(x,y)ÔÚµã(x0,y0)´¦µÄÆ«µ¼Êý´æÔÚ£¬ÔòÔڸõ㴦º¯Êýz?f(x,y) ( D )

A Óм«ÏÞ BÁ¬Ðø

C ¿É΢ DÒÔÉÏÈýÏ²»³ÉÁ¢

½â£ºÒòΪƫµ¼Êý´æÔÚ£¬²»ÄÜÍƳö¼«ÏÞ´æÔÚ£¬ËùÒÔABCÈýÏî²»Ò»¶¨ÕýÈ·. 6. Æ«µ¼Êýfx(x0,y0)£¬fy(x0,y0)´æÔÚÊǺ¯Êýz=f(x,y)ÔÚµã(x0,y0)Á¬ÐøµÄ( D ) A ³ä·ÖÌõ¼þ B ±ØÒªÌõ¼þ

C ³äÒªÌõ¼þ D ¼´·Ç³ä·ÖÒ²·Ç±ØÒªÌõ¼þ ½â£ºÍ¬5.

22

7. É躯Êýf(x,y)=1£­x+y,ÔòÏÂÁнáÂÛÕýÈ·µÄÊÇ( D )

A µã(0,0)ÊÇf(x,y)µÄ¼«Ð¡Öµµã B µã(0,0)ÊÇf(x,y)µÄ¼«´óÖµµã C µã(0,0)²»ÊÇf(x,y)µÄפµã D f(0,0)²»ÊÇf(x,y)µÄ¼«Öµ 8. ÇóÏÂÁм«ÏÞ£º (1)

lim(x2?y2)sin1£» (2) (x,y)?(0,0)xy(x,y)?(0,0)(x,y)?(0, 0)limxy?1?1.

x?y½â£º(1) ÒòΪ (2)

(x,y)?(0, 0)lim(x2?y2)?0£¬¶øsin11Óнç.ËùÒÔlim(x2?y2)sin?0.

(x,y)?(0,0)xyxylimxy?1?1(xy?1?1)(xy?1?1)xy?lim?lim (x,y)?(0, 0)(x,y)?(0, 0)x?y(x?y)(xy?1?1)(x?y)(xy?1?1) =0

9. Éèu=e3xy£¬¶øx2+y=t2,x£­y=t+2,Çódu.

dtt?0£­

½â£ºÓÉx2+y=t2,x£­y=t+2,¿ÉµÃ dxdydxdy2x??2t,??1,ËùÒÔ dtdtdtdtdx2t?1dy2t?2x?,?. dt2x?1dt2x?1dy2t?13x?y2t?2x. Òò´Ë£¬du?dudx?du?3e3x?y?edtdxdtdydt2x?12x?1Áît?0,µÃx??2,y??4»òx?1,y??1.

?2du5e4¹Ê?e»ò. dtt?03322?z?z?10. Éèz=f(x,y)ÓÉ·½³Ìxy+yz+xz=1ËùÈ·¶¨,Çó,2,z. ?x?x?x?y½â£ºÁ½±ßͬʱ¶ÔxÇóÆ«µ¼£¬µÃ

y?z?z?z?z?zx?z.

y?y?z?x?0,Òò´Ë??,ÓɶԳÆÐԿɵÃ???x?x?xx?y?yx?yy?z?z(x?y)?(y?z)?(x?y)?y?zx?y2y?2z?2z?x?????. 2222?x(x?y)(x?y)(x?y)(1??z)(x?y)?(y?z)(1?x?z)(x?y)?y?z2?yx?y?z2z?????. 22?x?y(x?y)(x?y)(x?y)2?2f?2f111. Éèf(u,v)¾ßÓжþ½×Á¬ÐøÆ«µ¼Êý,ÇÒÂú×ã2?2?1£¬ÓÖg(x,y)?f[xy,(x2?y2)],

2?u?vÊÔÖ¤

?2g?2g?2?x2?y2. 2?x?y1Ö¤£ºÉèu?xy,v?(x2?y2),Ôòg(x,y)?f(u,v).Ôò

2?g?f?u?f?v?f?f?g?f?u?f?v?f?f???y?x,???x?y, ?x?u?x?v?x?u?v?y?u?y?v?y?u?v?2g?2f?u?2f?y?2?x2?u2?x?v?2g?2f?u?2f?x?2?y2?u2?y?v?f?2f2?2f2?f?vx??y?2x?, ?x?v?u2?v?v?f?2f2?2f2?f?vy??x?2y?, ?y?v?u2?v?v?2g?2gËùÒÔ2?2?x2?y2.

?x?y12. Çóº¯Êýf(x,y)=x2(2+y2)+ylnyµÄ¼«Öµ.

2??fx(x,y)?2x(2?y)?0½â£ºÏȽⷽ³Ì×é? 2f(x,y)?2xy?lny?1?0??yµÃפµãΪ(0,1).

1fxx?2(2?y2),fxy?x,y??4xy,fyy?x,y??2x2?,

yÔÚµã(0£¬1)´¦,¦¤=AC-B2=6¡Á1-0>0,ÓÖA>0,ËùÒÔº¯ÊýÔÚ(0£¬1)´¦Óм«Ð¡Öµf(0£¬1)=0.

£¨B£©

£­?z?1. Éèz=ex+f(x£­2y)£¬ÇÒÒÑÖªy=0ʱ£¬z=x2,Ôò .

?x½â£ºÁîy?0µÃf(x)?x2?ex,Òò´Ë£¬z?ex?(x?2y)2?ex?2y,

?zËùÒÔ?ex?2(x?2y)?ex?2y.

?x2. Éèf(x,y,z)=exyz2£¬ÆäÖÐz=z(x,y)ÊÇÓÉx+y+z+xyz=0È·¶¨µÄÒþº¯Êý£¬Ôòfx(0,1,?1)? .

?z?z½â£ºÓÉx?y?z?xyz?0¿ÉµÃ1??y(z?x)?0.

?x?x1?yz¹Ê?z??. ?x1?xy1?yz?zfx(x,y,z)?y(exz2?ex?2z)?y(exz2?2exz)

?x1?xyÒò´Ëfx(0,1,?1)?1.

3. Éèz?ln(x?y),Ôòx?z?y?z? .

?x?y11112y2x?z?z,?½â£º?£¬

?xx?y?yx?y1(x?y)?z?z1?. ËùÒÔx?y?2?x?y2x?y214. Éèz?f(xy)?yg(x?y),,ÆäÖÐf,g¾ßÓжþ½×Á¬ÐøÆ«µ¼Êý,Ôò?z? .

x?x?yy½â£º?z??12f(xy)?f'(xy)?yg'(x?y),

?xxxy?2z11??f'(xy)?f'(xy)?f''(xy)x?g'(x?y)?yg''(x?y) ?x?yxxx ?yf''(xy)?g'(?xy?)yg''?(x. y5. º¯Êýf(x,y)?eA B C D

x2?y4ÔÚµã(0,0)´¦µÄÆ«µ¼Êý´æÔÚµÄÇé¿öÊÇ( C ).

fx(0,0)£¬fy(0,0)¶¼´æÔÚ fx(0,0)´æÔÚ£¬fy(0,0)²»´æÔÚ

fx(0,0)²»´æÔÚ£¬fy(0,0)´æÔÚ fx(0,0)£¬fy(0,0)¶¼²»´æÔÚ

2?x2f(0??x,0)?f(0,0)e?1?x½â£ºfx(0,0)?lim?lim=lim²»´æÔÚ, ?x?0?x?0?x?0?x?x?x?y4f(0,0??y)?f(0,0)e?y?1fy(0,0)?lim?lim=lim=0.

?x?0?x?0?x?0?y?y?y46. Éèf(x,y),g(x,y)¾ùΪ¿É΢º¯Êý£¬ÇÒgy(x,y)¡Ù0£¬ÒÑÖª(x0,y0)ÊÇf(x,y)ÔÚÔ¼ÊøÌõ¼þ

g(x,y)=0ϵÄÒ»¸ö¼«Öµµã£¬ÏÂÁнáÂÛÕýÈ·µÄÊÇ( D ) A Èôfx(x0,y0)=0,Ôòfy(x0,y0)=0 B Èôfx(x0,y0)=0,Ôòfy(x0,y0)¡Ù0 C Èôfx(x0,y0)¡Ù0,Ôòfy(x0,y0)=0 D Èôfx(x0,y0)¡Ù0,Ôòfy(x0,y0)¡Ù0

½â£º×÷À­¸ñÀÊÈÕº¯ÊýL(x,y,?)?f(x,y)??g(x,y)£¬ÔòÓÐ Lx(x,y,?)?fx(x0,y0)??gx(x0,y0)?0£¬ Ly(x,y,?)?fy(x0,y0)??gy(x0,y0)?0.

ÓÉÓÚgy(x,y)¡Ù0£¬ËùÒÔµ±fx(x0,y0)¡Ù0£¬??0,Òò´Ë?gy(x0,y0)?0£¬´Ó¶øfy(x0,y0)¡Ù0. 7. É躯Êýu=f(x,y,z)ÓÐÁ¬ÐøÆ«µ¼Êý£¬ÇÒz=z(x,y)ÊÇÓÉxex£­yey=zezËùÈ·¶¨µÄÒþº¯Êý£¬Çódu.

yy?zz?zex?xex?z?e?yexyzxxz?z½â£ºÓÉxe£­ye=ze¿ÉµÃe?xe?e?ze. .¹Ê?,ͬÀí?z?x?x?xez?zez?ye?zezÒò´Ëdu?fxdx?fydy?fzdz

xxey?yeye?xe ?fxdx?fydy?fz(zdx?zdy)

e?zeze?zezey?yeyex?xex

?(fx?fzz)dx?(fy?fzz)dy.

e?zeze?zez8. É躯Êýu=f(x,y,z)ÓÐÁ¬ÐøÆ«µ¼Êý£¬ÇÒy=y(x),z=z(x)·Ö±ðÓÉÏÂÁÐÁ½Ê½È·¶¨£º

x?zexy?xy?2,ex??sintdt£¬

0tÇó

du. dxxyxydydydyexyy?yy½â£ºÓÉe?xy?2,¿ÉµÃe(y?x)?(y?x)?0,Òò´Ë£¬???. xydxdxdxx?exxx?zsintsin(x?z)ex(x?z)dzdzxxÓÉe??. dt,¿ÉµÃe?(1?)£¬Òò´Ë?1?0tx?zdxdxsin(x?z)dyyex(x?z)dudz¹Ê?fx?fy?fz?fx?fy?fz[1?]. dxdxdxxsin(x?z)9. Éèz=z(x,y)ÓÉ·½³Ìx2+y2£­z=g(x+y+z)ËùÈ·¶¨£¬ÆäÖÐg¾ßÓжþ½×Á¬ÐøÆ«µ¼ÊýÇÒg¡ä¡Ù£­1. (1) Çódz;

?u.1(?z??z)(2) u(x,y)?,Çó

x?y?x?y?x½â£º(1)ÓÉx2?y2£­z?g?x?y?z?,Á½±ß·Ö±ðͬʱ¶Ôx¡¢yÇóÆ«µ¼µÃ

2x?Òò´Ëdz??z?z?z?z?g'?x?y?z?(1?),2y??g'?x?y?z?(1?). ?x?x?y?y?z2x?g'?x?y?z??z2y?g'?x?y?z??,?. ?xg'?x?y?z??1?yg'?x?y?z??12x?g'?x?y?z?2y?g'?x?y?z?dx?dy.

g'?x?y?z??1g'?x?y?z??1(2) u(x,y)?2x?2y1?z?z12, (?)??x?y?x?yx?yg'?x?y?z??1g'?x?y?z??12x?g'?x?y?z??z?2g''(x?y?z)[1?]?2g''(x?y?z)(1?)g'x?y?z?1???u?x??. 2?x[g'(x?y?z)?1][g'(x?y?z)?1]210. Çóº¯Êýu=x2+y2+z2ÔÚÔ¼ÊøÌõ¼þz=x2+y2ºÍx+y+z=4ϵÄ×î´óÖµºÍ×îСֵ.½â£ºÓÉz=x2?y2,x?y?z?4¿ÉµÃx2?y2?4?x?y.Òò´Ë£¬ÎÊÌâת»¯ÎªÇó (4?x?2y)ÔÚÔ¼ÊøÌõ¼þ u?4?x?y?22x?y?4

?xϵļ«ÖµÎÊÌâ?y.

ÁîL(x,y,?)?4?x?y?(4?x?y)2??(x2?y2?4?x?y), Lx(x,y,?)??1?2(4?x?y)?2?x???0£¬ Ly(x,y,?)??1?2(4?x?y)?2?y???0.

x2?y2?4?x?y?0,

½âµÃ: x??2,y??2»òx?1,y?1.Òò´Ë, z=8»òz=2.

ÓÖf(?2,?2,8)?72,f(1,1,2)?6.