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![[Post New]](/templates/default/images/icon_minipost_new.gif) 9 Jun 2008 22:26:48 IST
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Xy +Yx=2 , find dy / dx?
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9 Jun 2008 23:00:32 IST
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Re:please solve this question
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Diff on both sides,we get,
xy[y/x+y'lnx]+yx[lny+xy'/y]=0
 y'=-[yxy-1+yxlny]/[xylnx+xyx-1].
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MAKING A MISTAKE IS HUMAN BUT REPEATING IT IS IDIOTIC. |
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10 Jun 2008 11:00:59 IST
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xy + yx = 2
differntiate both sides w.r.t x
xy ( dy/dx lnx + y/x ) + yx (lny + dy/dx x/y)
xy dy/dx lnx + xy - 1y + yx lny + yx dy/dx x/y
dy/dx = -(x y -1y + yx lny) / (xy lnx + yx -1 y )
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10 Jun 2008 23:22:45 IST
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X^Y + Y^X = 2
YLOGX + XLOGY = LOG2
Y/X + LOGX*DY/DX + X/Y*DY/DX + LOGY = 0
DY/DX ( LOGX + X/Y ) = - ( Y/X + LOGY )
DY/DX { ( YLOGX + X ) /Y } = - { ( Y + XLOGY ) / X }
DY/DX = - Y (Y + XLOGY ) / X ( YLOGX + X ) 
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POORNIMA PUNDIR
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16 Jun 2008 23:46:20 IST
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This can be more easily solved by partial differentiation method....
let f = x^y+y^x-2=0
differentiate f wrt x keeping y const.
df / dx = yx^(y-1) + y^xlogy - 0 = yx^(y-1) + y^xlog y ------- 1
differentiate f wrt y keeping x const....
df / dy = x^ylogx + xy^(x-1) ----------2
dividing 2 by 1
dy / dx = - { [ x^ylogx + xy^(x-1)] / [ yx^(y-1) + y^xlogy] }
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16 Jun 2008 23:47:25 IST
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plz tell me wether my ans is correct or not.......
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