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If xy.yx=16,then dydx at (2,2) is
Options:
A .  - 1
B .  0
C .  1
D .  None of these
Answer: Option A
:
A
xy.yx=16
logexy+logeyx=loge16
ylogex+xlogey=4loge2
Now, differentiating both sides w.r.t.x
yx+logexdydx+xydydx+logey.1=0
dydx=(logey+yx)(logex+xy)
dydx|(2,2)=(loge2+1)(loge2+1)=1
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