Let z(x,y)=e^(3xy), x(p,q)=p/q and y(p,q)=q/p are functions. Use multivariable chain rule of partial derivatives to find (i) (delz)/(delp) (ii) (delz)/(delq).

Anish Buchanan

Anish Buchanan

Answered question

2021-01-06

Let z(x,y)=e3xy,x(p,q)=pqandy(p,q)=qp are functions. Use multivariable chain rule of partial derivatives to find
(i) zp
(ii) zq.

Answer & Explanation

SoosteethicU

SoosteethicU

Skilled2021-01-07Added 102 answers

(i) zp=zxxp+zyyp (1)
⇒∵zx=e3xy3yzx=3ye3xy
zy=e3xy3xzy=3xe3xy
xp=1qandxq=9q2
yp=1p2andyp=1p
Using these values equation (1) becomes:
zp=3ye3xy1q+3xe3xy(qp2)
zp=3ye3xyq(3xqe3xyp2)
zp=(3e3xyqp2(p2yxq2))
(ii) zq=zxxq+zyyq
zq=3ye3xy(pq2)+3xe3xy(1p)
zq=(3ype3yxq2+3xpe3xy)
zq=(3e3xypq2(xq2yp2))

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Multivariable calculus

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?