How do you find #(dy)/(dx)# given #ln(xy)=cos(y^4)#?

1 Answer
Jun 23, 2017

#dy/dx=(-y)/(x+4xy^4sin(y^4))#

Explanation:

Differentiate as normal, but remember that differentiating any function of #y# with respect to #x# will cause the chain rule to be in effect, essentially creating a #dy/dx# term.

First, we can simplify the natural logarithm function using #log(ab)=loga+logb#, so we don't have to use the product rule on #xy#.

#lnx+lny=cos(y^4)#

Then, differentiating:

#1/x+1/ydy/dx=-4y^3sin(y^4)dy/dx#

Group the #dy/dx# terms, since we want to solve for it, the derivative:

#1/ydy/dx+4y^3sin(y^4)dy/dx=-1/x#

#dy/dx(1/y+4y^3sin(y^4))=-1/x#

#dy/dx=(-1/x)/(1/y+4y^3sin(y^4))#

Multiplying the fraction by #(xy)/(xy)#:

#dy/dx=(-y)/(x+4xy^4sin(y^4))#