How do you find the derivative of #y=sec(sec x)# using the chain rule?
1 Answer
Dec 17, 2016
We derive the derivative of the secant function as follows.
#y = 1/cosx#
By the quotient rule:
#y = (0 xx cosx - 1 xx -sinx)/(cosx)^2#
#y = sinx/cos^2x#
#y = tanxsecx#
We now apply this to our problem.
Let
By the chain rule:
#dy/dx = dy/(du) xx (du)/dx#
#dy/dx = tanusecu xx tanxsecx#
#dy/dx = tan(secx)sec(secx)tanxsecx#
Hopefully this helps!
