Derivatives of Compositions

The first thing to notice when finding the derivative of this function is that it is a composition of two functions, as shown below:

B(p)

=

ln()

where

=

e*p - 5

The Chain Rule (Derivative Rule for Compositions):

The derivative of a composition is the product of the derivative of the outer function (with the inner function plugged in) and the derivative of the inner function.

If   z = f( g(x) ) then the derivative of z is   z' = ( f(g(x)) )'     = f '(g(x)) g '(x)

Or, if   z = f( ), where = g(x) then the derivative of z is   z' = ( f( ) )'     = f '( ) ( )'     = f '( ) g '(x)

So our example,

B(p)

=

ln()

where

=

e*p - 5

B(p)

=

f( )

, where

=

g(p)

=

e*p - 5

B '(p)	= (	f( )		)'
	=	f '( )	( )'
	=	( ln() )'	( e*p - 5 )'

( ln() )'	=	()-1	(by the derivative rules for basic functions)
( e*p - 5 )'	=	( e - 0 )	(by the derivative rule for sums, rule for constant multiples, and the derivative rule for constants)

B '(p)	=	()-1	( e - 0 )
	=	(e*p - 5)-1	( e - 0 )
	=	e*(e*p - 5)-1