Derivatives of Compositions

Example:

y = (10*t² + p)^p

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

(

)^p

where

10*t² + p

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.

f( g(x) )

then the derivative of z is

	z'	=	( f(g(x)) )'
		=	f '(g(x))	g '(x)

Or, if

), where

= g(x)

then the derivative of z is

z'	=	( f( ) )'
	=	f '( )	( )'
	=	f '( )	g '(x)

So our example,

(

)^p

where

10*t² + p

we can think of as

)

, where

g(t)

10*t² + p

So the derivative is

y '	= (	f( )		)'
	=	f '( )	( )'
	=	( ()^p )'	( 10*t² + p )'

and we just need to know each of the derivatives on the right-hand side of the equation. In this case these are

( ()^p )'	=	(p)*()^p-1	(by the power rule)
( 10*t² + p )'	=	( 102t + 0 )	(by the derivative rule for sums, rule for constant multiples, and the derivative rule for constants)

so the finished derivative is

y '	=	(p)*()^p-1	( 102t + 0 )
	=	(p)(10t² + p)^p-1	( 102t + 0 )
	=	(20p)t (10t² + p)^p-1

additional explanation for the chain rule
see another chain rule example
practice gateway test
previous page

Page Generated: Thu Feb 19 16:20:35 2026
Comments to Gavin LaRose
glarose@umich.edu
©2001 Gavin LaRose, University of Michigan Math Dept.

y '	=	(p)*()^p-1	( 102t + 0 )
	=	(p)(10t² + p)^p-1	( 102t + 0 )
	=	(20p)t (10t² + p)^p-1