How do you find the derivative of #u=2^(t^2)#?

1 Answer
Dec 16, 2016

#(du)/(dt)=2^(t(t+1))ln2#

Explanation:

With functions like this use logarithmic differentiation.

Take logs to base #""e""# first, then differentiate.

#u=2^(t^2)#

#lnu=ln2^(t^2)#

using the laws of logs to simplify.

#lnu=t^2ln2#

differentiate with respect to #""t""#

#1/u(du)/(dt)=2tln2#

rearrange

#(du)/(dt)=u2tln2#

substitute back for #""u""#and tidy up.

#(du)/(dt)=2^t2^(t^2)ln2#

#(du)/(dt)=2^(t^2+t)ln2#

#(du)/(dt)=2^(t(t+1))ln2#