5: Derivatives of the Exponential and Logarithm Functions
- Page ID
- 36865
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Where are we going?
In this chapter you will learn how to compute the rates of change of exponential and logarithmic functions, for example \(y = 2^x\) and \(y = \log _{10} x.
You will find a preferred number, \(e \doteq 2.71828\), for which the derivatives of the exponential function \(y = e ^x\) and the logarithm function \(y = \log _{e} x\) ( denoted by \(\ln x\)) are very simple.
We continue the use of rate of change to model biological and physical processes. The derivatives of exponential and logarithm functions greatly expand the class of biological processes that we describe with equations.
