   Chapter 11, Problem 31RE Finite Mathematics and Applied Cal...

7th Edition
Stefan Waner + 1 other
ISBN: 9781337274203

Solutions

Chapter
Section Finite Mathematics and Applied Cal...

7th Edition
Stefan Waner + 1 other
ISBN: 9781337274203
Textbook Problem

In Exercises 1-32, find the derivative of the given function. f ( x ) = ln ( x 2 − 1 )

To determine

To calculate: The derivative of the function f(x)=ln(x21).

Explanation

Given information:

The provided function is f(x)=ln(x21).

Formula used:

The derivative of natural logarithm of a function is ddxln|u|=1ududx.

Calculation:

Consider the function, f(x)=ln(x21)

The derivative of natural logarithm of a function is ddxln|u|=1ududx.

Here, u=x21

Then, the derivative of function is,

f(x)=ddxln(x21)=1(x21)<

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