How do use the first derivative test to determine the local extrema $f (x) = x - 2 tan (x)$ $f(x)=x-2tan(x)$ ?

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How do use the first derivative test to determine the local extrema $f (x) = x - 2 tan (x)$ $f(x)=x-2tan(x)$ ?

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Answer 1 · 2015-09-15T01:52:17

This function has no local extreme points because its derivative is never zero.

Explanation:

If $f (x) = x - 2 tan (x)$ $f(x)=x-2tan(x)$ then $f'(x)=1-2sec^2(x)$ . Setting this equal to zero results in the equation $sec^2(x)=1/2$ , which is equivalent to $cos^2(x)=2$ , which clearly has no solutions.

In fact, $sec^2(x) geq 1$ for all $x$ where it is defined so that $f'(x)=1-2sec^2(x) leq 1-2=-1$ for all $x$ where $f(x)$ is defined, so $f(x)$ is strictly decreasing over individual intervals on which it is defined (such as the interval $(-pi/2,pi/2)$ ).

Here's the graph of $f$ :

graph{x-2tan(x) [-20, 20, -10, 10]}

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How do use the first derivative test to determine the local extrema $f (x) = x - 2 tan (x)$ $f(x)=x-2tan(x)$ ?

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Explanation:

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How do use the first derivative test to determine the local extrema f(x)=x-2tan(x)f(x)=x−2tan(x)f(x)=x-2tan(x)?

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Explanation:

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How do use the first derivative test to determine the local extrema $f (x) = x - 2 tan (x)$ $f(x)=x-2tan(x)$ ?