What are the absolute extrema of $f(x)=x / (x^2 -6) in[3,7]$ ?

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What are the absolute extrema of $f(x)=x / (x^2 -6) in[3,7]$ ?

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Answer 1 · 2017-11-07T12:34:12

The absolute extrema can either occur on the boundaries, on local extrema, or undefined points.

Let us find the values of $f(x)$ on the boundaries $x=3$ and $x=7$ . This gives us $f(3)=1$ and $f(7)=7/43$ .

Then, find the local extrema by the derivative. The derivative of $f(x)=x/(x^2-6)$ can be found using the quotient rule: $d/dx(u/v)=((du)/dxv-u(dv)/dx)/v^2$ where $u=x$ and $v=x^2-6$ .

Thus, $f'(x)=-(x^2+6)/(x^2-6)^2$ . The local extrema occurs when $f'(x)=0$ , but nowhere in $x in [3,7]$ is $f'(x)=0$ .

Then, find any undefined points. However, for all $x in [3,7]$ , $f(x)$ is defined.

Therefore, it means that the absolute maximum is $(3,2)$ and the absolute minimum is $(7,7/43)$ .

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What are the absolute extrema of $f(x)=x / (x^2 -6) in[3,7]$ ?

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What are the absolute extrema of $f(x)=x / (x^2 -6) in[3,7]$ ?