What are the absolute extrema of $f(x)= 3x^3 − sqrt(3x^2 − 6x + 3) in [-2,9]$ ?

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What are the absolute extrema of $f(x)= 3x^3 − sqrt(3x^2 − 6x + 3) in [-2,9]$ ?

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Answer 1 · 2017-02-09T17:50:16

f is differentiable and $f uarr$ with $x in (-oo, oo)$ . So, the end values |f(-2)|=27 and f(9)=2187-2sqrt6# are absolute extrema. See the illustrative Socratic graphs and explanation.

Explanation:

$f(x)=sqrt3(sqrt3x^3-|x-1|)$ .

See the graphs of the given function and this equivalent function.

As $x to +-oo, f to +-oo$ .

$f'=3x^2-1>0, x >1$ ,

$f'=3, x =1 and$

$f'=3x^2+1>0, x <1$ .'

In brief, $f uarr$ with x.

Absolute minimum = lower-end value $f(-2)|=27$ .

Absolute maximum = upper-end value $f(9) =2187-2sqrt6$ .

graph{3x^3-sqrt(3x^2-6x+3) [-10, 10, -5, 5]}

graph{3x^3-sqrt3|x-1| [-10, 10, -5, 5]}

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What are the absolute extrema of $f(x)= 3x^3 − sqrt(3x^2 − 6x + 3) in [-2,9]$ ?

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Explanation:

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What are the absolute extrema of f(x)= 3x^3 − sqrt(3x^2 − 6x + 3) in [-2,9] f(x)= 3x^3 − sqrt(3x^2 − 6x + 3) in [-2,9]?

1 Answer

Explanation:

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What are the absolute extrema of $f(x)= 3x^3 − sqrt(3x^2 − 6x + 3) in [-2,9]$ ?