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Identify the absolute extrema of the function and the x-values where they occur. f(x)=6x+(24/x^sqr)+3, x>0

Identify the absolute extrema of the function and the x-values where they occur. f(x)=6x+(24/x^sqr)+3, x>0
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Identify the absolute extrema of the function and the x-values where they occur.

f(x)=6x+(24/x^sqr)+3, x>0

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User Prhmma
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1 Answer

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f(x)=6x+(24)/(x^2)+3\\ f'(x)=6-(48)/(x^3)\\ 6-(48)/(x^3)=0\\ 6x^3-48=0\\ 6x^3=48\\ x^3=8\\ x=2\\

For
x<2 \wedge x\\ot=0 the derivative is negative.
For
x>2 the derivative is positive.
Therefore at
x=2 there's a minimum.


f_(min)=6\cdot2+(24)/(2^2)+3=12+6+3=21

answered
User Ergec
by
7.9k points
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