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Question

Find the points at which y=f(x)=2x−ln(6x) has a global maximum, a global minimum, and a local, non-global maximum on the interval .1≤x≤2.7.. Round your answers to two decimal places.

Global Minimum:

(x,y) = (_,_)

Global Maximum:

(x,y) = (_,_)

Local, Non-Global Maximum:

(x,y) = (_,_)

Paul M. · Accepted Answer

You should graph this to see what happens.

There is neither a global max nor global min---the function is unbounded for |x| large.

The local min occurs at x=1/2 which is derived by setting the derivative = 0.

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1 Expert Answer

Still looking for help? Get the right answer, fast.

OR

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CAN I SUBMIT A MATH EQUATION I'M HAVING PROBLEMS WITH?

If i have rational function and it has a numerator that can be factored and the denominator is already factored out would I simplify by factoring the numerator?

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