What is the minimum value of #g(x) = x^2-2x - 11/x?# on the interval #[1,7]#?

1 Answer
Shwetank Mauria
Jun 17, 2016

The function is continuously increasing in the interval #[1,7]# its minimum value is at #x=1#.

Explanation:

It is obvious that #x^2-2x-11/x# is not defined at #x=0#, however it is defined in the interval #[1,7]#.

Now derivative of #x^2-2x-11/x# is #2x-2-(-11/x^2)# or

#2x-2+11/x^2# and it is positive throughout #[1,7]#

Hence, the function is continuously increasing in the interval #[1,7]# and as such minimum value of #x^2-2x-11/x# in the interval #[1,7]# is at #x=1#.

graph{x^2-2x-11/x [-40, 40, -20, 20]}

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