What is the minimum value of #f(x)=3x^2-6x+12#?

1 Answer
Trevor Ryan.
Dec 5, 2015

#9#

Explanation:

Relative minimum and maximum points may be found by setting the derivative to zero.
In this case,
#f'(x)=0 iff6x-6=0#
#iff x=1#

The corresponding function value at 1 is #f(1)=9#.

Hence the point #(1,9)# is a relative extreme point.

Since the second derivative is positive when x = 1, #f''(1)=6>0#, it implies that x = 1 is a relative minimum.

Since the function f is a 2nd degree polynomial, its graph is a parabola and hence #f(x)=9# is also the absolute minimum of the function over #(-oo,oo)#.
The attached graph also verifies this point.

graph{3x^2-6x+12 [-16.23, 35.05, -0.7, 24.94]}

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