Is #f(x)=(x^3-6x^2-4x-9)/(x+1)# increasing or decreasing at #x=0#?

1 Answer
flamespirit919
May 17, 2017

Increasing

Explanation:

To find if the function is increasing or decreasing we have to find the slope at #x=0# or calculate the derivative at #x=0#. Let's divide the polynomial first to make it easier. When we divide we get the following
#f(x)=x^2-7x+3-12/{x+1}#

The derivative is then
#f'(x)=2x-7+12/{(x+1)^2}#

Plugging in #x=0# we get
#f'(0)=2(0)-7+12/{(0+1)^2}#
#f'(0)=0-7+12/{1^2}#
#f'(0)=-7+12#
#f'(0)=5#

Since the value is positive, the function is increasing at #x=0#.

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