Is #f(x)=-3x^3-5x^2-x-1# increasing or decreasing at #x=-2#?
1 Answer
Feb 9, 2016
Decreasing.
Explanation:
Find the sign of the first derivative at
- If
#f'(-2)<0# , then#f(x)# is decreasing at#x=-2# . - If
#f'(-2)>0# , then#f(x)# is increasing at#x=-2# .
To find the derivative of the function, use the power rule.
#f(x)=-3x^3-5x^2-x-1#
#f'(x)=-9x^2-10x-1#
The sign of the derivative at
#f'(-2)=-9(-2)^2-10(-2)-1=-36+20-1=ul(-17#
Since this is
graph{-3x^3-5x^2-x-1 [-4, 2, -12, 15]}
