Is #f(x)=-2x^5-3x^4+15x-4# concave or convex at #x=-4#?
1 Answer
Mar 1, 2016
Convex (sometimes called "concave upwards").
Explanation:
The concavity and convexity of a function can be determined by examining the sign of a function's second derivative.
- If
#f''(-4)<0# , then#f# is concave at#x=-4# . - If
#f''(-4)>0# , then#f# is convex at#x=-4# .
Note that: you may call concave "concave down" and convex "concave up."
We must find the function's second derivative through the power rule:
#f(x)=-2x^5-3x^4+15x-4#
#f'(x)=-10x^4-12x^3+15#
#f''(x)=-40x^3-36x^2#
The value of the second derivative at
#f''(-4)=-40(-4)^3-36(-4)^2=1984#
Since this is
