Is #f(x) = x^3 - 2x^2+1/x# concave or convex at #x=-1#?
1 Answer
Mar 2, 2016
concave at x = -1
Explanation:
To test if a function is concave / convex at f(a) , require to find the value of f''(a).
• If f''(a) > 0 then f(x) is convex at x = a
• If f''(a) < 0 then f(x) is concave at x = a
hence:
#f(x) = x^3-2x^2 + 1/x = x^3 - 2x^2 + x^-1 # f'(x)
#= 3x^2 - 4x -x^-2 # and f''(x)
# = 6x - 4 +2x^-3 = 6x-4 + 2/x^3# so f''(-1)
#= 6(-1) - 4 + 2/(-1)^3 = -6-4-2 = -12 # Since f''(-1) < 0 then f(x) is concave at x = -1
graph{x^3-2x^2+1/x [-12.66, 12.65, -6.33, 6.32]}
