Sarahisme Posted May 14, 2005 Posted May 14, 2005 Hey can i ask if my answers to this question are correct...? a) yes, because f'(x) = 0 at x = 0 b) yes, because there exists a tangent line at x = 0 (because of part a) and the concavity is of a different sign on both sides of x = 0 (i.e. f''(x) is -ve one left and +ve on right) c) no it is not true, because f''(x) = 2 for all real x in the domain d) no, as can been seen in this question Sarah
Dave Posted May 14, 2005 Posted May 14, 2005 Seems okay, apart from ©. I don't think your second derivative is quite correct.
uncool Posted May 14, 2005 Posted May 14, 2005 f''(x) jumps from -2 to 2 at 0. d is therefore anwered incorrectly. The answer is that the second derivative does necessarily vanish. -Uncool-
Sarahisme Posted May 15, 2005 Author Posted May 15, 2005 ok, so so part c should be c) f''(x) is either -2 or 2, so not zero and d) no not necessarily
matt grime Posted May 15, 2005 Posted May 15, 2005 Well, in c) you ought to say that the function only has a one sided second derivative at x=0, and some people, like me, would point out that therefore f'' doesn't exist at x=0.
Sarahisme Posted May 17, 2005 Author Posted May 17, 2005 isnt the first derivative only one sided too? (at x = 0) ?? and therefore the first derivative does not exist at x = 0 ??
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