you again? Did you not see how your previous problems were done?
What troubles you about this one?
critical values, max/min: f'=0 and f" ≠ 0
inflection and concavity: use f"
exponentials like e^x have no symmetry
so, how about you at least try to work this one? You must have some idea on at least some of the parts.
f (x) = (x^2 + x - 6) e^x
Find the:
a) domain
b) intercepts
c) asymptotes
d) symmetry
e) critical values of the 1st derivative
f) intervals of increase/decrease
g) local and extreme maximum/minimum points
h) critical values of the 2nd derivative
i) concavity
j) points of inflection
* if you can please show the steps, so that I can follow everything
3 answers
No oobleck, this question is different from yesterday. Have e^x makes it difficult to work with and I’m not sure what numbers I need. Getting critical numbers is harder with this question. I’m not sure i did it right which is why I’m looking for a thorough answer. The whole point is that I know bits and pieces and have given it a try, now I need a solution to see if it’s right!
the problem is different, but the steps are the same
see your repeated post of this question.
If you have come up with a solution, show it, and I can tell whether it's right or not. Not that old dodge of "I want to check my answer." >wink wink<
You want me to show my work, so how about meeting me halfway?
see your repeated post of this question.
If you have come up with a solution, show it, and I can tell whether it's right or not. Not that old dodge of "I want to check my answer." >wink wink<
You want me to show my work, so how about meeting me halfway?
1 answer