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#1 2007-09-17 21:35:25
- fusilli_jerry89
- Member
- Registered: 2006-06-23
- Posts: 86
Need Help proving limit
Prove limx->2 x^3 = 8
let epsilon > 0 be given for x.
|f(x)-L] = |x^3-8|
is < epsilon if o<|x-2|<delta
then |f(x)-L| = |x^3-8| < epsilon
Assuming im right so far what do I do now? Also, can some1 plz explain to me how to relation epsilon to delta, im not sure how and I dont think I did it right on this question.
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#2 2007-09-17 23:48:23
- JaneFairfax
- Member
- Registered: 2007-02-23
- Posts: 6,868
Re: Need Help proving limit
Well, the tricky part is the |x[sup]3[/sup]−8|, isnt it? Heres one trick you could use.
Note that
.The curve
, which is minimum at x = −1, is strictly increasing for x > −1. Now you have . So if we make sure δ is not more than 1, x will be less than 3 (and greater than 1), so x[sup]2[/sup]+2x+4 will be guaranteed to be less than 19.So if 0 < |x−2| < δ and δ ≤ 1, we have
. We also want 19δ ≤ ε, i.e. δ ≤ ε⁄19. HenceLast edited by JaneFairfax (2007-09-17 23:52:11)
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