Tuesday, November 27, 2012

Asymptotes

The other day in class we learned that there are several different types of asymptotes, mathematical asymptotes (ex. when your denominator equals zero), realistic and theoretical asymptotes (ex. carrying capacity of a population graph), and physical asymptotes (ex. the reaction of an electron and nucleus). So I was wondering, is there one set of properties that apply to all asymptotes?
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9 comments:

  1. AnonymousNovember 28, 2012 at 4:42 PM

    I was thinking about this, and i really was drawn to limit. But as we talked about limit and asymptote carry a different meaning. So I thought of another property to give the asymptote as a whole throughout its many uses, and applications.
    -a point or points(line) where the input for whatever application cannot exist

    Any to add, going off off that Tashi?

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  2. TashiNovember 29, 2012 at 10:16 AM

    Yes! I definitely agree but I was really wondering a about properties that were a little more specific.

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  3. AnonymousNovember 29, 2012 at 10:20 AM

    wondering about*
    no "a" needed there

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  4. AnonymousNovember 29, 2012 at 10:21 AM

    ill assume typo for your sake

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  5. TashiNovember 29, 2012 at 10:23 AM

    Yes it was, but do you have any ideas about asymptote properties?

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  6. AnonymousNovember 29, 2012 at 10:25 AM

    Tashi, I think i have an idea for a more specific asymptote.
    Can you have a plane of asymptotic behavior, or a point with asymptotic behavior?

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  7. AnonymousNovember 29, 2012 at 10:28 AM

    We know about point limits, but is that the same as a point asymptote. It seems that a point limit is approached asymptotically.

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    Replies
    1. TashiNovember 29, 2012 at 10:49 AM

      The questions about plane and point asymptotes are super interesting now I am wondering as well Also I think from our conversation in class yesterday we con conclude that although asymptotes and limits are similar, they have important differences.

      Delete
  8. FedirkoDecember 2, 2012 at 3:55 PM

    This is a very important thread for a number of different reasons. First, the notion of a "point asymptote" or a "plane asymptote" is something new to our language and we would want to check on these usages before presenting them to a wider audience such as the math department. Second, Tashi could you please elucidate what you perceive the differences between limits and asumptotes to be?

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