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InertialObservr's profile
〈 Berger | Dillon 〉
〈 Berger | Dillon 〉
〈 Berger | Dillon 〉
@InertialObservr

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〈 Berger | Dillon 〉

@InertialObservr

PhD student of Theoretical Particle Physics @UCIrvine l @NSF Fellow l Physics & Math Animations l Patreon: https://www.patreon.com/inertialobserver …

DC → CA
youtube.com/c/InertialObse…
Joined August 2015

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    1. 〈 Berger | Dillon 〉‏ @InertialObservr 17 Aug 2019
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      √2 raised to itself infinitely many times is 2pic.twitter.com/0l9dhhs3GV

      60 replies 378 retweets 2,238 likes
    2. Zachary Cardenas‏ @zach_mescudi 17 Aug 2019
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      Replying to @InertialObservr

      Although easy to understand, it’s kind of funny how if you break the pattern at any point by placing a 2 in the place of the last sqrt(2), it automatically equals 2

      1 reply 0 retweets 7 likes
    3. Dong Johnson‏ @froodude 17 Aug 2019
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      Replying to @zach_mescudi @InertialObservr

      It's hurting my brain to think about. Not sure I find this easy to understand. Maybe I haven't done enough high level math to conceptualize this correctly

      1 reply 0 retweets 0 likes
    4. Dong Johnson‏ @froodude 17 Aug 2019
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      Replying to @froodude @zach_mescudi @InertialObservr

      To clarify, your point is easy to understand, but the OP is not

      1 reply 0 retweets 0 likes
    5. Zachary Cardenas‏ @zach_mescudi 17 Aug 2019
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      Replying to @froodude @InertialObservr

      It’s cause sqrt(2)^2 = 2, and substituting the 2 over and over again will give you his equation

      1 reply 0 retweets 3 likes
    6. Yuval Greenfield‏ @ubershmekel 18 Aug 2019
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      Replying to @zach_mescudi @froodude @InertialObservr

      His equation is only true for any finite amount of times you do that replacement and keep a `2` at the top of it. I don't think that implies what his original image looks like it implies. There is no infinite series of calculations that converges here.

      1 reply 0 retweets 0 likes
    7. Dong Johnson‏ @froodude 18 Aug 2019
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      Replying to @ubershmekel @zach_mescudi @InertialObservr

      Ok. That's more helpful.

      1 reply 0 retweets 0 likes
      〈 Berger | Dillon 〉‏ @InertialObservr 18 Aug 2019
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      Replying to @froodude @ubershmekel @zach_mescudi

      〈 Berger | Dillon 〉 Retweeted skullsinthestars

      https://twitter.com/drskyskull/status/1163252409226993664?s=21 …

      〈 Berger | Dillon 〉 added,

      skullsinthestars @drskyskull
      A curious mathematical identity http://skullsinthestars.com/2019/08/18/a-curious-mathematical-identity/ … pic.twitter.com/MugRdCJM1g
      10:45 PM - 18 Aug 2019
      • 1 Like
      • Ben (Ancient Technologist) Bradley
      1 reply 0 retweets 1 like
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        1. 〈 Berger | Dillon 〉‏ @InertialObservr 18 Aug 2019
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          Replying to @InertialObservr @froodude and

          The sequence does converge see below and references thereinhttps://math.stackexchange.com/questions/1089458/how-can-i-prove-the-convergence-of-a-power-tower …

          1 reply 0 retweets 2 likes
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