Wikipedia:Reference desk/Archives/Mathematics/2018 February 6
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February 6
[edit]Bring radicals
[edit]Bring radicals are used to solve quintic equations. BR() is defined as the unique real solution of the equation The following suggestions for the article were made on the talk page in October of 2015, but no one has carried them out yet:
- Show a table and/or graph of the function. (And then of its derivative, integral, etc.)
- Show expressions for , , , etc., or the impossibility thereof.
Does anyone have a reference for either of these? Loraof (talk) 21:21, 6 February 2018 (UTC)
A table
[edit]7j2":(,.~0 _1 0 0 0 _1&p.)-0.2*i:10 _34.00 2.00 _20.70 1.80 _12.09 1.60 _6.78 1.40 _3.69 1.20 _2.00 1.00 _1.13 0.80 _0.68 0.60 _0.41 0.40 _0.20 0.20 0.00 0.00 0.20 _0.20 0.41 _0.40 0.68 _0.60 1.13 _0.80 2.00 _1.00 3.69 _1.20 6.78 _1.40 12.09 _1.60 20.70 _1.80 34.00 _2.00
Bo Jacoby (talk) 07:48, 7 February 2018 (UTC)
- ... and the graph of is the graph of rotated anticlockwise by 90 degrees. Gandalf61 (talk) 09:34, 7 February 2018 (UTC)
Thanks, both of you! Is there anything about the second bulleted question? I’m guessing that at best it’s like the function in the sense that can be written in terms of and but cannot be. Loraof (talk) 16:13, 7 February 2018 (UTC)
- Sounds dubious to me: exponentiation (including taking the square root) is distributive over multiplication, but "Bring radicaling" is not (otherwise, you could reconstruct all Bring radicals from BR(2), and I am pretty sure this would be known and mentioned in the article).
- Probably an expert of the Abel-Ruffini theorem could say more - I have a feeling but no proof that any low-degree polynomial relation between BR(a) and BR(b) (for any a,b) would violate it (general idea: craft a polynomial of degree 5 with a known rational root and which can be reduced to a "Bring quintic", that gives you BR(a) (= the rational root) for some a (which is going to depend on the polynomial reduction process but that involves only an algebraic solution), derive BR(b) for all/all but a countable number of b from the polynomial relation, and you solved the fifth degree by radicals, which should be impossible). TigraanClick here to contact me 13:15, 9 February 2018 (UTC)