User talk:Like street
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Your submission at Articles for creation: sandbox (May 22)
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Hello, Like street!
Having an article declined at Articles for Creation can be disappointing. If you are wondering why your article submission was declined, please post a question at the Articles for creation help desk. If you have any other questions about your editing experience, we'd love to help you at the Teahouse, a friendly space on Wikipedia where experienced editors lend a hand to help new editors like yourself! See you there! KylieTastic (talk) 11:26, 22 May 2018 (UTC)
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Your submission at Articles for creation: Mathematical solution (June 30)
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senk -_-.
Reply to your Articles for Creation Help Desk question
Hello, Like street! I'm CASSIOPEIA. I have replied to your question about a submission at the WikiProject Articles for Creation Help Desk. CASSIOPEIA(talk) 11:18, 30 June 2018 (UTC)
like street
 | Hello Like street. You used the {{Help me}} tag but did not ask a question. Please write out your question and replace the {{Help me}} tag when you are done, and someone will be along to help. Alternatively, you can ask your question at the Teahouse, the help desk, or join Wikipedia's Live Help IRC channel to get real-time assistance. Click here for instant access to the channel. |
Nean (talk) 19:45, 14 July 2018 (UTC).®_©,
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I will ask not much about mathematics. And I'll start perhaps with that, but it is precisely the unsolved problem of the millennium about problem class' P versus NP problem'. and if short, and maybe just shorter, though not much, but probably worth give something to your attention and notice this given column I have drawn. for that I will be very grateful to you and I'm grateful. Thank you. As for the verification of the correctness of the solution of the equation pertaining to paragraph 'P versus NP problem', then please, suppose now in this way: .. 1-: imagine that every number has some kind of its own definite figure and also for of every number. 2-: let it be, and how to call it? _ Well, for example, perhaps a digital name, Or maybe a digital sequence or a given number, an or his own digital matriatic reality. who will be more convenient. m, -3-: as is known the figure '0 'is zero, this is the only figure in its image that does not change, the figure is not solvability, existing either as an addition to a certain number. in order to increase it, either it exists only in the most digital manifold of equations, ziffr itself as a given, when solving such problems where it is the only number. The figure 0 ° does not change the fundamental function of the equation. in certain categories. izv. Well, if you take, then b 4e -: and again, imagine that every number has a so-called own digital podpist. And I imagine it like this: a): take, for example, the figure of 5 °. and we solve here such problem - ° 5 = 4 + 1 = 3 + 2 = 2 + 3 = 1 + 4 ° and if we look attentively, this number of 5 ° does not have further solvability in integers in the direction directed to zero. b): we continue to solve the problem in this way, Sorry, forgot to add that this is all presumably an outcry. but we continue to destroy it, and take this way-in the direction directed to the 'decisive point' and this to ' '0' to zero. and we accomplished 4 or 4 add actions. And we take, I mention: We take these very 4 actions and redirect them to the side, toward the deduction actions, and so that we get. the number is 5 °, and what we get in this way. But look, what was the result of the equation: from 9-4 = 8-3 = 7-2 = 6-1 = ° 5 ° = 4 + 1 = 3 + 2 = 2 + 3 = 1 + 4 ° and it turns out and there is a digital signature. And I want to very sorry for the earlier, for everything I wrote here. since, indeed, this is all and all for a long time already it is known, so has left. but if to go - c): then, so - the thresholds of solvability in the direction to zero have repeating cycles, two of them which can be cut off, that is, in the retrograde structure we do the same and get:
short, 7-2 = 6-1 = ° 5 ° = 4 + 1 = 3 + 2 ° a, which is further, we have 4 (four categories of solvability) of one number of 5 ° and I call it the digital signature of the number. and every number, there is such a signature, by my assumptions, p / s: I solved some equations and the data surprised me, I apologize for bringing references to the article of famous mathematicians. but I had to point it out. Here is one of the examples which has full correspondence in this my assumption: number: ° 18 ° and its digital signature = 9 ° number: ° 32 ° and its digital signature = ° 16 ° number: ° 4 ° and its digital signature = ° 2 ° number: ° 17 ° and its digital signature = ° 8 ° and the equation in this way: I leave the cathrack if possible
° 18 + 32: 4-17 ° ~ and everything from under the root, then = ° 3 ° and the solution from the sequences of these numbers, also equal - 3 ° p \ s: and I ask, who knows about this, please write if it does not complicate, well, so as not to think. Thank you.
Valkov Dmitriy Vladimirivich, Cherepovets, 04.10.1978. Nean (talk) 21:35, 14 July 2018 (UTC)
Template:Help me-help == Mathematics in Reflection ==
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question
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I will ask not much about mathematics. And I'll start perhaps with that, but it is precisely the unsolved problem of the millennium about problem class' P versus NP problem'. and if short, and maybe just shorter, though not much, but probably worth give something to your attention and notice this given column I have drawn. for that I will be very grateful to you and I'm grateful. Thank you. As for the verification of the correctness of the solution of the equation pertaining to paragraph 'P versus NP problem', then please, suppose now in this way: .. 1-: imagine that every number has some kind of its own definite figure and also for of every number. 2-: let it be, and how to call it? _ Well, for example, perhaps a digital name, Or maybe a digital sequence or a given number, an or his own digital matriatic reality. who will be more convenient. m, -3-: as is known the figure '0 'is zero, this is the only figure in its image that does not change, the figure is not solvability, existing either as an addition to a certain number. in order to increase it, either it exists only in the most digital manifold of equations, ziffr itself as a given, when solving such problems where it is the only number. The figure 0 ° does not change the fundamental function of the equation. in certain categories. izv. Well, if you take, then b 4e -: and again, imagine that every number has a so-called own digital podpist. And I imagine it like this: a): take, for example, the figure of 5 °. and we solve here such problem - ° 5 = 4 + 1 = 3 + 2 = 2 + 3 = 1 + 4 ° and if we look attentively, this number of 5 ° does not have further solvability in integers in the direction directed to zero. b): we continue to solve the problem in this way, Sorry, forgot to add that this is all presumably an outcry. but we continue to destroy it, and take this way-in the direction directed to the 'decisive point' and this to ' '0' to zero. and we accomplished 4 or 4 add actions. And we take, I mention: We take these very 4 actions and redirect them to the side, toward the deduction actions, and so that we get. the number is 5 °, and what we get in this way. But look, what was the result of the equation: from 9-4 = 8-3 = 7-2 = 6-1 = ° 5 ° = 4 + 1 = 3 + 2 = 2 + 3 = 1 + 4 ° and it turns out and there is a digital signature. And I want to very sorry for the earlier, for everything I wrote here. since, indeed, this is all and all for a long time already it is known, so has left. but if to go - c): then, so - the thresholds of solvability in the direction to zero have repeating cycles, two of them which can be cut off, that is, in the retrograde structure we do the same and get:
short, 7-2 = 6-1 = ° 5 ° = 4 + 1 = 3 + 2 ° a, which is further, we have 4 (four categories of solvability) of one number of 5 ° and I call it the digital signature of the number. and every number, there is such a signature, by my assumptions, p / s: I solved some equations and the data surprised me, I apologize for bringing references to the article of famous mathematicians. but I had to point it out. Here is one of the examples which has full correspondence in this my assumption: number: ° 18 ° and its digital signature = 9 ° number: ° 32 ° and its digital signature = ° 16 ° number: ° 4 ° and its digital signature = ° 2 ° number: ° 17 ° and its digital signature = ° 8 ° and the equation in this way: I leave the cathrack if possible
° 18 + 32: 4-17 ° ~ and everything from under the root, then = ° 3 ° and the solution from the sequences of these numbers, also equal - 3 ° p \ s: and I ask, who knows about this, please write if it does not complicate, well, so as not to think. Thank you. Valkov Dmitriy Vladimirovich, Cherepovets, 04.10.1978. Nean (talk) 21:44, 14 July 2018 (UTC)
- Like street Stop using the help me template inappropriately. CHRISSYMAD ❯❯❯¯\_(ツ)_/¯ 02:12, 19 July 2018 (UTC)
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