August 30, 2021 Journal article Open Access

Vipawadee Moonchaisook

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      "@id": "https://hdl.handle.net/100.1/ijbsac.D0216063421", 
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  "description": "<p>The Diophantine equation has been studied by many researchers in number theory because it helps in solving variety of complicated puzzle problems. From several studies, many interesting proofs have been found. In this paper, the researcher has examined the solutions of Diophantine equation (\ud835\udc74\ud835\udc91 &minus; \ud835\udfd0) \ud835\udc99 + (\ud835\udc74\ud835\udc91 + \ud835\udfd0) \ud835\udc9a = \ud835\udc9b \ud835\udfd0 where \ud835\udc74\ud835\udc91 is a Mersenne Prime and p is an odd prime whereas x, y and z are nonnegative integers. It was found that this Diophantine equation has no solution.&nbsp;</p>", 
  "license": "https://creativecommons.org/licenses/by/4.0/legalcode", 
  "creator": [
    {
      "affiliation": ", Department of Mathematics, Faculty of Science and Technology Surindra Rajabhat University, Surin, Thailand.", 
      "@type": "Person", 
      "name": "Vipawadee Moonchaisook"
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  ], 
  "headline": "On the Solutions of Diophantine Equation (Mp \u2212 2) x + (Mp + 2) y = z 2 where Mp is Mersenne Prime", 
  "image": "https://zenodo.org/static/img/logos/zenodo-gradient-round.svg", 
  "datePublished": "2021-08-30", 
  "keywords": [
    "Diophantine equations, exponential equations."
  ], 
  "url": "https://zenodo.org/record/5414068", 
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      "name": "Blue Eyes Intelligence Engineering and Sciences Publication (BEIESP)"
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  "identifier": "https://doi.org/10.35940/ijbsac.D0216.083421", 
  "@id": "https://doi.org/10.35940/ijbsac.D0216.083421", 
  "@type": "ScholarlyArticle", 
  "name": "On the Solutions of Diophantine Equation (Mp \u2212 2) x + (Mp + 2) y = z 2 where Mp is Mersenne Prime"
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