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Difference between revisions of "The Root of Root Conjecture"

(Created page with "===The Root of Root Conjecture== ==Information== Created on January 23, 2021 4:51 PM PT when mathboy282 discovered a pattern in a MSM post. ==The Conjecture== If it exists a...")
 
(The Conjecture)
 
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===The Root of Root Conjecture==
 
 
 
==Information==
 
==Information==
 
Created on January 23, 2021 4:51 PM PT when mathboy282 discovered a pattern in a MSM post.
 
Created on January 23, 2021 4:51 PM PT when mathboy282 discovered a pattern in a MSM post.
  
==The Conjecture==
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===The Conjecture===
If it exists a problem that <math>\sqrt{a + 2 \sqrt{b}},</math> then there exists a solution that <math>x+y=a</math> and <math>xy=b.</math>
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If it exists an expression that <math>\sqrt{a + 2 \sqrt{b}}</math> for <math>a \geq 0</math> and <math>b \geq 0</math>, then the solution can be simplified to <math>x + \sqrt{y},</math> for some numbers <math>x</math> and <math>y</math>, such that <math>x+y=a</math> and <math>xy=b.</math>

Latest revision as of 01:17, 23 December 2023

Information

Created on January 23, 2021 4:51 PM PT when mathboy282 discovered a pattern in a MSM post.

The Conjecture

If it exists an expression that $\sqrt{a + 2 \sqrt{b}}$ for $a \geq 0$ and $b \geq 0$, then the solution can be simplified to $x + \sqrt{y},$ for some numbers $x$ and $y$, such that $x+y=a$ and $xy=b.$

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