Revision as of 15:25, 29 November 2021

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If this is your first time visiting this page, you will see an ordered pair $(a,b)$ below. (Originally, $a=0$ and $b=1.$ ) You may either increase $a$ by $47$ and take the last three digits or multiply $b$ by $23$ and take the last three digits.

(0, 1)

(Note that $G_{64}$ is the Graham's number; in general, it holds that $G_{n-1}=G_n-1$ for integral $n$ .)

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The Meaning of Life

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Never gonna give you up. That, my good friend, is the meaning of life.

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 =User Count=
-If this is your first time visiting this page, <b>SUBTRACT</b> one from the number below <b>OR</b> take the <b> SQUARE </b> by increasing the index of <math>G</math> by one and keeping the subtracted integer as-is (for reference, the starting number is <math>G_{64}</math>):
+If this is your first time visiting this page, you will see an ordered pair <math>(a,b)</math> below. (Originally, <math>a=0</math> and <math>b=1.</math>) You may either increase <math>a</math> by <math>47</math> and take the last three digits or multiply <math>b</math> by <math>23</math> and take the last three digits.
-<center><font size="100px"><math>G_{65}-9</math></font></center>
+<center><font size="100px">(0, 1)</font></center>
 (Note that <math>G_{64}</math> is the Graham's number; in general, it holds that <math>G_{n-1}=G_n-1</math> for integral <math>n</math>.)

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Revision as of 15:25, 29 November 2021

User Count

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The Meaning of Life