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Difference between revisions of "Gigantic prime"
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| − | A '''gigantic prime''' is a [[prime | + | A '''gigantic prime''' is a [[prime]] number whose decimal representation has at least 10,000 digits. |
The smallest gigantic prime is <math>10^{9999}{+}33603</math>. | The smallest gigantic prime is <math>10^{9999}{+}33603</math>. | ||
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==See also== | ==See also== | ||
| − | *[[Titanic prime]] ≥ 1 | + | *[[Titanic prime]] ≥ 1 000 digits |
| − | *[[Megaprime]] ≥ 1 | + | *[[Megaprime]] ≥ 1 000 000 digits |
| − | *[[Gigaprime]] ≥ 1 | + | *[[Gigaprime]] ≥ 1 000 000 000 digits |
==External links== | ==External links== | ||
*[https://primes.utm.edu/curios/page.php?number_id=3454 Prime Curios!] at The Prime Pages | *[https://primes.utm.edu/curios/page.php?number_id=3454 Prime Curios!] at The Prime Pages | ||
[[Category:Primes]] | [[Category:Primes]] | ||
Revision as of 16:48, 5 February 2019
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A gigantic prime is a prime number whose decimal representation has at least 10,000 digits.
The smallest gigantic prime is [math]\displaystyle{ 10^{9999}{+}33603 }[/math].
This term was invented by Samuel Yates.
See also
- Titanic prime ≥ 1 000 digits
- Megaprime ≥ 1 000 000 digits
- Gigaprime ≥ 1 000 000 000 digits
External links
- Prime Curios! at The Prime Pages
