Starship Asterisk*

https://en.wikipedia.org/wiki/Largest_known_prime_number wrote:
<<As of January 2018, the largest known prime number is 2^77,232,917 − 1, a number with 23,249,425 digits. It was found in December 2017 by the Great Internet Mersenne Prime Search (GIMPS). A standard word processor layout (50 lines per page, 75 digits per line) would require 6,199 pages to display it. Its value is:

467333183359231099988335585561115521251321102817714495798582338593567923480521177207484311099740208849621368090038049317... (23,249,185 digits omitted) ...285376004518786055402223376672925679282131965467343395945397370476369279894627999939614659217371136582730618069762179071 >>

BDanielMayfield wrote:What's called for is a much higher base system, say, base 100, in which there would be 100 characters to represent the base ten numbers 0 to 99. Such a system would be able to compress the exact expression of a humongously long real number into a more manageable size.

Chris Peterson wrote:

BDanielMayfield wrote:What's called for is a much higher base system, say, base 100, in which there would be 100 characters to represent the base ten numbers 0 to 99. Such a system would be able to compress the exact expression of a humongously long real number into a more manageable size.

It would allow the number to be printed using less paper. I don't see what other value it would have. Would you or I have a better grasp of the number if it were notated in base 100?

No, going the other way is what makes the most sense. Expressing it in binary. Because once a number becomes to large to make any intuitive sense expressed in base 10, it's probably only being manipulated in a computer, anyway, and for that, base 2 is the natural system.

(The ancient Babylonians utilized base 60, sexagesimal. AFAIK that's the largest base ever used for common math.)

BDanielMayfield wrote:15_{(base 10)} = F_{(base 16)} = 1111_{(base 2)}, therefore hex is more efficient than the decimal and especially the binary systems, at least in character count. The 50th Mersenne Prime would require a staggering number of digits in binary.

BDanielMayfield wrote:
The 50th Mersenne Prime would require a staggering number of digits in binary.

• 77,232,917 bits to be precise:

neufer wrote:

BDanielMayfield wrote: The 50th Mersenne Prime would require a staggering number of digits in binary.

• 77,232,917 bits to be precise:

https://en.wikipedia.org/wiki/Largest_known_prime_number wrote:
<<The largest known prime number (as of January 2020) is 2^82,589,933 − 1, a number which has 24,862,048 digits when written in base 10. It was found via a computer volunteered by Patrick Laroche of the Great Internet Mersenne Prime Search (GIMPS) in 2018. Its value is:

148894445742041325547806458472397916603026273992795324185271289425213239361064475310309971132180337174752834401423587560... (24,861,808 digits omitted)

...062107557947958297531595208807192693676521782184472526640076912114355308311969487633766457823695074037951210325217902591.>>

neufer wrote: ↑Fri Jul 31, 2020 6:26 pm

A 2016 plot of the number of digits in largest known prime by year, since the electronic computer. The vertical scale is logarithmic.

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https://en.wikipedia.org/wiki/Largest_known_prime_number wrote:
<<The largest known prime number (as of January 2020) is 2^82,589,933 − 1, a number which has 24,862,048 digits when written in base 10. It was found via a computer volunteered by Patrick Laroche of the Great Internet Mersenne Prime Search (GIMPS) in 2018. Its value is:

148894445742041325547806458472397916603026273992795324185271289425213239361064475310309971132180337174752834401423587560... (24,861,808 digits omitted)

...062107557947958297531595208807192693676521782184472526640076912114355308311969487633766457823695074037951210325217902591.>>

Ann wrote: ↑Fri Jul 31, 2020 7:42 pm

neufer wrote: ↑Fri Jul 31, 2020 6:26 pm

A 2016 plot of the number of digits in largest known prime by year, since the electronic computer. The vertical scale is logarithmic.

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https://en.wikipedia.org/wiki/Largest_known_prime_number wrote:
<<The largest known prime number (as of January 2020) is 2^82,589,933 − 1, a number which has 24,862,048 digits when written in base 10. It was found via a computer volunteered by Patrick Laroche of the Great Internet Mersenne Prime Search (GIMPS) in 2018. Its value is:

148894445742041325547806458472397916603026273992795324185271289425213239361064475310309971132180337174752834401423587560... (24,861,808 digits omitted)

...062107557947958297531595208807192693676521782184472526640076912114355308311969487633766457823695074037951210325217902591.>>

That's a funny shape of that curve. Reminds me somehow of the Universe with expands faster or slower during different epochs.

Although, unlike the Universe, the prime number curve seems to be slowing down.

Ann

Chris Peterson wrote: ↑Fri Jul 31, 2020 7:54 pm

Ann wrote: ↑Fri Jul 31, 2020 7:42 pm That's a funny shape of that curve. Reminds me somehow of the Universe with expands faster or slower during different epochs.

Although, unlike the Universe, the prime number curve seems to be slowing down.

Ann

Careful... the y-axis is logarithmic. The declining slope of the curve only indicates "slowing down" in certain contexts.

Ann wrote: ↑Fri Jul 31, 2020 7:42 pm
That's a funny shape of that curve. Reminds me somehow of the Universe with expands faster or slower during different epochs. Although, unlike the Universe, the prime number curve seems to be slowing down.

• Inflation.
  Dark Energy.

• Electronic computers ~1960
  Massively parallel computers ~1985
  Large scale distributed computing projects ~2000