There is a certain sequence of integrals that all evaluate to exactly pi up until the 25.000th or so member, from where on, if I'm not mistaken, the integrals never again equal pi. I don't remember the formula for the members, though.
Very interesting video, but with one slight contradiction in it. At 6:59 you work out the third Euclid number is 31, then less than thirty seconds later you read out the first 5 Euclid numbers and the third one is now 11.
Is there a conjecture that was correct for enormous numbers, but has been proven wrong for an insanely huge number?
Not that impressive but I believe the sequence 31, 331, 3331… is prime until somewhere around 10 digits
Euler's sum of powers conjecture was proven false for 80 thousand something. Although later smaller 5 digit numbers were found.
There is a certain sequence of integrals that all evaluate to exactly pi up until the 25.000th or so member, from where on, if I'm not mistaken, the integrals never again equal pi. I don't remember the formula for the members, though.
@@lonestarr1490 Borwein Integrals?
Pólya conjecture: en.m.wikipedia.org/wiki/P%C3%B3lya_conjecture
First counter example is at like 10^350
cool that you released this the day a new largest prime was found
Today news: The 52th prime place of mersenne founded. The cool moment for mathematics
#primenumber #mersenne52 #GIMPS
Ancient Greek - shows the Colosseum.
The only thing in this video I’m qualified to fact check…
Very interesting video, but with one slight contradiction in it. At 6:59 you work out the third Euclid number is 31, then less than thirty seconds later you read out the first 5 Euclid numbers and the third one is now 11.
One cannot stop loving this channel.
these videow are so well made and entertainging i really hope that you get more attention
well at least we have solved 4/6 of Goldbach conjectures :))
WOW, Great!
Theoretical mathematicians seem to have a lot of time on their hands.
Guys uhhh can you tell me self repeating self digit primes?
thumbnail is outa pocket
Real
First