Timeline for Is the $n$-th prime $p_n$ expressible as the difference of coprime $A, B$ such that the set of prime divisors of $AB$ is $\{p_1, \dots, p_{n-1}\}$?
Current License: CC BY-SA 3.0
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| Mar 10, 2013 at 12:07 | comment | added | user9072 | Thank you for the reply and the added explanation! And, sorry for the noise, I should have realized this myself. | |
| Mar 10, 2013 at 7:30 | history | edited | Aaron Meyerowitz | CC BY-SA 3.0 |
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| Mar 10, 2013 at 4:07 | comment | added | Aaron Meyerowitz | That could only happen if one of them divided 31. But I added an explanation. | |
| Mar 10, 2013 at 4:04 | history | edited | Aaron Meyerowitz | CC BY-SA 3.0 |
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| Mar 9, 2013 at 22:24 | comment | added | user9072 | I do not fully understand your last paragraph, as this does not seem equivalent to the question asked: the primes could "distribute" differently over the $s$ and $t$ than over the "coefficients." | |
| Mar 9, 2013 at 22:07 | history | answered | Aaron Meyerowitz | CC BY-SA 3.0 |