The discussion revolves around finding prime numbers \( k \) that satisfy the equation \( k^2 = n^3 + 1 \), where \( n \) is specified to be a non-prime number. Participants explore the implications of this equation and the characteristics of prime numbers in relation to it.
The discussion is active, with participants providing hints and exploring different approaches. Some participants have attempted to derive relationships between \( n \) and \( k \) based on the equation, while others suggest examining specific cases to ensure completeness in their reasoning. There is a recognition of the need to verify assumptions and explore multiple scenarios.
Participants note that \( n \) must be a positive natural number and that all prime numbers except 2 are odd. There is also a correction regarding the number of divisors of \( k^2 \), which some participants initially miscounted. The exploration of cases where \( n \) takes on specific values is also mentioned.
Tusike said:Two things you need to know to solve this problem:
1) If k is prime, then k^2 can only be divided by 4 numbers, 2 of which are k^2 and 1.
2) a^3 + b^3 = (a^2-ab+b^2)(a+b)
If you need more clues, ask, but post anything you did with these clues:)
-Tusike
Tusike said:Ugh sorry, I said something wrong
k^2 can only be divided by 3 numbers, not 4 (I was thinking how it can be written down two ways as a multiple of two numbers...) . So what does that say about (n+1) and (n^2 -n + 1)?
Tusike said:You don't need to solve that equation just yet, only see how it can happen.
On the left side, you have k^2, and on the right side you have a multiple of two whole numbers, (n+1) and (n^2 - n + 1).
You know that k^2 can either be written as 1*k^2, k^2*1, or sqr(k^2)*sqr(k^2). These are also multiples of two whole numbers! So just pair them up:) You should get n=2, and from then k=3. 1*k^2 and k^2 * 1 won't lead to anything worth noticing.
EDIT: sqr(k^2), not sqr(k), sorry...