They are one less than a multiple of 24.

They are always even.

They are one more than a multiple of 24.

They are always odd.

They are not odd numbers.

They are not divisible by 6.

They do not fit the pattern of being one more than a multiple of 24 when squared.

They are not real numbers.

Primes are always less than multiples of 6.

Primes are always multiples of 6.

Primes are always even.

Primes are always above or below multiples of 6.

Multiples of 2, 3, 5, and 7

Multiples of 6 plus or minus 1, and even or odd

Multiples of 10, 20, 30, and 40

Multiples of 5, 10, 15, and 20

It shows that primes are always even.

It demonstrates that p squared minus 1 is a multiple of 24.

It proves that primes are always odd.

It shows that primes are always less than 10.

It requires no creativity.

It involves simpler calculations.

It uses the properties of consecutive numbers.

It uses less algebra.

It is not important in mathematics.

It complicates the proofs unnecessarily.

It makes proofs less reliable.

It makes proofs more impressive.