There exist arbitrarily large prime gaps

Statement

For every positive integer $\text{[math]}$ , there exists a sequence of $\text{[math]}$ consecutive integers all of which are positive. Thus, there exists a prime gap between consecutive primes that is greater than $\text{[math]}$ .

Proof

Let $\text{[math]}$ . Consider the integers $\text{[math]}$ . For each $\text{[math]}$ , $\text{[math]}$ is divisible by and strictly larger than $\text{[math]}$ , hence is composite. Further, the sequence has length $\text{[math]}$ .

There exist arbitrarily large prime gaps

Statement

Proof

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