The numbers 3-5-7 are three consecutive odds each being prime. Find the next example of a "triple of prime ".
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3,5,7 are the only 3 consecutive odd numbers with each one being primes.
https://math.stackexchange.com/questions/2428844/3-5-7-are-the-only-three-consecutive-odd-natural-numbers-that-are-prime?rq=1
To find the next example of a "triple of prime," we need to look for three consecutive odd numbers with each number being prime. Here's how you can search for the next example:
1. Start with the number following 7. In this case, it would be 9 since we are looking for consecutive odd numbers. However, 9 is not prime, so we need to continue searching.
2. Move on to the number following 9, which would be 11. Check if this number is prime. In this case, it is prime.
3. Now, we have 5, 7, and 11 as three consecutive prime odd numbers: 5 - 7 - 11.
Thus, the next example of a "triple of prime" after 3-5-7 is 5-7-11.
Note: Prime numbers are numbers that are only divisible by 1 and themselves, such as 2, 3, 5, 7, etc. To check if a number is prime, you can divide it by all numbers from 2 up to the square root of that number (rounded up), and see if any of these divisions result in a whole number. If no whole number divisions occur, then the number is prime.