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Any two prime numbers will be relatively prime. Numbers are relatively prime if they do not have any prime factors in common. Prime numbers have only themselves as prime factors, so all prime numbers are relatively prime to the others.

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Q: Are any two prime numbers relatively prime?
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Related questions

Can any two prime numbers be relatively prime?

It is, and always is relatively prime.


Are two compiosite numbers relatively prime true or false?

Any two prime numbers are relatively be prime?


Is it true that two different prime numbers are relatively prime?

Any two different prime numbers are relatively prime because relatively prime numbers are sets of two or more numbers having 1 as their greatest common factor.


What two numbers LCM that is the product of the numbers?

Any two that are relatively prime.


What are the realitivly prime numbers?

Any number greater than one can be relatively prime. Two relatively prime numbers have a GCF of 1.


Is it true that two distinct prime numbers can are relatively prime?

It is true. Two numbers are relatively prime if they do not have any factors in common greater than 1. A prime number has only two factors - 1 and itself. Thus, two different prime numbers will only have 1 as a common factor, which means they are relatively prime.


How do you find out how numbers are relatively prime?

Two numbers are relatively prime if their GCF is 1.


What are related prime numbers?

You might be thinking of relatively prime numbers. Two numbers are considered relatively prime if their GCF is 1. 4 and 9 are relatively prime.


How can you use the prime factorization of two numbers to determine whether they are relatively prime?

Use the prime factorizations to determine the GCF. If the GCF is 1, the numbers are relatively prime. If the two numbers have no prime factors in common, they are relatively prime.


How can you choose a number so that it will be relatively prime to any other number?

To choose a number that is relatively prime to any other number, you need to select a number that has no common factors (other than 1) with those other numbers. One way to ensure this is to choose a prime number. Prime numbers only have two factors: 1 and itself, making them relatively prime to any other number.


How can you use the prime factorizations of two numbers to determine if they realatively prime?

List the prime factorisations side by side in ascending order. If any prime factor is on both lists they are not relatively prime. If the two lists are disjoint, the numbers are relatively prime.


How is the LCM related to the relatively prime numbers?

When two numbers are relatively prime, the LCM will be their product.