![]() ![]() Here prime numbers will come under the category of natural numbers. ![]() Note: Here we should not get confused by seeing the coprime, because the prime is different from coprime. When we consider any pair of the above, when we determine the greatest common factor will be 1. ![]() In other words, the HCF of the two numbers is 1Ĭoprime numbers are denoted as \ or \ or as “a is prime to b”. The only positive integer that divides both of them to give a remainder zero is 1 So, we can define a pair of integers, let's say a and b, as coprime or primes to each other or mutually prime or relatively prime if: Now we know the definition of coprime number In mathematics we have different forms of numbers namely, natural numbers, whole numbers, integers, rational numbers, prime numbers, even numbers etc., To solve this question, we must know the definition of coprime and on the basis of the greatest common factor of the prime numbers we are going to write the coprime numbers. Hint: Here in this question, we have to write the coprime numbers from 1 to 100. ![]()
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