Homework SourseProve that for any integer n the integers 3n 1 and 2n 1 ar
Solution
Two numbers are said to be relative prime numbers when they have a common factor as 1.
Relatively prime numbers have greatest common factor(GCF) of 1.
In the given problem 3n+1 and 2n+1 are the given numbers where n is an integer.
We need to prove that these two numbers are relative primes.
Integers can be positive as well as negative.
Let us substitute few positive numbers.
Let n=1
Therefore, the two numbers are
3n+1=3(1) +1=3+1=4
2n+1=2(1) +1=2+1=3
The GCD of these 4 and 3 is 1. Therefore, they are relatively prime.
Let us consider another number where
Let n=3
Therefore, the two numbers are :
3n+1=3(3) +1=9+1=10
2n+1=2(3) +1=6+1=7
The GCD of these 10 and 7 is 1. Therefore, they are relatively prime.
Let us substitute few negative numbers.
Let n=-1
Therefore, the two numbers are:
3n+1=3(-1) +1=-3+1=-2
2n+1=2(-1) +1=-2+1=-1
The GCD of these -2 and -1 is 1. Therefore, they are relatively prime.
Let us consider another number where
Let n=-3
Therefore, the two numbers are:
3n+1=3(-3) +1=-9+1=-8
2n+1=2(-3) +1=-6+1=-5
The GCD of these -8 and -5 is 1. Therefore, they are relatively prime.
Hence, Its proved that for any integer n.
3n+1 and 2n+1 are relative primes.
