Solving the First IMO Question Ever | Prove (14n+3)/(21n+4) is Irreducible | Number Theory Question скачать в хорошем качестве

Solving the First IMO Question Ever | Prove (14n+3)/(21n+4) is Irreducible | Number Theory Question

⭕️ Subscribe for more: https://bit.ly/3uOdhkp ⭕️ 🔴Solving the First IMO Question Ever | Prove (14n+3)/(21n+4) is Irreducible | Solving Number Theory IMO Question | Hey there. Today, we are looking at the very first IMO question ever, in which we are asked to prove that (14n+3)/(21n+4) is an irreducible fraction. To do that, we should first know what an irreducible fraction is. A fraction is irreducible if and only if the greatest common divisor (gcd) of the numerator and the denominator is equal to 1. Meaning that the numerator and the denominator don't have a common factor greater than one. Because if there is a common divisor greater than one, then we can reduce the fraction by canceling the common divisor. 🔴I hope you enjoy watching this video on the really nice and interesting first IMO qeustion ever.🔴 Don't forget to: ✅ Leave a comment ✅ Subscribe ✅ Hit the like button ✅ Ring the bell topics covered in this video: Solving the very first IMO question ever Solving a number theory question Solving an IMO question greatest common divisors #greatestcommondivisor #matholympiad #IMO #matholympiadquestion #numbertheory #anonmath