@divinedolphin The "pairwise relatively prime" condition is stronger than "relatively prime." For example, if two numbers have \(2\) as a common factor, but the third number doesn't, then the three numbers together are relatively prime. Relatively prime means that there is no factor common to all numbers in the group . Pairwise relatively prime means that if you look at all possible pairs of the numbers, there is not a pair that share a common factor.   $$ \textcolor{red}{4 \text{ } \text{ } 10}\text{ } \text{ } 7 $$ $$ \text{These are relatively prime (because 7 doesn't have 2 as a factor)} $$     $$ \textcolor{red}{4 \text{ } \text{ } 10}\text{ } \text{ } 7 $$ $$\begin{aligned} \text{Look at them pairwise: } &\textcolor{red}{4} \text{ and } \textcolor{red}{10} \text{ are both multiples of 2 }; \\ &\textcolor{red}{4} \text{ and } 7 \text{ are not both multiples of some number,}\\ \text{ and } &\textcolor{red}{10} \text{ and } 7 \text{ are not both multiples of some number} \end{aligned} $$ $$ \text{These three numbers are not pairwise relatively prime. } $$   $$ \textcolor{blue}{44 \text{ } \text{ } 13 \text{ }\text{ } 25 } $$ $$ \text{ These are not all multiples of the same } x, \text{ for some number } x, \text{ so they are relatively prime} $$     $$ \textcolor{blue}{44 \text{ } \text{ } 13 \text{ }\text{ } 25 } $$ $$\begin{aligned} \text{Look at them pairwise: } &\textcolor{blue}{44} \text{ and } \textcolor{blue}{13} \text{ are not both multiples of some number }; \\ &\textcolor{blue}{13} \text{ and } \textcolor{blue}{25} \text{ are not both multiples of some number,}\\ \text{ and } &\textcolor{blue}{44} \text{ and } \textcolor{blue}{25} \text{ are not both multiples of some number} \end{aligned} $$ $$ \text{These three numbers are also pairwise relatively prime.} $$