Prove that if the numbers 3, 4, 5, ⋯, $35$ are partitioned into two disjoint sets, then in one of the sets the numbers $a, b, c$ can be found such that $ab = c$. ($a, b, c$ may not be pairwise distinct)
For the sake of contradiction, assume that such a partition is possible.
From the conditions, if $a,~b$ are in a set and $ab$, $\frac{a}{b}$ are in the interval $[3,~3^5]$, they are in the opposite set.
Let the sets be $A,~B$ and assume that 3 is in $A$.
So, $3\cdot3$ is in $B$.
So, $3^2\cdot3^2=3^4$ is in $A$.
$A$ has $3^4,~3$. So, $3^4\cdot3=3^5$ and $\frac{3^4}{3}=3^3$ are in $B$.
We have $3^2,~3^3,~3^5$ in $B$. But, $3^2\cdot3^3=3^5$. Contradiction.
So, there is no such partition.
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