A PRIME PROOF OF THE ABC CONJECTURE (Papava)
If a,b,c>4 positive integers, gcd(a,b)=1 and a+b=c then
0<√c<a<c/2<b<c or 0<a<√c<c/2<b<c;
if rad(abc)>√c then ABC conjecture is true;
If rad(abc)<√c<a then ABC conjecture is true because rad(abc)<a<b<c such triples are finite;
if rad(abc)<a<√c then also ABC conjecture is true;
if a<rad(abc)<√c then ...
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