Have you ever wondered if Einstein after his rebirth (with the caveat that he did not attain Moksha) struggled with the equations he himself created, or if he struggled to understand General Theory of Relativity after his rebirth? Indeed, did he even remain interested in scientific pursuit in his new life?
We keep seeing and hearing about musical prodigies who sing difficult ragas like a walk in the park. And, we keep hearing from people, 'Oh! She must have carried this talent from her previous birth.'
So, does this work for scientists, athletes, mathematicians, painters, sculptors, actors, military men and women...meaning, across the board?
Quoting from Wolfram MathWorld:
Fermat's last theorem is a theorem first proposed by Fermat in the form of a note scribbled in the margin of his copy of the ancient Greek text Arithmetica by Diophantus. The scribbled note was discovered posthumously, and the original is now lost. However, a copy was preserved in a book published by Fermat's son. In the note, Fermat claimed to have discovered a proof that the Diophantine equation x^n+y^n=z^n has no integer solutions for n>2 and x,y,z!=0.
Fermat's last theorem has still not be proven. Shouldn't Fermat in his next birth (assuming, he didn't attain Moksha), or in a later birth, have solved this theorem for us?
Erriyon Knighton (born January 29, 2004) is an American sprinter specializing in the 100 meters and 200 meters. At the age of 18, he won the bronze medal in the 200 m at the 2022 World Athletics Championships, becoming the youngest ever individual sprint medalist in Championships history. Bob Hayes, the 10 seconds wonder, at Tokyo Olympics, died in 2002. On the other hand, Knighton was born in 2004. Is Erriyon Knighton reincarnation of Bob Hayes?
Only past life regression can tell
1 comment:
A reader pointed out that Fermat's last theorem was solved by Wiles in 1994. But some say Fermat had a simple and elegant proof. Wiles's is overkill.
Post a Comment