60 seconds in a minute, 60 minutes in an hour, 24 hours in a day. 60>6, 60>6, 24>6 (6,6,6) and when tΒ‘me Β‘s Β‘nversed special codes emerge. Do not be surprised as tΒ‘me could have been 100 seconds minute per minute, 100 minutes per hour and 8.64 hours per day which would still be 86,400 seconds in a day and would appear as 1,1,9 but that's not as cool as 6,6,6. There's not enough life-tΒ‘me to learn everythΒ‘ng but tΒ‘me Β‘s all thΒ‘ngs. With elect thinking we may solve the puzzles of this Fibonacci life.
All Rights Reserved META GEMATRIA Β© 2025
We use cookies to analyze website traffic and optimize your website experience. By accepting our use of cookies, your data will be aggregated with all other user data.