I've finally figured it out I think! Well not me someone else - Stuart A. Lichtman. Who's Stuart A. Lichtman? He's the MIT genius student who developed a model of unconscious decision making called Arintel that ran on a powerful supercomputer back in the 1970s. He tested out his model on businesses in the 1970s and it gained 90%-99% accurate results. But politicians thought of abusing it so he decided to destroy the system and keep it a secret. He reasoned that the human brain is analogous to a parallel supercomputer millions of times more powerful than the most powerful supercomputers at the time and that the human brain could do what Arintel did but much better. He developed a system of training the brain to accomplish any task what he calls "Cybernetic Transposition" claiming a 100% success rate and tested it out more than 50,000 people with success (including working with some Fortune 500 companies and the US government). A summary of the three-step process:...
Basic probability shows that attempting to do nearly anything many times guarantees success. It's the same concept as the probability calculation used to determine the chance of tossing a coin and getting heads 5 times in a row (1/2^5). The chances of failing many times in a row decreases dramatically with more attempts. Chances of failing: 90% chance of failing - After 100 tries becomes nearly 0% or 0.002656139889% (0.90^100) 95% chance of failing - After 200 tries becomes nearly 0% or 0.003505266625% (0.95^100) 99.5% chance of failing - After 1000 tries becomes nearly 0% or 0.6653968579% (0.995^1000) 99.9% chance of failing - After 5000 tries becomes nearly 0% or 0.672111196% (0.999^5000) So this means trying nearly anything 5,000 times guarantees success!? So there's 365 days in a year, let's see how many times you would have to attempt to do something in order to achieve by the end of the year: 90% chance of failing - 1 time/day 95% chance of failing - 1 time...