The Number Pi (3.14) Could Be a Mistake of our World
Discover why the traditional Pi-based system is inaccurate and how the number Ra provides more precise calculations for mathematics, physics, and engineering. Explore the hidden truths of historical measurement errors.
After the last cataclysm, our civilization began to restore knowledge. The main task of mathematicians was to find the base value on which the calculation system is based. Without solving the mystery of the nine system, they created an erroneous system, leading to the appearance of the number Pi (3.14...), which makes today's length measurement inaccurate.
Even NASA uses Pi with 15-20 decimal places, which results in small but critical errors. The decimal system must consider the number Ra (square root of ten) for accurate calculations.
Why the current system is inaccurate
Humanity is unlikely to correct the error because it would require redefining the second, the millimeter, and other units. The world remains in a false dimension of time and space, and even school rulers cannot be changed without a new number system.
Common mistakes in school calculations
Students are often taught to memorize formulas rather than understand concepts. For example, the addition of two semi-axis values of an ellipse results in the diameter of the circle, because an ellipse is a flattened circle. However, modern calculations of ellipse circumference often lead to incorrect results.
Correct calculation using semi-axes
Semi-axes: 1) R-7.75; r-4.75 and 2) R-22.5; r-13.5
The area of a circle cannot change when it is flattened into the shape of an ellipse. This means that we use the values of the semi-axes to bring the ellipse back into the shape of a circle and carry out the correct calculation. In this case we add the values of the semi-axes:
Example 1) 7.75 + 4.75 = 12.5 × 3.14159265 = 39.26990812
Example 2) 22.5 + 13.5 = 36 × 3.14159265 = 113.0973354
In geometry: Any figure that is in a closed line has a closed space.
Those who follow others’ opinions instead of forming their own add endless decimals to Pi. There is even a competition to see who can add the most decimal places in the number Pi. Tens of trillions have already been added.
The square root of ten gives the number 9.99999999999999979762122758866849, which is much closer to 10 than Pi.
Restoring correct ruler markings provides more precise results without changing the decimal system — only the length of ten. For large-scale calculations in research, simply enter the number Ra in your programs.
Try to add the decimal places yourself so that when you multiply the number Ra by itself, only the digit 9 is after the decimal point.
So, the number is 3.16227766015...
This riddle is more interesting than the nonsense of adding trillions of decimal places to the number Pi.
FAQ – Frequently Asked Questions
What is the number Ra?
The number Ra is the square root of ten, providing more precise calculations than Pi in the decimal system.
Why is the Pi-based system inaccurate?
Pi-based calculations do not account for the correct base value (Ra), causing small but critical errors in length and scientific computations.
Can school calculations be corrected?
While everyday calculations are sufficient, large-scale scientific calculations require updating ruler markings using the number Ra.
How does the semi-axes method work?
Adding the two semi-axes of an ellipse restores its shape to a circle, allowing correct circumference calculations.