Law of Eliminative-Deviated Degree:
By Sahitya Mukherjee

It states that in an extremely slow moving/rotating object , there is a gain of angular velocity of the object in any degree of angle ranging from 0° to 1° (always tending to 0°) towards backwards due to a challenging force which opposes the motion of the object (it's not friction). To continue the motion of the object in equilibrium, a counter Eliminative degree of angle is achieved when a counter  internal force is gained which opposes the opposing force ( as per Newton's 3rd law). This Eliminative Degree of angular velocity with respect to a small time change( ∆t —> 0) is equal to the deviated angle + ∆angle+ D , where D is a constant angle called Degree Constant of Me. This is one of the laws of Me by Sahitya Mukherjee.


The Law of Eliminative-Deviated Degree suggests that in a slowly rotating object, there is an increase in angular velocity within the range of 0° to 1° (approaching 0°) backward due to a resisting force. This force, distinct from friction, opposes the object's motion. To maintain equilibrium and sustain the object's motion, a counter Eliminative Degree is acquired through an internal force that counters the opposing force, following Newton's 3rd law.

In mathematical terms, the Eliminative Degree of angular velocity (θ) over a small time change (∆t → 0) is expressed as the sum of the deviated angle(ω° ) ,...