Nearly identical Numbers

Nearly identical Numbers

Molecule example: There are three different ways a molecule can be rotated in relationship to the different dimensions there are three hundred and sixty degrees of possible rotation for each dimension. How small can each degree of rotation be divided into? If the rotation is quantized then there will be a smallest amount of rotation in each direction. If not then there will be an infinite amount of smaller and smaller amount of rotation in each dimension. When this one molecule is then applied to the structure of a consciousness there will be either an infinite amount of structural differences for just one molecule. If however the amount of rotation is quantized then there will be a smallest amount of change for each direction of rotation. If we call this number of possible different molecule positions in one dimension R then there will be 3 times R or 3R possible positions for one molecule at each moment in time. If we take into account just one molecule and make structural changes to it alone If a molecule can only rotate by 1 degree there will be over 46 million different positions it can have. If the molecule can rotate in each dimensional direction one half of a degree thee there will be over 370 million different positions it can have. Each position gives the the whole body a different structure but not a different consciousness producing different functioning.