obtain among Eodes of Being, irrespective of any specification of the 



relations of coincidence or proximity in Time and Space, but not necessarily in 

 . (LOGIC.) * 



being definitely-related sets of positions in.space ; and the facts predicated being 

 ometry of Position.**) 



equal only as having independent existences. 

 (Indefinite Calculus.^) 



f when their numbers are completely specified 

 ie equality of which is I (Arithmetic.) 



ot defined as extensive, | 



iive, or intensive ( . . , . 



, .V /w,,,,/,,^ fin their relations. 



untc i/(ticitius) . . 



I whentheirnumbers | (Algebra.) 



\_ are specified only ^ 



^ in the relations of their relations. 

 (Calculus of Operations?) 



f considered in their relations of coexistence, 

 he equality of which J (Gcvnctnj.) 



s that of extension^ (Kinematic*) 



{ considered as traversed in Time &amp;lt; 



^ units. 



(Geometry of Mot ion. $) 



