SENSE-DAiA AND PHYSICS 175 



only acquire meaning when put into a context which, 

 with them, forms a proposition. Thus such pairs of words 

 can be applied to descriptions, 1 but not to proper names : 

 in other words, they have no application whatever to 

 data, but only to entities or non-entities described in 

 terms of data. 



Let us illustrate by the terms &quot; existence &quot; and &quot; non- 

 existence.&quot; Given any datum x, it is meaningless either 

 to assert or to deny that x &quot; exists.&quot; We might be 

 tempted to say : &quot; Of course x exists, for otherwise it 

 could not be a datum.&quot; But such a statement is really 

 meaningless, although it is significant and true to say 

 &quot; My present sense-datum exists,&quot; and it may also be 

 true that &quot; x is my present sense-datum.&quot; The inference 

 from these two propositions to &quot; x exists &quot; is one which 

 seems irresistible to people unaccustomed to logic ; yet 

 the apparent proposition inferred is not merely false, but 

 strictly meaningless. To say &quot; My present sense-datum 

 exists &quot; is to say (roughly) : &quot; There is an object of which 

 my present sense-datum is a description.&quot; But we 

 cannot say : &quot; There is an object of which x is a 

 description,&quot; because x is (in the case we are supposing) 

 a name, not a description. Dr. Whitehead and I have 

 explained this point fully elsewhere (loc. cit.) with the 

 help of symbols, without which it is hard to understand ; 

 I shall not therefore here repeat the demonstration of the 

 above propositions, but shall proceed with their applica 

 tion to our present problem. 



The fact that &quot; existence &quot; is only applicable to 

 descriptions is concealed by the use of what are gram 

 matically proper names in a way which really transforms 

 them into descriptions. It is, for example, a legitimate 



1 Cf. Principia Mathematica, Vol. I, * 14, and Introduction, Chap. 

 III. For the definition of ixittencr.. rf. * 14. 02. 



