Annotation:Annotationen:Representation and Deduction/V5ilw6agyi
Annotation of | Annotationen:Representation_and_Deduction |
---|---|
Annotation Comment | |
Last Modification Date | 2019-07-26T15:04:10.919Z |
Last Modification User | User:Sarah Oberbichler |
Annotation Metadata | ^"permissions":^"read":ӶӺ,"update":ӶӺ,"delete":ӶӺ,"admin":ӶӺ°,"user":^"id":6,"name":"Sarah Oberbichler"°,"id":"V5ilw6agyi","ranges":Ӷ^"start":"/divӶ3Ӻ/divӶ4Ӻ/divӶ1Ӻ/divӶ1Ӻ/divӶ2Ӻ","startOffset":14,"end":"/divӶ3Ӻ/divӶ4Ӻ/divӶ1Ӻ/divӶ1Ӻ/divӶ2Ӻ","endOffset":839°Ӻ,"quote":"The ability to re-present is just as crucial in the use of symbols. The so-called “semantic nexus” that ties a symbol to what it is supposed to stand for, ceases to function when the symbol user is not able to re-present the symbol’s meaning. Memory, clearly, plays no less a part in the symbolic domain than in that of sensory experience.\nIrrespective of the particular position you may have adopted concerning the foundations of mathematics, you will all agree that symbols such as “+,” “–,” “x,” and “:” refer to operations and can, in fact, be interpreted as imperatives (add!, subtract!, multiply!, divide!). To obey any such imperative, one must not only “know” the operation it refers to, but also how to carry it out; one must know how to re-play the symbolized operation with whatever material happens to be at hand.","highlights":Ӷ^"jQuery321091684549877898492":^°°,^"jQuery321091684549877898492":^°°Ӻ,"text":"","order":"mw-content-text","category":"Prämisse3","data_creacio":1564146250336°
|