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MyWikiBiz, Author Your Legacy — Friday November 29, 2024
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Evidently what Peirce means by the associative principle, as it applies to this type of product, is that a product of elementary relatives having the form (R:S:T)(S:T)(T) is equal to R but that no other form of product yields a non-null result.  Scanning the implied terms of the triple product tells us that only the following case is non-null:  J = (J:J:D)(J:D)(D).  It follows that:
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Evidently what Peirce means by the associative principle, as it applies to this type of product, is that a product of elementary relatives having the form <math>(\mathrm{R}:\mathrm{S}:\mathrm{T})(\mathrm{S}:\mathrm{T})(\mathrm{T})\!</math> is equal to <math>\mathrm{R}\!</math> but that no other form of product yields a non-null result.  Scanning the implied terms of the triple product tells us that only the case <math>(\mathrm{J}:\mathrm{J}:\mathrm{D})(\mathrm{J}:\mathrm{D})(\mathrm{D}) = \mathrm{J}\!</math> is non-null.  It follows that:
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:{| cellpadding="4"
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{| align="center" cellspacing="6" width="90%"
| 'l','s'w
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|
| =
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<math>\begin{array}{lll}
| "lover and servant of a woman"
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\mathit{l},\!\mathit{s}\mathrm{w}
|-
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& = &
| &nbsp;
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\text{lover and servant of a woman}
| =
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\\[6pt]
| "lover that is a servant of a woman"
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& = &
|-
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\text{lover that is a servant of a woman}
| &nbsp;
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\\[6pt]
| =
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& = &
| "lover of a woman that is a servant of that woman"
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\text{lover of a woman that is a servant of that woman}
|-
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\\[6pt]
| &nbsp;
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& = &
| =
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\mathrm{J}
| J
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\end{array}</math>
 
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