|+ '''Table 2. .Truth Table for the Proposition ''q'' '''
+
|+ '''Table 2. Truth Table for the Proposition ''q'' '''
|- style="background:paleturquoise"
|- style="background:paleturquoise"
! style="width:20%" | ''u v w''
! style="width:20%" | ''u v w''
Line 1,341:
Line 1,341:
</pre>
</pre>
−
*<p>Working in the ''conjunctive product'' form of representation, if the conjunctive proposition <math>x\!</math> is a model of <math>q\!</math> in <math>X,\!</math> then one can construct a conjunctive proposition <math>\operatorname{e}x\!</math> as a model for <math>\operatorname{e}q\!</math> in <math>\operatorname{E}X\!</math> just by appending any combination of values for the differential variables in <math>\operatorname{d}\mathcal{X}.</math></p><p>The tacit extensions of <math>c\!</math> that are models of <math>\operatorname{e}q\!</math> in <math>\operatorname{E}X\!</math> are as follows:</p>
+
* <p>Working in the ''conjunctive product'' form of representation, if the conjunctive proposition <math>x\!</math> is a model of <math>q\!</math> in <math>X,\!</math> then one can construct a conjunctive proposition <math>\operatorname{e}x\!</math> as a model for <math>\operatorname{e}q\!</math> in <math>\operatorname{E}X\!</math> just by appending any combination of values for the differential variables in <math>\operatorname{d}\mathcal{X}.</math></p><p>The tacit extensions of <math>c\!</math> that are models of <math>\operatorname{e}q\!</math> in <math>\operatorname{E}X\!</math> are as follows:</p>