Changes

<p>The relative term <math>^{\backprime\backprime}\, \text{lover of}\, \underline{~~~~}\, ^{\prime\prime}</math><p>

<p>The relative term <math>^{\backprime\backprime}\, \text{lover of}\, \underline{~~~~}\, ^{\prime\prime}</math><p>

<p>can be arrived at by removing the absolute term <math>^{\backprime\backprime}\, \text{Emilia}\, ^{\prime\prime}</math></p>

<p>can be reached by removing the absolute term <math>^{\backprime\backprime}\, \text{Emilia}\, ^{\prime\prime}</math></p>

<p>from the absolute term <math>^{\backprime\backprime}\, \text{lover of Emilia}\, ^{\prime\prime}.</math></p>

<p>from the absolute term <math>^{\backprime\backprime}\, \text{lover of Emilia}\, ^{\prime\prime}.</math></p>

<p><math>\operatorname{Iago}</math> is a lover of <math>\operatorname{Emilia},</math> so the relate-correlate pair <math>\operatorname{I}:\operatorname{E}</math><p>

<p><math>\operatorname{Iago}</math> is a lover of <math>\operatorname{Emilia},</math> so the relate-correlate pair <math>\operatorname{I}:\operatorname{E}</math><p>

<p>is in the dyadic relation associated with the relative term <math>^{\backprime\backprime}\, \text{lover of}\, \underline{~~~~}\, ^{\prime\prime}.</math></p>

<p>lies in the 2-adic relation associated with the relative term <math>^{\backprime\backprime}\, \text{lover of}\, \underline{~~~~}\, ^{\prime\prime}.</math></p>

|-

|-

|

|

<p>The relative term <math>^{\backprime\backprime}\, \text{betrayer to}\, \underline{~~~~}\, \text{of}\, \underline{~~~~}\, ^{\prime\prime}</math></p>

<p>The relative term <math>^{\backprime\backprime}\, \text{betrayer to}\, \underline{~~~~}\, \text{of}\, \underline{~~~~}\, ^{\prime\prime}</math></p>

<p>can be arrived at by removing the absolute terms <math>^{\backprime\backprime}\, \text{Othello}\, ^{\prime\prime}</math> and <math>^{\backprime\backprime}\, \text{Desdemona}\, ^{\prime\prime}</math></p>

<p>can be reached by removing the absolute terms <math>^{\backprime\backprime}\, \text{Othello}\, ^{\prime\prime}</math> and <math>^{\backprime\backprime}\, \text{Desdemona}\, ^{\prime\prime}</math></p>

<p>from the absolute term <math>^{\backprime\backprime}\, \text{betrayer to Othello of Desdemona}\, ^{\prime\prime}.</math></p>

<p>from the absolute term <math>^{\backprime\backprime}\, \text{betrayer to Othello of Desdemona}\, ^{\prime\prime}.</math></p>

<p><math>\operatorname{Iago}</math> is a betrayer to <math>\operatorname{Othello}</math> of <math>\operatorname{Desdemona},</math> so the relate-correlate-correlate triple <math>\operatorname{I}:\operatorname{O}:\operatorname{D}</math></p>

<p><math>\operatorname{Iago}</math> is a betrayer to <math>\operatorname{Othello}</math> of <math>\operatorname{Desdemona},</math> so the relate-correlate-correlate triple <math>\operatorname{I}:\operatorname{O}:\operatorname{D}</math></p>

<p>is in the triadic relation assciated with the relative term <math>^{\backprime\backprime}\, \text{betrayer to}\, \underline{~~~~}\, \text{of}\, \underline{~~~~}\, ^{\prime\prime}.</math></p>

<p>lies in the 3-adic relation assciated with the relative term <math>^{\backprime\backprime}\, \text{betrayer to}\, \underline{~~~~}\, \text{of}\, \underline{~~~~}\, ^{\prime\prime}.</math></p>

|-

|-

|

|

<p>The relative term <math>^{\backprime\backprime}\, \text{winner over of}\, \underline{~~~~}\, \text{to}\, \underline{~~~~}\, \text{from}\, \underline{~~~~}\, ^{\prime\prime}</math></p>

<p>The relative term <math>^{\backprime\backprime}\, \text{winner over of}\, \underline{~~~~}\, \text{to}\, \underline{~~~~}\, \text{from}\, \underline{~~~~}\, ^{\prime\prime}</math></p>

<p>can be arrived at by removing the absolute terms <math>^{\backprime\backprime}\, \text{Othello}\, ^{\prime\prime},</math> <math>^{\backprime\backprime}\, \text{Iago}\, ^{\prime\prime},</math> and <math>^{\backprime\backprime}\, \text{Cassio}\, ^{\prime\prime}</math></p>

<p>can be reached by removing the absolute terms <math>^{\backprime\backprime}\, \text{Othello}\, ^{\prime\prime},</math> <math>^{\backprime\backprime}\, \text{Iago}\, ^{\prime\prime},</math> and <math>^{\backprime\backprime}\, \text{Cassio}\, ^{\prime\prime}</math></p>

<p>from the absolute term <math>^{\backprime\backprime}\, \text{winner over of Othello to Iago from Cassio}\, ^{\prime\prime}.</math></p>

<p>from the absolute term <math>^{\backprime\backprime}\, \text{winner over of Othello to Iago from Cassio}\, ^{\prime\prime}.</math></p>

<p><math>\operatorname{Iago}</math> is a winner over of <math>\operatorname{Othello}</math> to <math>\operatorname{Iago}</math> from <math>\operatorname{Cassio},</math> so the elementary relative term <math>\operatorname{I}:\operatorname{O}:\operatorname{I}:\operatorname{C}</math></p>

<p><math>\operatorname{Iago}</math> is a winner over of <math>\operatorname{Othello}</math> to <math>\operatorname{Iago}</math> from <math>\operatorname{Cassio},</math> so the elementary relative term <math>\operatorname{I}:\operatorname{O}:\operatorname{I}:\operatorname{C}</math></p>

<p>is in the tetradic relation associated with the relative term <math>^{\backprime\backprime}\, \text{winner over of}\, \underline{~~~~}\, \text{to}\, \underline{~~~~}\, \text{from}\, \underline{~~~~}\, ^{\prime\prime}.</math></p>

<p>lies in the 4-adic relation associated with the relative term <math>^{\backprime\backprime}\, \text{winner over of}\, \underline{~~~~}\, \text{to}\, \underline{~~~~}\, \text{from}\, \underline{~~~~}\, ^{\prime\prime}.</math></p>

|}

|}