Selected Mathematical Works: Symbolic Logic + The Game of Logic + Feeding the Mind: by Charles Lutwidge Dodgson, alias Lewis Carroll. Lewis Carroll

Selected Mathematical Works: Symbolic Logic + The Game of Logic + Feeding the Mind: by Charles Lutwidge Dodgson, alias Lewis Carroll - Lewis Carroll


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alt="Diagram representing x y prime does not exist"/> All y are x′ Diagram representing all y are x prime No x′y exist = No x′ are y = No y are x′ Diagram representing x prime y does not exist All y′ are x Diagram representing all y prime are x No x′y′ exist = No x′ are y′ = No y′ are x′ Diagram representing x prime y prime does not exist All y′ are x′ Diagram representing all y prime are x prime Some x are y, and some are y′ Diagram representing x exists with and without y Some y are x and some are x′ Diagram representing y exists with and without x Some x′ are y, and some are y′ Diagram representing x prime exists with and without y Some y′ are x and some are x′ Diagram representing y prime exists with and without x

      

       INTERPRETATION OF BILITERAL DIAGRAM WHEN MARKED WITH COUNTERS.

      Table of Contents

      The Diagram is supposed to be set before us, with certain Counters placed upon it; and the problem is to find out what Proposition, or Propositions, the Counters represent.

      As the process is simply the reverse of that discussed in the previous Chapter, we can avail ourselves of the results there obtained, as far as they go.

Diagram representing x y exists

      First, let us suppose that we find a Red Counter placed in the North-West Cell.

      We know that this represents each of the Trio of equivalent Propositions

      “Some xy exist” = “Some x are y” = “Some y are x”.

      Similarly we may interpret a Red Counter, when placed in the North-East, or South-West, or South-East Cell.

Diagram representing x y does not exist

      Next, let us suppose that we find a Grey Counter placed in the North-West Cell.

      We know that this represents each of the Trio of equivalent Propositions

      “No xy exist” = “No x are y” = “No y are x”.

      Similarly we may interpret a Grey Counter, when placed in the North-East, or South-West, or South-East Cell.

Diagram representing x exists

      Next, let us suppose that we find a Red Counter placed on the partition which divides the North Half.

      We know that this represents the Proposition “Some x exist.”

      Similarly we may interpret a Red Counter, when placed on the partition which divides the South, or West, or East Half.

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Diagram representing x exists with and without y

      Next, let us suppose that we find two Red Counters placed in the North Half, one in each Cell.

      We know that this represents the Double Proposition “Some x are y and some are y′”.

      Similarly we may interpret two Red Counters, when placed in the South, or West, or East Half.

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Diagram representing x does not exist

      Next, let us suppose that we find two Grey Counters placed in the North Half, one in each Cell.

      We know that this represents the Proposition “No x exist”.

      Similarly we may interpret two Grey Counters, when placed in the South, or West, or East Half.

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Diagram representing all x are y

      Lastly, let us suppose that we find a Red and a Grey Counter placed in the North Half, the Red in the North-West Cell, and the Grey in the North-East Cell.

      We know that this represents the Proposition, “All x are y”.

      [Note that the Half, occupied by the two Counters, settles what is to be the Subject of the Proposition, and that the Cell, occupied by the Red Counter, settles what is to be its Predicate.]

      Similarly we may interpret a Red and a Grey counter, when placed in any one of the seven similar positions

      Red in North-East, Grey in North-West;

       Red in South-West, Grey in South-East;

       Red in South-East, Grey in South-West;

       Red in North-West, Grey in South-West;

       Red in South-West, Grey in North-West;

       Red in North-East, Grey in South-East;

       Red in South-East, Grey in North-East.

      Once more the genial friend must be appealed to, and requested to examine the Reader on Tables II and III, and to make him not only represent Propositions, but also interpret Diagrams when marked with Counters.

      The Questions and Answers should be like this:—

      Q. Represent “No x′ are y′.” A. Grey Counter in S.E. Cell. Q. Interpret


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