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This concept is linked to the previously discussed topic in which the colleague should be aware of his own 'Subjective Uncertainty' (due to a classic logic language 'sick or healthy') and of 'Objective Uncertainty' (due to a probabilistic logic language 'probably sick or probably healthy'). It is not complicated to prove this assertion: the uncertainty we are talking about derives from the fact that the elements, assertions, data, classes and subclasses mentioned and that build the apparatus of the logic of probabilistic's language: Analysandum <math>  = \{P(D),a\}</math> and Analysan <math>  = \{P(D),a\}</math> are elements that exist in a specific world, and in this case in a dental context in which the element <math>KB</math> of the process indisputably indicates a "basic knowledge" only in a specific dental context.

Este concepto está ligado al tema discutido anteriormente en el que el colega debe ser consciente de su propia 'Incertidumbre subjetiva' (debido a un lenguaje lógico clásico 'enfermo o sano') y de la 'Incertidumbre objetiva' (debido a un lenguaje lógico probabilístico ' probablemente enfermo o probablemente sano '). It is not complicated to prove this assertion: the uncertainty we are talking about derives from the fact that the elements, assertions, data, classes and subclasses mentioned and that build the apparatus of the logic of probabilistic's language: Analysandum <math>  = \{P(D),a\}</math> and Analysan <math>  = \{P(D),a\}</math> are elements that exist in a specific world, and in this case in a dental context in which the element <math>KB</math> of the process indisputably indicates a "basic knowledge" only in a specific dental context.

This conclusion confirmed by the dentist was the following:   

This conclusion confirmed by the dentist was the following: