Supongamos que tenemos la siguiente base de conocimiento:[br][br][br] [img]data:image/png;base64,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[/img][br]Prolog puede responder preguntas, según los valores de[br]verdad (Verdadero/Falso). Respecto a  lo que hay en la base de Conocimiento. Por ejemplo si hacemos la siguiente pregunta a Prolog:?-legusta(juan, maria).[br][br]obtenemos:[br][br][br][br][img]data:image/png;base64,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[/img][br][br]Ahora prueba dichas afirmaciones programandolo tu mismo.[br]Instala swi-prolog (altamente recomendado) o bien usa la plataforma en linea en esta dirección.[br]https://swish.swi-prolog.org/[br][br]