Objetivo: Entender cuál es la estructura de un hecho y la fundamentación[br]Sintáctica.[br][br][br]Prolog tiene como propósito establecer las relaciones que existen entre diferentes objetos.[br][br]Por ejemplo si tenemos el siguiente enunciado:[br][br][br]Juan le gusta Maria[br][br]Podemos identificar dos objetos María y Juan. Sin embargo la relación que existe entre ellos el verbo gusta. Entonces podemos definir la siguiente oración en Prolog de la siguiente manera:[br][br][br][img]data:image/png;base64,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[/img][br][br]En cuanto a la sintaxis podemos observar lo siguiente:[br]        [br][list][*]El verbo que relaciona a los objetos se encuentra, antes como si se tratara de una función en C. [/*][*]Los objetos se encuentran encerrados entre paréntesis y separados por comas.[/*][*]Todo se encuentra en minúsculas. Al menos la primera palabra.         [/*][*]Todo hecho, regla y pregunta siempre finalizacon un punto.[br][br][br][br][/*][/list][br][br][br]

A continuación se describen diferentes formas validas de escribir hecho en Prolog[br][br][img]data:image/png;base64,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[/img][br][br][br]Explicación:[br][br]El de la línea 1 está escrito de la forma como se vio más arriba.[br][br][br]En la línea 2 puede ir separado por un guion bajo para[br]facilitar la visibilidad.[br][br][br]En la línea 3 se puede utilizar el vero solamente usar cualquier[br]cadena para describir la relación que existe entre ellos.[br][br][br]En la línea 4. Vemos la posibilidad de anidar los hechos[br]dentro de otros hechos.[br][br][br]

A continuación se describen las forma invalidas de escribir hechis en Prolog.[br][br][img]data:image/png;base64,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[/img][br][br][br][br]Explicación:[br][br]En la línea 1. Es ilegal porque la relación empieza con mayúscula.[br]En la línea 2 Es ilegal porque, no se están cerrando los mismo paréntesis que se abren[br]En la línea tres es ilegal, porque la terminación de la oración de Prolog concluye con un punto y coma[br][br][br]