[b]¿Cuáles son las propiedades de los cuadriláteros?[/b][br][br]El cuadrilátero es una figura geométrica, específicamente un polígono, conformada por cuatro lados, cuatro ángulos y cuatro vértices.[br][br][br][b]Elementos del cuadrilátero[/b][br][br]Guiándonos del gráfico en la parte inferior, los elementos de cuadrilátero son los siguientes:[br][br][list][*]Vértices: A,B,C,D.[/*][*]Lados: AB,BC,DC,AD.[/*][*]Ángulos interiores: w,x,y,z. Suman 360º.[/*][*]Ángulos exteriores: s,t,u,v.[/*][*]Diagonales: Son los segmentos de recta que unen vértices opuestos de la figura. Son AC y DB.[/*][/list][br][b]Tipos de cuadrilátero[/b][br][br]Los tipos de cuadrilátero son:[br][br][b]Paralelogramo:[/b] Es un cuadrilátero donde los lados opuestos son paralelos[br]entre sí (los segmentos no llegarían a intersecarse, aunque fueran prolongados)[br]y miden la misma longitud. Es una categoría dentro de la cual se encuentran[br]otras varias.[br][br][b]Cuadrado:[/b] Es un tipo de paralelogramo con cuatro lados de igual longitud y[br]paralelos entre sí. Sus ángulos interiores son rectos, es decir, miden 90º. Sus[br]diagonales son perpendiculares entre sí (cuando se cortan forman cuatro ángulos[br]de 90º).[br][br][b]Rectángulo:[/b] De sus cuatro lados, hay dos pares de lados de igual[br]longitud. Todos sus ángulos interiores miden 90º. Sus diagonales miden lo[br]mismo, pero no son perpendiculares entre sí.[br][br][b]Rombo:[/b] Todos sus lados tienen la misma longitud. Dos de sus ángulos interiores[br]son agudos (menores a 90º), miden igual y están uno frente al otro. En tanto,[br]los otros dos ángulos interiores son obtusos (mayores a 90º) y también miden lo[br]mismo. Sus diagonales son perpendiculares entre sí, pero miden diferente.[br][br][b]Romboide:[/b] Tiene dos pares de lados que se corresponden en longitud y tiene dos[br]ángulos interiores agudos y dos obtusos. Cada par de ángulos, que miden también[br]lo mismo, están uno frente al otro.[br][br][b]Trapecio:[/b] Tiene solo dos lados que son paralelos entre sí, llamados base del[br]trapecio, y que tienen diferente longitud. La altura del trapecio es el[br]segmento de recta que une ambas bases o sus prolongaciones.[br][br][b]Trapezoide:[/b] Es un cuadrilátero sin lados paralelos.[br][br][br][img]data:image/png;base64,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[/img][br][br][br][b]Instrucciones[br]para alumnos:[/b][br][br]En este applet podrás:[br][br][list][*]Podrás mover los puntos de los polígonos mostrados en 1, 2 y 3[/*][*]Muévelos en todos los sentidos y observa cómo cambian su forma[/*][*]Construye tu cuadrilátero[/*][*]Contesta las preguntas[/*][/list][br][br]