Uma pirâmide pode ser classificada em reta ou oblíqua. No [i]applet [/i]seguinte movimente o ponto O para ver as diferentes classificações da pirâmide.
A partir da manipulação do [i]applet [/i]anterior, o que caracteriza uma pirâmide oblíqua? E uma pirâmide reta?
[center][/center]Em uma [b]Pirâmide reta[/b] a projeção do vértice coincide com o centro da base.[br][br] 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[/img]
Em uma [b]Pirâmide oblíqua[/b] a projeção do vértice não coincide com o centro da base.[br][br] 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[/img]
As pirâmides podem ser classificadas de acordo com o polígono da base. Se a base for um triângulo, a pirâmide é triangular; se a base for um quadrilátero, a pirâmide é quadrangular; e assim por diante. [br]Manipule o [i]applet [/i]abaixo:
A partir da manipulação do [i]applet [/i]anterior, o que caracteriza uma pirâmide Quadrangular? E uma pirâmide Hexagonal?
No [i]applet [/i]a seguir, clique com o botão direito, segure e arraste para ver as pirâmides em diferentes posições. [i]Applet[/i] adaptado de https://www.geogebra.org/m/akwutrfy
Quantas bases cada pirâmide possui? as bases são iguais?
Qual o nome do polígono de cada base?
Qual polígono que forma as faces laterais das pirâmides?
Qual o nome de cada pirâmide?