Uma indústria fabrica brindes promocionais em forma de pirâmide. A pirâmide é obtida a partir de quatro cortes em um sólido que tem a forma de um cubo. No esquema, estão indicados o sólido original (cubo) e a pirâmide obtida a partir dele.[br][img]data:image/png;base64,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[/img]Os pontos A, B, C, D e O do cubo e da pirâmide são os mesmos. O ponto O é central na face superior do cubo. Os quatro cortes saem de O em direção às arestas AD, BC, AB e CD, nessa ordem. Após os cortes, são descartados quatro sólidos.