Numa feira de artesanato, uma pessoa constrói formas geométricas de aviões, bicicletas, carros e outros engenhos com arame inextensível. Em certo momento, ele construiu uma forma tendo como eixo de apoio outro arame retilíneo e rígido, cuja aparência é mostrada na figura seguinte:[img]data:image/png;base64,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[/img]Ao girar tal forma em torno do eixo, formou-se a imagem de um foguete, que pode ser pensado como composição, por justaposição, de diversos sólidos básicos de revolução.Sabendo que, na figura, os pontos B, C, E e F são colineares, AB = 4FG, BC = 3FG, EF = 2FG, e utilizando-se daquela forma de pensar o foguete, a decomposição deste, no sentido da ponta para a cauda, é formada pela seguinte sequência de sólidos: