1 - Abra o GeoGebra 3D; [br]2 - Você deverá construir um sólido geométrico, o cubo, utilizando as ferramentas do GeoGebra, considerando que a aresta da base tenha 4 unidades;[br]3 - Clique em "ferramentas" no lado superior esquerdo da plataforma digital:[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAEMAAAA+CAYAAABwdqZsAAAEaklEQVR4Ae2Z208aQRTG/aNRYxSUqFGgTz5oAuJD+6JWvMXaZElUtEZLsVFB+wBe2th62SJqLVBeTnPOMrsHsriuyoI6D2Q3w8zsOb/5vjOz0FIslEB+NAYtEoQhBgmDOUPCkDAMa/AyIZUhlSGVYXmEkDaRNpE2kTbhW6fVvawZsmY8g5qR3E3B7k7K0ttWcn/o901jk3z+HwwMDNAH7x+a0GPGNQ2M1dgauFwu+qwsx14vjKurP+B2u3UYeJ+7vHYcSFMoY252jkD4fD7w+fx0Px2ZeX0wzk4voL29nQDs7CQhldqn+7a2Nvh5cuooEEeVcXN9CwsLHyAQeAOdnZ3Q0+OFvr4+Sn5kZERPPBQMURteH1MQ7Y51DMbx0Xfwer2UpCiU/Nrf3w8nZSWcnPyC1tZW6ptK7jkGxBEYx8c/wOP2UHKjoVE4ODiCbDZH2ygCQZXg1ePxwOHhMSWPNQPbsIY4tdXWHcbtbR66u3sosfn5BX2Vl5aWqQ1BnJ+pECxbA21TKJQgl7smOAhkZcWZrbbuMDY2NinpYDCog7i8vIKuri5qF2eK/N8i1RJMHgsp+j0WW6U+qConttq6wxgaGqKE9ve+6TCmpiLUFggEKizwJb5F7aHQKPVFe/j9AWqLRKb18XYL43371x1Gb28vJYOyx6Bwu8RtExVg5+PEVusYjN/qJcFAu9iBwPtiXbnvKj+kn2Mw8DBlFWAyuUeghoeNM4fVmKf8vu4wxscnKEFeQGsl8PbtO+q7vr5hCa7WHI9przsMVc1CR0cHJTkzMwu4a5gFvJX4Sn2wNlzlbkz7mI17yra6w8BgcasU7x+Dg4OwtvYJTk/PAbfYTOYQJiYmqajiqXNzM94QEBinIzDwQdvbuzoQXhTFPcL63EAQjsLAh+FJc3HxI+B7CELA06ff74fJyfegXmQbpgiMzXEY4qHNenXMJs0KgMclYcj/TZ7B/yZcso24lzaRNpE2sTzHSJtIm9i1STpKR2bx7oDXcLzxR2bzXSYL8XjG0gbmYw0wtW2SjjZx8kYClKCagLDSEBgZUPTfL6OQJs9lQAmPQRjblQyo8TEIh8fA5RqDuMr7C3VlIR6OgqKUfwctjyEVhhOg0pzYR/xOivMgAGzDuUU7Pt/oR8pFMHp8LlDSYpwYI2KoAnrnK3y1TcpBphXxgBIU8cHUjgkLMCUNhrBUOlMGxvtrCfBANQtqyWLiBFTMURDz83El0GNhylDTmTLMEhQxB1QM+/4uq9i0ibEKRi1BCKgMsaJaIlqiGn0MWu9P/XAeAc8AgIGmFU0FFWNopbGdj2PPqUi2Ksayffh8tWqfTRhsNdiWVLwDBq6wDkZXEk/KHEalMoSk+ThzGAImKUAoozpWpmKuFNswKHHmSZewSS1lcLthnSBF8KTMYWj1gSmKEuDjqmCweqWrUMHnJUDFRWAx21dGBU2xMi/7WlsZEsbLXnleH8zupTKYAyQMCcO8HEhlSGVIZVi+4kubSJuY2+Q/1unaGmcG4+kAAAAASUVORK5CYII=[/img][br]4 - Selecione a opção "cubo":[br][img]data:image/png;base64,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[/img][br]5 - Denotar dois pontos no eixo X, sendo os pontos (2,0,0) e (-2,0,0).[br]6 - O sólido cubo irá aparecer, conforme a seguir:[br][img]data:image/png;base64,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[/img][br]Pronto, seu cubo está pronto! Viu como a plataforma é uma facilitadora?![br]7- Agora, vamos descobrir qual a área de um dos lados do nosso cubo. Para isso, selecione a opção "ferramentas": [br][img]data:image/png;base64,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[/img][br]8 - Na opção "mais", em "Medições", selecione a opção "área":[br][img]data:image/png;base64,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[/img][br]9 - Clique em algum dos lados do cubo, e assim, terá área de um dos lados do cubo. [br]10 - Agora vamos descobrir qual o volume do nosso sólido. Para isso, em "ferramentas":[br][img]data:image/png;base64,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[/img][br]11 - Na opção "mais", em "Medições", selecione a opção "Volume":[br][img]data:image/png;base64,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[/img][br]12 - Clique sobre o cubo, e você terá o volume do seu sólido geométrico.