A figura abaixo, formada por uma pirâmide e um cubo, representa um peso de papel feito de granito polido, em que as medidas são dadas em cm.[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAMYAAAELCAYAAACCmvmDAAAe6UlEQVR4Ae2d2bLbNrNG/ydJPA/b3p7j6d5JnMR2Es+z/QS5OO9fPLUUf3anDUqkCFAA2apigeIkstGL/TUAkf/r4hMWCAt8Z4H/fbckFoQFwgJdgBFOEBZIWCDASBglFoUFAozwgbBAwgIBRsIosSgsEGCED4QFEhYIMBJGiUVhgQAjfCAskLBAgJEwSiwKCwQY4QNhgYQFAoyEUWJRWCDACB8ICyQsEGAkjBKLwgIBRvhAWCBhgQAjYZRYFBYIMMIHwgIJCwQYCaPEorBAgBE+EBZIWCDASBglFoUFAozwgbBAwgIBRsIosSgsEGCED4QFEhYIMBJGiUVhgQAjfCAskLBAgJEwSiwKCwQY4QNhgYQFAoyEUWJRWCDACB8ICyQsEGAkjJJ70cOHD7s///yze/PmTffhw4fu3bt3uX8ijpfZAgFGZoP6wwHFkydPNtOrV6+69+/fb+Dw28X3uiwQYBSsj19++aV79OhR99dff3WPHz/uXrx4sQHj48ePAUdBu+c4dICRw4o9x/j99983Eurvv//u/vjjj+758+cbGQUYb9++3UDSs2ssPrAFAoxCFaC8gmjx888/d7/99lv39OnTDRjkGYoehX4+DjvRAgHGRAOmdrcSimjx4MGDDlCARAk4y8k5iB7xqc8CAUaBOrESiihBi9Svv/66KZWAk3M8e/ZsAwoJeXzqskCAkbk+rIQCCqLE1atXN2AAw8uXL78m4ACDpIrm28yVkOFwAUYGI+oQSCicHxiQSkw01f7zzz8d63wCTmRhW6IIeUd86rFAgJGxLlISCiiYUgm4chEii3KPjKcTh5pggQBjgvHsrikJJSgoUwk4y9mPqKKmXHvMmD+cBQKMDLZPSSgLheYFz+vXrzd5hpZLUpF/hKTKUCEZDhFgZDAiuQOJNDmFWqF++OGHjYSS81PSMuUTcK2nh5x9gSbgyFApEw8RYEw0oKIASbRaoYDi6Ojo63TlypXeBBww2NZKqugVn1gpGXYPMCYYsU9CeTBorgUAEnBkEwDRREtkEBjAQe84kUdNuhNOLXadaIEAY4IB+ySUBePy5ctfJZUScCSXWqEkpRRhOCbrkVTRKz6hcibuGmDsaUDd3a2EwsmBwoJxfHz8FQzWS3r5BFyRQ3kIveIhqfasnAy7BRh7GDEloa5du7YBwEJBFFB+ocggx5dcIiponaKGoIuBhntUTqZdAow9DJmSUHJuC8alS5c2w0G0jhKo2F/9FhYM1gsOSaoYaLhHBWXYJcAYaUTdzb2EkvNbMLyMYhsl4Eglm4Brf8EBQDThaqBhNOGOrKiJmwcYIwwoGQQUJMhMklDWsbfNk4ADF/uSQ6hlyu6jqKEm3BhoOKKSMm0aYIww5DYJZR171/y2BNzvq17xGGg4oqIybBpgDDTiLgnlHXrbd0UeJeD8H6Nve0mq6BUfWFGZNgswBhhSjqy8Yh8JZR1fzt6XgNttmZekYnvkV/x/Y0ClTdwkwBhgwFwSSg4/JAHXtiolqRRlBpx2bDLBAgHGDuNJQhElNBZKzrpvOSQBTx1bTbjRK76j0jKsDjC2GDEloVIOSxNtavm2ZWMScB1H5xO94lsqLdOqAKPHkMgd7tBqmiVaMMBPTmrLfcDAyfmDkqQRuYM9Zt+8Ilj0ivdUXKbFAUaPIeWAQySU7dSjD0Kjafucm+VKwNVH4XvAt+0rSRW94j2Vl2FxgJEwoiSLbYXqc1SgsGDY0bR9+7B8nwSc/QBP56de8Xj8TqISJy4KMJwBx0goHNWDkRoGkgJk3wQ8esVdhRX6GmA4w46RUAJDzkrpR9OmoNCyfRJw9tXvqQk3esVdJWb4GmAYIyohHiKh5NxWRqVG02q7VKnfw7GRQ5Sp7VLLgEN5Cg0D+uOTuZyYnWCBAOOL8cZKKJx1XxklR5dj75OAcwzgsL3i0SM+gQS3a4DxxSBjJZSc20aMMTKK/fdNwPXbXlLR9BvD052H7/k1wOi6TSsPfQpWQo0dTo6TymGHlvsm4Pb4/C4SLh6/sycBPbutHgzu2nrrkfos+jryrEPmmkcKAWTqP+BDfwM41ISrgYbRhNvj8QMXrx6MfSXUUKfdtZ1PwMk3du3Tt17Xot70gT4QmyUssGow5JRTJFSfkw5dPjUB97+jXvEYaJjw9hGLVgvGoSWUHHpqAq7jqJSkil7xERQkNl0tGHSO2efNEjXkXHOWSsDpi+j7D/jY85GkUjNwot5j0Q4LrBKMlIQa63w5t1cCTifdtr+5jvnN6BXf4fk7Vq8OjBwSir6LMU66a1uBqh7wXdsPWa/cJXrFdxDQs3p1YEyVUL63mz6EIY66bRs5saTPmCHo244bveI9Xj9g8arAkKPYVqhtjpVa58EYOpo2dSwtI4rRmkTCzLCOXGBwfEmq6BUfQIPZZDVg6K4MFFM68uwQEDrWxg4DEQy2BAwS5pwJOMePXnHj6SNnVwPGVAklR/ZgDPm3nvbtK2mZsgl46umEffvuWg4cipTRKz6cjlWAIceYIqFwQC+jhv5bb5fzsr5EAs5xAYNJTbjRKz4MjsWDkUtCpcDIIaMEjc6TBJwm25x5huCIXvFhULDV4sHIJaEEhpyMMoeMEhhKwIc+nVD7DS05X9srTmdiDDTsB2XRYKQk1Njh5CnHw8lyNNPaY9sEvO/1AHb7sfMCWpJKkanfNda9ZrFgSJpMbYUa64D7bl8yAdc5CQ5JKjoUkWzx+d4CiwUjp4SSY5UuSyXg9ry9pIr/in8PBUsWCUYpCWUdrMQ8Ue7x48dfn06YMwH35ysbqbc97R7rXbo4MFqTUNZhOXdkTqkE3P4W8+oVR1LFf8X/exNYHBgtSig5bOkEXL+jUjeRGGj4Xyj4tigwJA/UkUeZs0lVDlWqnCMB9+cumylKxSN4/oVkMWDo7qdWKMZD8eQP7whjv6u3e+x++25PAs4fqHIOQd91LpJU0Sv+LXIsBgwvoXI96UNgqKkzx2jabY4K4HMl4PY81ITLf8Uj31iIlEIOAIKVULbSp8z7QYM5h4GkzmvuBFznEL3i36LFInKMUhJKDuPBKJ2zzJ2A6zopo1f8GxzNS6lSEgpH8TIq52ha65B2Xgk4OZI63+z6UvOSipJUa+8VbxqMkhIKB/RglM4v5PRKwKc8nVDHGlOmesXXOtCwWTCUpNpWqDFOMGTbuWWUzkl6X61EJXvA9ZuUihpWUq21+bZZMEpKKDmLBSP3aFr9Rqo8VAJu4VAT7lp7xZsEo7SEss6qu+hcMorfPmQCLjjUqLHWXvHmwEhJqBz/sbAwHHreJuC5nk449pq4Ifhe8W9tNsufaw4MWk3sozVzdeSNdZzS2ysqzp2A67oUKSWp1vb4nabAUFJoO/LmaEKVs8xZ+gQ855NDhl4HcKz1pTTNgCFHsa1QS5NQ1mEPmYDb82Betl/T43eaAWMtEkpOSQKOjNHTCQ8RMXQulIrWakJeepbRBBiqFCuhbKUtcZ4EnOumB/xQCbi3q3rF1/BSmurBUBgXFDhKSQlF34V3iEN9P3QC7q9bdUEUW/rjd6oHY24JZTv1SD5Lj6b1zme/yxElX+iFtusPMa/ovfTH71QNhipB0YKytDN4MEqPpt12Pepk0wML5hoasu2cWCdJteSBhtWCobuloEBC7aqwqeuBwoJx6Kbg2hJw2VfALrlXvEowcIi5JRSV7sGYcxiInM6WNSbgOr+l94pXCYYkFFGCu9IcEkpgqMf30PmFdUB69w/VA67zsKVstORe8erAOISEUqVbGUWP7yHzC52T7KGHI/DnJa07ZAkcVlIB7pL+K14VGIeSUDhYbTJKTi/nqy0B5/yAw0qqJTXhVgXGoSSUnFCVXYuM4nxqTcCtrVRvalZeQq94NWBIMszZCmWBqHW+5gTcwqEm3KX0ilcBhiQUUCjhXupw8n0ArK0H3F8DEVY3tqX0ilcBhkKxoJirFcpXcK3fcTqeqqgEnLKmcwUMJtXjEnrFDw6G7jRWQpUcC2Ud6syZM93Zs2e78+fPdxcuXPj6MAC7TQ3zNSfgso/gkKRqvVf8oGAcSkLRAnXy5MnOg3H//v0q4ag5ARcYKnWjQ1LpuVgtJuMHBUOhd24JJTBOnz69gePcuXPd7du3u7t373Y1wlF7Ai4oVKoJV03MAcYIC0g3zy2h1F9x4sSJ7tSpUxswbt682f3000/fwYHE0qRKP1SJs2Er7sI8BO1Q5zH0d9UrjqRqsePvIBHjUBKKSgUM5RQXL17cRIjr1693Fo47d+50LPPTjRs3Ok1sP8RJiEaaBBnlkH3tNrqRKAHnbmzX1zavvMgONKQpl6HzLTzd8CBgHEpC4TyCAcmkiaEfHg4GEPqJ/2ZoGuqIHi77XZANOZYcTfKEIehTQBvym1O3kaTiv+Kct8Aggnz69GmEvph/09nB0J3PSqipFTBmfyIGQNy7d68jMpBbML24dKF7cfli9/L4qHt1fNQ9vXA2Oan15f9+/7VLTfZcGLbO5AHT96F/gqKVzifggGEhY97+dt+8opcvS0DGtUtSAQfRTsNGOP+a4ZgVDCr30aNHG62shDt3Rx4VTNOrogGldZKHJ3/YgPD6yr8AAMSzo3Pd86Nz3YujC18B6QNDy1NQ+GXadlvp9/HfOXcGNGI7Ii3SRP8BF2CU9hr75omMQKbJg6Xvffvb5bdu3do0dXvA9F03EM6ZPhjqm6jh4QCQGj+zgsHdAxAEBVHDGjvHvAWCeVqavLNtosPR+e7ZxXNfowLz/8Jx/l9Aji58tx/HsU7uj5v6brdPzaf28cvYj5Ypm4AjR+zx/D6p7wCmqS+aDakDANPUB5nAQCHQYEC9A7UklSJHrfnGbGBIb5aWUEgkYJBMIjJ4JyFqaJJzAcZmOvq39PuU+K7fHnJstpUMVQJOX8HYY2j7vnLIucjpPWRWNgIDibbyCWSThYNrYBsAIfeo7TMLGLkk1DaZZCv09fFR9/L44kYWEQXsOjsPHCkHsdvUNG8TcO60yBCdH9eh+W1l6nrtsm37ap3d3s6nYOAcgQNIkNGCg5yD0bgAQlnbZxYwckkoK5MUGVRZKpFJwECFadm2Ejg2EurSxU3SvW3bQ69LJeCHOicB0QcD4AKDIgLOT74BHOQcUg5EvRo/xcEYK6EUFfq0LjJJLUm0Hk11jNbAUAIumTL1+vfZX/kB0eDz58+b1iXmPQzkE+STvIUWPwBsSsZTCRAiSI2fomAo9HN3UMKNIbzTCwbfx6DtbOUBA82qtCDRmmTX7TPfEhipBHyfax67DzlACgYkkmAgcrCdYMDxgYBzthM+Qa4E4CgJtqnxkxUMnN62V2M47iSCYlcrlKSS7WPwlQgMQ2WS3zf1vSUwOH+fgKeuKceyMTBQ59QtMHB+gKCbmhJ1CweRg4lltX6ygaE8As2InuQOogSRcAscNO1peLcMZ0vbkuRlUk4YrOMABrCRm/jftNvVMq8ozJ1Z9s11bikYlDzzW0QNRQbBgCzyMNg6ZR44LBg1AyFQs4BBZREa0ZIAYNuqFTVorlNEoJTxbKXS62z7GOy6UvMtgoEz4pjkGTjuFNv45JmbWB8M3PRQBfw+dY6Dqx53lcCBjxBZ8I/aP1nAwEDcNTAYhkt15AAITXNMigy+Qp9emJ4z+GPu+u7BeHTm9CRH2/V7U9cjQaYm4B4GblqCQS1JbENdCQYUATDsAqBv/erAsCGSCkNnclfAoDZysIyJiKKcA4CY2FYTd0JN7G8nJJomQUY5xdlaAwN7k7BiN64deYMz77LBGBg4Nk2qwACIfc4+ZvmqwbCSCggwMI5NBVKZgKMJozMRZTQBFROSTBMVpIloxCTIpoAmwCgtZOjsXU52yPXYDxtw8xAYRGPu+pT23IbCgA0EA8fPBYMFBzDwAc4dn6j9M1lK2YghSYXD49gYgehANPDbbftOxTABmiakGhPG1STIKMeCxrlpEmiKZvtEtDlAwyZcJ+eNTflNnF9JuCSR+ji29TGwL9dJPWE/6sM6cu55CwZQ1/6ZDAYXaJ1cDoyxuftzt8fx7DZzzgsyC5rOsQ80QUbpo5mNaIpklB4yG80saJKMlJKMKnfJRq4Bu+LMHNNGDcFBriBAWKacwfYxsD83l9IwWLhWD4acnkrE+DiXJJI1FPPatqVSoCmSUQo0RTJKHFiTQBNklLIJTqpJoAkySkUz2YjfY3+2lVS1zayCgUgiGDgGvzc3DLa+VwmGjxpUou7QchoMYw2Ve16O01IpyGQrC5mNZgBmrwsHBw7AAQ5FDmBQX4Ng4Djsm9veY4+3WjBScKgyxxrx0NvrvGstAQk4iALAIVlF3qCGhBpgsPW4ajAEB3c+Qj06mqdvWAOtcb4EYEQCIolkFRGC6IHNKWu0MzDjF0S42j9Zkm97kTgBYKCbA4x/sjmoh0syDGdTHofTEUFqhIJzAuYA4wsYDBGvtaJaOy8Ph25CwEH0ABDKWq8rwDARI8DIFzVweA+HIgcl62qFgvOyYKAmav4Ul1I0GdZcWS2em4ejdiBkYwtG7XnG6sHgOVOqOMpWIhwwWEez11DrvM6XaFH7sJAiYBDWlXzTfFhrRXFegEFTIo+D4cmAAUZe6WfrPsAIMIrfDFqMGLa1kj6Xmj/FIgadT4TMiBhl7sAeDGxt7841zlsw8IuaPwHGQqQUyWyNMNhzsmDQKFPzpygY9MC2EjF4wHJrOQaOphEGJLPWCWubJ48LML48vLlFMFoZwoKUahmMVUupAKNMfkE0EBhq/SOZrS1K2PPxEWOVYFBpJN8Bxnxg1C5ZA4wvT55j1GeAMR8YtY8wAAz6t2xr5eqSbyJGK2AQ7n3vt5UAtc57KRVg5MWsSKuUBaN27Vur4+86Lw9GC1JKEUNKIq8r5z1agPFPObmzy7mnrAeMlobeWCkVYDx9unnEyxQHiH3T4AoMq9lrtlWA4ZLvkFJpx57qxAFGXunkjxZSqnEp1UrE4EYQOcaDB5u/WfL0iogY5SOGNPvUKFR6f6Kcba30d+mavheLGPz/OMAoAwUObKVUi2Bww6z5E2A0LKWAo5URBoJZESPAqHwMT2n5UOr4QBFglIs5q48Y9HozHR8fd9evX2/mAXECQ3fg2jv4ImJ8uZO1kmMEGOXyoFS0BGTlnuXu99OPXDxi1P4HmqWA0Urr3+rB4Il43BkCjDJ3ZC+lWgHDKonp9/VyRygWMQCDBw3XDgbhfgk5RoCRF5IAI8CY5Z9/jJViiogREaOow0lKWUdLJbu1LFs9GAQ0Kq1VKXXr1q2iDp3LUVsHA4ld8ye7lAowyiTbHqgAoyxWxcDgnQ0tJt8RMcqA7aXUaiNGS2D4u3EL31uNGFZil73nTzt60YjBa69aaK5tAQR/jgHGNMfftXdxMFp4pqp3uha+ezBqvwFJSkXEePhw86LEAKOMZhcYOFoLIwwCjC/NteQYSKkAI8BQBAaOiBgBRtH+EBsxWmn9A5DVg8FrpSJilIkWugMDh3U0La+5tOe7KwE+5PpiybfetxZSqhwcLYIhib3afowAoxwQiggtg8ENs+ZPRIxGH4YAHAFGObRmAePmzZtFE1HdQfct+T/GpUuXNq805lzPnz9f9fnqOgGjtREGklIRMZ4/7wKMMrJKYLQ0wmD1YOj9cNwZah+Y5yPG7du3m4oYAUZ+SVVMSgkM3j9d+wsflwBGK61/tlEmvzvnO2JRMPTiRGniWssAo4zUS9V3gPHLL12AUdbhbI7RQsRgSEiAEWAUz1MAA0drZYSBBwOZXetnFilV+4sTkVJU2tWrVzctaC0l3y2DUXOTbYDx5fE5AuPGjRtda2A8efKkiVHMNmIQLWoeFlIMjJZenGgjRoBRLi8KMBp7o2iq9aSFZcoxWooYNOOrUabmd2QUjRgtvR+uBRD8OXowkCd+m5q+EzEsGLy6oNZPgNH4IELb/Fl7k60Hg0aZWj/FwWjl/XA13VmHngsRw44waOGBCDZiBBivXlUd4oc6Ym3btQ7GqqVURIxyrTwCwyaztcHrz8dGjFWCQaW19EZRX4EtfPdgtPAevgDDvey8BUdr7Rw9GLWPMMC+9G/Z1srVJd9UWktvFG0NCs43wCiHVbFWKQtGK6/Bag0OD0YLUkoRQ7lnOdeeduQA48tYKYaFXLlypbl3fbc09MZKqQDj6dOu9ogBFC2DYTV77VEvIobJMQKMMk22SCk5GsNBQkpNk09275BSC5BSETGsS+eZLwpGK28UXYKUkmavWUoxVso2yqy2gy/AKCOh5PxWSrUIxiqHnVNpAUZ5MLBzKyMMfMQIMF6+rHoQoaTU8fFxc821AUaenMIfJXIMk3y3CkYrIwwiYjx4sEmyWpFSZ86c6c6ePbt5CMLdu3e7+/fvb54aIi1fa0m0YGoJDODgfHlv4OqlVK1/oEFCnTx5sgMMHjzN00Hu3LnT3bt3bwMHgNQKBeflwai9vwgoAowvr8Gq+Y2igHHixInu9OnTX3MLDwcVWSscrYJhlYTX9rV8L5pj2Pet1eZcSrh//PHH7tSpUxswiBo8gNrDwTItZx1TDe/QaAkMHmbHo4mIagyPf/fuXffhw4fu48ePtbDwn/NYNRg4uHIKZNP169c3kkoQIKtY1jdR0UxDoBdctpwKWStgaHAmtkJWA8bbt2+79+/fb8D49OlTx1TTZ7VgAIKfuKsBARUoOC5fvtzRWuUnKptpCBRsc+3atV7A9JtDjmXBEhhWmgDbkOPMtQ32w05cP7KaJ5nQ4/3mzZuvUUNg1BQ9VgsGUgowiBhEBskjZBXJuCZJrr5yiIPxGjMcRJOHjO9DjgO4OJimFBhANuRYvMzHQmbnFcmGHGfbNuRnXDvXx7nzPnJ66IkawEHUsJKqpqhRBAxCIpV2yByDyrUyCQhsJcrRz507t4EAIFhGMk5LlQDRdttKe9zU/LZ9tS61n1+Gk2kCshQYfp/Ud5xUkyBLycXUvn4ZgGmycDGvVihFDZ6YSNRgJLByDQsHOQdTDZ+iYBzyxYlWJtH8CiS+UnF+QJBzqhQcAsTvp+/aXt+3ldq2r9y2r9b5ffcFQw4ryCh9NNNvbisFl0pBRglo+h1KogZDV1JwSFYRPZhq+DQNBlEBGZSqPMEgmURkSG3nnc1/T+1zyGX2/FJgsH7X+dlj9M3vOgbrreMzL9CATOvk9EQCpBJw8D4PRQ7JKhJytmWq4VMcjNwvThQMthPOyyRVqpVJRAEt9+UU5/DHmvN7Coyhv993zXb5rmPZbe28hwEgSKxphSIieDhIyJFW5B21DEWfBYzcz1QdIpOQQfRRUGG7KrjV9R6MQ4wwwL6++fXz58+b6ECUEAzAwnacI61oklVKyMk78BPKGj7VgqHI0Oe0kkhsxzgnu92SYbDXKTBo5ECazAnGGBhweAAABvJOHkTNOTNmiqcoknewXlOA4Z40jpP7lqQ+maTmVCLDWkCwUDA/Nxi7YKCFSZFBMOD8gKBzVckTCYGE6CFAgKSWT5URQ1LJ9jF4p1grDNYOcrKSzeIpGMgXJJMEA7kBMoicsg8GnS8lYAAMcHD+THyv5VMUDC409UZRGxlsRWteMknJs5ZH+f0/AnGy3GD45JmcQTCQPKdg4M6Ps3M+/mOB8PM85UTL/H6H/F4cDPsarJRMonXJOzwyyfYx+PXx/RsgOFUOMDwMakkiMlgYaD2i95p6FQxDHFjOnyqH7D/3NrOBQWKIUTWpaY6SCGKdPWTSN8e3dknNTwFjCAxIKQsDEHKXX/pnFjC4uzAhqzSpBYLWFE3ciTShVzWRyGkCME2CjFKgAZkHLeVQS1k2Fow+GNSsikwCBmxMvZAQrwUGC3tRMNCcmsg3lGyRcNmkC8MTltVCQfLGRPMeE5WjaRtkwDYGMmATZJR9oNUMEWBgS66da0idKzBoiLf6GGyHWx8MHHutn2JgYFAMO3UibGvykFnQgEuTILOgCTILmiCz0UyRzEIGbIpklIpklIpkQyAjqqUcd8oygUEkFhipliRyBrUkkTMAiyID14pdAGzNMNibQPVgTAXL7+8hA7Y5opki2VDIhoLmwfCRIQUDxw4YLAbfzxcF4/uf61/iHbiV72NByx3NLBg4vJpVAUTNqkQG1hFVbB9Df23EmmrAyF0VrYBlz1OQUQ6VjR4MwYBsQ+oFDPt51mLB2M8c6b2s89Y4b88aGMiZiEzAFZ/9LBBg7Ge3SXvlhsueTMBgrbH/fICxv+2q2RPQ4pPXAgFGXnvG0RZigQBjIRUZl5HXAgFGXnvG0RZigQBjIRUZl5HXAgFGXnvG0RZigQBjIRUZl5HXAgFGXnvG0RZigQBjIRUZl5HXAgFGXnvG0RZigQBjIRUZl5HXAgFGXnvG0RZigQBjIRUZl5HXAgFGXnvG0RZigQBjIRUZl5HXAgFGXnvG0RZigQBjIRUZl5HXAgFGXnvG0RZigQBjIRUZl5HXAgFGXnvG0RZigQBjIRUZl5HXAgFGXnvG0RZigQBjIRUZl5HXAgFGXnvG0RZigQBjIRUZl5HXAgFGXnvG0RZigQBjIRUZl5HXAgFGXnvG0RZigQBjIRUZl5HXAv8PU3Pw+pXt1fkAAAAASUVORK5CYII=[/img][br]Considerando que a aresta do cubo tenha medida igual a 4cm, e a a base superior desse peso de papel, representada por uma pirâmide tenha altura igual a 2cm, construa no GeoGebra esse peso de papel, de acordo com as medidas indicadas.