Observe os números: [br][math]3,5[/math] [math]\frac{25}{5}[/math] [math]-\prod[/math] [math]\sqrt{17}[/math] [math]-43[/math] [math]3,515151...[/math] [math]-81,591630...[/math] -2[br][br]Quais são considerados racionais?

Observe os números: [br][math]3,5[/math] [math]\frac{25}{5}[/math] [math]-\prod[/math] [math]\sqrt{17}[/math] [math]-43[/math] [math]3,515151...[/math] [math]-81,591630...[/math] -2[br][br]Quais são considerados irracionais?

Observe os seguintes números:[br][br]I. 2,212121...[br]II. 3,212223...[br]III. π/5[br]IV. 3,1416[br]V. √– 4[br][br]Assinale a alternativa que identifica os números irracionais:

Explique, com suas palavras, a diferença existe entre o conjunto dos números racionais e o conjuntos do irracionais. Como podemos identificar os números que pertencem a cada conjunto?

Observe os números a seguir e determine quais pertencem aos conjuntos numéricos citados em[br]cada item:[br][img]data:image/png;base64,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[/img][br]Qual deles é[b] Natural[/b]?

Observe os números a seguir e determine quais pertencem aos conjuntos numéricos citados em[br]cada 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yq+SmpwAn3vHsXTCAAwf2Bvj/jLBmTueiIj7icwpH+jQoQN22ztiuNV4HpGjhAjc2jYRlqsuw6CnFf6soQXbEZ0wy/YcImX3I5BJXNArHF0zDj269sFe+0vQKd8SXQe1xJcdaX5OTcEn95vY/E939B00GZcuvECtTn3QunUVfNloWEp8JPycT2J835awtFoK3zepaGcyELUMdPk38o7ylSphns1yTJ0mu5OQH1GsWDHYO+3Fhu2yu8yUp5SUJIR8eIU7B9fComtbGJtOwNkHvihIry6yftxtVqyEyUhLHvm12LsOg7t3RsuaRtkavL7SQ11eI9cklN2ObtW2LcoYlOORvONzairuO82C2Z/tcNglikfJt8T6v8TlXeuxyWYxtm3bg6e+33v7OxHBvo/w3+7lWCeU3ezoCM/gvFWHLl68ONq0a4c6UvpYzyua9BiJHp3qQ0NFSWwfUD6d/+WcAQMGYNseByGRGMIjuS/kyTHMGj8dXuWHYaODA4ybK2HGsD7YcuwBEgpg/VNVVRXaQvKftV/p7EuA39XdsPn3FAwrtEK7RjVQt2MHVDBSw3nbeTh+3x/fWpzh3k+xaaY5Fu55gAZ/L8Qa+70YO7IHqpfSwZdNX7+9fRJTRwzBnifqGLVgO1Zt34QBXRqhjLb6/09SqSnJuLlzCUYNG473ZQZg5rr9sF45HR0bVUJR1bx3j4CdBy3HTYCZ2TAeyR62/7NKnpZ27rQZHfTmNhxXzoHNQmvceuCJyKhYyO73LH9iXUaP/2cSevSV7Db4V/D28EBsdAz+NjbDEIuRPz2wLjflQVFJCb+1aYu2wnmSbX85Qa6N1bPn896HRiBVVUN8oy3vSEbEPQd0HzoVQeGJmHT0Hazay6/mzLokTIqNRkktdegXl9/vPXPmDC5cuYZ6zVuifecuPJpLUpMR/fIkFvyzGDc9/MT+wBXVNKFv0AoT7Xbjr8bFoCJzm0yE+0Un7BJOOM88fBHwPgQJKuqo3qw/liy3Rv1qJfj3ft4EcxOcO3FM7GOe9Xn/M1i3eh8+BiM0KRXF5LTT5pwIXF46ETPXHBY+lYKp3UHMG9iY/yz7Fk6bhL07t2P+/Pmwtrbm0Z/zZbeduS7pFVb2HIjtD4TE8+R+jGhdBUmPNqN2lxlQrz4I+09uQO0Sv+Z68tTRI3Di4AGsXr0aU6ZM4VH5yIm+4z/HBGH3nKFY6fAELYZuwOqNQ1Hi00vMsTLFwWsBaD92DVbOHgxdNelVo/hPntg83Ry7r3xAD2snzB/6GzRVs/S68jkVIc9OYvrEGbgXVQHz1tliUBsjiW6VkZoIn9OrMHTsWsTWG4xju5bDqFReOsdIl5/7jo+PCUZYSAw+eZzGonEz8CxYGx0tN8NmWT/k5nVnsX3KhDiULqKJYkXlf4fly77jf7V1y5aI3RVPmjVXalfGuY3lNpEhwdDXVEV5g7KS+6UcyDW1ZbcLWBeMeSsBBWICnLFm3koxAc0J0ZGRGDd8GEyGyvfqT/fu3bFgqU3uJ6CC+E9u2Ln1P3w2aosexkPQrn4lpCTEIvD1JdgumAPXj7KXZYjbdbhFV8WcHVdw4tIFTB7SFpopMfC4fhTbLz7l3/r11NXVUap0abnVGsmvF+/mjPO+rItZZajwWpKKiqp4BTnO4yKuPPt1zw4aVqyIRo2boHQ+6aM6NvojvN08kCKceFSEBCDTtcbUKLg8eYDQCNmdEjw/uQz7TjyHWpXuGPV3a8kEVJAkJLpHtizDfdePaPanOTo3ryL1RBftdx3rVu1AiGIZmA4bhgr6eT8Bze/UtUqgTPkKKGNYHlq/MB/y9nSHlcUwzJgun8ca8qq4uFjcvHwR7Tp2zhMJKMOufpYsVUo8ZuVEAsrkzPXVPCQ5NgynnY4iUjdnFiCTlJSI65cu4sL58zyS/33080LVDuOwaN2/WLByHRb+uwhNS6ctw4Agb7z7IL3/ekataC107tMaxTQAjeJV0b1vV+jrsCe7ohEfJ5/7oWznUFJSyrEdo7Cp36QpBhuboEG+bus2Ad4vnyE2JhbQLYJi6lm7IA3Fgyc+v+yKx9Dho7DD3lGsXOYHsZFeeP0iHFBShJqeTqZnM5lI/0AEx0pvq+FzxHMc2nMdrHPJEuop2DmnPyz698ac9YfgFxT1/+6Nw7yu4PR5VyQpKEIh6DGWju0HcxNzbNx/HdFxaVfTPyfH4smF43jk/QlaQsXxw51tsBraB+aWU3HmrhdScuGqIPl1IsLCcO3SBdy+fZtHCqa3vr5QUVVFxcpGPFI4FPAkNBGvLtnCPb4leram5pN+RPnm/dGtbxtoa7GrFyowqPk7evRoIf5MRUUZql+pqWkblEOR9OQwJR5vfbwRlwgY/TEGFv2apMWzydTSCjvtHdCpUyceIdnRZ+AQbN62A3369OGR/CgG7zz8kRArJCVqKlBTlrzyFu7jJyZGv0IJ/ZKobGQk3jGSp9DQULi7ueHD+/c8Ih+fUxOR9LWXjyKiEZkkrVKZgre3TuL2G/b8eEW0HW6BufOXoKL2Bxy0NsfgYbPhHcrupCTg2em9cBdWiIq6UAmaPw8L5lkh2OUINoztgXFLj4LdvEqM+YibF84iOEEBZWr1xKgF62Derx68zm/BtCHdse7Ic8QXzHfOMmG3ad3cXOHl4c4jpKBgt73v37wBA8PyKCnlTkliYgI+BgbCU1j/l86cwrnjR+Hy4D78373N973cFegkNOb1LTg9UcDQUd2hp8aDJNsqVWiJqkbF+djXROLxyR2w23wSofEaqPd7J9Qul/3nQZlGzZqjT/+/xQfLCfleSYGhBa6JmatXr8LC1Bi7Nm/gkVwi83WCKLxycUd8rJCgFjVA/erloKFXA2OHpjUtFOx8ENvOs7d3A/D8pp8YUy5bA7XKF0XRCh0w8q96YuzxMTucfxYkVCq84fWI9RCmgJLV6qC0rgYat+6H9o0MkBQZJPb25fcp763V0OBgnD15ApcvX+KR7GHvXJgZG2PiSAseIdnl7++Pk8ePwfnur73KGhcbi6ePH6Jrz948kiY2JgbXLp7H4pnTMHmUBSaNGIYJFqbi8M9wM0weaS6++Pv+7VteIv+RaxIaLOx0796+QVTkr7rWkCHhkyt2rb2A5v3MULWUOo+Sn5WYGI33fr6AlgH6TBiJit98tyMCzjv+xZrVG3DfJwhJCRE4udgKi7ZezDNNfLC+0t+8eSPWMPM89vJbclKefzv1xIkTmDJhLM4cO8IjeYuyfrE838zVj2JXQl1fvhSvisiTgoIqlLPeg/9SUW0UUZH2VnqKkDgmsXeOAE01qKukXZEuVrMxKoifYvDK2VU4QiQiPipti1bQ0UT6UdqwViOwKm58xAe88nyLhNQ44fcJAQUFKPNnU1V1iqOKQUWoCHtE8CtPvAn99eecrLw9PcR3BWZMn84j2cNe0Hn54gU8XV/yCMmuhw8fChU4E2xYbsMjv0bghw8IFBLiqjVr8kia6VajMM5sKP6z3y1eeNm67xDue7zG2bsPUbNeA7g8cMbOTesx1nSwsF248lLyw67Qvhdyujdv/MTPOUGuSaidnR1Gm5vi6oVzPPLzPj05LjZq/K1hx77TCGEHqCweX9yO6Kpt8Xs1Ax7Jf1gXilcvXYKv9yse+XWivK/hknMK2o6wxoBWJb9jwymK5iOmY/XWtbAa0gVFNZSRkhiAc3bb4JlHWsh68uQJzE2M8e/S7L0NnvOiEejtAueHLkjb1KPw5I4LAqPyXlNj7KC+Z8cOuDjf55HcpAzNoupQlLwL/3/KxYtB3g0ZFVRqmhVR+iud1BQxKA19jW9U8CNjxDf3GQWdovj/gwhZrqKmfor4/xVqNZ0vKgpffk/4nBAcAfEJARUV6Gjwl6WEr8i6JvsrsedeExMS8v3t0oKMJVYJwjpKTvpFrXlwr9xdUbyEPvRLleKRNPFxceI2xJ7ZNxttJb7cWFRXF1Vr1MSUuQvE77C/we35M9y+fkXuiWJCfBzGjzCHqbFxjm3Hck1Cvb298cjZWexSMbuiP7jh+sXz3xwePvWAZMskPri86SyObJmOvq3ro1PT+piw5g7/GbB7bF+sdrwL2e915g379u2D5TBTnDx8kEd+QLgvbKf2E//2bw0bzvjwQtIlRr/BmZ1OKPfXZMya0OcHriRpomydPzFqxQ7MsWgonjBSQ+/C813aT381dnvrgZAsseds8qpPnlewYrQZZs1YiadhGqhQtRoqVy2H2Cf7MGuEGSyHLILXr2oOKc/RRvkahlDXFA5rySlIljggq6BGnar4VU/mxERHISQ4WLwCnx9oFzNAvaZNoZyagpj3nzIfLxW00bBBE+gWE5LQlHiEB/rCx8cXIZHxQvJVDNWaGAnrQUH4o9/C9z2vLKmp//9qZ9FKhsLaqoh67dMez0kJeYE3H8WPUFJVE9aUcHLS0IBeKX1oa9RG9aasZCrC/d0Qxn6dkhJUlVXEE5hqST3oawpHpZQERHz0E+bjNYKjY9MS05Q4hPj7wOe1H8Lj+YkiWajUvfGCj+9bRP9M10+EyJnbi+eoUqM61NUzV5FLlzUQjvfV0HvAIBTTzfwIXNaElSWrcmxxU8SSWna11fn+fbn/7nRyTULlqVL32bjg7PLNYevKqTCUeM4/EQnRiYgIfAs/Hx9xCPjicml4wFuEhMflydrzl9jJKiwsVKwN/TBVbVRv3B4du/X85lCj3FcaP06Mws3d63AjtRMWLhuPKrrCKTwxDJ7e75CU/D21LkWoaOmi/dDxqF2EjWtDjZ7P/W761TtgxpYj2H3sAo7fydjuz9+6ht3/HcXWffNRTT37zXm89X2N+/fu4m0+fraIbWuVmvdAg4p6QHAEQmKzvFWj0widWlbkI7nPacd2DDczFtv/zQ8UtUugW7+BqKSvjoTYcLALIawlkMSEeKjrG6BNh/bQUfuMYNfTWDysHbq2bYcJ1nsRkQxUbTsYv9VlTZ8F4OHT1+Lv+/zmNbzYB51q+LtrIwhpJJr3s0J14VyanOyFpy/Tms8Kf/saQcL/pau2QLvGlaBRpDT+6DsIelpAYNBz+AdEs4web4I/Il5JEy1at0eFUkUQ+uoSVo78A13btMHYdQcRnZiAwEcHMGNgK3Rt/wdmOlwRfmsi3l6zxYg/m6Brhy7YcOmFOE0iW3JiNOKFRS4+ZpEQjWSq88oVSx6fPHyAOg0aSzTNtGTdRvF4z1rWYK3BfIk9R5qOXR2tUFlK+7r5QJ5NQrOnAkbaH8L+sxf/PywalfFW9oClO2DZr7HcroioCbUXkxEjYTlmDI/kAZr66DB4PGZYL/nm0Ll+5hpVhlS8uXsQVz31MGzsEBQVks9wISn2un8CZy8/QHKqsMGnJiEuOhzhEZFISEoRzjQpwgErEpFRMcLPM9J85WJloa8jLCujTqhvyIPZcPPKJWy3s8OLF3QSkYfD+xwx0swUhw8f5pF8Sr8Bhht3hapyOIKCopH6ORUf/f0BJWXU79UHDUrnTm8z0rzycMP1q1fzUaKvjDLNBmLy6C7we30Hd1/6wuPGdfh5ReHvGQvQu4Wh8I1UBPt5wc0zDArx4Xh4YAceBQpZSsl6mDBvPn6rqIVXx+1x4YU7bp04jbjSRugz3xrtqqWtB72Gf2HaP8NQQUcBV5124rmvO26cuwUYNceoRdNRneWxKkKiOWgSxvZtgcT3Hjh8/Ay83B7gqZsvyv4xAKPG9UNxjc8Ie/8abh7BQEIUXF1eiSf3oFfuePUuRkhaQ+HykN3xScS7Z0+FBFaoQEcGwuWJfFsUKEhSkuIQFRaGF49vw128mB2P1z7XhHX0FjFxSbl2EadkmTIwGzEKAwcO5JH8g109ZO1/hnz6hJQU6VfdAz/4ixW7uj/QPB77Xc530l6mYolrr/4D0bLd7znWq1FOKqBJqCYqNmqKJi1a/n+oWTGjjweDmg1QsWyxTN3GZQfrMm/pmnXYsHETjxQMkW+uY61wIjm0bzks2lZDUyNDYSiP7r0X4aNicSgqpyD46QFM7FYDTRs0w3zbS4gOcsHiAa3QoU1/rHc8iQCxg4AE+D64gFdRBjD+ZwTKf+1lh+902MkBUydNxM2bN3mEZEdkeDj8379DREQEj+RXKqg3ZDGWTGuNB8d3wHGPLbasv4teVvOwcuFwlNCU115fSKjr4o+xW7Btalt47VuGw48/YfTOq5ht2gvsTrz4iEOrPhg10goD//4blfQCEMgSPEGllhawu3AZ/5gb4ordWpyNq4pN529gkUVPFFFOO/UoqWijneUm7D21Ey0NX8Np1Vok9ZoHx/OnMKiJUdoznwK1okYwXnse9ttGoUTwFez47w4azNoNJ4d1aF5aRziRKcGoVT9MWzQFfcwnYf0CK+gW0UH93qMwbeZo9Bk1B1vmss5EtNFq1CxM/ccUfcbYYI1Vh7QJEAlB7pewZc4MXH6UhK6DhqDPoMFoZqCKC+uX4+AVz1x7wbSSUVXY/LsOc+bO45G8j93GDg0JwYVTJzHOdCiG9e0ptpYgzdUL51HBqApKlJR1MSgN+51xsTF4/+YNDtjvwppFC1C3YSNMXWCNKULFrphubvZjJT8FNAkl2ZUQ7A3HFfNw0UNKUqKlC4OyJaCsmATfx/fx7FU0EPEe57bvgOeneHxKTED421vCAWw8JpobY6yZMRZY70Wj0TYw71qL/xJCcoayVgn0sFoJmzE9UVrPEL/PWIi5MyajcnF6JelnKCqrok6XkZi1ehusVy9Dh1ZVkakJVr2a6DN7GUYPa4uiJX9DvYoZb8xr6deF8Zg1WGm7DSvZFdDyxf7/XOiX9Kt1w3Rr4TvC9+aYm6CenqbERQIFRWU07DgJC1YK3/t3Pcb1+ANl1TKmBQ0DtBy4ACtXW6NDfYO0k5t2FfQYsworl01Dowr8mTqdujCbbYuVi8egAutRg0hVtl4vTGPrLeuw2RbmPer8smer84NPQUFYKiTwHq4vwNr49HB9icfO9/hPM7CrpPduXkenbj2grPzFtiwFe1N+/DATTBxuhlUL56FchQpYuOpfmI4cA6081kvljyg0SWj9kYfgFhQmDpZt5dtYdEHkffsIngSXxG/tO6FthyxDz85oWLWssPGoo3HXIRjS62/82bk9dJXcEaDeCsvsHGFlOgxtf2uMIlpK0KjVDtP33sPy6X1RoggdukjOSE5NEq8WsFtgChraqNKkAzr17Clsw02hw96fSWUvK8mnx668pF27dtiyYyfMLK14JLclIfzDMxzafxRV/h6JmjrZf0a5IFBTV0fFypVhWL48j2RP0aJFsX3XLqwSEsGcFJcUi+eBj5GUkohXIe54HvRY3LeeBj7E61AvJCTH4967GwiKDsixl1VyC0veWAcSpcqW5RH50NPXFx91mzBjNoYOHwkt7SKwW7MK4WGZexoM9P+AoIAPqFP/27fi2S17trw1NTVRsnQZPHd5DMshA7F8/hwE+Offx0oKTRKqoMT6klYRByVF6urxW2r3noEdB49h5yEpg+0ytKquBwXhn6JhK0zcuh2TzP9AiXJtUb2cIvSqNsekdZvSvuu0H6tnjMNvNfSgSMu9wKtWrRo6de2KKjVyv4cy14/P4BLojEDh5LjTZSPeRfiJMfaZnVhv+F3EcY/9wsm1YL1ZUb16dQwxNkGLNm15JJeFeuLknj1QbmqF8YPaQEWJ9nOmSvUa2LTLHitXruSR7GHJh7GJKfoNGswjOUNRQVFIMD9g15ONuP32Kp4EOIv70PPAR7jx5iL2PLWFT6gHTnseFPar/N31Q7NmzbDLwQkThWRRnthVzZKlSovPaDZs1gL1GjfGW7/X4rsM6T4LFWZ2pZT1pKYnDN+yYbeTeE7deuCQUBHZjuat2yL4YxActtpi7dJFCA8N5d/MX+SahLIHh+cvsUGzlq15hGRHkSJFxA1ZS/vXvUzxbckIf/sUR0/fQL2/TVE5H93dqiEkSkuWLYepZR56oSyfGzBgALbvcUTfQUN5JPdUKGYEr2BX/PdyJ1oIFaLTXofgEnBP/PzvPWtEJUZCX7MkrvmeQ3JKwbsi+svoVEVvK2tYDu6CMkXpKmg69q5Ag0aNUadOXR7JH9SU1fF75T+F/aYdulftiz41hoj7UJ+aQ9GtSh+0LNceA+tYoEPlbogU9qn8TFdXF42bNIFRteo8In/6JUuh/1ATsdtV1qxkemc+KUIS6v7iOZq1agOlb9yK/5KmphbqNWqEibPm8ghw6sghXDh9Uu5Xpllf9rMXLYHN8uXffFzgZ8k1Ce3WrRvG/jMZ9RvLp3/w/CIpMRH3bt3EjRvXeUQ+hg4dim32DuKbb3lWyHP8t3sXPje0xNh+TeX2slduMDIywj+Tp6DPgJy9slCYqKuro4iOjngrMrcVU9dFrxoDYdpgDOqXboKhdUeir3DiZJ8tm0xBZ6OeaGn4BxqWaQ4o5O/biHmKshp0ihUD7xiJFADKisriflNSuwx01IuJn4uo6aBUEQPULd1IWNcqqKhbFaW15XsbW5rIiHDcFc6vDx8+4JH8hV0NbdehMyoaVcHtq1fw+pXYUJnYQP7TRw9QQ6ik/Ohb7QrC9ysJ56907HeFBn+Se2P1qqpqsJwwCZOnTBXvIueEQnM7Piexmg3rns1USBrliSVJrdu2Q/lKlXgkD9KqjJ4W8zDetBtKFMmZmlLeF4V7W+diaPtW+Ot7hj6jcdn16x06XDl7RnpZGcPJw//xkj9HVU1NvHKjKtR88zNt1SIorpHWAHoxjeLCibOo+FlfqxQ0VDTFkyf7rKyY+1fs2nXqgnH/TEKTJoWrkk5Idnh7eGCshfy6P/0VWDue/QYbIyw0BKeOHBSbWGLPcSYlJom9H8lq33PRjKni8f2gwx6JJp5SvxhnSamycv68C0FJqBx8/pwqvg0XmB/6IJc3oZZc1rAMvnxJNTcYVqyEho0aQ19fn0d+JSUULVcFdRo3RYPvGerXRHGtryd7xUuUkF5WxqBfsjQv+XP6DTHB9j0O6N+/P48QeevZ728sWbZCfJGIEPJ9WAcJH4MCESyjiaP8ok2HjjAoXwFnjhyGzysvvHjyWOwrnr3EJAvrRIR1yXnsv33/v42f7rW3N/8ElBN+b7NWrSUatM8PFD7L+SGCjzEJiEwsXM9bhXz6iBbV0zpZlvczGSFxiQijbhklsIOSRkoiKhmUQbFiP9/aQYywrQYK2yzdnAX01FWgq5H9K6GhwjYbStusVPrC8i0qhx6uvuTp6Ynrt+9AS7/Mr3s5iUhg5wI1RaC0ljpUVbJfS2c96O377z/h/JqKXgMG8WjB53z7Jox7dUOtWrXg6irfLpbZOoqMF5Lc2ETxamJOYv2wL5s7Gwcd98B01BjxRaU+g43F5plkGTWoP65fuiDO5+S5CzHQdJj4joivjzdWWc/HzcsXxVv5C1etRd/BQ3PkMShVRQWU0lKDWqZ22eSHklA5oCT01yipqQodteyd0CkJzSCPJPTjx4/w8Q8ANIpI9G1MciYJ3bZtGywtLdFROJnZOR3gUfKrvfJwh+2q5ahSwRBr167l0Z8XEBCAsmXLikmHZ3D+fiHoR+RkEurs7IwVq1ajbGUj/DMr5xvD93vtA7M+PRAfFw9FBQWcuHlXfPlYlrCQEBxyssetq1fEPCPggz+iIyOhraODcoblUbVGLfQZMhStcrC3pJxOQuU6148fP8bZUyfELJ2QvI49PnHyxHHcv3OLR0h2HTx4UOz+89iBvTxCSOHEesg5fewILly4wCMkr/H398exI4dxP5d63itbzhBt/ugovkTEmrErrpf2/Losunp6GD5uIjbsdsTaHXuw2m47VmzeKv7Pxhf9ux5tfu+QYwlocnKS+Nb9iePHhc85c3FRrnNuZ2eH0eZmuHbhHI+Q7Dh69CimTZyAi6dP8QiRpydPnsDC1AT/LrHmEZJdLLF3ffEcQQFff/GKEEIKG/bi57xlq/DQ5x227jv0Xc0esec8dYsXR/VatdHhz+7ibXf2P2uHlr1MmpMS4uMxfoQ5zEyMxSamcoJck1A2k2ymZXXUT37MvXv3sHv7Vjx56MwjRJ5YcxbxwvbKmtjKL2LDXsJpwVysWmSNZ5Tn5Ste7q64euUy/Pz8eIQQUtiw5zZZP++a+aSrTZbTsfNkTsmZa7iFDGtegW1UxYXaCskdMdFRCA0JydGdI89JjMbFjZOxfOM67LTdBE85vix67eJ5rLBZgmvXrvEIkTenHdsxwswEZ86c4RFCyLewhtyL6RYXuy0lBQ8loXKgXUQHG3fugYMTPQeXW/ZssRVvpV+8eJFHCrjkGHic3oB/9zxBAg/J041LF7BiyWJcvy7fDhdIhtiY6MJXcSIkm9ht58279mDFCvl0f0ryFkpC5YA19N2uQ0d06tyZR0hO83R9iWtXLuPdu3c8UrCF+N7Flg3XUbtZBR4hJDPWa0pUZISUIVLm81yJCQlSvp8xxMbESO2FhcXYz6SVSR8ShN8tDZsXNk/SyrAhOipK6iNdrOWRuNhYqWXSB/ZzaS2UpCQni79XWpm0IVJcftIkJMRL+X7GIGsZ5SbWD/k314eMyg974YS9cS2tDBvYcpP1Ukp8XJzUMumDzPUhrF92N0tamfQhfZtlV0HbC+fXlq1aieOkYKEklJC8Lj4Qh1fZILrdULQtX1h7pSKysMeADA0NxfYEG1U0kBhaVK+EWxfPi02tZB2cttlJLZM+WPTvjZDAAIlyYR8DMWJAH6ll0gcHu40S5dhw+/JFtKxhJLUMG3q3bwWvF88kyil9TsXMcZZSy6QPcyZYSZRjg8fzJ+jZpoXUMmxoXbsq7l67LLXszg1rpZZJH1hbjpEhnyTKaWmoi206ygt7iaVu3bqoVaeOxLRiI8Mx1nSw1PlLHzYuXyJRjg0Pbt1A+wa1pZZhQ9cWjfHy8QOpZRfPmCy1TPowZZQFPicmSJTz9XRD/47tpZZhQ1Oj8rh27vT/v68sDDkpJPgTjv+3P9PAXrCOjIjg38ggdtN987rE978cnrs85t/OjLVvfe74Uall2HDuxDGx4xtpnj1+JLVM+nBPWI/SKpus29Or589JLZM+vH8j/Tn192/e8E85h5JQQvK0BHies8NZVz30G9gTRTV4OI9jt/fHm5vAZu4s+Eu5Wh0fH4et69aI35E1HLDfxb+d2St3d8z5Z5zUMmyYNX4MPFxf8G9ndmS/k9Qy6YPtmlWIiYnh384Q+MEfKxbMkVomfbh/W3ozLyzOfv7w7h0eka8//vgDVlZWfEwSO30XU1dGaW11iUFb9euVGlUlBehrqkqU09dUE3729dMH+91Zy7FBV5gXcaZkECYJPQ3JabJB/RvTVFdWlFquuLrqVxOZtGWkIrWs9jcamk9bRmoS5aoblkXVKlX4t7KPdcqxb/9+7Nu7T2JaJbXUofaNZaMl/B1Zy7GBrQ8ZvUaK2PrQlbFs1L/RdiRbHyW1JJeN3jfWB1NMLWN+dYXv50QeamBggN9athR7Jpo2ZmSmYd3SRYgODhLWv1KmQSk5EXtsN0h8/8vhzOEDEuXY8N7bC9bTJ0stw4ZF06fA/7WX1LKnDu6TWiZ9sLfdCOWUJIlykUKFce2ShVLLpA/uTx5JlGODmxDPaXJtrH7q1KnYtn27eFuAdUX175YdaNX+d/7TDMvmz8WerbZ8TFKb9n9gzZbtYn+rX/L1foXJliPh9vI5j0iyWbcR/QZL9uF+/OABzBgv+0Bdo3YdYX63w6hadR5JEyXUhCaNHolbVy/ziCSTEaOwaNkKlPiOA/OPmDZtGlavXo2uf/XBAJO0nhLYfGZ9q47dRvJwe4mwkFAekcTaJzOqVo2PZQgLDRVvbcu6XcealKheu7Z4SyQrb08PBPj78zFJxUvooXqtOhLNUMRER4vTlHayT1dDmKa+lEZ8WX+73p6eQrKwAo/u3cWmTZswduxY/tMfw17CGT5iBIxq1oKdY95s5DvgwQFMn7UKDSY6YlLPWri4sAXGb3wJJVUNLLr0CQPq8i9m08Jpk7B353bMnz8f1tY/32SVi4sLli5dKjYvxtSoVQu7HJxQu04dcTwd2wYsTI1x/uxZHpE0TFg36zdJHidu3biB4ULZIBlXDIrr6QnTdMTvHTrySIaZ06bAbuNGPiapQ6fO4vwW083cC5enh4cwTRO8eP6MRyTZbt+BoSamfCzDXkcHWI0cwccg7tNTpkzhY/LBbm/K2ocZFRUVqV36sdusX2v/j7U/yMpm7duanTbY9L52G5rt99KaoPnWvLJpsWlmbfvwe6bJ/kY2zazzy8qwsl873eXUMmL/q6mp8WjO+N5lw+Yzq59dHwwrJ+3RiXSylk121oc8sfm4c+cOVqxYgcQsraRUNjLCrJkzUb58eR5Jw85by5Ytw8OHD3lE0l9//SW1YsiaBVy+fDnCw8N5JDNdIeeZKUyzQYMGPJJho3CuO31KdnONzZs3F8tqamrySBrWGgebpq+vL49IYuV+/10yVzsrHJ/Xr18vfj4lTDsntmO5JqE+Pj6YPn26eAJit4jsnfaiY6dO/KcZZkybig3r1vExSR2FE4G9k5PE2+aeQtJjZmyMZ0+f8oikLdu2w8zcnI9lcHJ0xEgLyXi6uvXqidOsKSQkX2Ibi6nxUFz6SoPDVuPG4d+166AiJKCsFwR52bFjh7jxsOXK1KpbF5t3OaBa9cyJcoSQKFtZmOH6Jdkv6ViMGYvFK1bxsQy3rl0Vyg5DaIj0V631S5YSHwpv1Vayv+uZkybCUUhcZOnQ9U/Y7rKHdpZbUh5ubsI0TeEp/C8Lm2bv/gP4WAbHXTsw858JfAzZSkLDwsLw3M0dsYqqqFqjJo/mJe+xstNfuFPRGFvXj0NpTRWcX5C3k1Dm0aNHuH//vviZ7cNdunSBnpAYfokd8NlLZV9rrqi2UBGRdmBkDUyzBsBZN4bSqKuro3PnzhInD+bWrVt49kx2IsnKsLLsd3wpVKissfn9Wv/VHTp0EI4fktuRu7s7rly5wseAVq1aoWHDhnyMEEIKL7l328kO1tHR0WINiJ14NDQk7x+yk39UVBQfk8ROAKxs1loQqzmxk8DXam3spJc16WHYPLF5k4XVukqUKCH+/yVWU2LT/NobrWx6WRNmeYiLi8OWLVtgb28vjlerVg02y5ajUqVK4ni6qOgozBZqMnfv3uURSYMHD8bUadP5WIYHzs6YPXuWuE6kYevBRqj1NWnSlEcyLLNZisOHD/MxSa3btBFrjJqama/c+vh4Y9asWfDxlt2zlo3NMnTp2pWPZThy5DBsli7lY2k1uEGDfr4f5TzbbWdKPB7uGg2Llc8wdOYS9GpmKN4yvGNnghUHfKCorAarrddQM+YgDt+qDOutFiiTVvKnyDMJJYQQQr6H3JNQQvKTPJuERrljldkwbLv+7b6Sa7RZDLsTk1COj/+MXbYbcf38GYwwN4eFhQWPEkIIITmHklBSqOXdK6FxCPD1xafIOB5Ic2+bOVYffC1eCbXcfBEdjQCNIgaoULU0VPl3fgZ7C1Q9JRHl9ItDR0eHRwkhhJCcQ0koKdTybBIqQ049E8roqatAVyM7qSwhhBDy/eT3Kjch+Qyrf7FnfvNFPUyYx8+R7vB5lNZuHXsj1eX+I8SxuBghhBBC8hdKQkmhxZrLMDc1xpql+eBFnOQI3D56FF669dGxWw907NIZES6HcfflB0pCCSGE5Et0O54UWmfOnEGPHj1Qt2EjHL0ivaHxwoRuxxNCCMlNdCWUEIKI8DC8f/9ObHOWEEIIyQ2UhBJCcHivI0aamX613VdCCCFEnigJJYTgnZ8vnO/dxdu3b3mEEEIIyVmUhBJCCCGEkFxHSSghhBBCCMl19HY8KbRkvR3P2g597HwfAf7veESSgWEFNG7ego9lCA0OhsuD+4iNjeGRzJSVVcRypcqU5ZEMHq4v4eUuu5vOEvol0Ugoq66uwSNpYmKi4SLMb1hoCI9IqtOgESpXqcrHMvi/eyfM7z3xmdC7169R3/GEEEJyDSWhpNB6/PgxltrYoFzFSphlvYRHgaSkJIwxN8XZE8d5RFLv/gNgu9uej2V4JCSDVuZmeP9O+rOVWtpFYLd7Dzp27cYjGVYuWYR1K5bxMUkt27aF3S4H6JcqxSNp3vr6YoyFGZ48esgjkhavWoPho634WIaTRw9jrMUwsfF7hpJQQgghuYWSUFJosSueycnJUFBQgLKyMo9CiKXAxmYpbt26xSOSfv/9d8yePZuPZXB1c8MyIbENCgrikcw0NTUxa9YstGgheRXV3t4eTk5OfExSgwYNMEuYZnFdXR5JExAQIMyvDTw8PHhE0tixY9G7d28+luHGjRtiWbYsGBMTE5iZmYmfCSGEkJxESSghhBBCCMl19GISIYQQQgjJdZSEEkIIIYSQXEdJKCGEEEIIyXWUhBJCCCGEkFxHSSghhBBCCMl1lIQSQgghhJBcR0koIYQQQgjJdZSEEkIIIYSQXEdJKCGEEEIIyXWUhBJCCCGEkFxHSSghhBBCCMl1lIQSQgghhJBcBvwPa65LtwNy0mUAAAAASUVORK5CYII=[/img][br]Qual deles é[b] Inteiro[/b]?

Observe os números a seguir e determine quais pertencem aos conjuntos numéricos citados em[br]cada 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[/img][br]Qual deles é[b] Inteiro, mas não pertence aos Naturais[/b]?

Observe os números a seguir e determine quais pertencem aos conjuntos numéricos citados em[br]cada item:[br][img]data:image/png;base64,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[/img][br]Qual deles é[b] racional[/b]?