[b]Que equação mostra uma relação de proporcionalidade inversa?[/b]Seleciona a opção correta.Seleciona a opção correta.

Numa loja de plantas, os vasos de catos têm um custo de acordo com a seguinte tabela de preços:[br] 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[/img][justify]Qual das seguintes afirmações é verdadeira?[/justify]

A Ana decidiu resolver uma ficha de trabalho com vários exercícios de Matemática. Para planear o seu trabalho, elaborou a tabela seguinte.[br][img]data:image/png;base64,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[/img][br][br]Indica o tipo de proporcionalidade existente entre o número de dias que a Ana demora a resolver os exercícios e o número de exercícios resolvidos por dia. No contexto do problema diz o que representa a respetiva constante de proporcionalidade.[br]

Qual das seguintes expressões relaciona o número de dias ( [i]d [/i]) que a Ana demora a resolver os exercícios e o número de exercícios resolvidos por dia ( [i]e[/i] )?

Para um certo número real [i]a[/i], a tabela seguinte traduz uma relação de proporcionalidade inversa entre as grandezas [i]x[/i] e [i]y[/i].[br][table][tr][td][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAANcAAABLCAYAAADj2RKNAAAYfmlDQ1BJQ0MgUHJvZmlsZQAAWIWVeQdUVMuydu/JM+QZcs4ZJOecc84gAkMakjBEAUUQUYIiiICgqIhEFRUFVARBDChK8ICIiCASVBRQQSXI2wQ95577r/+t12v17m+qq6uqq0Pt2gMA14hvZGQYghGA8IgYqoOpAb+buwc/dgogACtAAnog4kuOjtS3s7MCcPnd/mdZGgTQRvtcZkPWf/f/fwvRPyCaDADkBWM//2hyOIzvAoA6RY6kxgCA2aALxcdEbuD9MGamwgbCuGADB23h6g3st4VbNnmcHAxh3AsAjtbXlxoEAP0ITOePIwfBcuhX4T5ihD8lAgAWeOYYHXKwrz8AXHYwj3R4+O4NnAxjcZg/EsYVMFbz+4fMoP+Q7/dHvq9v0B+8Na/NgjOiREeG+e75P7rmfy/hYbG/dYjClTaYauawMX/Yh0Ohuy03MC2MZyP8bGw3fA3jHxT/Lb8DgCAEx5o5b/EjuMnRhrD/4FUHCDl/XyNLGHPD2CQizMZqm+4XSDExhzHsM0QCJcbcCcbsMD4cEG3suM1zlrrbYVsXojGQaqi/TX/kS93Uu6FrNDbUWX9b/pfgAPNt+Uj6xGAnVxgTYCwcR3GxgTE9jGWjQx0tt3m0EoMNbX7zUGMdNuwXhrFDQISpwZZ8ZFwg1cRhmz8rPPr3fJFngynmNtv4Wkywk9mWf5CdZN9N++G5IHsDIvSdf8sJiHaz+j0X/wAj4625I2cCIpwdt+X8iIwxcNgaiyJEhtlt86MEA8JMN+iCMFaKjnPcHotyiYE355Z8VGBkjJ3Tlp2oxBBfC7ste1DHgBUwBEaAH8TC1Q/sBiGA8my2aRb+tdVjAnwBFQSBACCzTfk9wnWzJwJ+OoJE8AlGASD6zziDzd4AEAfT1/5Qt54yIHCzN25zRCiYgnE4sARh8O/YzVERf7S5gHcwhfJf2n3hSobtDYPrRv//m/6b+jdFH6ZYbVNif2vkZ/jNiTHGGGHMMCYYCRQnSgelibKCn3pwVUCpodR/z+NvfvQUug/9Fj2AHkO/3EVJo/7LSmswBss32faF3z99gRKFZSqjDFDasHRYMooVxQlkUEqwHn2ULqxZGaYabtu94RX+f8n+jxn8YzW2+fByeASeDa+HF//3SHpJeuU/UjZ8/U//bNnq98ffhn96/q3f8B/e94dby39zIg8jG5APke3ILmQLsgnwI9uQzchu5J0N/Gd3vdvcXb+1OWzaEwrLofyXPt9tnRuejJark3svt7rVFxOQELNx8Ax3R+6hUoKCY/j14egQwG8eQZaV5leQU1AAYCPWbF1fXx02YwjE2vM3jXwQANV5APDLf9PCvwJwBT77/NZ/00S84eOHAaB6ihxLjduioTYeaPiWYIBPGgfgBUJAHJ6PAlABmkAPGAMLYAucgDvwhr0cDO9zKogHySAVZIBscAycACXgDDgPqsElcA00gRbQDh6AJ6AXDIBX8O6ZBB/BPFgCKxAEYSE6iARxQHyQCCQFKUBqkA5kDFlBDpA75AMFQRFQLJQMHYCyoXyoBDoH1UBXoZtQO9QF9UEvoXHoPfQFWkYgEbQIZgQPQhSxA6GG0EdYIpwQOxFBiChEIiIdcRRRjChHXEQ0ItoRTxADiDHER8QiEiBpkKxIAaQMUg1piLRFeiADkVTkPmQWshBZjryMvAWv83PkGHIW+ROFQZFQ/CgZeAeboZxRZFQUah8qB1WCqkY1ojpRz1HjqHnULzQdmhsthdZAm6Pd0EHoeHQGuhBdib6Bvg+fpUn0EgaDYcWIYVThs+iOCcEkYXIwpzH1mLuYPswEZhGLxXJgpbDaWFusLzYGm4E9ib2IbcP2YyexP3A0OD6cAs4E54GLwKXhCnG1uFZcP24at4JnxIvgNfC2eH/8HnwuvgJ/C9+Dn8SvEJgIYgRtghMhhJBKKCZcJtwnjBC+0tDQCNKo09jTUGj20xTTXKF5RDNO85OWSCtJa0jrRRtLe5S2ivYu7Uvar3R0dKJ0enQedDF0R+lq6O7RjdL9oCfRy9Kb0/vTp9CX0jfS99N/ZsAziDDoM3gzJDIUMjQw9DDMMuIZRRkNGX0Z9zGWMt5kfMG4yERikmeyZQpnymGqZepimiFiiaJEY6I/MZ14nniPOEFCkoRIhiQy6QCpgnSfNMmMYRZjNmcOYc5mvsT8jHmehciixOLCksBSynKHZYwVySrKas4axprLeo11kHWZjYdNny2ALZPtMls/23d2LnY99gD2LPZ69gH2ZQ5+DmOOUI48jiaO15woTklOe854zjLO+5yzXMxcmlxkriyua1zD3AhuSW4H7iTu89zd3Is8vDymPJE8J3nu8czysvLq8YbwFvC28r7nI/Hp8FH4Cvja+D7ws/Dr84fxF/N38s8LcAuYCcQKnBN4JrAiKCboLJgmWC/4WoggpCYUKFQg1CE0L8wnbC2cLFwnPCyCF1ETCRYpEnko8l1UTNRV9JBok+iMGLuYuViiWJ3YiDiduK54lHi5+F8SGAk1iVCJ0xK9kghJZclgyVLJHimElIoUReq0VJ80WlpdOkK6XPqFDK2MvkycTJ3MuCyrrJVsmmyT7Ocdwjs8duTteLjjl5yyXJhchdwreaK8hXya/C35LwqSCmSFUoW/FOkUTRRTFJsVF5SklAKUypSGlEnK1sqHlDuU11RUVagql1Xeqwqr+qieUn2hxqxmp5aj9kgdrW6gnqLeov5TQ0UjRuOaxpymjGaoZq3mjJaYVoBWhdaEtqC2r/Y57TEdfh0fnbM6Y7oCur665bpv9YT0/PUq9ab1JfRD9C/qfzaQM6Aa3DD4bqhhuNfwrhHSyNQoy+iZMdHY2bjEeNRE0CTIpM5k3lTZNMn0rhnazNIsz+yFOY852bzGfN5C1WKvRaclraWjZYnlWytJK6rVLWuEtYX1cesRGxGbCJsmW2Brbnvc9rWdmF2U3W17jL2dfan9lIO8Q7LDQ0eS4y7HWsclJwOnXKdXzuLOsc4dLgwuXi41Lt9djVzzXcfcdrjtdXvizulOcW/2wHq4eFR6LHoae57wnPRS9srwGtwptjNhZ5c3p3eY951dDLt8dzX4oH1cfWp9Vn1tfct9F/3M/U75zZMNyUXkj/56/gX+7wO0A/IDpgO1A/MDZ4K0g44HvQ/WDS4MnqUYUkooCyFmIWdCvofahlaFroe5htWH48J9wm9GECNCIzp38+5O2N0XKRWZETkWpRF1ImqeakmtjIaid0Y3xzDDL/XdseKxB2PH43TiSuN+xLvENyQwJUQkdO+R3JO5ZzrRJPFCEiqJnNSRLJCcmjy+V3/vuX3QPr99HSlCKekpk/tN91enElJDU5+myaXlp3074HrgVjpP+v70iYOmB+sy6DOoGS8OaR46cxh1mHL4WaZi5snMX1n+WY+z5bILs1dzyDmPj8gfKT6yfjTw6LNcldyyY5hjEccG83TzqvOZ8hPzJ45bH28s4C/IKvh2YteJrkKlwjNFhKLYorFiq+Lmk8Inj51cLQkuGSg1KK0/xX0q89T30/6n+8v0yi6f4TmTfWb5LOXs0DnTc43louWF5zHn485PVbhUPLygdqGmkrMyu3KtKqJqrNqhurNGtaamlrs2tw5RF1v3/qLXxd5LRpeaL8tcPlfPWp99BVyJvfLhqs/VwWuW1zoa1BouXxe5fuoG6UZWI9S4p3G+KbhprNm9ue+mxc2OW5q3btyWvV3VItBSeoflTm4roTW9db0tsW3xbuTd2fag9omOXR2v7rnd+6vTvvPZfcv7jx6YPLj3UP9h2yPtRy1dGl03H6s9bnqi8qSxW7n7xlPlpzeeqTxr7FHtae5V773Vp9XX2q/b3/7c6PmDv8z/ejJgM9A36Dw49MLrxdiQ/9DMy7CXC8Nxwyuv9o+gR7JeM74uHOUeLX8j8aZ+TGXszrjRePdbx7evJsgTH99Fv1udTJ+imyqc5puumVGYaXlv8r73g+eHyY+RH1dmMz4xfTr1Wfzz9Tm9ue55t/nJBerC+pecrxxfq74pfetYtFscXQpfWvme9YPjR/VPtZ8Pl12Xp1fiV7GrxWsSa7d+Wf4aWQ9fX4/0pfpuvgog4YoIDATgSxUAdO4AkOC8jeC5lQtuFyT88oGAWxdIFvqISIcjag8qA22CQWKeYItxEXgrggQNlmaWtp+uib6KoZKxnqmZ2EF6wtzLMsT6hm2G/SPHAucy1xoPghfLR+CnEyAKEoVYhdlF2ETZxbjFeST4JfmlBKWFZURlxXZIy8nJKyqoKGoo6Sobq5irmquZqJtomGgaaulra+lo6CrpyeqLGvAYMhsRjNaNv5pMmb406zZvsai2PG6VYh1i42ZrbKdsL+bA5cjohHNGukCuCDeUO96D0ZPDS3injLfELmEfPl9OPxYyyZ8YQApkDeIKFqRIh6iGmoS5hFMiknfnR1ZEnaUWR+fF5MRmxmXFH00o3lOd2Jr0ai/YJ52ya//J1FcHBNN3H2w/hDkslKmQZZDtmBN4JPFoXm71sbt5w/mLBUwnZAotigKLD5wsK7lZ2n/q3enFM9izHOcky7XO21b4XYipPFhVWF1dc7P2cd3wxQ+XftbjrrBdFb+m2+B+PepGZuPppvrmtptdt3pu97Y8udPRerWt9G5K+64OjXvEe1OdN+/XPjj1MPtRQpffY/Mnst303bNP7z871RPZa9BH6pvov/Y89S/7AZFB1OD7F91D9S/zh2NeuYyoveZ8vTo6+qZ97MJ45tvdE87vtCaF4V22NP3XzPX3RR9SPobNkj+RP0fOZc/fWJj7qvft3BLpe/FPqeVnqym/NNbX/7H+CsgZVD7aEsOCeY1twOXggwhGNJK0DLSrdNP0QwxDjG+Y3hE/kb4yL7Gssa6wrbH/4ljjXOL6yj3HM8U7wtfPf1/gpmClULZwmIiVqKQYXuyDeJdEjWSWFEXaUkZGlk52bkef3HX5IoVkRbKSvbKBioKqgBpRbV39s8aIZpdWo3a5To5uvJ6PvoWBgiGnEcLovfEzkyumeWbR5k4WKpZslitWb6zv2dTa5tkl2Qc6ODrqO8k7C7iQXLGuy24f3Uc8uj3veNXvPOt9fNchn2Rfqh+F7OvvEeAUaB9kE2xJsQwxC9UMkw0XiGDZTROJiFyN+kH9Gb0Wi44jxgslaOxxSoxOKkxu2TuVQrOfL1UmTfuATbrfwfiMI4cqD7dlDmd9z2E+onDUPjfi2JG8uvxHx98VrBdyFikX250MLTlYeuZU8+nespkzv84xl0uc166wu0CujK06VF0M33PddXOXiJcV6x2vRF3NvVbX0Hl95MaXJkwzx03JWxq3LVrc7gS2xrSl3E1tP9Bx8F5G56H7hx9kPcx5dKTryOMjT4505zzNfpbZc6g3vS+1f+/zuL+iBnYPRr6IGUp6eXD4+KvykYbXD0Zfvvk0Dt4SJwTfyU/qTJlP+82cff/po/Js0qfWz7/mNRfivlz++m6Rfcnye8qPhp/TK9yrDmtZvzq3198YoY/cgfyMakcfwjhixbELuJv4DIIDDTfNKO15unB6dQYEQztjOpMFkYHYSzrGbMvCwPKUNYvNhB1ib+aI4BTiHOLK5tbh/sRTymvG+42vjN+M/7NAgaCG4IjQXmF+4VYRb5FV0WIxJbFu8QDxVYnjklKSbVKOUlPSqTIiMkOyOTsMdnyTq5L3VKBTaFOMVBJQ6ldOU1FQGVfNVdNW+6ReqmGusah5Xste65d2nY67Llb3hh5Zn6h/1yDSkN+w1yjNWMl42qTE1BZ+77htHmUhZfHOsszKw5rV+rlNvq2DHclu0P6kg7ejsOMHp6vOiS7Grgyuw26V7tEeBp60noNeZ3YGeyt4r+y675Pn6+Un4bdE7vQ/HuAbqBiEChoMrqWkhDiFSoehw96E34oo3h0f6RqlQeWNRkXPxgzEtsfVx5cl5O5JTYxPCk3237tzn1uK036HVPs0+wMO6U4H3TN2Hgo4HJoZnZWSfTgn/0jZ0ZrcxmP38vryR49/PoEqlCjyKj528n7JyinZ035lJ848PrtarnA+oKLkQk8VqlqrJr62vu7jJcnLIfW1V+auqTTsv97dyNEU1tx5i+92SsvbVqu2lnb5joudUvevPjR4NPw4oZvvaW/PkT6n56IDYPDj0LvhD6/BG5HxXRO1U+iZxI/gU8U8+avuktpP59XijfXf+ia4UTAqAJw4BMDGdx6HGgByLgIgtgcANjj3tKMDwEkdIARMAbTYASAL7T/xA4ITTwIgAR4gCdSAGZxfhsE5ZRGoB11gAqxB7JAy5AhFQyegZug1nPNJI1wQqYh6xCiSAWmAjEdeQk7BWZoXqhT1Cs7EfNAX0J8wKphUzDMsDzYc24Yj4Si4djwnPhbfT1AkFBFWacg0T2nVaavp2Oly6BH0SfTfGWIZlhgTmSCmLCIrsYKkRuplDmHBslxgNWadYjvMLsXeyxHDycHZyuXPTcN9jceDF8l7ic8Tzgj6BHIFbYWYhJ4LF4l4igqIToldFI+W0JCEJLuk8qQ94d05L9u/o0WuUj5fYZ8iRclRWUOFTxVSHVNrUS/QCNHU1qLXGtGu0YnR1dXD6fXpNxhcN2wyumXcanLPtMusx3zQYtRy2mrBesUWZ8dqL+qg5mjlRHZOdil2bXWb8SB56ntF7iz3HvAh+Or7JZGb/b8HqgUlBbeHEEKdwyrCF3ebRZZFzUVrxWTHjsYrJRzbs5Dkmvxgn3ZKa6pl2kR6Zob2YZDZl33lyKnc/Dyz48iC+4V5xQElhqekywTPipQrVdhURlWX1j65BOpVr9o0uN8Ibkq+eeL2tTv9bUsdvJ1mD2IenX38rHutR6Zv5/OjA3eHSMPkkUujs+PcE2qTetPy7+k/vJg9+nnHXPuC2ZfObwqLJUvLP+x/XlheWNVYS/l1d/P+2Fp/Irz+EkAVmABXEAL2gQJQBzrBKPgBkSA5yAaKgI5BDdBLBEBIwFl+GuIq4i2cx1sh05FtyBWUNuoAqhvNjg5EN2LwGG9MI5YRG4Z9gpPG5eIW8V74BwRZQhENkiaKZpzWmfYxnSFdK70W/R04i33EaM84Cuep68QCkizpKXMEnHk2s/qy0bA1swdysHI85NzDJc01zl3EY8uL4+3g289vIIAReCpYKOQrLCu8KtItWiYWJW4swSXxRfKx1HnpFBlPWc0dEnLs8nj5VYU5xQmlF8qPVW6rXlQrUT+kQdX01DLUltRh1FnUHdZr1a83uGrYYNRkfNukzbTT7LF5r8ULyzdW09YLNit2OHtWBzFHdSdrZ3+Xva4lbjfdhz3WvAR3WnjH7Drr0+MHkVX8IwJqAqeCRSkhIVdDl8NNIwp3z0RpUfdGt8Wi4qziixKmEtWTjiZP7zNOqU6lT9tzYBq+T3oPW2Q+zDbL6T7qkDuWl3Kct+BuYWAx/cnmUv/TpLIHZ/eWq5z/cuFqVWyNVh3m4sDlC1eSr3ldV2mkb5q4ef32gTs2bex3xztqOqkPtB5huwaf1Dzd3+PVp/NcZIBp8NGQ88vJV4mvmUevjTmNr05UT7pPM8x0fTg8a/mZce7FwtmvIYsq3xE/epZLV4N+KW6vPxJgAO3mDSAOVOAd4AbCwUFwBtwGw/D5F4QsoFioAhpE0CCM4JPfgcQh7ZFnkF9QFqgqNB5NRb/BOMGn3QY7gCPjfuILCeqESZqTtHq0I3RJ9Pz0XQzxjJKME0xniH4kCdJ35ocsZaxJbJ7sehxSnOxcNNwI7lWeZd5VfiCAhd9AeYRlRbRFHcSCxPdLnJS8Aefd87KMOxTkXOX3KVQo9iitqEiouqvlq/drMmu5a1fozOlp6x8xeGOkaJxtMm6mZV5o8cXKzvqSLa1dmP1jR0mnbOcPrhZutR54T4rXQ2/RXQd9Jv0MyZUByED/oHsU0ZCM0Jlwq4j6SJaoBOpYjFHs5Xj2hH17Pia5wedUJaUqlSPtaDrqYHLGl8MemVez1nOcjlQdXT7mmHf5OKGAcuJBkVRxzsm5UtdTd8pEz+TBd7//+e4LmpVV1Uw1ibVTFx0vtdSLXsm9utTgff1Bo0zTseb5W/a3L98htAa2tbYTOwLuNd5HPbB7WPpo4rHEE0p35dPxHs5e+76D/defvx0gDMq9cBiivjw6XPPq3sjA66nRhTer49Bb7ATmHWYSTC5PfZoenXn6vvlD+cfDsxGfrD9LzWHn3sw3L2R+8fgq8fXLt5bFtCWj75jvnT9Sfmr+XFi+sOKxSlhtXCP/ovt1bd19Y/2jAxUVNsMHRGsAAHp0ff2rKADYfADW8tbXV8rX19fOw8nGCAB3w7b+Z9qMNYwAnOXaQH1XZsngX2XrP6h/5DH/bsFmJNrUCkeizRaOSuB/ABpY5I1Dn1Q0AAAAVmVYSWZNTQAqAAAACAABh2kABAAAAAEAAAAaAAAAAAADkoYABwAAABIAAABEoAIABAAAAAEAAADXoAMABAAAAAEAAABLAAAAAEFTQ0lJAAAAU2NyZWVuc2hvdLB958sAAAHVaVRYdFhNTDpjb20uYWRvYmUueG1wAAAAAAA8eDp4bXBtZXRhIHhtbG5zOng9ImFkb2JlOm5zOm1ldGEvIiB4OnhtcHRrPSJYTVAgQ29yZSA2LjAuMCI+CiAgIDxyZGY6UkRGIHhtbG5zOnJkZj0iaHR0cDovL3d3dy53My5vcmcvMTk5OS8wMi8yMi1yZGYtc3ludGF4LW5zIyI+CiAgICAgIDxyZGY6RGVzY3JpcHRpb24gcmRmOmFib3V0PSIiCiAgICAgICAgICAgIHhtbG5zOmV4aWY9Imh0dHA6Ly9ucy5hZG9iZS5jb20vZXhpZi8xLjAvIj4KICAgICAgICAgPGV4aWY6UGl4ZWxZRGltZW5zaW9uPjc1PC9leGlmOlBpeGVsWURpbWVuc2lvbj4KICAgICAgICAgPGV4aWY6UGl4ZWxYRGltZW5zaW9uPjIxNTwvZXhpZjpQaXhlbFhEaW1lbnNpb24+CiAgICAgICAgIDxleGlmOlVzZXJDb21tZW50PlNjcmVlbnNob3Q8L2V4aWY6VXNlckNvbW1lbnQ+CiAgICAgIDwvcmRmOkRlc2NyaXB0aW9uPgogICA8L3JkZjpSREY+CjwveDp4bXBtZXRhPgqGOshHAAAMEklEQVR4Ae2dV28USxOGi3TI2eRgggkim2iySSbnILAAiSQkbpDgCq4Q4hcgBIjkG5DIYLggSBZYIKKFCAYMiJxzzuF8PGWN5c9rw/rgnRl2qqXx7s6Op7ffqbequru6q9i/P4tYMQQMgSJHoGTeO3758kU4vn//nvcr+2wIGAIFIFCiRAkpW7as8OqUEHLdvXtXrl27JmbQsiFCyXz+/FmBK1asmINboF8/ffqkQlSqVKlA4+A0/sePHwIWHTt2lOrVq4sjJyHkOnv2rNy6dUsvdP45yK8vXryQgwcPyrhx4+Sff/4JMhQ5bc/MzJTSpUtL27Ztc84F+c3r168lKytLqlSpokfJktm0CiEXDGzcuLEkJCQEGa+ctj958kQuX74s3bp1U4HK+SLAb96/f69YmIxkC8Hz58/l69evIRIRQi5MGgTDf7QiUqZMGcWDVw4rohYcLExGsqXBkZG8slE87wn7bAgYAkWDgJGraHC0uxgCIQgYuUIgsROGQNEgYOQqGhztLoZACAJGrhBI7IQhUDQIhIwWFs1t7S5/gsDbt2/l9u3bcvHiRYmJiZEOHTpI1apVpXjxbF347ds3nR74+PGjVlOrVi2JjY39kyp9/b9M0jLfeP78eXn16pU0a9ZM4uLickYrwePevXs6PwteTZs21ZFdZzLXq8b5ilyAyOz/s2fPhIk4gPrw4YMwr1KuXDkVMK+AcqteCAOpUlNTtd1M6A8cOFAnsevXr6/zKffv35dVq1bJmzdvFJcRI0ZELbmQCWRg9+7dGjn08OFDlY0JEybI0KFDNRqCwIczZ85InTp1lGDMS44aNcrzeUlfuYUACXhbt26VlStXCkIEaOvXr1fN5JaAe1kPigSrlZSUJHPmzJH4+HjZvHmzEBVB4fu0tDTVzoMGDZLhw4dLq1atvPzJEa2b8DNkAqU7efJkmTZtmmKwYsUKPQfx1q1bp5aqV69e0rVrV0lJSZFHjx4JFs3L4ivLBRBMTDZq1EiWLFmi7hCz3w0bNsxxibwEy626e/ToIQ0aNBCUTeXKleXAgQPqFhHviVt0+PBhmThxonTq1Elj2QhFitYCBrjDs2fPVksE2XABHcv9+PFjDT3CiuE6gw/XHz16VEaOHCmVKlXyDBpfWS5cQUw7WrtJkyaSkZEh/fv3l+nTp0e1ds799An8xP1zCtEyNWrUkGrVqulqBaw5gdVgkpycLOnp6Z5raOe3RuIVxYEsEAVBHwrioIDr1asn5cuX174nGFWsWFGr5z0Y0j9z+qSR+F3h3NNX5OIHAyAka968ub4HLAD1unMaDphFcQ3tdNqKW3Pq1CnBkuH6EThM5PW2bdvUmtWsWVPWrl0rp0+fLoqqfXsPBw9+ILGeDPhMmTJF5eTly5caoe8EVXMtMoMF83rZlO/IhUABDOtibt68KYAHSLgHQSq0GSG6dOmSjB07ViASgoPWxrLRF1u0aJFq9BMnTgQCGjC5cuWKLofq06eP4pFX8eI6c13udVVegeMbchFVfOvnyBiuINp6wIABQn+LjnzQ1pchIBDryJEj2q/CBcodNAzJ0NStW7dWC09nP9oLmCAfDx48EIjF9AM4oHQgEwt8KShhBjn4HgvmZfENuQAI92bjxo2qnVnigYbGd3Y6tV4C5VbdzqAF7UZIunTpou1nzRB9CITIWd4ALggXfZJoLsgGi3j37dsnLVq0kNq1a6vyQQHRfaDwHjzABs+HuUGvo/Z9M1qIluncubMSilc+L1iwQDutkAwtFYSCFTp27JgOVDCYc+7cOYFYtB+BYQ4QbMAEy85oIqOG0VogDPN59C1ZZ/j06VMdOeUcigXlgwXnPHiAFVaefipzo14W35ALH7nRzyF4DodIbdq0UWycz14C5VbdFy5ckL1792rfAheZAjbz5s3T93y3fft2SUxMVK09bNgwFTr9Mgr/vHv3Tgdv6CowvO7IAspl6dKlqmjmz58vu3btUgLSB1u8ePH/RbR4BYtvyAUADnAOGHk/O+ej+ZWl88uWLdN9O5x2ggPzNfSzEKQZM2aoy8NntDMCFa2F4XYiUOhn4TI7BevthITVrVtXZs2apS4higjL5YcBDV+RywEuyK/0E37VV4BQ7NUQlAJJKlSooEdBbQYTDr+V6FV5fkPafk/gEDByBe6RW4PdQsDI5RbSVk/gEDByBe6RW4PdQsDI5RbSVk/gEDByBe6RW4PdQsDI5RbSVk/gEDByBe6RW4PdQsDI5RbSVk/gEDByBe6RW4PdQsDI5RbSVk/gEAiJLWTNEDvnEIFsRXRtECuijx8/7vniO788j6tXr2oQbRADq/N7Bqwlu3HjhhBAnLuEkAvA2FEHgbIius0Ai+/Ag0hsKyLXr1/XDWFMRrKlgbVlyEjeEkIudtthUd6QIUPyXhvIz2yIwj4efthk0i8PgJ2WiNxnQaIV0UWa+e1jYn0ukw5DIEIIGLkiBKzd1hAwcpkMGAIRQsDIFSFg7baGgJHLZMAQiBACRq4IAWu3NQSMXCYDhkCEEDByRQhYu60hYOQyGTAEIoRASIRGhOqx2/4BAmyGScI3YvrYN50NQglTYwNRr7ds/oNm/fZfnX3fyWzCxqctW7bU7bvD3fCTXGZscU0iC3J2uV3McrmN+H+oD+E6/DOb5OfPnzXR3erVqzW1K0SL1sIe8WQ1IWUtsXvskb9z505VMrl33s2v/Xzv5FHetGmT7i2f33WRPucrciEsBECSMghgESYOMlwEMUgUISGxwJYtWzQhBbF8ZKrPysrSzCZ+3GW2qATWSaGEte7Xr58kJiYK8XsnT578bcZI5Iik7aRgcvIpF9XvKsx9fEUu3ABC99esWSPLly/XgFm0FokHNmzYUJh2RcW1TmZJtDapctg3nYTjBFdDsmgmFwqVZPOkDCJIGFeYJR2cI5i6oOIo6EOHDmnWHLLAeFV8RS420AdMIvLv3Lmj2drxlcla37t3b68w8qxelA1ZTchQj2C9ePFC19nR94Bg0bye6vbt25oWiBzZTqHvhCVivWFBBUtPxpPBgwdrHmkvMfIVuQCMNVMkN2OZB5obDYamQsCCVuh3kLbVETBydaGRycfFotZo7nNBEtpHEganoFDIX4b1zq+QbgiljJWLi4vz3LL7brSQZOMxMTHa90JLMTKEpnaytecHarSeQ+siXFgvsGARK8LlLM7z0uWJNOa0PW++Y5QtJT9rhCKiS5GamiokDWSkEEvPgVsNZpDOzeI7cgEoPjYkwzUgLxOuYbjDr26CF+m6sOJTp05V6wUmCQkJWmWzZs0052805+XimdOnzG2lIAj9zvxSKDH4g5eD5UpLS1OcSH2LBdy/f780aNDAyIUrQN5f0nG2a9dOatSoof2LSAuyH++PcI0ePVqSkpIUA8gUHx+vQhftWw7ExsZqWlbIAnE4sN4NGzZUzwbSMbKMfDhY4OGMGTMm51Ey0owr3b59e09kyDeWC3eHDjwH8zoLFy7Uyb9oHhHLkYJfvEFwHOHhstzvf/Fvf/1XWBpyY6enp6tLh8JlIGPSpEmaUfLs2bOyY8cOmTt3rqatRU4YQeVwCgREriAX93O7+IZcgEhnHWvVq1cvJVYQXUG3BcCv9RF50rdvX2G+i2Tj9LfGjx8vPXv2VCtGgvEHDx7Inj17ZObMmflGYOBaYgFxqb0oviEXo4GYdfLcAoYRywtx8FedNWvWlOTkZPVmcAuRC0YMKShgpm6wTAV5N927d9d+akHfR7q1viEXI18c0dxJj/TDjLb753WJnfZhxQhvgly4jgVZptzD+M7/uvnqG3IZqdx87H9/XUzNELiMp+NX2fENuf7+x20tcAsBpmkgld+L7yI0/A6Y/T5DIFwEjFzhImXXGQKFRMDIVUjA7HJDIFwEjFzhImXXGQKFRMDIVUjA7HJDIFwEjFzhImXXGQKFRMDIVUjA7HJDIFwEjFzhImXXGQKFRMDIVUjA7HJDIFwEQiI0iNPKyMjQRWfh3iSaryMwlHVEKSkpvg2zcRt/ln4QDJuZmel21b6sj+UwHCxtyb1KutjPaON/c/9i9qsgnJ+FZlYMAUMgPAQwSqwZY6W0Q7AQcoV3K7vKEDAEfoeA9bl+h5B9bwj8RwT+B6yE2qS6hV66AAAAAElFTkSuQmCC[/img][/td][td]Determina o valor de [i]a[/i].[br]Apresenta o resultado na forma de dízima.[br]Mostra como chegaste à tua resposta.[br][/td][/tr][/table]

Na figura, está representada, num referencial ortogonal de origem [i]O[/i], uma função de proporcionalidade inversa [i]f[/i].[br][table][tr][td][img]data:image/png;base64,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[/img][/td][td]Sabe-se que o ponto de coordenadas (5,6) pertence ao gráfico da função [i]f.[/i][br]Determina o valor de [i]f(3)[/i].[br]Mostra como chegaste à tua resposta.[/td][/tr][/table]