Helicopteros Radio Control - RC - Radiocontrol

Alguien usa resistencias o entiende este sistema para explicármelo, se que con bombillas de coche se puede hacer pero ni idea de cuantas y si hay que calcular algo.
http://www.youtube.com/v/EyTzRp2g5Iw (http://www.youtube.com/v/EyTzRp2g5Iw)

http://www.youtube.com/watch?v=k6bX9DwgLr0 (http://www.youtube.com/watch?v=k6bX9DwgLr0)

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hson0kDfy1qx7M8exLubZX4VJzGdY5Dz8506Vupp8jzJ0Jx5ok2u1d/DeHimGKgf+pw4LIfNrfxpPz9BRTgsVYxNsXLT271s7MII05SNjULCcftXT3dyA2xB/vb1io9/sTZ7zvsK7Ye4d2tEQ3+JCCrj1FVsZFla4YqOXtFlZhBM5gR6HWmsfxUWTluhCSJEHKT/q0+tUfa3jeLwGFZ1sd+wA/fAqqCTGZ0zFjy20M8qyLG8XTHXO9v3Xw+KAibjHuWA5KwINr029adgubFwXC2XFxsQF7y45MOOXKG99qj8e7J2VtveRmXICRBzLpsNdvest4Rxe+qqVvPbz/CLoLI8GPDcWJ15Nr5UV4TiN64O6xIFp2OgLZVfoFceCf4WAPrSaSBSbDLgfCQ1i21x3zESd+ZMc+kUq4s8TxaKF7l/CAPgU6DzB1r2o2KuB68IIcKpWIOsnQRtr12qRxLhC2E7xNSANDB20naT6VO4XxC0XufDmBgCfFuRtt9edO3V79iDBVIlfXrz68q61HKH8tzlnUaqbbIo7WHBILMGY6jKJbYwRl20yHU8iKl4ziN2zlBUqJ+8ddZ+fTrVrhrYtghUCg6cufrqfnVX2sAeyGuiWQyskBoMCJUCevyqFp482aLUO9gi4fj7bKMxJ0GbQnKdZGg8qvLvCpXwXGAPXb61klkX1BuoigFRqBMzyM9Naf4DxLEFxOcoDyJA+Q2+lQ2krLkXg227hHjOD3sBcOIwi5kP/Hw42b+O3+F/LnQ7xrtEl+4b9kkhUhQ8gq4DaMP4TBPpWiC94R4w3XTr57T8qBe2eGsgkooViwJEQSc0z9Kx9G6k4xtzaOqjXVBSlzeLX3BjgmE7pCMxJYhnJ3LaxPWNfmTVvgrWd1QAGSB71CQQJoi7AYbvMWpPw2wXPrsPqfpXv1IxoUJSXRHheldSok+rNLwWDS0oS2qqABMACSNNYGtTEpvu5rpFjQCBXxEXJvJnr2S5DtKmtY5160zzgVvkMaYFiQJA1EnY7V4bL58wOmg35ayNuuvL6V2QcsazpMf3tXuQyBrAH9896EriObVkkhmAkSPOCevtUio4Hh1DHXnv66k04y+IGNev9/KrSSAdiga9wI4jF4nxZVUzOXNJYAxHvRvcugCWIA6mqu7h7TE3O7zsWDSI1gCPiIrs0dTCTcX0MK0HKy8fkCX/lhTnPesq21zOXslYESIBMtoDt0869v9iirMGuqEVQxfKeZIy5Rz0+ootZy6N3qGWcNlQqfChUqpLETOXUDqRSa4XQ96hk3A+VSp0RlKAkkD7qkx513et1V1I9Wh1/7A272FIZg1xAq5RmIOrOYCx1kj3FDvHOCdxde0SCygGRP3hI3rU+9LKDcRp73vMqlT8B8AJJAnRCY5iqW5wcXXuXbqDPcctEzCgBVWRpIVRMc5rajrJuX83sc+o06jC8E7gDwrGMq5la4rLoXUz6ZlO/Mb8qlX8bcc5ic2kZrZKtH8S/0qy4VbGG4i1pgO7u+GDt4vEv1lfnRDxDspZuaoDbbqu3t+leZxTS//AGcoPaX8kfR8H4lTdBQrR3j/ABb/AD1AS1iDKwxdQ4Ztg5j7usgjy51x2j7WXmt3FwrvbLHKyT4oI1IEeHmJHWrjinZm9b1K94PxL8X6+81S4i2XPihyPxeFxHRxv86w003G8arfgdms0VOulPS2v135/wC+hFOHxScLTM02g+bujmzEawdd9SxPSF6UKuLVzScpPI7Ub21LkI1wiAFUOIMT8P4SN+h9akcM4NhrLM+JsK0CFGWZzbmI0j3rqyTezueJOjOntOLQAYTv8PItNmtHVrTeK23+X7p8xB86tbfaNbdsZVYAmGw1zx24jU27m6j+Fh70/e4AwzXLVyFLHIhB6/DM6QOetaF2D4ThrNq5+2ix3tzQhspXugJ0J0MmSY8ulU1sZ3BXCdr7SooXEYu0ANLYYkL5AmTHSlTuPxXAe8fKcSBP/LHg/wAs6xSqcQyLWxw0O8qAWGu+x6hSIJ31NTLl1xlLKyROacxBEQdJgHbYU8bTjZhHQrp9KDe1+Ouoyogyc5QmDvv1q41Y4q3Ml0puTT5GicOUOJjKDz/WuO0nBEu2tJkHkJJ8tdPc0K9mr+Jfugl1gBIuZhOmpBH5e1F9+xiWtAIIaQTBIkA6weU0pVZN7lRoxjyKrA4BrOVGW41ojkDO/PX5bVbYOyttAAs5WP3STqZ1MdDHyqus3uIK4i2W8WucLETJGbfrrRRatszAug8Q8RBG87ZTrEU4uMZXJqRlONkcpiEZWVUYxEwOuuhk/PpWY9t8TnvCFy6hRqDogY8vN6167YGUgdIrJO1bZcVIytlGmxG5nfTlXbo7TrJfU4dSnTpuT+RVJaB3JA9P61pH2b4JFtXHG7Nl3Ewon8z9KAn4lm3VI/wqPbKBFScO6AaqrHzOw+R3r1tXpXXpejvbz/B5lHUqnUztf/fU2YLXsVj5xNv8Cj5t+tdC6h+6vuf1rylwO3xeX7Ox8XXd8/0a6duVN3Lq6yy7dRWTllHIe5/WvP2hOn1NP2J/z8v2J8Yt8Hn+jU7vEbKTmu2x6uP1qDe7T4ZT/wASfRXP5CKz1cWn4fqa6GMtfg/3GmuCrq39LEPi7fKK8w5PaiyQYJ16iP6/SuW7QI3/ADLa/wCsn6oAD70GjG2f+n/uNcvibWsLH+b08qFwSlffL7oT4tU8PMM14thwZNxC3VixPy8Onyim73GMO291NPM//Ggzv7fT/d/SmyLe/wD7hXTDhdKPJtfYyfFaj+FeYb2+LWAIF9Brvm69ZWvW4tZII/aE/wBY8v4f7mgUrb/s02yp1+tX7Mpv4n9kHtWovhXn+Q5GPtf/AJS+veJ/8a5OMt8sUvrnt/lFA5FvzrzJb6/Wj2VT7z+we16ndXmWnbTKxs3bdxWddCVZSZU5lY5fOaPeG4oXbVu4PvqG9CRqPkZFZkMNbI0P1FGnYW6TZZI8KPCt1nUj5H86w4jp4x08bO+L69jOrh2qlOvK6tkvNBCRVdxDg1m98aCfxDQ+9WZFeEV4DR78Kkou8XYBuJdkHAPdMLi/gff5H/tVC3eWjlJa3/BcBZPkd1+VaqaYxOGS4MrqrDoanHsPQhxGTWNVZIy65iAINxCm8MviSSImRsfkdhrTPFbD37DjOLmbQPIMa6jw6SQIoyx3ZIAlsO5tn8J1U+X/AHmgzG8GxVi617unttt3mHhgQOT2tmHtWtNvqc2qWnayp8+wHcNwK+qwCggnQgdTSowwmJd0ViuCJPNrty2Tyk24OX0mvK0ucGKC8JvpTd/hyOPEBVklgevzrLu3Pbu4t9rGEYItvws4AJZ+YBOwG2nMGuKKOxmj4PhUagtpsY5dPp+fWrWzZgQDXzs3aTFtviLx/wA7D8jXq9osSP8A1F7071/1rW/iRgz6JWwDBzab6GZqTaQDr718+4PtPi7Yt5L10AaIoYx6BdiPIg1bL2vxq3CWvtmK/CYO/wDAAEza7cvOlyBxNxI0rIe13Chh3cAbOG3Oq3NDv5hBVWnbnG91AvtoZnKpInSGJG0AxpvNN8Y7SXsS371gRl1AUAAAgiCBJGgP860pTcKsKifuu/06mdSnnTlTfVf+EYOKk2rg6iqoYrwliBqfDykdYmf5VKS4JRY1PxcyD0hTp+dfTri1DxPnnwmv4FkrjqKfsuOo96p0xIIcwNNhO2u++o5c60TsP2dtXsMLtxAxZjBk7DT859qc+LUErq7M1wqtfe33Bh7mm9cZ/MUU9uOEWsNh1a3bhmfL946BWYnfT4dzQH+2baeu2mk/35UU+KUJK7dhT4XWvtuWebzr3PVaMWIP0139OtdrihCkgwd/KIB5dSOVbe0dP3jP2ZX7pOz16XqIL6+LcR5D6AHX1rwYgeHRvFtoPTeY385p+v6fvE+zdR3SWHryah/tCwSSdDE5dJ6anffSnEuAwAdCJBj8xMx51Xr1DvIn2fqO6SCfOuC1M5/i11Xcc9Nz6CubmhHiEEaHl6TtNWtZQ7yJ9Rr91j0+dck1HY6EnSDBkGfaNq4L6gSJIn5U/WqPeQLR1u6/sOvtWsdh0IwVmRyJHmC7EH5gzWR4C7ba4nfPls5v3hAMwNwANZO2m0zWr4TtlgBCLdChV8IyOBlA0A0+lePxbUwnFQjv1uetwzTTpyc5K3SwQtXlUZ7cYLxfvTK8ijg/LMAPrUThHbjDXUBvHun2I1KzMCGWd9NDrXhWPaCYiuKr8J2jwdwxbxNon/GB+dTMdcK23cQYUkfIaUuQEDjPGrGGXNfuKnQbsfRRqaBOJ/amkkWLJPRnP/tX9aDu2HDcZ3z3LivcBOjgFhHLb4fShJ5nXetIw2E30Dy79od4knLZH/8AP9TSoAzGlVWRNz6O4/i+6w9xxuFMetfOa3CSWJ1Op9SZr6A7bKWwdwAeX1ivnpdP6da46fvNfL+zplyRd8L4mLcSiPHJlkVJ4vjVujMLKWzzyc/lQ8lyp7X5QDl/StPQxyyH6R2sXt/CWVWyFckt8V4qVC6qRlhvFAV11jflGlnhuH95euJhrZYFdGKwQQplSG+ENBmMpEToJFVD4yyLVlVa6Uz/AL22QBqo1KmSCfG+8fpcXMWguzh7jOgtr4LmmpkwRpOX+HrHM1bgjPJjAwJayLgsnuxciB98swK6gZsxErpO0iKfvYHLcE2zmdc1oQAIAG6p0h1n4ZE6zpEtY91tAgic4yNP/DIZYA15ZeY0B58rG1xq5bvhgApVRJgsYX4SAxaPEdBsARtAInCIZMh3sAmVlC3IRmDncq6hwi5NAAQJJkkkEaRrLXB28waGK6ZSZZrltNwDoGZ8wnSVFs6TurPHgLF0FAMxhfEZP7wXGzfinKFY7nw7RFSzxpGu4dWQqVBIA1CXHKZWy7Aqq5QIygBTl0IpejXaGbK9cBaFsBmIUlTKkknQd6Y2IWYHPNPKtn7F4cpgrCsADlJIHIliYrI7nEE/ftbhxnMBxqqqjW7ZA/EwOrbeECth7Jx+xYfKZHdLBPp05VcIJMicm0C32uIWtWFGniJOk7ZRp5+ImOgNZmbIGQkwoGnxbjQyQDpmESOUwJBFad9qV5V/ZywnS5Algd7M6jllzjrqI2NAK8Q+A5JuaaBoGiFUI08DBTm3IUqDAkgKcdxwdkVn7KR3gMZtZXplLBm88scuRnXUU/8As2tuIDcmmFGqgKW5lSZbp571YW8bbDHKpKqBmfQ5lQtKn8IujLsZJ3kEw5b4jaKtKmGnNtm7x3Qu3T/hhgoGgMz1qMfEvLwKsYdYuHxLrBLCCNNoMsCWMR0OpEGvGwHwLm3gmefhJJMawpGUnXy1BFXz8QtZUhQbgDEqPhdSlpLdvM2pXIoYgiSQdiZHNzF4cGSudPhWBAXLbIbxci7w4Xl8W5p4eIZeBSphWLPrroonTKSuxAPIBgekSRvHJsOEtkdQ0mZ8WaI6jwt5yDyiiFf2cSHggQLpMrmUavcRRsSTaykbkSYBamc9koCSQVym3Da5yqZwQREKIbNpB8OvJ4vtFkVVnBt3jqFXK6jKsiH5KQdlJIJ5QRG+lcPaburTlDKtl02ETIcbAnSJHI+gI0FvvvCr5riqcgyk2pzgAA6HKQlwTGmpg61GK2e7ZVc/u3Gd8si5bzKoyGdD3kvB+Ic/DTxl2iyRSNhouXVKtsCSD5SxSZLAxI1iAeWohlPBZaTGaIy7nSSOpAyeWo57lFxbPeI2ci0VBQQZUhnJzxqALsSV+6TGoqMcOAhzMjXEcB1AEJ+98V4/igjJ4QdGEmIFGMu0MkUS4dzcuIrnMw2M76yCOoHt8jTFq2yqlwMJXc6GBIWIgz8Q3+UxRXh8LaYtOXx2ZDnRSzQSiqJJW2neIR8ZmBHhqBi8PhzhwVYhQXKyfETmfuBlB3YK0yICiZBOpg+0MkUFy0e/8Tkq+nh3I2jQwdQNQSPyrvHvaVGt2lJGoDtoTP3iuxkeQ5VO45atqyFPiJIVpnwJKamACQy6c8sTuKe4vZaHtDujDd5KkEsbgXwqwEsASYXypqLQZAKbcGtT+yLjF273+EuEuhtlkJOoaIya7giT/lrM7yEMQRBBgjzoy+yviz2sbbsj4LzidNQwVoIPSCZFA3yNJURTGKwFm7pdtW3/AMSg/Xer7ieBysSPhY+x6fpVW6RWsXsc7KJ+wfD2M90RPIXHA9ppVd0qoRa47Ad6pQmFOjaTIjkeWsGsE7XdmLuHxRQISrmVKgx4jEzyH9elaxheM3V+9I89frXXEeLve7vDgqDdcAGNVC6sfPlXI6bjLJHUppqzMlwnZLEFZ7v3py7wF0U5wFIOwOpnoPKPrWidocfbwzrasLecGB3uuU3G2EkQfoJ0nSil+zdu4QHLTbcGRoSSoJU8o1FWnJys0J42ujB1wzlYVWkQFZhlIPSToetSxh3zglBmAhohQJG8Hfn661ufFOyuFvkZ7S6bESp+ZWJ+c0zf7E4NmBNpgQuUQ77a9SddT71VjPIxROGtlZNQCZzEaGOUE5hzG2tTFwLBkYyuUQEAklQY1yzpqOWvQVry9h8NlAHeiGkHOJGkRBGWPlPnTw7F4fMWm7BEZc4iQImYzTz3iSdKLDyMfXhLlHTwsSSVAJhBOpDfynWOtSbOCbwv4cw8LuYyn8QgGQ0GZMfpqn/kaxlC95dMGZPdmYEQRkg9dRNOp2KsByxa4ZEQcmmkaHLO+vrSswyMhuYDKlwZWtpIOYkGeYELPgjUGY89a2fsZcjBYcDYJA+RI/lVdiOwNp1g3XJO7ELJGxEgAifLTypcIe9Zw+Gtp8AtnxESS2c6Hp4Y+tCTQm7lX9qtoucMoDEt3i/wie61b0jSs+XAHLo5HdfFcYGInLlAMSBrv57VsXaLs6cYcOXfL3cswAJBLZNhIHIxMjXaq49hPFdYXviEJK6r0B12HlE0OLbBSsjNBw4TOoRxITdswmGWDtBO06Tp0cHDeRDSk5UmQwGskxAJ6bmtDPYQ5UUXV0Jz6HWSNiD6ztOmo2p09imm7FxPEPD4SJMffAOvMT/2qcGVmjOxglnOWaW0LECLbEAyQYmNvaJpteFaFVY8ixKkaBZGXkwBnz1FaN/5KcC3FxZU67+HoUO23IiKT9jbnjhk/g+LX3nu9PwzNPBhkjObeB8SsrQBpbXUM25gz8OpMg6a9K8PDWylQQSTMaeDQGWJ1E7aaaa7itGXsY/hGZII8e516EES+w8RIPtSbsjdgyUJB8IJnTmR4Y1/CQfWjFhkjPzgWz5gV2IuHk0gyVAMtI0038qewnDyFcMM1vK5UeInMUA1iQpHhgmDK6c6Om7HuSPggjUyZBPTSV25aaxoKjv2PulG8KSTBAaCR5kRmjSJKny2oxYskAKI+ZboJBgB9RFsgETMQI3AjQ+dcLgzkZA2u5Yr8SyDlGvzNaAnYy8GUDLCiQ+b73TbT/SdOc0w/ZLE5M2QZ2aIziVEGGk6Dc6L9eRZhkgG/ZpZDmAWPCIIYudz5MSoM9Irg4VoeYLXCZUaxmJ1I5wSII9aOH7GX5K5FyKJkFYuGNh94HzMeu1R27I4nKLhsy06IGXMvLUTlPLWSfSnZhdAPxCxFtUzCC0loOjDN930mSJ1pqxYKNmbxEDMJ26jT2o+xXYe+qM5CsxUkxGaAJjkJ9KGxwi0LNlnzS6BsxLbMAY2I0poLgziuEtdcspEncH9aJ/s27PucfafQral3PTwsF/3EfXpTfB+zAa4FtXgc7ZYYMIOvOIPt+Va52Z4EuEtZBqzGXbqeXyA/n1ppO43LYs71sMCDsaoL+FytlOvQ9RRKKj4zCh16Eaqeh/SmtjMo/2Va9pNcgwdDzB617VXJsZjwvtRhr0BLqyfut4W9jv8qjXO0iWOJWTdJVLazm82mfltWX4nhQAJVtAdj+tRLr3FOVi2mgBJPtSlG6sXGVnc+jv/ABPAMMz4jDgFgUAuA6zoFT4j6fSra9xUtcZ7ZYKTIB05DUisC7LdqrWGIL4VGb/qKfH7NI9iK0XhPbfB3oi8Eb8Nzwn0k6H5Gs6dLDq38ypyyNGwfGTPjEjyirbD4602zAeR0oMs3ZAIIIPMfrUu1crTEi4aLBrrLQrh8Sy/CSKs7PFW5gH6UWEW8V7FQ7XEFO+lS1YHYzQAjVdh74tWLZKsQEBOUTAiZjf2qxNRrVt1AUZWA0BJIMdCIINJ8xkhSDBHMfSuq8Fe1QhUqVKgBUqVKgBUqVKgBUqVKgBUqVKgBUqVKgDwigF+EW1S2l0+G3iLiabhCNCPQlTFH9U3FOC94SwymTJVpHigDMrjVTAEyCDGwpdUx9AdWytk5CEcWmR7V1ABInUPB+IDN6+HaKOYoc4X2XNtiXuNlIgoDoRpoTA008qJAKGI8rw11XhpMZHuYRGMlVJ6kCvKkQKVID4+fFCIbZj8h5jzj2o67DdmBaAxF5f3jD92rD4EP3iPxkH5D10puwXZrvmGJviban92h++4O5/gU+505GiXtt2l/ZreVDN64Dl/hGxc/wAup9DWrEB32ithluhLCAXRrcZdAOiwNCeZPL8g6aceSSSSSTJJ3JPOuWtECeVICbwzjN/DmbF17fkrafNdj7UZ8I+1bEJAv20ujqvgb6Sp9hWeUpoA3vg/2lYG7AZ2st0uCB/qEr7kUZ4PGLcUNbZXU7FSCPcV8pTUrAcQu2WzWbj226oxHvG9AH1grU9bukbVgPZ77TOIIYZRiVAlpUhgOpZBt5kGj7gX2oYa6s3VezG5PiX3XX6UmM0u1jT1qXbxgO9DnC+L2b4mzdS4P4WB+gqwV6Qi7VwdjXVU6PUi3iCOdMCwpVGTFdaeW6DzoA7pV5mr2gBUqVKgBUqVKgBUqVKgBUqVKgBUqVKgBUqVKgBV4RXteEUmB5SpRSpDMR41xa3hLGYgBVAW2i6bDwoo/vmaxziWPe/ca7cMsx+QHIDoBUztLxxsVdzGQi6IvQdT5nn/AEqqtrJAHOrESLFj7zaKNz/IeZpM2cyRCjRR0Fe32khF+FfqeZrtRAoGkNvZBNT+IcBKAFNdJI/n6VGw6ZmAokwmIZQY1O2vQaAUyWB/7K3ITTUUScRuS0hVTrGk0R/ZP2YGKxffuJtYcg+TXd1XzA+I/wCWkM0X7LuygwWEm4IvXQHuz90R4bfyB18yalcV7HYfGZ2Ze7n7yQDp10g0Q45/uDc7/pT9zDjIEO3OoYjHeJfZViLTZ8JeDxtqUYf5h/SoSdpuMcPMXw7IP+qmYR/+xdfc1t6KNq8a0DoRIPI0h3M34P8AbBZaBibL2z+JCGX1jQj60b8H7VYTEx3OItsfwkw3+loP0qj439muEvyUXuW/g29qA+LfZVibRJtMLijURM07j2N0DU4r185WOL8UwBhbl7KPuvLr/umB6RRNwb7ZWEDE2A3VrRg/6GkfUUXQWNrFyujcPIkfUe1BfCPtCwF+AL4tsfu3fB9T4frRTavgiQQQeYMj3piLC3dPMg+mlOC71/v2qvFynBdosMngzXtQVv8A9/8AanFxHnQIlUqbW6K7mmB7SpUqAFSpUqAFSpUqAFXhNe14aTA8zUq8mlSGfEc1IwmhJ6An57D86jVKteEEHc/yqwSOrVuB5105rwV4DNBVtth7DvlIPSpa8QOug1M1A7wVyzUE2OsZiZ5D5Vu32M3LacOtwRmZnd/8WYjX5Kor59uHWjj7OOLFMySfCwYf4W0I9x9aTEzfMDbLM1w9ak3Hqo4Vxm2yAKw/rVql4GoEeqK7QV6o6V1EUAelq6U1wWpZqAOcRhLb/Gin1AoV499nGDxHi7sI/VfDPrlotBrqaLBcxni/2SXQCbFwf4X1HyYCfcULXcHxHhzCGuWxyNpyUPqBp7ivpCai43htq6CLiK06ba+4osPIxrhP2qYu14b6pdA3kZG910/20Z8J+1XB3IFzPZb+ISv+pZ+oFTuJ9hrLiFCkclcTHkGHiAoG4j9mYUEk3Le+qjvE+njAoux3RrXD+K2rw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)

Buenas! Yo en alguna ocasión he considerado la opción de usar una resistencia en lugar del cargador, pero finalmente siempre he terminado usando el cargador de manera convencional.

La cosa es muy simple, es aplicación directa de la ley de Ohm, I=V/R. Veamos, supón que tienes una batería de 3S de 2200mAh y que la quieres descargar en algo menos de media hora. Para descargarla (por completo) en media hora, necesitarías descargarla a 2C, es decir, necesitarías una corriente de 4,4 amperios. Si la batería es de 11,1V, pues necesitas una resistencia de (despejando la R de la ley de Ohm) R= 11,1 / 4,4= 2,52Ohmios. Y además, y muy importante, necesitas que esa resistencia soporte esa intensidad, no vale que la resistencia se derrita nada más conectarla. Para ello, tendrías que adquirir una resistencia que soporte 11,1 voltios a 4,4 Amperios, es decir, una resistencia de 11,1*4,44=  49,28 Watios, vamos, de 50 watios. En el caso de las baterías de 3S, estas resistencias se pueden encontrar en las bombillas de coche, que están hechas precisamente para no derretirse.

Otra opción es comprar una resistencia de las características calculadas en una tienda de electrónica (una resistencia de 50W son muchos vatios, no sé si será fácil encontrarla) o recurrir al ingenio. En su momento, para descargar baterías de 6, pensé usar una estufa de resistencia, que watios aguanta tela... pero con los omhios que me daba, descargaba a 0,5Amperios, lo cual, era lo mismo que era capaz de descargar el cargardor. Se me ocurrió entonces poner en serie cuatro baterías de 6S y descargarlas a la vez a 2 Amperios... pero al final, me dejé de experimentos, y terminé usando el cargador.

Cuando se va a usar una resistencia de esta forma, no controlada por el cargador, es importante poner un salvalipos que nos avise cuándo termina la carga, para evitar que se nos olvide la batería y se queden ahí descargándose hasta agotarse, lo cual puede ser desde perjudicial para las baterías, hasta catastrófico en caso de que la descarga sea lo suficientemente alta como para llegar a calentarlas e incendiarlas al agotarse.

Saludos.

Tengo 3 bombillas  h4 en casa y tenia pensado experimentar con ellas poniéndolas en serie para que no rebentaran y conectarle una 6s al cargador en modo descarga+ a ver a cuanto descargaba y controlar la temp interna del cargador para ver como respondía.
Esta mañana leí otra opción y es ponerle las bombillas o resistencias a la lipo  y conectar los cables de equilibrado al cargador y este ponerlo en modo monitor seleccionar el voltaje de aviso y a descargar, vamos lo mismo que has dicho de ponerle el salvalipos. De esta forma el cargador seguro que sufre menos porque solo monitoriza los voltajes de las células.

un  saludo