Physics
General
Easy
Question
A sparrow flying in air sits on a stretched wire. If the weight of the sparrow is W, which of the following is true about the tension T produced in the wire?
- T=w
- T<W
- T=0
- T>W
The correct answer is: T>W
Related Questions to study
physics
A body of mass 6 kg is hanging from another body af mass 10 kg as shown in fig. This condition is being pulled up by a spring with an acceleration of 2ms-2. the tension
is (g=10ms-2)
![](data:image/png;base64,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)
A body of mass 6 kg is hanging from another body af mass 10 kg as shown in fig. This condition is being pulled up by a spring with an acceleration of 2ms-2. the tension
is (g=10ms-2)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAHAAAACQCAYAAADQpO/JAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAC4JSURBVHhe7X1ZlB3Hed43d5l77+yYGQwGG7GREEmQFECRIkVxkUTLtuQotkzaOpacRNY5Ofax9ZaXPPokD3lOTh7ymM1xzonjY8mRqKOFNEVIokiRIrEQxI4BMMAAs8+d5e6T//urqru6b88CcO6AFPHN/F1Vf1V1V9fXf2293LZXf3V2ubhYxVKljnpjGcvw0WbdVdCWlKZZ5zTB/r18ST5F8248xCPbkBJVSjZpkVQqhUwmhXx7BoX2LAr5dhQK7UhnslKGDKqNNpSqbViqLaNRBxrBXkQiu161EGvimQPW0yKk5peqKFdJXgON5Sh9Wt1UUd8UZ5EYp5k88X0WLl8g1JmoIBDRxRGPECJkP7V6Q4ipY6FUxfxiBcXFMhaWSlgUKZVKqJRLqFVLWK5XhMYa8ukGcpll5NLLyKakQixfYdFcIeLy4UCKJ1uj5bkyBR6Bev3wKgVfLW5dJ8w0TmJYMfvK+yUPrPxqtSFk1jBdLGFsch43JouYnC5iYWEBbfUldGer6MnX0Z0DClkgnbalkM3KeydWj90spCpygo1406mlp8YXh3h4vVhPnqRjrYV4nmgzyG6hVKmhuFTBlJA4ObuImblFIXAR1coSUo0ysqiiPVUXC2wg00ZZlmZ4Wa0xsYf4EMG1GAGSqsxUkfmzARHn8eCIX/ECiIcNfK1m1T+ns38SEdllExKVglAvvOjFWqmZJlatcmoBE9PzmJ4tolxaEDLL6KJV5hroyi0jT6u0leROS8uhoCcI3BHIdeYKERamWeMjWXvrWGsfSfFrHdvFN6chB7QmVj77yUUhcHKOzeqCNq0ksLS0gMxyyRJYRy+b1YxUkvSNzO/vPSTxziKlV5QNGKxeMi2886nHaZx4iETJRs/aCREPWwRq2QT5fDi98QYSQaJS4KzZCPv/mlgkm9l5aWZn5pYwObMohC6iKP1kTZrZXFtFiKyhq72BDrHInPSTtEprmAK/EHFpLeTaEjQdMxJYBUnx68l3O0jab0yXlCRQJkYqCewnK7WGjlrHZ5e0Wb05VcTM7JwQuIBCqoze9jq25JdlwAPTrJqaM9eRlTsBKYY7MU+cVxEJBHBadyWHiiBCNgnw421eirmaXWQzGL9yGqezEgtGJPRYyPHlryHTqGpdBjwyqFsq16SJrcj0Q0SmIfOLnIYsYam0pBaZalR00JPPNJTMrFikP5iwp7YpsNfRerB6iVgJTVjjLDjZXpifx/Vr1zE1NemN+KL5vLpZJ9ZTe8lpeCzXtJYqdczMV3BjelH6yaJY5RzmivNYri2hM1Mx/aRYZWc7STSllGyGQA21HrdAILFWsRLilUQnUaQzGUyMT+DXb7+NM2fOKKEhaJXOMpNwG2VZAzyWOx5Hq1VpVhfLVczNl4XIEmaKS9IvLqFcLqFRK8k8sqzWmEZN+sQaMjINycqwkBaZkVNpGuK3AClWcPMVwxCVTkKV52mCiUmIdyolM8SyNFs3b97AyRMncO7sOdSqNWo1Ljz3MNxcH27HK2G1OCKe34VDHVsFHb2Kvy5NLJtXzifHpsQqpa8cny5iUQY76YZYZboiI9e69pOdMoLNyQi21ZDrhTBX+60heqLNWCnO5OOa5eTkBG7cGMN8UQYM09MYuXRJOJayNDMVwBHpy+pw5VytrEkwefQY9iBcqtNmtVjBTWlWb8r8UVd1FufRJhaZT1XQma2hO9/QZnVTCLSuNTZao3qMBDAnoxLEW5UfZxFqwr9Aa51MOoNLFy/h2rVryLZnsbS0iHfeeVes0ms2HUOcgTsEulCclaiIamWEx49Is6IZcs7utLllPTVkPlnVOWVNm9gJmX6MW1KXxCohpLYaq/eBq5xPEOHSaNAPqGJF1Go1XLlyGePj48hIX1itVsUCL2J6ekZHhD4RK5FCvS8K8axmwesp28owLZW7WDhg4aIAbwhMzJVksLOAaxMy2JmcxbwMztqkWW01hEB3QuFJhSHr8y3OiaINmfZ25PI5tGezIjkUCh0o5OgXyReQE+tihx5mlQqQ5vPSyIg0nze032trY1e8rAvM7508jkqlImlMppALE2A4Kvxr1nMAEVglRXRRuNKI23R+Tucrk2CtUjY16R+5rlyu1LSf5KLAnFhlq9H2Ny+9FStdeKrNJ01YrdRKOl3EpbeOY3SujlT/FuQrc5i8Pon64F4MdQHVyVEs9RzEjn0HcbCfdz1M1nQ6jZdeegnXR0cxK5Pl2dkZ5PN5DA0NSyWU8YcvvCD+IZPYQxuZsDC+WAljQa1/um4j8U7n4AfNpRBDoEqIC2BGEEyhonXTJiPSFL7y9H4maBkSmtDYGTbBxbfJCGgKY9fGZSS5iPqyDLEnz+KtH34fr19YxEKpjkbpGq6PTcj8SYbZ3pHq9ToG+gfw6KOfwqFDh7B161bs27cPT332Kdx3331aCWxGDZrLE1bl6mV1lmcqVVVe3iSsde4rwx2H4GCH1rggU5BWI/3Cn/75X1t/AlY+XW26ludRKRzAgfs/icceGkJn2yxG3j6HzJP/El96/AAeOjSM7sIWdGfb0d2T1qaGOUngnr17sHffXt0XySKBhx89gvsOHlQL5VXMkaqDWof+x8rEoKSNkOWLRoTx3NAfcak33hg8TXOkIKo0IVtCbuQAD+0bYKhlSLBAH6xwX3w0UMcu7NszgCEp45K0+VUhRrv5RlXvei9Wt2H7jm3YvSOrcygHEsRBTFX6upoMXtQvbrVaQblU0kFN2vaBzWhWumpUkhJE+0P+ScBJii7zuHy6h41AWFcbt8+VoRP5ZpEYShNchHb9IkKijMJIjiZ30WYjkGa0QZFwsF/jT5x3ahITHyDwRtMHla8hMzIMEY0llCQRkhmIbEikE5eGYsBjWrHl9lWBzipCHxH6Wok1LHA1xAroV/qK8PKoY8KmvoJaE7Ay1rO/ZHBPEZFNXAg6ap0iNHhDoo28Ldx+mW8Xtp1y4mDDwRW2TmhS5qFjXVsp0WoxBLFP1KR2q7DZDKzepgvLYsMWZt9Go35urJAP9Tq/LY8jy/hNXGCZ1InHxTOOYsDjxMR5FZFAyxGzQHfw2ywAV0yCExUvL+tKGdVyGWU/wkdAogZ0qwjIsrCJzECIiJIYDawOLYklxYhPVtikphnWtLq9RdgCtxiGwBWPYyPilRmBiePkXK9aBtvS4k8h1Shi9OQJnHzvPMap05QJ4P5jxzAqp6Nr/OpTfagL4NJbN6h2r/6dN04My8YgNXRpiepKhItTHf0iUbjjGmczIYMY62uCi3CFE9cXD22QUeTiLGYnJjA5v4Tp8euYWijL3LCKqZGLuHTxCqYhUwPNKxmi2Q0kzkRzYxJo2OpNjNETgS6Ij0KP5aVvqnhHhjDj9HRJkiPPkMYHhWXkLK4OekSMpZr4EPZ40cO2HFI0e7RVD7paJCugivLcDKYnlpAa2on8/BVMzi6glN6C/oEtGOzJ2gpdBVoZksYSYuiiXwMhSd5+Qm+oc35fE4dWPl0nDEfEkGT6SRMORqxKoiFWoky8uCFWO/LGg62DgAcVsZWVLLLxKi8MN+Qvi9zAJ3D4d76Ff/Pv/xr/9l89iyN7epFPL+vzJpxF6D4UNhA7Fp0QVBiNiTZEcoXDWNxqYtNrHrsH6ukVtEXubIhfRVnyxDqWKEOkI1WsUTZOnFWadCafgofxDtUqWAJ9rHVUVzI/nfiXhcg6J/AyIa+5x/TN2ejWnVgE/j4SoGyQCEuG55q8Ns74gj/CHM6FVgfTxoUVQyEhFJLjLE9FiUvpgoOzSiWZubmDTYIc1lVGks+EIoioxePCgXBDyKlUi1iYHceN8WnMzFX0xMJq5p/JonB5g/xxSHqNMpbIpVIXXpaLh/cRTXZxnZ+xDJsI61clM9oEzmPq3YnzOMsz1hf6NUxCVWiNjkgzehVHpdXQO/LBeSRihZhVM5nIWqMdu594Fp/93FN4MN+QQU08g9uJk7VgiaGoPyTShVU8v4lhGm49xMM+bMUrh0piKMbSDDmOVCVL9GHTyuVCE9dqmFGonovz2ApQv0MY1wRWhK2oABqUPSxn0D28Czt37cBAeySFB5fXCR1xV6xgm073b/wuuSONEvaXQfIgTv3cVbCla/wK8bqqpxuXgLRAaJESp3oRUaqemxZDrhULr/yrY4WEqo7HSUXWTL/YbH0xJEavkUdAQvQ4tEQV+j2inF/TemEbb5TcU+AoGSvDRQppuhVhM6rkGdLCAY4mbCmih9ATMt7V4RImZVhhB5p0hTgiqDQvjXo1oyfNMLslSbQ8hqMkqSsM+3pGqJ/7NEH165/4V4KxNCe2LySZdIU0X08SWw0hkKWNiXO8k3R/yYjmM7URBKxYuLhAqLNRgXh/TOJJkCcCjbBiwHLTEhscHXOQI2HVSZwOgmzYWaRsjDAv/6zf3yfJ8cGgipJm/OSMfmOR1LQWlsA4knStwlrHWqF8QaVbVQBWvos2RBgiQ9KEThNH8pjD6m1AiKDH6dWnYYKUqAQe47ApCyySok0oY1qLFe4HipizMRLxRv+icAktXFBVfkAVHiSsarrxOEIjrRiEGvmTPEpAAC/WxlGUSDalIo5UvlrOxYY6LdXpdWQbzZskcQScklQrrYa+H8i/JrCAKhoIxelc0PsL4SVw+rjK7V+DTmnhHzseZf+SEFRsUj6NcwQZ8sKmNSTU6dVa+afxTrhL+2d1PgLynLsZBEpZeHa2WF4BNZqIFtLA00WizR6akaRzsHGJSdbKt1K8F9eUTM7NVr6SRavzwm4U6yzRxfkS7trqTBDL/jLdJiEchbJg2sUnFELjVkFSliRlBLH4pqvVxSfu3ENzfKiJxXnnoRXvSFIRf900qWqBdNUveslmyLMWy/1yV3Z3AYnhZtOwwjQi8ISQQhqhXxWeGCfUWF3gEmFsqBc3CDpPoIi6/vGbQGU0ItRYH/O6YAQkxlqcbTojzamSHBJJ15Bp9smLwO7F/GmQcapuOaKDGAd6Neg8XtyKOuvEo5oVifAPH8XaeUOs71jNSUKFIdNaJIVWqZZpiRTX3GEx4sjnCSix/GOQ+6SnxYjOA/XIYdhdaTZk/0ys8chG0yeAUcax4nLHoP2GfbApmsGDr7D+1Y4dpA/L62v0rymv0RmxzWfdutQpcSGx2tRaIpmHpIuj6cw+TLjViDahchIq6nhHd6VRnREvVivfTVzd/MeERa9hrtQb4aMXTjQs6Sjci58u1WbF12meeDrJzxL4BYrAlfnWwbPUPyXNkBm3RBMmkYZo4dESbvrLVqPtf/zDT81R1ASIwCOwfq1gHxK2qmwmg8uXr+DihYvS1PAFzTAuhKfw9kUCJicmMTE+jq7ubuzcuXPlk24qg3lEn5U3ODCAw48+KnlZfYR/POsGCBVJPkVTHgO9VHjBSLxegHKBqV82vLBcnLmojP5LTx00mVuEsAm1TmhlhPVT50ThwtDXpEdGLuFXv3pTidAnrCuVUOwT19UK3Wgcn8IuFPLYsWMH+np7USmXw3jm8fO5sPqrSt7szCzOnzuLsyLGitcDnoM7D4ckXTPUGuW85ZoxVmctMTJqlbBaJtME9dU6iAW+GhwlejhzRYVwfro2pcTnCwX8+Ic/wvunTuGpp57C4Natym1bOoMMH6nQfoTpub+UEO6uGfN1RKPX61XzZFN1VKpiWdyHHssi8BpPKp3C9NQU3n//ff2I3Z984xvaZ62IBIJDTTzOhpuzWJgI7pJlVMtTi6QutEZa4leeuV/Ttgrpr37tm3/Ng7EqozCFiCIWliDfcxi9elWbz8NHHsW24WF09+SRrsxhrppDV98Ahrf2o7e3G11d7ajOFlGVes72D0vT149+6ntECmlgYRxXF7qwc8cQBvv7ZD896HHS6/lF+vr6kMvl9P30pcVFPPDgg2odQcHiaDoXP1VCeqdLivJAq3RwPr8buH/vVutrDXQQowdUYYAai0DvlPEEBszPJq3Ge3+1in4cZ/b8z/Hyz9/DmatzukJRWZrB9Mi7+NWJEVy7/B7ePXERoxPzQibfraijujSNqTP/hL//yRl925XDAb5XUa/V9OWXGvs7NyoUv68PiheguYy3Dnuu1olIArRptc0oWxa+8Mm3d1uN6DTCiSXN/fk69fs662q0hHTTaEdfoYLifAnFpQZSmTaUJ0Zx4ejPMLrtU/jkY9tR/PWbOHthVJ8XTS2nkckU0D/YCWl15aIXQsv8vqf0idrMyoiuWtL36BcXl0QvfSHJ5DF5bHfcCKjwlFpAX/TfineeQchpQp+RqJfQMlgx0wteZIbIViN5GqEQ1waNY09EA9xYBH7G0S9tTiaLfEce+WwKwp30BUUUixM4eymNnbvSaGR2Yjh1FeOTkxidlXguqTN7QxKz72hMYeTYW/j1u+dwZa6KRm0RMxd/jTdloHT06Ot44633cGl8HkvLnEbYYzvHekMkKgVJujjWk6YZ5qKSv80n0MGdtBWtXQr/zV+gI4J4iVGhN/S3LZdkNDmP2YUcOgsSTuXRnqWFVcSq3P03JiR/bVgcOYvxNukfd+/HvVtLmLp6HD/6wXX0P/o4Hmi8i9NTwHyjgN4sbw2ZImh+B7u7qDiPB1NQelQSUgjiWhcW8bwqHnjuHJ22GobAeEGchB4L8VuVOV3jD5SrwFWPnpKMQBs1O3JjCTSrsNeQeeTNo/jOWw109G/Dvp3SpGpy6evmZzAPIV6aVxk50Wy18M1HXb0cJn6lNKvlTcoX062WvUVI+NxkEvyCWr9k5FUW6ukLw8GqiS6VdciIsQ+DvTK4KcpUgk1qiaNSsaIezpc0ixAqE+MuGZ0WT+HslRu4Ps/PVnWis3cHPvFAj1jmeYwPPIdnj9yDAwN8y9dmtI4rgVEEyhARlUsj4nlDi4wi1Dofj+XOOPSZ/JuHlM5ZbGBt2EKqOMQLLf7GEopT05ienMBUcQHzlTx6tgzh/kPdmDgu/drpE5jouRc7tm3D9hwHIyLSzxUnpzFT6cHBBzswfeIXOPrq2zg9WRarrWJx+hLe+9kr+MWpK7h4aQxFGczUtOzm2GEl+oiHBVQlqCPQ+LUSrYJNJDGVYSWsn8FmBGWlR4TtvjSR1dwO7N/Vj4HuNMrlBvK9g9h75Ah2yQBlerKOoUcewr7tg+iWZrPOJlUaxOWOXXhw7wB2PPYsHtohFlpflH5zTvrKaYyXejDQ14Pe3CImzp7DyI0ZzEmeFTpxD7ZccSSomtGcaD2azUTb3710dLnM34xwc5ZbIrNNJ9M/ffVVXL1yBZ9//nkMDAzIBSgXhYxEczIE5QSfX8Rd1nVDGZXWipiqdKC3M63WE0yVuEqTbdfP/1cqy0hlzTuGKF7CVWk637x2D5799JDENzB37Dgmtu0Feroxe/LXuDZ2Ey+8+GIwaIieQvyEEk4w8ZxjynVc5WGKcGHk6797xPpag1RnXipaK0sOv3YZY2AxRcy/wrQeMjqUCb3O46p2oi2bZZmYV1Od+jU/N+ENckrl1/llCxmZ1htVnQeWy3wouI7SxFWcefN7+M73foCXvv8yflXjyk4/dmUkj7cLdZ1/RbhEayWMxfMkzIlYWQ1rxW8cUp2FdhnS8y2bGHvrKWNwLrLxT7DpZH2dkCvbIGwCRtSha0WIrBe2Y/fjX8W3/+Jr+O3PPI6nn/8ivvDYfuzsa9fJMpPZjPQo/F14His+rM6PjogfsPDjVoqKhFoLIZBzsxw6aImZjC7ABriFMnBNtL1dLob2LLJZX9qNS70fZ/1Mn8tJ0yl543HZbEb97fkOdPYNYvuunRjqk1FpPoesNNG8lcVvyoRrtq7ACYVe53ncGlY41iai7f0z55ZnizJYmC/rB9qW2GxJuxSxRy8QVJUtd6FQwA9e+gGOvvaafn1p69CQxLmTSshIj1Q4g+wTuRDNBemMENbb1yda5rWJ1dGU7l/B3afkgpmZmcGVy5dlOtKNv/z2X+maagiT2uVRaCCisUjSWQRRa6VJjv/67z5qfa1BKi9Xf2eHDPM7c+jqaDdfGszYO92uTEkXGeNEuJi8fft2PPjgA9iypU8tQi1HJW1F/NQ7kcpnOh6bJJw8cVI/9kprpD4Q3pJSv6SXPLTyNP2yv3Q6he6uLhw4cC8OPXRIulA7Goo1e+H0QkRVTuP+HGyaiPheG/bjHFQlGyebiLaxsbFlDjYWReYXyphbLOnX2pdKXOk3C8YmZcQJToHNV4lfdBchQuuLw+UMkcsX8PovfoFXXn4Fu3bvxte/8XXPimIHDMKsdLm45DA8dkpIbpcLoSD7ikCTh8c0Pjs6DNUK0x4wJhah8HS6KOGnSUpvYa/+Vltg29Tk5DLvdJfK5hP7/LWv+SV+ar+sN1ZJIof6uq5pM8WhFalrYhYrJfQh58dvi/74Rz/Gd7/7Xew/sB/f/va3dcoRIGgCfFidjTOH4q0c1+wn5REE+/LiY0kNkWshIU1iOQ2+/qVPWV9rIBcwmygOJvj7enn0dhXQ390hk+YO9HXn0SWj1Hy7NF1ulMoa84WOkEvLCYT38Si+LlFqOp1wTY/TBfE1z98kJo73BvVOvL3AXLPoFc/ChbxY5w3gxa2IpDg/n5PNgYwF2K8YAjuErO4uIVGI6xe3r0v6RdEV2qWZkr4skzb9YuSCSygzozWJ8/jpm2AziqNW7iTQa4RJoLB+dejaMBEJe3pCg7IJ0tBp6MunLqkfbUrAiCRQ74nzRpCo3HAogRwkGJeDCBnWt+f0C7pdHQWxQrHI3gIGRQZ6CtgipHbkMzL5N/fiNqaYbi9uT+Kq19Or48KE84uo4/QCw4CR0BMBB0EzM9N48403ZCS8YLUegiwuf/M+PgyQrksm8UIe510c8encTAYFeZlrdUiT2sMmtUeaVCWQTaxYqswZaZGshKQFnKTTDSzXSQQ2hzout1z/4lcuGAzSBAoPSXFG51u0+TMxLMTM9AzefvstnHrvlDbJ4XzSwu5ORYMmZzNMrHNWTNYCKIFO/CE8ieQEO8/fnrVkcrrR3UkSTfPa152T6YdMQ2iR7ZJf2NQquKUTSUikKn8nIq4WFS4cKCwYXiEuyL+sFx6/0805JJ9sO/buuzJ4qtrriol8iSJ6GTTHbzZkumdGkLRC5zoCjbQjK/0jF61JZKc0q1vYR0pzOihCqySJHTnpJ3X+aPecgKTTNZSvkileUR4RWpFNJBLUeXE2qBAd55Q3b9zA6fdP6/H56zGjV0f1eVNTHpfYgfuyXiIWDEGtF5OcaEMhnIUWSPKc+JaozapPolhjl1hij5VuLgLIYKezkNXmlaPWrJDJkaujJn4uAW0Bd4EnEe7Kd1UUciMeJdUqInB6FydTDblgOWe9PnoNY9ev63lzJHz83WP60FT4qecwT4DormzQiw9gIzcBOnnjSTlLjJPpiHRkkshsNieuiJDJqUd3p1ilWqMZ7PT3kFBDZEaaq6BvMWccxS2dqEtsd2SdMGzFKC2c38TR+vgc6+XLIxJsSNlM7Nkzp3VVKHiORXfDPCZoFVYsgmBCXFO4NQhm345ERxxJJGmOxLBJFdEFaBmpcu4oJHZp31iQ6YeMWjkNEYvs7siiIM0qb1VlhUS1RlaWZ2hssmp28MCKq1TKTWma4VeM8QeDHfdHv+qi6YwAly5e1PuXPA/VSrqlUgkXzp3D7NysDM29RQmmCPbjEO5LEQnG4loMv6RakUTcEh2RPpl0uQDtSHVNLEev7Cd7uzq0nxzozYtl5oRUjl4NofyWGPd1/fqY/vwc91UpV/Qn6FiZgcWuCldRrrLEDYLOQ50VAc+HP7Z17fo1zp/Q398vUQ0pSwodHR1479R7mJyY0LDJ78HbTwiG47rNRZtUWFMJnIouhX2E73fCsK6GiN+5fFpaV0rErdbqIjWUK1VdW10s17BUYbiOVKYdP//Zz/D6L17HpIwESf7ePXvw4h//kS5Ym/cpbhWOeO8CsF72xiSQP7ZVEcvfsmWLDF5u4rWfvobHH38cu++5B2NjYxgQUvsHBzWtnF4kfxOaLrQw7KK+/uVPG0+LELHAOFyz6qyR4luic51VOkv0rdEMegro5hNoMnrlCJbCRyNmJm9goTgrU5CMEF7VyuWPYdVr/PGrhApbE6xxX0Ivm1ZeYLS6nTt3YHDrIDo7O6XsaXR1deq7Fvv377e3tCS9sseMmtn449A4Fx8DdUn6DUYigY64OIGOvCTxidSBjk8kbxp3SDMqJG6RfnKwrwPFqTEszE1Jc1rX+SMrl7/4deLESfPjV3LceAWQUierw9WetwPxkhSWhwMZ835FHfryZt0sqWm5sxmzf0egwrQ+KiZkXZdCtuoJtc7XaqxqgYRWpHXXItQRGLdI3m0vSMV1aP9opiCTN8cwvHUL7j+4X9199+wQ/70YH7umv+euN3546A9UEy5zuIPgzVlLUGBp3Ep/6Ie9bBai0Hjrj4Bx1quIx7cGaxJIOBIJn0BHorM+ik+mE2eRzirbs+0YGhrEc88+jc898yQOfWIfnvr0J/H7v/dFHLr/gC4IsAL08Q536NuuD2aMifOajWyN6xwelA8Z61KhtA685xjOaSUR02naIIMF42y8Ih6/8UgcxKwHfjY3oKE4P924PxzwmN8M5KT5xIkTOHH8BAYGBvHQJ4/oL37Nzi+hVHb3IiW/7ptHcm5YNX451gdDA1uHS5dG8PJPfoKnn3kae/fu0wuPe2tbNr/lVK7IiJjE8beg0p06LeKvVYdHDC9seh3FPr7xz560vtZgXRa4GliBKzWrcYsMm9d2TcurnI9H6INLXHfNZXVJTpfpZPqxpSuLrnxa5ptcZ5WLQPqsmlwAfIyD/RefZb1V+kLqWeH0i6hj/Lyw6jOXceGtl/G977+C1155BT/4X/8R//21UVwvCvHaONg8Lr8JyNb9bR5um8B4f5hEoCPOJ9L1ja5/ZHOa5+0r9pF2sbyvpxvbGifw7k/+Hn/7t/8PPz/6Q7zyf/8L/sO/+0/4m+//ED95+bv4n//5v+Lvfvg2RtIyKLFlcqAdOGmC1rdsHAla27bi26RcxWN445cn8PaN7fjCi5/Hs0904uapNLYOd6DQlbIrNczkbkQzv8BeAAa+v7X4wBaYhNX6yTixapVqhewjzQpPLi/+aifuefgJfO6Fr+Irzz2GZ+7vRa7RiXuffAKf/a0v44XnH8HDuzpkwCMVSaZuq85cJpMxk53H6Z+/g2tzKQwdOYzt6WVkyvOY67wHe7bm0NXO7kKTepC87ri6K4Z9RWuxoQQ6q0wiME5coGNYLZJ3/e3Ug4TueBCHHn4Yn3lwN+7ZOYy923sx1NeDnbuGsXvHdhz41GEcemA/9vAdQTKYYG7rrT5T31Lm6VM4cbmGSmEY9x/oQn2xiGvHT2F25wFs78yiIFZnGm2fICsBcRR6xaIDIluHlligjyRS42QasctzIvro4ZYhDGzpQX++TS2UTSynIJ3SR3ZKn9gpg57hbQPY1ZNBwS7RZTNyDEvkilXH+ASy+W7G8vVzGK3kkeobxq7sHKZGTuGt4+PoPTCMbF0GOFUOygKKdBuS5sLBZlPQUgJJmkPcKklUkkUGJHIBXJ8LNVYZ3JPUux/ST4pwUYBPCmyRto2L5/l2SS/59IKxx10RCQl0jliewNjls3jv5Ps4PzqKkWsVdKSWUCzzN+NttoAzR1TMdcFNwKZaoBNHIhESGrXIcMQqgx3btFJ0sEMShbCO9jaZM6bR1VlAT4e9HykWyttY7iEsWuSKZPoRHJxsuw/3bamjevkYfnn6JhZ792C/NNedpXkss6nW14WFHRHXRPJPCQtIswGbrtVoOYFrgZN1JTFmgc6vT2KLaLOqfaWITDky/NXs8VGMjt7EnDRvJLG/O68W2c9nd+yjHiRYm1Vbr4F4MFYl05PeI/j8i3+KP/+rb+LF3/ocnj38GH7rW9/C1770GA72ywUE/kawG4XGEdclHKgF2HQCfUvUsLVATupJmrPIoEnVZpQjVTPQ4RyykC/hxshVjF48jQvn3sYP//FtLPDJgC7OHdm85sQis0KguSfJpwPUGuVs7WEVQfVSpyQ3kOro1UXuDs47ZVrR0deHvJ0yhHQ4ckSsFeof/VZMfOtxxy0wDr+JVRKFNJLXroQafyrVjZ0PHManf/uf49lPHcGDnTNYyOSlnzR3QDoK5iazWTzP6VMCvAPSHTwlIBcQj2UO2VzVLtIlSIRHEglz4vTqcNNa3HECtZ5oFtY0HHlKoFheul5C8cYI3jt1EVOLV3Hm+CWMTS8j29WPgS6gq1usbN8RHBByuGDeLmLufpjndTjQ4eMefJ6VL++Yh6/kYpD9hy2BTkQS+fKKtgI80ijOEfKMJbYWHzoLdDCVK65YXq5vF/Y++Qf41r9+EZ8/OIwhsayOXBVLxQqqbYM49ORDGJJBS7vtI3n3I7gfaW9ldbJZVZEmVqySz7fSIgu5lBK6OknrhWVvE/GhJNBYhUCu4La0WM3ALuw//DSef/4ZfPr+3djRU8P0+WN4681jOH7uGmZuXsZoKYOUWKwZ6Mi0g82ujlxz+qR5Ic/pB5805yORfMzDPqQsTWpe+0hapBzbHPkD8OBI3BwiP+QWaPoqIhwgMFTG3OQs5hfmUanNybxtDHMNjlg5YAmnISGJnH4IWbZp7VbJCZGd2Dk8iC29HejigEfmkZGHsPTIlor18OF400I6aS1u+3bSRuHihQv6zU9+pvLRR1d+l84vJnsst+Li0KjxA3jhrau4+M/uGP8ypmdmMHJpBFsGBvVdxUq1gRKf2ZEZe6VGYXp30Qhix2xCvCYl/b/4g8/ZQGvwobXAOAKLFCF5oUUa0pbdT5+LuLmkb4m+NbJ/5NvA/F7pkSOfxK4d29DX0yFNqnnKnM+0ukcieXNZR61SU+TPybqwCabxkSFwNQTEcuQqgx7n6kKATj/MbSync8SSTOeaFR4ZqdrnW/u5TCf9JKch3QX2lZKP/aQcTy3SF4dbZviD4yNLoG+RjjxHXFwckXGLdOKskqNWzh/NSJUrOny+lYMfvjJgLDJjXxmQQ9ljW75i1kb9ZhD5G2GBccSJjRPp/HFC/SY2eCRSBjskVN/IEmvsswvnBa63ZgyBAWIkbgZ+owgkYc515MUt0xEXD/tkOhIpHfqiqyGQFsn1Vk4/2E/yeVY2q8EXPSyZm2B4Ae44gVzE5nMoKY4SNgBxEtciM05k3CL5jiQtkXdASCQfidRpiL7/YayRi+Z6B8Q2r5uJDZlG6BNc5bK5n2Z16wG/tnThwnmcO3cOW7cO4ZFPPqIjylsFK57vNiQhfnou7EavBF0nTu8kPv3gA1W1Kp9aq5mphj69VjfTD7oyFaly+qH7kmnEV1s7jdgQAvmrLSdPntT3IXiFrxdMWyzOYW5uTvocaZ70ZZP1F4dfwuBT1Vu3bsUzzz1rtavD3z/9vvjE+WH6I0QGX88w73+U+c5HuaLvfSyVSaKQLCTyCbo/+cpz9mitwYYQ+NpPf6rPVw4MDgoJ/NzkB97lmkil+KmtKX2biB8J+uaf/ZmNWR3xsrkwXSeOOEdeEF62FikXDR/N18cbRdQa1SLp0iqNNXJB4Pee/4zuv1XYEAL5taULFy7gmWeftd8Lje9S+iH2P9I9sJn1f5KGv9ai/Ua9KlesVa4D7Lemp6fxnlj+9PQMXvyjF23M7cMR5iQgzur9sBMSqL9fwedU9ds4pnldEqssiTzzmRZ/6Me6HwgcJHDBuLu7W/si3hCNipC0eA2nT13C2Pwy2gN9FqXLv8Y7cgG8M+OnX1v4GRQeryDHu5VmezXEBzz+4CY+2HHiBjucdnAxgMKFczefbDU2bBTKK5RXo/OrMNCYxvUzx/H6OzeQ2TqI7ryMOhs2Dlk05icxc+0CLs2qIkBysxBaB6HNmVjBRsER6EgkYesh0h+16t0PksiF848SgUnggLp4/gROvz+C8fxO7N41iMGevP4YiLCgKXgDtpBLC9ESXrqJK5evY6JYkWgZFMyO49qlEVy+fBU3+AH1eSEsmdkNg0+iT+atWqR+LEnOrdVoIYFkaQynj53H5ZsV9AxlcPPkKVycLIG/FsBYB75AslxfwszIGZy9OoVipYHF6+ekX72Ic1euYvTsu3j9rQuYLPGhomjeVmM9RMYJ9C2y1WgdgazlmXMYLdYxUy+gcPMdnHjtO/jfL1/AjIzQpEZMOiasLWBhahTnx9LY+cAnsHcgj9ljv8Dp6xW077sXBwZLeP9USQZIfCnGfzuo9fAJ9En0iVzNGluNljah4A9Vtfeh/8BhPPPZ5/D87z6C7LFjGJW5Utkm4dftK+NXMPr2azjZ9TD29fBr9kCuK6evdS3MLaGRyaO3rxsZZW4z6UtGnMy4RfrhVqO1BG7pR08mhezSIkoyYEl396KnW0ap/OUcm0TG3ihs3YbBA3tQeeX/4I2JBiqiHjz4CPb2p1C+PoGbqQfwB398BD2SSb+5egfgW2GcPOd3YZ/EVqN1BLKiC4fw8N4Ceutn8ZM3TuPiqQn0P/U4htuledFEZcxOj0kfWUM9sx2fuX8KL/23v8PRs9MYu3weF44dxdHXfoQffO/7+M4/vIwTszLSlf1uZh+4HiSRSvLobzU2ZCL/y9dfl9Ejf/jjC5GJPE+qNj+OqelZTFcyKPD1sS3D2NrBExUalmtYnLyOybkKal3D2JGRQc9oG4b29KN46gRmGmlkh7ajuzqDxeIYbuaew9MP5JFT9tswOzuL48eP4+aNm/jDF/5Qj3mnEK9GTm+oa7UVtvQS0RPo2ooh/ozc7mFs27kT27rMI3yMW0YaHYO7sXv/Aewb6kSu/wAeeXg/hnsqmJuQpnNiQdcVG5C+Jc+fa5Xm6sNmfhbOCn3ZDAts+RGUqGVpVtrFcvSHHqNXqon3hdo0egc6kanPY3xkBKMTMhhK78S+3e3SPDGPZv1Qw5HYamwcgd4V51+FRlQtiOuThOkGcO+TX8Tv/P6X8cWnn8TjTzyORx/ciT7Zvbl5anaofY4+bfThM0t3Pq3GhhBIy+EtFt4T5Adz+KGeWxHeT+Rvxzfpa21iuTIhRvM+uYzGj+NVqhW9M/BxxYYMYl79p1f1jsTBTxzUe3Pr3SVT3e41SuubmprChfPnde3xL/7yL23MxwsbQiC/OX1cJuh8e5Zrm+vdJUngzVx3Q3dgYP03dNk88TYO0w8NDeHTTzxhYz5e2BACS6USlhaX1JxuxaL4qhjvI54/d14t9+FHHtb7hbcC3mfkmiN/w+njiA0h8INgREaZtODh7cM4fPiw1d7FerFxo9DbBAcg/MjcRt7X+zjhjhN4Fx8Mdwn8iOMugR9x3CXwI447T6Bdbmq77Sn9xxt3hEAunV29ehWLi4s6IeejB7yHxmU46icnJnWSfhdr447MA3nIo0ePojg3pz+Dw5UY/oQqvxzP996ffuYZbNu2bVMWgz/quCMWSGL4KZCzZ87oL4fxp3DOnDmNN/S3/JbQ1dl5l7x14o71gfc/8ACGt28PHv5hM8qnuh97/DHkP6bLYreDO0ZgT08Phoa26SI2V2FocdTtP3BgUx4G+k3BHR2F7t23Fzt2bNdBDd91eOjhhzblWcrfJNxRAu/Zc480ozuUwJwS+PCmPEfym4Q7WlvpVFpHm3v27sPu3fdoE3oXt4Y7fjvpxo0buHrlKnp7e3Hvffda7V2sF3ecQH3GpVzWvo/N6F3cGu44gXfxwXB3xPARx10CP+K4S+BHHHcJ/IjjLoEfaQD/HzO6QdSkkPEiAAAAAElFTkSuQmCC)
physicsGeneral
physics
A stone of mass 2Kg is tiod to a string of length 0.5 m h the braking tension of the string is 900 N, then the maximum angular velocity the stone can have in uniform circular motion is
A stone of mass 2Kg is tiod to a string of length 0.5 m h the braking tension of the string is 900 N, then the maximum angular velocity the stone can have in uniform circular motion is
physicsGeneral
physics
A granophyre record is revolving with an angular velocity
. A coin is placed at a distance r from the center of the record. The coefficient of static is. The coin will revolve if
A granophyre record is revolving with an angular velocity
. A coin is placed at a distance r from the center of the record. The coefficient of static is. The coin will revolve if
physicsGeneral
General
A shell of mass 200g is ejected from a gun of mass 4 kg by an explosion that generates 1.05KJ of energy. The initial velocity of the shall is
A shell of mass 200g is ejected from a gun of mass 4 kg by an explosion that generates 1.05KJ of energy. The initial velocity of the shall is
GeneralGeneral
chemistry-
The oxidation states of S atoms in
from left to right respectively are
![](data:image/png;base64,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)
The oxidation states of S atoms in
from left to right respectively are
![](data:image/png;base64,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)
chemistry-General
General
A 0.5 kg ball moving with a speed of 12ms- 1strikes a hand wall at an angle of 300 with the wall. It is reflected with the same speed and at the same angle. If the ball is in contact with the wall for. 0.025 s the average force acting on the wall is
A 0.5 kg ball moving with a speed of 12ms- 1strikes a hand wall at an angle of 300 with the wall. It is reflected with the same speed and at the same angle. If the ball is in contact with the wall for. 0.025 s the average force acting on the wall is
GeneralGeneral
maths-
Two forces, each numerically equal to 5 N, are acting as shown in the fig. Then the resultant is -
![](data:image/png;base64,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)
Two forces, each numerically equal to 5 N, are acting as shown in the fig. Then the resultant is -
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOsAAAD+CAYAAADbEfL9AAAgAElEQVR4nO3deVxV17338Q+H6TAcpsOMAjIozkqs84SKEpwQNXFsjInJbZ6mSW9ub3Nvkt60z9ObNumYNDWNTatmcI6gGDU4oigqERXEARUFOcg8H4Yz7OePRJtEUUT0cOD3fr34h9fem98Gvmftvdbae9koiqIghOj0VJYuQAjRNhJWIayEhFUIKyFhFcJKSFiFsBISViGshIRVCCshYRXCSkhYhbASElYhrISEVQgrIWEVwkpIWIWwEhJWIayEhFUIKyFhFcJKSFiFsBISViGshIRVCCshYRXCSkhYhbASElYhrISEVQgrIWEVwkpIWIWwEhJWIayEhFUIKyFhFcJKSFiFsBISViGshIRVCCshYRXCSkhYhbASElYhrISEVQgrIWEVwkpIWIWwEhJWIayEhFUIKyFhFcJKSFiFsBISViGshIRVCCshYRXCSkhYRYcwm80YjUZLl9GlSVhFh6iqquLatWuWLqNLs7N0AcK6Xbx4kdTUVM6fP09ERAQvvfSSpUvqsiSs4r41NDRw6dIl0tLSOH78ONnZ2bi4uBAaGmrp0ro0Catos5qaGi5fvkxWVhbHjx/n8OHD5Ofn09jYyOjRowkKCrJ0iV2ahFXcldlsRq/Xo9PpyM7OJjU1ldTUVK5cufKd7Tw8PAgODrZQld2DhFXckdlsxmAwUFtbS25uLqtXryY1NZWioqI7bu/p6SlhfcgkrOKOysvLSU9PZ926dRw8eJCGhgaampruuK2dnR2enp4EBAQ84iq7FwmruEVRFAoLC9mzZw/79u3jzJkzFBUVUVlZedf9vLy80Gq12NraPqJKuycJqwC+DmpzczOHDh1i06ZNHD9+/J4hvSkgIEBa1UdAJkWI73BycsLHxwcPDw/s7Nr2We7n54efn99DrkxIyyoAsLGxQa1Wk5iYSFhYGIGBgWzbto38/PxW71Vv8vHxwcfH5xFV2n1JWMVthgwZQo8ePejXrx+/+93vyMnJQVGUVrcPCgqSMdZHQMIq7sjT05Pp06fj5eXF0qVLqaurw2Qy3XFbrVaLVqt9xBV2P3LPKu7I1taWiooK0tPTaWxsxNHREUdHx9t6fD09PdFqtTg7O1uo0u5DWlZxR8XFxRw4cICkpCRaWlqYOXMmPXr04NKlS2RkZFBbWwtAYGAgnp6eMmzzCEhYxW0aGxvJyMggKSmJK1euEB4ezpIlSxgyZAjZ2dl4eHhw5MgRdDodPXr0wMPDw9IldwsSVvEdiqJw8eJFkpOT2bdvHz4+Pixbtozx48fj5+dHWFgYvXv3ZtWqVSQnJxMWFoa7u7uly+4WbJS7dfOJbqe5uZlXXnmFjRs30tTUxJgxY9i4cSMuLi6oVF93cSiKQl1dHcnJybi5uTF06FCZF/wISMsqbjEYDHzwwQekpaVRW1vL6NGjefXVV78TVPh6TNbV1ZXp06dja2uLk5OTBavuPiSsAoC6ujpOnDjBxo0buXLlCoMGDWLevHk89thj3wnqTSqVCi8vLwtU2n3J0I2gubmZS5cu8eGHH5KdnY1WqyUuLo5p06bh6upq6fLENySs3dzNJ22++OILtm7dislkIjY2lscff5zw8HBLlye+RcLazdXV1XHw4EE++OADTCYTffv2ZdGiRQwfPtzSpYnvkbB2c6mpqXz22WfcuHEDFxcX3njjDaKjo2WSQyckHUzd2IkTJ0hOTiYzMxNfX19WrFjBsGHD0Gg0li5N3IGEtRsym81UVFSwbt060tLSUKvVTJw4kUWLFuHj4yOtaicll8HdjKIo6PV6tm3bxu7duykvL2fo0KEsWLCA3r174+DgYOkSRSskrN1MY2Mjubm5/O1vf+PatWuEh4cTHx9PXFycpUsT9yBh7UbMZjNXr15l5cqV5OTkoFKpmDt3Lk8++ST29vaWLk/cg4S1GyksLGTnzp1s3ryZpqYmFi9eTHx8PN7e3pYuTbSBhLWbqK2tZd++faxdu5aWlhbGjRvHnDlziIqKkg4lKyFh7QZMJhNpaWkkJydz+fJlevTowYoVKxg6dKhMJ7QiMnTTDeTm5pKUlMSRI0fw8vIiMTGR+Ph4PD09LV2auA/SsnZhZrOZ2tpaNm7cyMGDBzEYDIwYMYIXX3wRd3d3bGxsLF2iuA8S1i6ssbGR/fv3s3HjRi5fvszw4cNZsWIFwcHBcp9qhSSsXVRTUxPnzp3jl7/8JYWFhQwZMoSEhATGjBlj6dJEO0lYuyCTycT58+dZuXIlFy5cQKPRMGfOHOLi4nBxcbF0eaKdJKxdUH5+Pjt37mTnzp0YDAbi4+OZNm0aISEhli5NPAAJaxdTVVXFwYMH2bp1K5WVlQwYMICFCxfSt2/fO76eRVgP+et1IUajkczMTLZv387Jkyfx9/fn+eefZ+jQofLYWxcg46xdSGlpKWvWrGHPnj34+PgwdepUlixZIktbdBES1i5AURRaWlr405/+xJEjR7C1tWXUqFG8/PLLODk5yXhqFyFh7QJqampISUlh165dlJaWMnLkSBYuXEhkZKTcp3Yh8pe0cnq9ntzcXFatWsXly5cJCwtjxowZTJw4UR5762IkrFbMZDKRn5/P9u3bb72eZcaMGcTGxspK5F2QhNWKVVZWsm/fPj788ENsbW0ZP348s2fPpn///pYuTTwEElYr9sUXX7B69WoaGhoICgripz/9KQMHDrR0WeIhkQ4mK7V37162b99OXl4egYGBvP766/Tr108WierCJKxWxmw2U1BQwKZNmzhy5Aienp7Mnj2b+Ph4PDw8ZJimC5PLYCty8/nUzZs3s2/fPpqamhg1ahQLFizA398fOzv57O3KJKxWpL6+nmPHjvHRRx+h0+kYMmQIs2bNYsSIEZYuTTwCElYrYTKZuHTpEr/85S+5evUqXl5ezJkzh4SEBEuXJh4RCauVyM3N5eOPPyYrKwtFUVi+fDlxcXHSodSNSFitgE6nIzU1lS1btmA2m5k7dy7Tpk2jZ8+e0qHUjUhYOzm9Xs/evXtJTk6moqKCgQMHsnTpUvr27YtarbZ0eeIRku7DTi4zM5OkpCROnTpFcHAwixcvZvTo0bi5uVm6NPGISVg7qZvLMq5evZr09HRcXV2ZMGECK1askOdTuym5DO6kGhoa+Mc//sG+ffuorKxkzJgxvPjii7i6uspjb92UtKydUE1NDRkZGaxatQqdTsfYsWOZM2cOERERli5NWJB8RHcyzc3N5OTk8O6771JYWEhgYOCt51MdHR0tXZ6wIAlrJ5OXl8e2bdtIS0vDwcGBOXPmMHnyZAICAixdmrAwK70MVoAK8o/lUlBSTc2t79sAbvQc2J/QIG88He6wq76MsqIrHD1X8q1veuEbEkqfwT2441JNxiaovMiBMzpq9S3/+r6dIwQOYmykN14uD/5WhrKyMvbv38+2bdswGo2MGzeOJ554gqioqAc+tugCFGtkblYMtUnKb6YOUfp+ndxvvmwUHEYrz608qJyoamXfwsPK4feXK6GhoUpPf2/F09VecbCNVsYv+ouyvaxeMSiKYv7+PvUlinLgv5XHxw1Vgvw9FVeNs+LoplUCooYpoT/bqWRerX7gU2publY2bdqkxMbGKvb29kp4eLjy5ZdfKjU1NQ98bNE1WGVYTU11ytU185XJ/b0U1bfDaqNSGPyfyh9TzytltyXuG2ajYmxpVGoqS5WclPeUXzwRofTzVym2geOU4T/erFxRFKXltn3MimJsUvQNDcrRpNeUpc9MV4at+L2yM7dBqdYbFKOptR/Wdjk5Ocq8efMUtVqthIWFKW+99ZZSV1enmM0PfmzRNVjhZXAzRmMRJw40MWbF71jSry9Rt95fbQMugYSG+ODR2iw8G1ts7W3ReDgQMfYJ5hQfJ/dqNblZWeTs+YDFf+jBxuWD6eHxrdlBNjZg64iTMwwKCiIs0pZSVTSjw5zROH598d1eZrMZvV7Pe++9x9GjR/Hw8CAmJoannnoKZ2dnmU4obrG+sOoraTmXyieq0SwYNp4pw8LxbkcnqY2NCkd3X3y8PAjpH0V4dSlN1zL5au1bvBf0a56dFEGkz+0HdrZ3QK3WYG+rwa0DOmdramr4+OOPOXDgAHV1dcTGxrJ48WLpUBK3sbLe4BYayvPJSt5IRn4eB9K/ZG/WKU6V66l7gKNqwoYxclIc83+gxXB2J5/9cwv7z+ooaeqwwu+ourqajIwMVq9eTUFBAYMGDWL27NnyfKq4I+tqWY1VlBflkLT5EI2XD/G3y3tJy5nBpMnTmTKsL8PCQvFTg/39XjlqIhkwPor4MTbszXuPC3s+IblvL3y83YgdoMX1IZxKc3Mz586d47PPPuPMmTP4+fmRmJjI5MmTZTqhuCPraln1FTSUXONshQ/OGi88qsq5uv5vfPDKj3nhjQ/5OKeaUr0Jk9KOY/sMIGTcEt6a705Pj8t8+ed/smHDQU43tGDu4NNQFIXCwkK+/PJLNm3ahEqlYv78+cTGxhIYGNjBP010FdYVVk1vese9yienT5Oyezf//O1PWTaiDyFV1yjZ+RG/nfEU/zyu45q+fYd36xHFhNc+5+Ux/kS4p5O8aR3vvX+Y4o49CxobG9mxYwerV69GpVIxbNgwli1bJuOp4q5s33zzzTctXUSb2ahQ2Tni5OqKl1ZLUGhvBo8dRt9QNapL6ZwsKiFfH0SfPkGEBLrRlv6funM7OVnrjZ1vP8ZFuGPvpKXnQHfqTl7i+tlcztXpybePYM5gv697fUuyOHy1iUJVLxYNb18ruGnTJtatW0deXh69evXi17/+NYMGDZK3Poi7sq571m/Y2NigVqtR+4fi6e+H1ssVd7WJ5j//g31H9nL64nCi+wXhdt+3fipsVBoCB87myWdvUGvcxMacfez9xJV3g99k8TBPvB+gbkVRyMzMJDk5mdOnTxMUFMQPf/hDRo8ejavrw7gzFl2JdV0G35ETXqHRjJ23nBce74OnXkdpeR1V7e7JtQF6MHjmPOYvnMbkEDOVx7bw3gd/Z09uJWXtvMQ2Go3cuHGDdevWcfToURwdHYmJiWH+/PloNBp57E3cUxf5D1Gj8Qhh8typ+GhcOuZywX0wE2Ym8tQPJxHqXMfl9f/Nqs1HyLhcS73x/g6lKApVVVV8+eWXbNmy5dbzqfPmzaNXr14y8UG0SRcJK2DvgE1QKJGOajxUNh1zYsETGDvrad5d3h8HW9j/9v+wfmc6WZX31918c5jmF7/4BcXFxURERDBr1iymTJnSEVWKbqLrhLWlGaXgCufChxMQ4U+Ie8cc1jl0EAPnv8TPh9jg43SB7dt3c+BA9n0dIysriz//+c8UFxej0Wh49tlnmTp1ascUKLqNLhPWxoYWso5cZmBsLAPCeuJl2zHHVdl74B05lqf++AbTA91xratHr2/7DfGFCxf44osvSEtLw2w28+yzzxITE4NWq+2YAkW3YUW9wQ3UXD1BTuZx9tUPZOaUiUT6OeFir6f2+kUuHj3GIc9YEidEMTDQlTs9yvpdZqCG2uoiiq844OhZQi2+3P7OQDscnAMIH7eUp5/XUfuPL9jbxopramrYu3cvO3bsoLm5mUmTJpGYmEivXr1kXRpx36zoP8aEvvw8uQfX8MHBUMp0xQzs4UJAoBuOLXU0VjejmbCImCg3PO7xOl2TvpLqqydIO3eJcwey+Sr3OnZlTnzqfh3fnkOZ1t8HV8dvN80OQATjnn6Kkuo6qs7d8RH17zCbzRw5coSUlBQuXrxIVFQUzz//PP369ZPphKJdrCisbmiChtEnOoZx+/aT9unv2QsEDoph7PSFzJz5BLP823YkQ42O62n/4J2PzlOjtwfq4fTn/KUwC6fH/5sRvTy+F9ZveI9l3g9LqT5Rw0lV658IZrOZoqIiVq9eTUZGBv7+/sTFxTF37tx2nbkQADaKorRnJq2FKCiKgmJWuFW0jQ02N7/u8zhm8x1O3UaFreouR1KUW0+7q1oZcqmvr+d//ud/2LBhA5WVlcybN4+33nqLoKCgNlcoxPdZUcsK8E0oH7jz6Ovj2LbnON98KLQW54qKCnbv3k1SUhKlpaVMnz6dJUuW4Ovr+wD1CtGFeoM7g4aGBk6dOsX777/P9evXGTx4MDNmzGDYsGHY2z/4C9VE9yZh7SBms5nc3Fw2btxIZmbmrfVTJ0yYgJeXl6XLE12AhLWDFBYWsnPnTpKSknBwcGDatGnMmDGDXr16Wbo00UVIWDvAzedTk5KSqKurIzIykpdffpnevXtj264bYyFuJ2HtAIcOHSI5OZkzZ84QGhrKa6+9RmRkpCx3ITqUlfUGdy5Go5Hi4mL+/ve/c+LECXr16kViYiKTJk3CyclJnqYRHUrC2k6KolBZWcn777/P0aNHsbOzY+LEicyfPx9Pz3vPcBLifsllcDuVl5eTmprKhg0bqKqqYtSoUcyaNYv+/ftbujTRRUlY26GhoYGTJ0/y97//nevXrxMSEkJiYiITJkyQCfrioZGw3iez2cz58+dJSkri4MGD2Nra8swzzxATE4Ob2+3P7AjRUaQZuE9lZWWkpKSwYcMGXFxcmDt3LnFxcTLvVzx00rLeB4PBwJYtW9i+fTsmk4mhQ4fyox/9iNDQUBlPFQ+dtKz3IS0tjZ07d3L58mUiIiJ45plnGDRoEGr1PR6gFaIDSFjbwGAwUFxczGeffcZXX32FVqslLi6OmTNnolarZTxVPBJyGXwPZrOZiooKtm7dyq5du2hoaGDSpEksWLAALy8vCap4ZCSs96DX6zlz5gxvvvkmpaWljBs3joSEBAYOHGjp0kQ3I2G9C6PRSGZmJu+88w51dXWEh4ezYMECxowZY+nSRDckYb2LU6dOsWXLFjIzM1GpVDz77LOMHTtWxlOFRUhYW3H9+nV2797N7t27MZvNzJo1i7i4OAIDA+U+VViEhPUOGhsb2bdvHzt37kSn0zFgwABeeOEFQkNDcXC49xuJhXgYZOjme4xGI+fOnePTTz8lKyuL8PBw5s2bR0xMjLSowqKkZf0Ws9lMfX09v/nNb/jqq69wdnZm4sSJPP/88xJUYXES1m8pKSnhr3/9K0ePHqWhoYGZM2eybNkyWZFcdAoS1m+Ul5dz6NAhPv74Y0pLS5kwYQIzZ84kKipKWlXRKUhYgaamJk6dOsW6deu4ePEioaGhJCYmMnLkSFmXRnQa3T6sZrOZvLw8duzYQWpqKu7u7sydO5dJkyYREBBg6fKEuKXb9wbX1NSwdetWtm7dikqlIjo6mueee47g4GBLlybEd3T7lvXzzz/niy++QKfTERkZydtvv01AQAAqVbf/1YhOptu2rEajkfPnz/P5559z9uxZ+vfvzzPPPEPfvn1l4oPolLplWI1GIyUlJaxcuZKTJ0/i7e3N1KlTmT59ugzTiE6rW17rlZeXs23bNpKSkmhqamLixInMnDmTkJAQS5cmRKu6XVjr6urIzMxk5cqVlJeXM2DAABISEhg5cqSlSxPirrpVWM1mM1lZWXz66aecPXsWJycnXnjhBXnfr7AK3Sqs+fn5pKSksH37dlxcXHjllVcYOXKkPJ8qrEK3aU7q6urYsmULKSkpODo6MnHiRObNm0dgYKAM0wir0G3+S1NSUtixYwfFxcUMHDiQ5557jvDwcFmWUViNLt+ytrS0cPHiRT777DNycnIICQlh9uzZTJo0CXt7e0uXJ0SbdemW9eb6qR9++CHHjx/Hzs6OadOmsXDhQgmqsDpdOqxVVVWkpaXx4YcfUlZWxsyZM5k3bx7+/v6WLk2I+9Zlw6rX68nIyODtt9/GYDAwbNgw4uPjGTBggKVLE6JdumxYMzIy+OSTT7hy5QparZann36aESNGyHRCYbW6ZFhzc3PZsWMHaWlpODk5sXDhQmJjY+XyV1i1LhfWqqoqUlJSSE1NpampiREjRrBixQp69OghyzIKq9ZlwqooCkajkfT0dLZu3cr58+eJiopi+fLl9O3bV5ZlFFavy4yzmkwmSktLef311zl79izBwcFMnTqVhIQEaVFFl9BlWtaSkhLefvttrl+/jtFopKysjK+++oq0tDRMJpOlyxPigdkoiqJYuogHVVxczM6dO/nVr35FaWkpI0eOxGw2U1JSQq9evZg8eTIJCQn07NlT3gIhrJbVXwbX1dVx4sQJ1q1bR0FBASNHjmTRokW4uLiQnp5ORkYGH330ETdu3CAxMZHBgwd34OtFzUAdxRfPcf7KRfJ1FdQ0eaAOGMbsuCh8nez/9Qs26THXnOfYkROcu66nxs4Pn4gBRD82iL4auPVm4uZSKgqzOXH8DHllYDR7Ezh4MIMHRxClldeidmdWHVaTycTZs2dJSUkhPT0dX19fFi9eTFxcHAEBAQwfPpzk5GQ2bdrE2rVraWxsxMHBgSFDhjz4faypkZba65w9dZyM/Uc5diWXgvImjESijfZl/KRItDfD2lxDXdFpjqat58uj57lUBNV23riEX+ZcRQOLxo8g3FOF2q6eyksZnNi9mc2Zlyksh6qr9bgMi2HyEwtYGjOSEPeO+M0Jq6RYsZKSEuXnP/+54u3trXh7eyvLli1TioqKvrNNU1OTcvLkSWXcuHFKUFCQ8sorryg3btxQzGZz+3+wsVlpKT2tnEv6mTLBQ6sEeIxTZjz7R2XNzguKTvf9jQ1Ky+V9ysH/naXYanyU5Wv2K2dK6pWqK7uVVb+apfToFaksXluuXKgwKobm40rK/y5Xnh42RXn90BWlvuWK8tVfJyvzhzoq/ac+q/zqYEv7axZWz6rD+rvf/U4ZMGCA4urqqkyaNEkpKChQWlq++w9tNpsVg8GgpKSkKBMnTlQiIiKU1157TWlqamp/YK/uVY69PU+Z5BuoOD32C+VX63KVnOsNir7JqJhM39/4onL80/9SloREKQ5Pb1BOXqtSDCazYjY2K1ePfqL8MdFTcfV8Wfkgq1A5vf9t5Y15CcqI2LeVXS1GpVkxKi36Pco/n5uqjBkwQ4n5w4n21Su6BKu8DDYYDKSmppKSksK1a9cYMmQIP/7xjwkICLjt8tbGxgY7OzvGjBnDjRs3WLduHdu3b8fT05Mf/ehH93//WnWC1K2bWLnyLHm2U3j1D0uY2z+YMHdH1Hf4bdZknyDr6H4ybByJnzwFXw8NdiobwIGAwF6MGvEYLds2kZQ6AxvTWcpLdRicHLC3t8UGsHfqRWCwFz6ndJQV6Nr9OxPWz+qGbpqbm8nLy+Of//wn2dnZ9OrVi1mzZjFu3Djs7OxaXUTKw8OD2NhY4uPjcXR0ZP369aSlpVFTU3MfP72Kc/u3sWvHMS7Y9WbqK8/z5IhehGvvHFSo4XpuNmdPXadBHczQKC8cHf71YeKg8cAnvA+hNjfIzi2kqgEcHBUMLZVUVILZDOCLl78GbU97cJF5zd2ZVYXVZDKh0+lYv349+/fvx97e/lYAvb2977l/cHAwcXFxTJ06FZ1Ox7p16ygqKkJp6+jVjZPs/fIgewpscBsXx9PLRhPuYEfr75oopSi/iIKLLdjZeePlAd9p+O0dsHNzJwCoOX2BJrUWl0ANxqpc9mZcoMJowthQRmWFDbZuIfSPDm9bnaJLsqrL4MrKSg4fPsyqVavQ6/VMnz6d6dOn079//zYfo0+fPiQkJJCZmcnu3buZPXs2PXv2RKPR3GUvBWim/Mg29p/K55LXKOKHRRFSlc3JS3rMigJqN9y8/fD31eJ1cyi3pZSKklpKS22x8VOjVsN3Gn5bW2wcHHHCBpusi9QuHUfIY030vpzJvm1rGOUcR6gpl6NXNbj6DSF+bFg7fmuiq7CaltVkMnHs2DH+9re/UVZWRmBgIMuXL2f06NH3dRxbW1tCQ0NZvHgxzc3NHDhwgCtXrtxjLwNQyM7Pd3Pt8nUie0Kw01lW/+8LPB43lcmTJjJ+/r/x/F9T2FXYQovp63hTXkZFXS2laHBwCKJnENh/++PRyQkH/wDCbPi6dfYcwdSlK3jrP0cxPvdd/j0hnun/tY+8x2Yx69+XMNn3vk5VdDFWE9bjx4/z+eefk5WVhbu7O6+99hpDhw5t14wkd3d3Ro4ciZ+fH0eOHCEvL+8eexiAa1y/YKCuCqpqoNljCAm/3cCJrNPs+eT3PBdqomTlO7z1b7/mnQyoa2nXaYJbPyImv8Fb67P56lQ22Vvf4w9PDGe4VzuPJ7oMq7gMLigoICkpiT179uDm5sYTTzxBTEwMWq22XauS29nZ4ePjQ0JCAlu3biUzM5Po6GjCwlq5zDS2QNk1ChpaqPOLYcSImcwf2Z8wHw+cfCDQfQ6exioc7LewMiuVjetHM6v/BHrfq5CmJgxlpRQocCvbKgfsnbX4OGvxue8zE11Zp25ZFUWhqamJrVu3kpqail6vZ8SIETz11FMEBga2+6VnNjY2ODs7M3v2bNzd3Tlz5gzZ2dmt72A2Q0M9DWYzRpce+AWE0dvfA2e+niao9gwkKmYUo4aHE1pVxLWDmVxrNtCkcUPj5ESrk46MRsyNeupQMPt74uqqxqVdZyS6g04d1ubmZtLT09m8eTOXL18mKiqKxMREoqOjH3hCvr29PYMHDyYyMhKdTsfZs2db31hlCxo3NLYqWv148AkhqGcwQ9QGFF0FNSYTBo0fWq0bvhoDZlM9dfU3h2O+YTRgaqinHDCGB6H1cMXjgc5KdGWdNqwGg4HCwkLeffddcnJy8PT0JDY2ltmzZ3fI8W+2rkOGDEFRFPLz82lpaeVG084B/CIJ93LEHQMmgxHDbRu54eLhhk+ICpwcsbexQYUPvj20BIQ20txyjWuFYDD+aw+zvoEGXQF5ioJDWDA+Hm7crU9adG+dNqzFxcVs2bKFPXv2UF1dzZw5c1i4cCHu7h07kz0sLAwPDw8qKiq4du1aK1s5A2MZHuuCv1JKTXElZa0d0FWNakAoPeztUONLWJ8o+gx0pbnlIlcKwOe4vDYAAAt0SURBVPCtlOv19RQXXUNRFCYPG0JIgF+HnpvoWjplWGtqajh69CgrV66kqamJhIQE4uPjH8r6qT179sTT05O6ujp0urtP5xs6IhYf/2JOnU1n14HvxbXyEgV5l8it8GDwpFGEODqgBjyjRxI9aiKP1dWzZX86dfrGW7voG2rQFV5HYQ4/GOpJgAzNiLvodGE1mUykp6ezZs0aSkpKiIyMZNGiRURHRz+UdWl8fX3RaDQ0NjZSWVl5121dopcxZ+IIwivPsXvtJjbklmEwKVB5ibM7tnDgRCn1/WfzwpwwvJzsUAG2Lr0ZMmoKi2YHUZH8JhtOnOdqTRP1lw6QsXMbq7P7Mf6nrzAhzA8/WSRA3EWnG7o5ffo027dv59ixY2i1Wp566ilGjx6NVqt9KD/Pzc0NtVpNS0sL9fX1d9/YZwATZi/BZLObvVnpJP3pGpdC3FHVN9NSU4dNn4nMGTmLKRGu35qC6IZ35CgmLqzgmeqPOL1hFTXpfqhNZVRU2xH++L/x+NKR9NOqkEfLxd10qrCWlJSQnJzMnj17sLW1ZdKkSSxduhQ/Pz+amppoaWnB1tYWF5eOG+BQq9XY29tjMplobm6+5/YBwyYz28OTUN9tbP7yJCdugJkQ+o2dwpTHR/KDgcHcNn/BLZiA4fN53dnExyuPkJN9nTrvcPqOmsELCXH08/7eNEQh7qBThFX55jWiu3fvZseOHRQWFjJu3DhefvlltFottbW1XLlyhdraWgICAujbt2+H12BjY9PmdVpdI6IZ8+Noxvy47ce3d/ahx/AX+a/hL7azQtHddYqwGgwGrl27xvvvv092djbR0dEsWrSI/v37c/nyZdauXcuOHTvo2bMnL730UoeG9caNG9TW1qJWq/HwkFFO0XlZPKxms5mioiJeffVV8vLyCAwMZPTo0bi4uPDqq69y+PBhdDodlZWV+Pr6Yv7OrIIHV15eTn19Pc7Ozm16zE4IS7F4WK9du8b69es5cOAABoMBDw8PLly4wJkzZzh//jw6na7DA/pt5eXlNDQ0oNFoCAgIeGg/R4gHZdGwlpWVcejQITZs2EBVVRVqtZrKykp0Oh2lpaWPrIa6ujr8/f3x85NJCaLzslhYa2trOXLkCFu3buX06dMANDY2UlBQ0Oo+RqORhoYGqqurO6yOgoIC9Ho9Dg4OmM3mDj22EPeiVqtxcHBoU+fmIw2roiiYTCaampo4fvw4a9asYdu2bW3ev7q6mpycnA59q35OTg4Gg4H6+noOHjzYYccVoi2Cg4MJDQ3Fw8Pjno97PtLlMxobG7l48SJr165l165d5Ofn09jYeO8dv2Fvb3/rk6ij6PV6DAYD9vb2HfimfiHaRq1W8+abb7JgwQJcXV3vuu0jbVnt7e3x9/fH29sbg8FwX0GFr4d4DIbbn3fpCEaj8b7rEeJB9ezZ89bEnHt5pGG1tbXFy8uLxx9/HJVKxenTp7l06RK5ubk0NDTcc/+IiAhiYmKIiop6BNUK8fB5enoyfPjwNoXVYqvI6XQ6rl69ytmzZzl+/DjZ2dnk5eVRU1PT6hKNMTEx/Md//Afx8fGPuFohLM9ivcGBgYEEBgYycuRIEhMTSU1NZdu2bWRnZ6PT6aitrcVoNN77QEJ0ExZ/RE6lUqHValmwYAGrV6/mnXfeYfr06Wi12ru+YV+I7sbiM5i+zd7envHjxzNw4ECWLVvG9u3b2bRpE6WlpQ+tY0kIa9GpwnrzvUhOTk64u7sTGBjI5MmTSUtLY+/evTK0Iro1i3UwtZXRaOTChQtkZWVhNpsZMmQIgwYNsnRZQjxynT6sN918ONxsNt9z8FiIrshqwioswYixuZ7y/GJqFfjXgJottnbOaHsG4u6owu5OfYBNlZRW1FBR2/Stb7rhHaTF3U3NHeegGRpoqKmkoOx7r9dxdMXJ3ZtQbTdf8vLRr98srEexUnzuQ+UFRwfFz85Osbv15a1495ir/PZknVLU2Mqume8prz4Z/a19HBQ7u4XK65u/UvJa+3H5e5TUt2Z+a59vvgZMV8a+ffQhnaP16FQdTKJz0Rdc4eL2jWw2GKg0K9wa9XbzxLbfGEYE2+HW2jTtvk/y4m9imbE8l0sZyWzbsobUCztZ9V4Qdio7/s+cQdz2qH/gcEY8/SeOTHyFrB2v8/t0NwaNSuDJ6ZMZHCGPL0pYRSvqqdSVcOWcI9N+u5qRWhs0N/9bHNxx8u/HQHd7nFobqXf2ITDUBx9ff3r5OOJWmc7x6wVcz9rKuo0aHN3ceHVy6Hf3cdCg8dPwmLsXPW/0YU1VJIN+MIop0WF4qB/muVoHCau4s6orXNXpOOgwgRVPLSHaU4VLO/5b7J3d0faIoF+ILz0HaFDO5FN8aCtb3DT083uG6f002Kq+e9OrslHhr3HH0T0QdzeNBPUbFp/BJDqjZqovZHI6M4O9ehU1eRlcuFFBSZOR9i47i8qGwFHTiR01lAHkc+HLDby7/iiX68w0P7y39nQpElZxO9MNzpw8TvqGTyjc9Dozf/ITXt+YSsr5QvJrG2m883MW96CCgKn88LknSZw+CJsbF8ha81c+zixH12CkXYfsQtrynjEJq7hdeS6XLhRw+irQ3AynT7PnjRW8tPwn/GzVHva3uipXG0TN5/G4iTw/qoYqXTq/n/P/2JWno6SjardSVVVV99xG7lnF7TxHEP+TYHrP+ClXr+dTcvoLtn12gDPnD3HovRqMFwtQfvl/mOoL9vf7cW/rQNiEJ0nQ6ykp+hOf5m3id/8biuO/JzJ3dK/WF57u4g4fPnzP5UwlrOJ2Dl74h3uhDe5N/5rB1A2LYkD0ePZuWsvuIyfJ2OeCQ+RQ+v94OEFqu9YXmG6F2iuCATFz+WFNCYUvr+PEgY/5sIcGB/UslkT7P5RT6uzasu6whFW0yt7eHk9vXzy9fQkeOJBgbxUa57WsTz/Hkc93cXrBUDwC7PCwvd8jO+IW2J/hict5/sR16rdncuaLDWx01xDqMYuxQQ/jbKyf3LOKNvKkb/xTPLFkPrMjbDFczeZcqQl9u59cdEPj/QOe/PVPmDehPyHlRzm6/RM+2H6cK9Vgkh7i20hYxX3wpM+AYYybMqpjLsnsXCFwDv/58yeZPDaC+pxd7P/H/+XPh+qpblaQvH6XXAaL++PugZtvAP24xH1f/bZmyLO89HQFNi3VrNyXw6afvUj4C16UNN171+5EWlZxfxrq0RuhOGoEQ4Ps0HTEK5wdNISMTyQ+bjKPB1RRdn0/f1m1i4LrFR1w8K5DwiruS2VxFVW1Cn2mTyfqbnOD75ODNorouAQWLJ7CIGMV+XnX0evvvbh1dyKXweJ7Gqi8cISzxQb0rpEM6RuJn8vX36+6dJ6c/DJqtP1YOnYgvvZt+QcyYDbVUlddSnldEdX6KJpxxfG27ZzxixpNzJONVJy6wR/35lDU8Sdn1SSs4lsUoJaiYx+yOukq55ym8cziRIb6g5MHVBzZwxWTN5oxM3miDetZG+vLqCi/ysVzhzl5Jo/zBalk9HbCw3EwId6+hHl//51aPgT2mchTb9VwaflbbHK63xHcLs7SD9SKzqf45AfKO0uGK/3t7RX7b74ee+JV5Z1t55Tz5W0/Tvnhlcrvf9j31jFufQ1fqsz74GTrOzbVKMrenylT3vhE+cv+qw9+Ql2EvNZF3MbYVE1NZTU1tU23nrJRa7xwc/fA1ckBhzZ2A5saq6ipqqK09nvP6qjd0Hh4EdTas2+KGfTlFOgd0bg44+ksLSzIO5iEsBrSGyyElZCwCmElJKxCWAkJqxBWQsIqhJWQsAphJSSsQlgJCasQVkLCKoSVkLAKYSUkrEJYCQmrEFZCwiqElZCwCmElJKxCWAkJqxBWQsIqhJWQsAphJSSsQlgJCasQVkLCKoSVkLAKYSX+P4FOAI9dq6AWAAAAAElFTkSuQmCC)
maths-General
physics
Two masses M and M/2 are joined to gether by means of light inexcusable string passed aver Z, fiction pulley as shown in fig. When the bigger mass is rekasod, the small and will ascend with an acceleration
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAKkAAACkCAYAAADsSw7xAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAABSUSURBVHhe7Z0JXJTV+sd/LAPIIqB2BVkEFFFJ3FKxcr/ulpp7XbfKtMzymqXmcvur9/NJcrk3vZq5a2lpbrkmdtNCU9DKDU1l0QCVRZR9Bpj5n+fwUt5SA2fhneH54ssM57yDzLy/9znnOec5z7EzCMAwKsZeeWQY1cIiZVQPi5RRPSxSRvWwSBnVwyJlVA+LlFE9LFJG9bBIGdXDImVUD4uUUT0sUkb1sEgZ1cMiZVQPi5RRPSxSRvWwSBnVwyJlVA+LlFE9LFJG9bBIGdVj9GrR0tJSpKWlobSkVPw2+ie+MRbFIL60RUXwDwiAm5ubUmo7GC3SnJwcvDnpDZQUF8PdwwOOjo7gVdKWpVirw+kfTuM/K5ajXWSkUmo7GC3S27dvo2+v3ohs3x5t2raBhxCqXq9XahlzQ5cvMyMTa1avxqIli/HkU08pNbaD0SK9c+cOXh77IkaNGYOnOzwNd3d32QVgzI+dnV2ZSDMzMWbkKPzfvLniGnRQam0IEqkxZGdnG4YNHmKIPnTIUFhYqJQylkSI1NCtcxfDd99+q5TYFibx7umOdnTUwFGjUUoYS6IRn7u0qsrPtobRzb2wpBgxdBj69OuHp556Eh41a1pFc+/o4CCbSuo/3/sB2IuLbWdvD714D2q/6DSOopd90gzMmDYdCz6Issnm3iQiFc09HnvsLwhrEgZ3N3dx4dUsUrI4BuTl5sJBCNXZxUU+kiLpo9AV61CsK4arqyvsHURDY9zHY17IeuoNuHv3LkRTj4WLFwnnta1SaTsYLdKCggKsXPERioqK4OzsDHthhVSNvLB6fLl7N2rVqoVmERGoXbu2tKg6nQ5JSUlITEiQFqmmp6e0qGqHbrrc3DyMHDUSwcHBSqntYLRIrZURw4ajcVhjjB47BkHBQbJMOH44HH0Y+/buEZ7yPNStW1eWM1VLtZwWleO44t6kL73htzFdvWg6ycqWPeexXrXAc/f/046QbBm1wSJlVA+LlFE9LFJG9bBIGdXDImVUD4uUUT0sUkb1sEgZ1VOtRUrhbQ4URKJAgSaqjz2ohlTLK1IuxGKdDrl5eXIJDC0mpFUGRYWFMtTQxcVZnsNUPdUmwITm4mnRIIUWpqen459z58koqCfathEW1BEFBfnw9vZGYkIi4uMv4JXx49EwNBQ1a9aU5RRYzFQNNi1SemsUSpibm4vUlFQpvgvnL+D8uXNSrDVq1JACdBGPRElJiTz3jqijBYX1g4LweLNmaNmypRBsQxljSmu4qJvAWA6bFSm9rRuiCd+xfTuio6ORkZ4BP38/dOjYEZGRkfhgQZSMJR01ZjSChBiJwsIiHBbnUqjes/0HyFWYx2K+w5WrV6WgO4rXUsxmXR+fskBpxiLYpEipj3nwwAF8snETvLy90LlzZzz1dAdhGevDyclJWsJRL/wNYY0bY7QQaXBIiHwdWV2KJ92/by9mzZkDPz8/GcydlZWFE8ePY+eOnfL58BHD0btvX443tRA25TiRw3Py5Em89fcp2L1rN0Y8PwJz3nsPw59/Hk2aNpFNNYmUEliUc+8tSvdr+T1L55CYyYL6+/tLUb43by7GvvwSjn//Pd58fRJ2bt8hl5ow5sWmRHos5hiWLFosxfXyuJdFk90fjYW1JOfn3qGlijQevz+H0teECkeqrxDruFfGSSu6+dNPsWXz5rIUQ4zZsAmRFhUV4sD+/di+bRt8fOpKz7x7jx7w9PJSzjAdZI3btGmLCRNfQ2Nhnb/++mts2LBeOFt3lDMYU2MTIv1a9CO3f/EF3Nzd8ObkyYhsb/58SE2aNBEW9RWENgrFvj178dmWLbJPy5geqxfppfiL2Llzl+g3BkiBljtBliAwMBBjX3xR5sHa+vnncmRAq9UqtYypsGqR5uXlYcH77yMwIEB46WPk0JCloREAGsbq1LkzFi9chIvipuFcWKbFakVKQlj98So5xNR/4ABhQatuvTk5US8Kr5+s+PJly+T4LGM6rFKkNDN04fx5HPrqKwwZOlQOylc19erVw5SpbyEhIQHxF+JRXMxDU6bCKkVKSRz27d2LJk2bomHDhqqIXKIZKHKmuvfoLj3+K1euKDWMsVidSClQ5PLly3LQfuiwYfCuVUupqXpoAqD/wIG4/PPPuHTxolLKGIvViZSmJU/HnYKXlxdatmppdHSSTEqmYIr5eLKmtevUxrXkZKTfSldKGWOwOpFSmN3Zs2fRtVs3o5t5en1BfgHy8/NlGF9ebp5JhNoush0yMjKkxWeMx+pEStFMyUlJctbHWJEWFhQgNjYW27/Yjh3iOHr0iLTUxuaBatX6CZmOMSkpUSlhjMGqREozOtevJcuM0o3CGhkl0uKSEiHKo/ho+XL8Z+lSrBCPUe8vwKqVK4UVzKzQ/P6DCBcOHc3nX792XSlhjMGqRErLO/Ly8tEgJMSoZpmCmnNF8075SH8vRho6SvnlF9GfvKWUVB4KoqZgFOpCUIA1YxxWJdLs29nywvsF+CsllYes8a5du2ScKEVL3e+g7MmnTp2ScamPin9gAFxcXJCRmamUMI+KlTX3+bK/WB5J/yiQpbx4IV7OWFF+/PthZ28n+72UsvxRcXN1k8tNeKGJ8ViVSNOF0xQXG4dLFy8pJZWHmneaDJDN/INEKsrJ0hozB5+SkiLHcq9c5kF9Y7Eqkd6+nSW88ZM4ceKEUlJ5aMC9vpJ+/EFePE27+vj4okYNV6Wk8ly/fh3HY2JwkQf1jcaqROpg7yA3j3B2clJKKk+NGi7o2bOn3MyBuFeoZF3pZ4rCb9uurRyUf1QcHct2NuGl0MZjVSI1BbTGPqJ5c/Tq00dGL9EwVrnDRM8p8r5nr17yHBaYOqh2Ii3ntYmvyb04KQ6UplgpUQRNs86cPQtT33lbljHqwDpF+gCHp7I0b9EC02dMx9oN67Fm3VrMnT9f7t9EQ0fGw369qbBKkdKOezqtTvnp0SEniqKofH194SOOOnXqyD6vsdDQVV5ertHTtkwZVvcp0oXXFmlx7tzZB3rnVc2ZM2dkjAFnOTENVilSmjX69ui3qhVp7MlY3Lx5U1pqxnisUqQ00B4XGysf1QbdOBcunJdTqmxJTYPViZSGivSletzOvi0j4GngXU2cFU09WXruj5oOq/skaarSo6YHevToiY0bNsi93tUCWdGDBw+iRYuWMr6ghBfjmQSrFCnldhrw3EC5xv2nH39SRUIGsuhHjxyR2Uw6duqE0EaNoGORmgSrEylNXTo4Osh93Yc/PwKbNm7Eqbg4pbbqSLh6Ff9a8i+0adsW4eHhcvpVrY6dtWGdHScZwGSHgc89h6CQYOzauQs//vCjUml5KKxvxfIV0psfM3as7I4YE0HF/C9WKdLyaHqauhw1ejSyhRNFuZiuXbsmyy0JZSvZ/OlmnD51CqPF3xLRvCxRRalw7hjTYJ2W9B7CwsLQu3cfZKSny8zOZNUsxc0bN7B161Y5HPbMs8+i3zP9lBqTzdwyAqsXKTFoyGB50OrMZUuXyRhOWr9kNoQlT0tNFf3hTYg9cRJ9+vXFO9OnwZ7HRc2CTYiU6N2nD96eNk10Vw2Y/e5MuUaJIvBNCXUzyItPEtZ6zuw54maIxysTxss8pYz5sBmREtT0T58xA527dsGsd98V3vYSJCaabu17yi8pWPrvD/Hq+AkICQ7Bu7NmyVA/xrzYlEgJimSiTHszhEgpzc3bb03FdGFhD+w/IIM+Kgt1G8gpWhgVhUkTJ+LnS5cwcsxo/G30SIRYMGFvdcaqtsjZ/MmnmDVzJlq3bo1tO7YrpfeHBvivJV9DvGiSf/rxRyQlJKJUr0dAYKDcPKx27Vpy+MrTw1OuDiVoKXNefp7M43Tr1i0hyJ+RLJ4bxOsC69dHixYt5KZj9Ds8PT3lax7EHGFlN6zfgOEjRmDBB1FKKfMo2KxIy6EBdbJ+l8SRkpIqkz5QmcZJA31pqXhe9vZJpmXPDNIBon1HqY4i9oOCg9C4cRNERET8Kug/g0VqOmyuuf89FOhBeUxp4H/SG5Pw8rhx6NCxA5pHNBddg8fkPk0UiU+L5ug5ifLx8HC5cx7tfjd5ymQMGz4czVs0r7BAGRNDltRa+HTTJ4bgwPqGwQOfU0rUy+yZMw2Bfv6Gd6a+rZQwj4rNW1LG+mGRMqqHRcqoHhYpo3pYpIzqYZEyqodFyqgeFimjelikjOphkTKqh0XKqB4WKaN6WKSM6mGRMqqHRcqoHhYpo3pYpIzqYZEyqodFyqgeFimjeqxKpJRa0WAw8KrNaobF193TVt606UFlNz6g7RQ//+wzmeamaXg4li5bipKSUpn76c+gXKY6rVaupw8ICJC/y9zwunvTYXGRUnKGL3d/iUOHDsk0NQZDxfJ40p6gaWlpMrWju4cHHn/8cWlVy1M6PAx6bXJykkwK8fcpU9AuMlKpMR8sUtNhcZH+cv061q1dK/dhenXia5XbPURYxPKGvjJ/NiV/OBYTg7NnzmLipNdlLlFzwyI1HVUg0l+wc8cOaRXfj1pgsjyilKmEmvX7pQF3cnJCzHffYe+ePWjXvj0GDhyo1JgPFqnpqBLHiQSlUXaLIwGZ4qBcT8ePH79vXfn/I3eos+w9yZiAKhEpGe9yA17+/A+HrNMj6bN3sHjHGZy+IU9HbnIMDiychvmH7kInurMF+XmYPn06dgjrTHsnEb//XYT+nueMdaHSISjqewoFlqYi6UwMDsdcRUqW6Lvqb+LKsaM4/N/TuKHRIDe/AIsWLUJCQoJ0pMhzZ2wPFY+TUt8yHQWuAXARzpWTnRBpVgZuJKUj27UBWjd3haG0GKtXr5Z5Q3v37i1fxdbS9lCvSElrRcWwd6shHSK7ohwUG7TQOrvByaEG3ISbf/nyZdSrV08mtOV9k2wXdYpUCNAgrKcuMRUOLSPgVFwE3ZU4pGYn4JqHDxy9I9HM7g7eeWsKunTtiv79+8sBeraitokqRUpjoaUleqQlAo+1DMBjuIjTiQbkpOrQyisHKQFNsfXfS2AvLOzYsS/KvigL1HZRnUipaUfxHWQmfoONx1LgoKsDP/c6aNzUBRm3EnFkzwmkZcZj3Zq1WLh4CUJDQ8teJ78ztojqREoG0eDgCq/ANhgx7jk08GyFF14djh6dWuPJvuPRoFM/ZB5ZhtffeA2+hT/jsy0H8X3iHeTfMxvF2BYqbO6FSu2c4OJRF40aBcDd2RP+wX6o7e2N1IxC/HAlCU8EumNUt3DEpQDa1Gh8vnkfDp68RWaYhWqDqNNxEkKlPmb5QeTn52PL5k9w7sxPeOPvb6FuvUDUDnsS3br7oiA5AQkXUlCJKADGilCpSH9D9lEF27Ztk1sxdv9rNzzduTsMdVugU6sg+Ic1Q+uWYQip56n+N8M8ElZxXePj47FlyxYEBgZi6tSpSqlAr8XNYzfh26I5wto0FG9GWF6lirEdVC9Sau6nTZsmh5kmTJggg1Okc1VajLyL0Thm3wbhDf3RrLYeJbzFvE2iWpFSM08CnTdvnozmHzRoEMLDw8sqddnIOhaF8ZOXYtOHszBl/GxEbY3FNXvhOLHnZHOo2pKSUGmHOrKkHTp0kGXSj9K4w6vFaLy39EMsjFqADxa8iRe6hsNPnkDfGFuiSkRK4pOxncrz+x3ldUOGDEGXLl1+XZdEVXb2Gmhq+iO0cRgahoaiUVgQ/Op4wEU54X6/qzyetPxnxnqweGQ+7Rm/ZfNmnD9/HrP/MUc25Q/DSaNBidyo9tE7nLRn6JFvvsHh6MN4pv+zGDZsmFJjPjgy33RYXKS0Rff6deuxe+dODB02VArQ3DhpnHBB3BSpqakY+9JLGDR4kFJjPlikpsPizb2bmxuaNG2CVq1aya26RYNs9i+y1kHBwejVuzcaNGig/CXmxs4o68/8hsUtqTVCsaq0YLCi/VlanTp75izZrRk0eLC0pEVFRUptxTEIkdPFoe5Kde5Ls0grQFxcHNZ8vEoGVzsoDt/DIEHRUm2ypDSuW555paLQ6+m11D3RaouwctUqeHl5KbXVDxZpBdi/bx/+OW8+evbqCR9f3z+3auITpVRAcuJBdGlks18JQ0iZXbIys3Aq7hRyc3OwZv06+Pj4VFtryiKtAHu+3IOVH63A3Pnz4edXT/ZzzfmhOQqRUhqiXbt2IfpQNNZv3ADfitwctgqJlHk4QqSGoYMGG9LT05US81NQUGBYt2aN4a9duhpEsy+6p3qlpvqh+rl7tUDr9mmUQHxmZj8I+r8sMTxnDbBIGdXDIjULotcq+o9/7EGWlTOVg0VqFvTSo/+jc0Xl7KdWFhapibGz0yH7wjf46qvvEXv1NgxkUcl66ktQcOlrfHnwOM6m5EArraryIuahsEhNjAHOqOWdjrhNy7F2YzROyPiZUpQWX8W+qHex7mQBckpc4EICZaNaIVik5sDZFSEBWqQlJeC/R3JFgQ66+JNI1hUjUwjUzq4sDTtrtGKwSM1BqSMCO3ZBfZdS3I3Zh/MFWlw6cwehTf3g4ebE6qwkLFJzIPqfpT4d0SbEG8F392PtoXM4gwi0/os9XDXmna2yRVik5kCbh+xMR4S0aoDQ+qX4YfNROLV8AvbComrz8qAt4UH6ysAiNTF2wknKSU1D8uVLuOXdAL6dR2JA02C0D72D5Ewt8m8l405+gcy+yt59xWCRmhiaafaInIxJE57BgCdC0TSiOybOHIYgV3+0n3MIX304CgOaecJeToEqL2IeCovUHDhooNE4wtHBXm5wRs/thY110DjD2YnK2YRWBhapObgnWOTXQxaX/1x2GlMxWKSM6mGRVhDKKl2+bt/cB6HRaGTwM8MirSAGFBYW4kbaDWRkZCAzMxOZ9GimIzs7W+4YmJV1m4YLqj28fKQC7Nu7F/PnzpNLov38ZDIfsyLXOGVl4fSpUzIv68pVH1dsbZWNwiKtALR57rIPlyIgMEA0w2XbQJoTEiOF+uXk5MDVtQamzZghc2KxSJkHQks5CgsK5HCSJaFLQ8J0dXWVK0+rKyxSRvWw48SoHhYpo3pYpIzKAf4fPLqiEA/maHYAAAAASUVORK5CYII=)
Two masses M and M/2 are joined to gether by means of light inexcusable string passed aver Z, fiction pulley as shown in fig. When the bigger mass is rekasod, the small and will ascend with an acceleration
![](data:image/png;base64,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)
physicsGeneral
biology
Mark the correct sequence -
Mark the correct sequence -
biologyGeneral
physics
Two bodies of equal masses revolve in circular orbits of radii R1 and R2 will the same period Their centripetal forces are in the ratio.
Two bodies of equal masses revolve in circular orbits of radii R1 and R2 will the same period Their centripetal forces are in the ratio.
physicsGeneral
physics
A given object takes n times more lime to slide down 450 roagh inclin a practly smooth incline. The cofficient of kinetic function between the object and the incline is
A given object takes n times more lime to slide down 450 roagh inclin a practly smooth incline. The cofficient of kinetic function between the object and the incline is
physicsGeneral
physics
A car travelling at a speed of 30kmh is bought to a halt in 8 metros by applying brakes. If the same car is travelling at 60kh it can be bought to a halt with the same breaking power in
A car travelling at a speed of 30kmh is bought to a halt in 8 metros by applying brakes. If the same car is travelling at 60kh it can be bought to a halt with the same breaking power in
physicsGeneral
physics
A 7 kg object is subject to two forces (in newton)
30j and
The magnitade of resulting acceleration in ms-2 will be
A 7 kg object is subject to two forces (in newton)
30j and
The magnitade of resulting acceleration in ms-2 will be
physicsGeneral
physics
A block of mass 4 kg is placed on a rough horizontal plane. A time dependent force F=Kt2 acts on a block, when
of friction between the block and the plane at t=2s is.....
A block of mass 4 kg is placed on a rough horizontal plane. A time dependent force F=Kt2 acts on a block, when
of friction between the block and the plane at t=2s is.....
physicsGeneral
physics
A particle of mass 2 kg is initially at rest. A force acts on it whose magnitude changes with time. The force time graph is shown below The velocity of the particle after 10s is
![](data:image/png;base64,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)
A particle of mass 2 kg is initially at rest. A force acts on it whose magnitude changes with time. The force time graph is shown below The velocity of the particle after 10s is
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAALYAAABsCAYAAADHVUhNAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAABw2SURBVHhe7Z15VNRXlse/tUBVsS+yCbKj4oYLKtEsbhGTmI6JZjFLZzHdSXdPOt1nTveke06n+4+c0z1JOpPpM5nOOpPFpLVdYoxxAxVFRUFQjCAg+2IBshcUWy3z7uOHElGoFQp9H48H6tWPX/2q6vt779777rtPZmZAMOYYdFqUn9iBnaeb0A0NAmJmYMbMmZiVEI5QHxVk0nG3DWYjzA2nsH17Jooa9DD7hCMyYQbmzJmOuKgg+Cqk4yxECHs8MbajpqAAVW2AOjQeCbHB8FVKz92m9DcWo6iiEa0mX4RExyIuzAu2fCRC2IJbkuuEbYbJYEB/v4F+g8HInpK7QaV2h1IuGzI8mmHo7UafUQY3jQZu9AQbSgyGfva3ZsjkcijcVHCzcvgQCBzFdcI2oaelGtVlVajpcoOvlzuM/e4ImTEVYb5qqOgQswG9+nZcabgCXVsz2lVsCI0JRqCHHq3V1ai8rIMiOAyBGn8EBnlCpRx6Q9wck8nEf8rZTSEQ2Mt1KpJDLauFtmg/3vxSi4joyfCtzUNBvQ5N/QNHdNaW4mLGUVzSxCLSdBBv/PR1/N+RYjTBE2huR1tJEa4ET0L/mS04WNqF1r6BvxuJ7p4e1NbWorKyUmoRCOxjePeoVEDBzAuN2hOBk3zge8da3BPljzA39pyZGfbl57CnMBCLw5TwCJ+OR1bLkPHZXnybWYv+SQHw9fGDt8YNEYs8cPKLw2jXtg+cdwTKS0uxY/t2HEpLl1oEAvsYLmy5AnJTL3oun0fWka3YdaYbPX2ygQNritFSXooqzxh4MLNFpnCD/6JXsCmpBqUn9uLTg1fg4ePOzAkllP4xUF06AZmeufyjkJubiy+/2IwzOTnoYb23QGAvw4XNDGKZ0h3uvmGYEpuEefFeULtLVrKuA706Hbo9fAYey+SQecZhyYaNuNu7CpXpW/FVYT+YWQ2z3Bee+gYojCPbIi3NzSi4UID6+npUVVVh/9590jMCge0MF3ZnO5rrGtDUrYRXVDJSZvnDSy0d5uMNN29PuHd2sAf96NJWoqy8Eu3Bi7B8TQoWRhpRW94MI3tWJtND7x4Ak5xsmJtzWatFQGAAFi1aBG8fH7S0tMBopDMIBLYzTNgmsze8/aORnOiFzi4K7A0hbCqCIuMQpy9DK+va+wz+8PMywNBjgHvcGqQ+9QwenR8KbyZt45UK9E2/AyYPX+mPb0xAQADuvucerF6TiqSkJCy9aylEaF1gL1ZP0LSWF6IwtxBuazZgoTe3XIZh7m1Ha8527JE/jDVJAQj2lJ64CdRLH8/MhI6ZOU89/bTUKhDYznBTZBT8Y2ORfF8KPKsb0Huje8LcB0OfDrV+a/BYit+ooiaMBgNMzPwQJojAUVgtbEANlVcEEhODoZbdoL+WucPNKxyzZkyGWky2CMYJq5XX0dGB0kulkMtvZIRIMMGP+LxA4GSsEnZfXx9OHD+BLVu2SC0CgWtilbCrKqtw5PBh5ObkQKvViuiFwGWxStj5+fk4lZWFtrY2fPftHiFsgctisbDJDGlubuKRC5JzYWEhent7B54UCFwMi4XddOUKnx185sfPIDYmBg+sXYuuzs6r6aYCgSthsbAnh4dj3vz5WJSSgtlJSVi5aiUmBQWJ/GmBS2K1KuUyGUXzBAKXxmphc39R+IwCF0fYEYJbEiFswS2JELbglkQIW3BLIoQtuCURwhbcklgtbJPJiP5+qciIQOCiWC3s4OAQzF+wQHokELgm1gs7JBjJycnSI4HANbFa2CqVCr5+I688FwjGG+E8Cm5JnC9s5mwaDEYYTdcSTMwmw0CJYoHASThd2D3a8zh75jwKqtthYI/N/Xq0leci51Ir9H0il1vgHJwobNYj16Xh6/25yPjyTfz9/Y/x1vYcNJ/djP/KUEN9/G/4IkeL6m7AXUF5sDLIFaJSvMAxOHerjo46VOvc4K7bi2+OdeN8NvBQ3AVkLfsLfm16C79NX4RnNy7HrLA+pKcd4WsqQ0PDYDabsGzZcpw/fx5XrlxhJzIjJCQEiYmJyDyWCZlMhn5DPxYtWozOzk4UFhRAoVTC3c2Nl0vLyjqJrs4uZv4YERcbh7DJk3Hi+HEo2TG04ifljjtQW1ODqupqKNnNRM5w0ty5OHn8BD+vQq5AwrSp/Of58/lwY+fVaDSYPWcOii4W8UKaKrWKXVMogoODcTYvj5ecUKvc+WvNnTePvY/Qgc9AMC44V9hkadCYULcfhwu6kJmtR1j5QRj+/AV+3vsOnnjdE5t+sQ4LZ6iQceAwKiqrsGTJEr6uMi4+DtrLWnR1dfJTeXl7I4SJqLy8nIvIZDQhMnIKenv70NBQz1fyKBRKxMbGoqqqkrfTWwsMDISPjw8qKyv4MSZm60dFR6G9rR2tra28Ta1RYzITZGVFJZ+AohsnKCgYMrmMX4NCIefiDg0Lw5XGRnTp9XBjN4mXlze7Li/U1dZBrVZjx7ZtuHz5MtY/ugFrH3yQX7dgfHCusAljCyrPFKDVfzJ6GqtR8NHH6P7Ll3il+01s/PMkbHr5R0iepkBGWgYTcdeErd1HuzHs3fMdCi5cYDdAKO5/4AEsEPH+ccOpzqO5swbn927D/gItSuvN8DF2I2RmIJoK61BX1IaQxDj4BfpAznpfWpozUWv30aLmr3fsRELCVNy9bBlrkSEvN4/33oLxwanOY3/1Qfzzu1zkZOzFgZ3bsbdEj7iHlsG7MBdnSgKwdPUsREW6w9Q/cYtRUgkK2omBbPD4hHj4+/sxO/9uxDJTavs/t4m8mnHC+abI9dDL9bajDX7wVXFzmdut5Nx16HT48bPPSgdODMgE+du77+KPf/oTNB4euFxXB/+AAN6Lp6WlcRv/vvvvZ3a6iPiMJU6PYw+DlKz2ha964NeJDG0tQibI0888w3dj6OntQXFxMapZO5WruOeeZTiVdQoVFRXc2RWMHWMvbI5lez+6Mu3t7SguKuYmyJykJB5dMRqM0HXooNfr+TFTIqfgiY0b8QlzmJtbmnmbYGwYJ2FPfPLP5fP4+Y/WPcTj44TZZEZvXy8MBppjBTc/pidOR8odKaxn34HGhgbeLnA+Qtg28P3336OsrBQzZ83i8e9BKJadOGMGwiMipBZw0d+7ejX6mBOZl5fH64sLnI8QtpVQrJ3KKHswR3Hlvauk1gHIHPH08OSpvUOhY1NTU/nkUv65c1KrwJkIYVvJ4UOHoGI9c/LChbzc21DIts7NPTMwO3odCVOnIjIyiu8GQftaCpyLELYV0H7vJMro6BjExcVJrdegqXgyPW4W2lv74Frem9PNIUwS5yKEbSGUPPX39/6HT74sXLRQah0OnxUYYWrgIeZs0pT7Rx98KLUInIEQtgUY+g34eudOzJo9i5sUg1GQ6/H08uTCn56YKLUMx9PLi68ZpbWj/9yyVWoVOBoh7FEws566trYG55jTt/TOOxEUFCQ9M5yenh4eAiSTZSRiYmMxb948lJWXobioiGchChyLEPYoUD449dbLV6xAeHi41HpjaAlcQ0MjOtrbpZabQz0/3Sg7d+zk6bMCxyKEPQLk4OXm5vK5/2XLlo2a70ExEqVSYdFKIHIiU1JSMGnSJOzft4/PZAochxD2CFy4cAEXCwvx2OOP8xj1aCjdlHxFja+Pj9QyMu7u7jzPhPJLKM2VTBmBYxDCvgmlpaUoLyvjob3RTJBBqBeOjonhe/NYisZDw8Wdffo0zp09K7UK7EUI+wZQaC/z6DFmHnTgkQ3rpdbRoXWWp0+dRhm7KawhISEB06ZNY6PDRVy8eFFqFdiDEPYN+MdX/+Cmx7p166QWa7AtwrHukYf5QmLKS+/U6aRWga0IYV9HEesx29vaEBsXh/AIy0yQQeQKOXx9ffmCA1t4ZP16Pnu5efNmqUVgK2Mi7J7ubvb/2i6+xqYSFDcMpHYSrhLFpTWX33zzDRN1LBYkW19RlpxBsscD/P2lFuugCAmVhiBx79r5tdQqsAWnC9vcfAy7dx9BRl4Te6RDR/kxfHOqBc2nd+NYeQc6TICSrkI2kL88nnyzaxf8mShp4QBl5FkLLTSgfeapPIOtzJgxA/PmzUdRURFfyCCwDeevedR+hH99swWhSQ/iN+uMyN72Gbb4vIpXze/gv7s24qn7kxGnaUH64WN8xm7FipWs5zQgICCA2ZwG6Lv0fEGsWq2CDxvmyf7s6enl9T8o+kAOW0trCzw9PUfM0bg5Axl6nV2d2L3rG7z08kt8ZtAWWppbeEw6KiYaS5culVqth97jcWZrFxYU4oVNL8DPxhHgdmYMFvNm4G9vV8AvaiHum9GE3e98jI4/bsavDG/i6f8IwqaXHkTyNCUOHziMs2fPISAwkAuUkvipWE59fT37ojtZewBiY+NQU1PNBUSrVGj2LicnByXFxbj77rttWhFOTmKXvgtll0qx9kcPInXNGr5gwBbaWtuQkXEEEVMikJx880QpS6DJoQ/f/wDTp0/H8hXLeY6JwHLGQNiH8O5bVQiImYdVCY3Y/uZmuP/n5/hp97t48o8abPrFw1iYqELGwcOs1+ziMV1LoZUsW/+xhWfL/csrr0it1kOzfrQu8YUXN8HPz09qtR5ahEC5IrQynZxPe9Gxnvv3r/0Ozz3/HC/BdrPkK8FwxsB5HBjqzSYVPDReCJ4kR1uLCebWDngEh0LNbFm5eWAFN8WPrSHrZBYaGhrsrpNnYD09vTY5j/be5Y7sJci8+uWrv8T2bdtw4cL3UqvAEpwv7KY61JcXo6S6CabJU5DywCw079mPfQc6MXt1EiJivGHus75gTmbmMR5FoEKRcpl9b4MKWgYFB0HBzBI2hEmt1tPf14/amlo0NztmRTqZSfEJCbhjyRJkn8rmEzgCy3C+sH1W4SevvojnH50Nb88wRNyxES/dn4CEtT/FY4sjEOnBBDGkKLylZB7N5HkZq1NXIzo2Rmq1DRriqZorH+qvW+5lDdTr9/R084W7joJCf6tTU3nl2LzcXLS2iExAS3C+sN3DEDc9AfFR/nCTuUHpHYH4GbGIm5mAcG83UIDPWl3T7BwJkSqyUi/Z1EShRNshR7ShvgEGO2sHulOuSHT0iDnbtkDOLImbHMqDBw9IrYKRGAMb+0Yo2b9rWNNHUq28Q4cOIXlhMsLCwlBXV4s6NvzbA62Q0Wq1XOD2+NJyuYzbxerrVqk7AlpjmTQ3CdrLl3E046jUKrgZ4yRs2yDhUZleEk/ElCm8zc3NnWfI2QNNhVM0hCaIaOi3FQo3UoVVZy0cWLJ0KZ88OnL40KirdG53JpSw25hgvt29Gw8/8sjVsBzlZkwKnMR/txWaCicTgoq72wPV5yNzQd/dLbU4Hqq5TaUfvvj8c3Q78XUmOhNG2H3MBKmproFKpeb5GIPT72R/8llHO6AwH81eGtmIYNvs5TUoknF9vRFHQjcyCZtuxvS0NLE44SZMGGHX1NRg//59fMcD+lIHqa/XoqKyQnpkG0OdR3tkTavUFy9OQXx8vNTiHChu/+RTT+HA/gN8QcRELZjvTCaEsKlXItvVw8OTVzAdagf3M8evr69PemQbvJgkGxG442hHZ0vXeelSCU8DcDYUFXph0yZ8/umnN6w8dbszIYRN09S0/vCBB9dKLdcICprETJNrRSBtgTZXoogDLe2yp8AxZffR5Iyuc2BDKGdCJs/ceXP5DmXpB9NQIcT9A1xe2JTLTVvX0S5dNxri3d1V0NiYtDQI9dSOKMxO5yGzZqxMAxI37U5GBecpGYxSZgUDuLywz5zJ5T3g0rvuklp+SEdHu91T2GTKXLp0if8022Flu7m78RLCgQEBUovzoa3+Vq5cxXNmjmdmSq0ClxY29XxFRRehVLrxzUtvBG1g2tZuX09FPa0jNkEip5YmUoKZ/TuWzEmag5iYGJQUl+CsWOnOcWlhZxw5wle0jLRMi/I77I0/kzNKohxwSm23sWlRBPWaVLZsrCGThMRNm6iK4jsuLuyc7Bwu7JHCZ3HsOZqNswcvT0+sXLWSLwezIyjCIbtXxv6PB7QgYd78+fjrW29LLbcvLits2uV22vRpvN7GSNTV1aG8tEx6ZBu0RvF45nG7Z/IGnEcjc0THJ65MS8gWLEjmWY9bt2yxOr/9VsK1hC3Fpw1GA/fyqTceup/LjaDh394i6iQAOgf9tMd59PD0wOKUxfy6xwvaJ37lqlXIZU43hUlv18kblxE2yYmGceLIoSOYOm0qIkYRNUHhNSo0YxfsxbmoaYLGdl0PxLGbmrhDO16Qn5AwNQGrmLh3bNvOR7TbEZcRNnfcmLBo3eDJEyd4iV2yr0cjJCQYkZGR0iPbcFe58zJj1xxI26DZSwob1mu1Usv4QA71vamr4evnh0NpaWMyE+pquIywqbfmi2EvFCBschi3Ey0RGYmfjrUHNyXFn8MHVtDYgUwu47OXSjujNI6APrtNP3kR5eUVfHfg2y0T0OHCHpx9sxbK1mtsbET6oXSs37CBC8QSiotLkJubJz2yDSq/QMn7tOsXN0dshN4DZd95amwrceZovL29sf7RDbw8xTEXXpxgq2ZGwqHCJkeFlmlZG8el3qW3pwfd+m7e+1KxHEtNAoVCfjWF1Vbolai35q9p4eveCLoZyaQJCbNv1bwjmTt3LmJiY/h3cj4/X2p1Leh7p+JAjnR0HSJsutuysrLw+9dew2u/+S1zoKyb4qYijq1UGqyrk9cVsVTUBAlSaaewaa0imUIDSVC2Q/kmVOvE1Ry2Rx97DMGhIdi7d++YJGhZi75bj48/+gi/+NnPeamJlpYW6RnbsbtgzqWSEnZRH/MtLag0F0UXKF+YKjkR105Ov1HunAxyJROi0QATvbRMzntrcrjIDqQtm3n7aLBjSNS0DItyPKh8wkDc1jpp0j00uCCYyjnQLCaJnD4Wfj4LbzI6iq6D9qzx8vLi5+rrH0yntfZ2MQ98Tuw66CannuxaGNKac5mhkCv4ebTay+jo0PEtsiksSW0UxbHtvI5i4PqoMNCZnBy+0IM6OfJ3Nj75FK9AMDT33hrsFnYru7toRy3aNP9sXh5Pxpm/YAFS16Ty54eeXU7VJ416XLlUDWPMLIQoDbwgZVNLK7MDi3hUYdmKFXxx7WjQXi9dXXoubI2GVtVEoLOT6kpb/wWReOgmMRj6mVmj5IlVcvaBazQaq2xulcodRnYzVFVWsffSw/NGrP90B25Yora2jo9iVFuEBEDXZ837IxONahKSc6xSD4xKNKromU9RXVODxOmJ/HRUMMiWz80RUEdSV1vLe2zyT2bNno2ZM2cyDc1HVHS0zWamw0qc0QQHDcMN9fXsC43n+c3D6G1HY0E2CpQhMDWYMXtFEoLZdXcxQR49eoyf44mNG6WDR4Z60xI2WlCSPf0d9URUv89eTp8+zYdC2q7O2gpTdFOTA0zCpOuhL8oWKC5fVlrGelZPXsSnrKyMXw85g9ZAJuJ7772HNffdh2lTp/I2Gplo1Q2tGaXrXbx4sc21Ch0FjdS7du5ko24w3yPTkvmL0XCY80jpk1RhlIqX0+TKcLpR8/1J7P7qKBr8fND43UfYk1eHenZb9VORGdZb01BuKfSlULoq3dG0vQV9gfZCq3QOHDjAyztUVVVJrZZBEZWtW7di//79/KazVdQEre0ke5ji+XSuw4cPo7KyUnrWcigZ6oMPPri6tw11Alu2bOE3CtUXfP/99wd2RRtn6MZ64sknsereex0iasKhUZFBaAgfTjUut5Qjqz4GSyInY/Hkcpwu0OEy8zOVCuuHQYpf042UmprKZ9lolbmt0KBFSfrZ2dk84Yp6amscWBLf0aNH+e5fU6ZM4TaxPcu1qJOgHnXHjh1IS0vjkQ1b6hOSeOn9DC52pskjunHvlDZiJdOP6qk4ImXXHuiztubztgSnCPvG9MDAnMQemQZqswkKNyNzGo1MBPTGpEOsYHD4pN6HJnaeZHe8rZDzQgKiout0U9IXbU1clYRNOyGQiGjvxt27d+ONN96wyj4fCjmeK5ivQaHDTz/9lNuh5JDaAl3bUOjxYBuFVWmUvBUnb8ZQ2L7QePoiUN6GVrMcbR0eCA5RgTYOuO6ztxiyZ6mnJUEl2ZG6SiIme33Xrl349ttvkZ6ezv0F6tEsgXobGkHIrqbqVJSRSD0imTa2kJ+fz02Il19+mZs3n3zyCU8Ks4WhvSFdIzm0g+E0WvlPJhONELcaij8xpN+djB80hj5omk/jpM6ESyUqLFm7BHNCPdDX2YWq6mr0st6D6kBbAjl57777LrdF8/LyuK1Iq2xo2LV2WKOQ0mzmjdPm/dTL0uNFixaNmAc+FHo9EjTF8gnqEWmiiXpvW6AbjZw8qvZEvSrdYPPnz+c9uTWQjf3hhx9yM43eG5km9Pns2bOHx+zpdzJLLMnJmWg4LCpiCebeLnTUV6O6WwYzvBEVGwJfdyWPf2dmZqKD/Xz88celo0eGvnhy8GgopaGaxDiVef72evgUPiTThGxca3oyEiM5ePQ3g/FnEpIt0HuiXpXKOZCwydQi8Vn73ug8tFSM7HOy/em6KHxYWVmFoOAQ9oUY+XmpTNytxpgK+ypkv0qx2lJmAuSyHpe2XKZ0z4cfeRjLli+/GssVOAsDGyFp1pbi3fTYxL4WI7uZzMyen/hCH0MbewhDRNvGhsuTJ07iIPPWKZeBakALHEkn9HoDeq66C2ZmbnWitrAY9R16GK8qQA6lqQvdV0pQWNdjw8SSazE+wh4CrbAOD58MPRtuadhduvRO0Vs7DDN6K44g81Qhvq+RQnpGJt6aUziQ1QqTSgGTQY/O5gY0t3ai0yCDxlSHo/uyUavvZ3247ZBTr+Mrm8bnDhl3YVPBm+nTEzElMpLPPC29607pGYH99KBi52fYticdGdUd7BGTWXsj6vZtQ9Hk+QhQG3E57wRO7PsaGafP4kKnL9TBMxF67jOkabvRIimbrNXBMKEl/4ljR4/yySraXoR8hLGOlY+7sImZs2fh2eeew72rV0stAsegQXxMBGJnJyEyPBDkeup0epzNaUBAlBIqZTEyD55Fdb8fImZORRh7Xi5TInpSA3K/70FHF53DhPa2dtTV1kF7WWvR/8aGRv43X23+Ei889zx+92+vISc7mzvYY8X4OI/XQW+Y8j3op72rYQQ/pH/Hr/B25zokLFmGDQnMRKjIx+4//B7a13fiZ1NVUFcdwdefbsVJ/TTMe/7XeC6qAYXv/BhvR3+Gf18bijjvPmSdykV+/jmLM+0oSkU1Yai31nXo4B/gjxUrV/IKsfEJ8Tw642xcQtiD0KVYG4MWjMK+V/Fq+mT4LnkCv1kfBbW2GGfeex277vsCf1hUjOxdpdCWZKHeJxqKpJ/gV8ntOP76S0hf/yFenB+ICJWZdTo6bk5YWveb8tv/9+NP+LbZNLewZOkSvgNFYAAbNTTqMfmOXUrYAifQeBqZFwFlcDzmJTJh9TTiytlteK94JV55TI2WUh1PbVX4B8MzMBRTmHny+V9PYMYrmzA3xAO2LnKjDEKanwgNC7Mpz8VehLBvO/ph7KnBqSMNCFnAbO9AJcxGBeRuCrihFY2lhcjWhmPFkkh4ULL8BEUI+3alowpVfcEI8tMwAVODGf16HVrr26GKnQLbk25dAeD/AUvCOApLCXj6AAAAAElFTkSuQmCC)
physicsGeneral