Physics
Grade-10
Easy
Question
What is the direction of the velocity at point mentioned if the ball is revolving anticlockwise?
![](data:image/png;base64,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)
At point C
- Up
- Down
- Left
- Right
Hint:
In uniform circular motion, the velocity at every point of circle varies and the direction of the object is towards the tangent at that point.
The correct answer is: Right
At point C, direction is towards right because the ball is moving in anticlockwise manner.
Related Questions to study
Physics
What is the direction of the velocity at point mentioned if the ball is revolving anticlockwise?
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)
At point B
What is the direction of the velocity at point mentioned if the ball is revolving anticlockwise?
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jN2x9u5Ca7k6GDBhF5880YR96Oad6TzQqu0XZwFpdQt+DXhDyciiz7XxzHvuA182VmJXSioyrYL11C378fEX94BeP4qyd+pLwQa/4HqJcsKJ17EjpjKrqYxgTYrObemptP7SMzaCgpY2J4NAYRon92Mzgc2Hfvxbo2F5xOz5y1RlCh798Pw52jcO4/QF3HBF6uvshXDfUoXW5BHxpKyOT7iPjLH65pUAC1aBv1r76J2uDEtvhP1L70V5qy53W31db1+ZhnZUB4GMa4GL755gLROj2WkjJMSf0gKor6X/8n6oWLhD37lCfOWyPICP8/C1C/KqcwLYNKm5UeBiO2GzpinPYodOuCcfTIHz5Yp0PpPoTw3/0Wq3oGW5VK0xTSdWVS9fwF1PMXMAxLweBUOfflKY431GNFUL8NYN+2A+Nd4xvHxL481eoT1ghOdF27UJWRxseqk99b67HMTSdkbsZPT4mGhMP5z6m5cxyW1Z+gH/Ld4ynXZVKpq8P20RbUigr0CR1o6NaFcGMII8MiMN1wA/Z9B5D6BmzvvId9+65mzyhotC2qTSFcksbnkQ033XR9B9ks0HEgke9uIGbR09je/Av28sahqutq7tUzZzEOS8GhOtFbbTjrzOhtNhzo0fXqgXHcGKzvbUTXqSM4HDiKitH36N44PKHR7tBd+cD89Q5Rqk7EbgdFAYcNbHaaOqXXlUl1N3RELlehu+UW1D696NGlC9U1NVQYdBh37Mb6wYeE/Pw+sFhw7D8ADifovL6xiUZbIioBnZzD/MAD1L7yLmGvvoqha+OTddeVSXU/+xn2zz7D8cl+TEn9uVxfx2rVToG5mkd7dCcpLBxVURAVFFMohmHJjX8RGhrXiX7Ew8Tsug+xOVBMkShR3y3TdF0mVcJMGJOHoDhV6NSJqF49+GX2Em4SuEFvwB4Whs7pRD1zBsOwYei7dfPayWi0UQxGlJhYrpXarq9NNhgI+82/YZx0L6rdTohex0NRMex22qn+8hRy6DD1v30Vw+BBhP/2N54VrxHUeOKFvOvuOOo6dcKUOQecDmzvb4LwcEaFhqGIis5iwTR7JhFv/BF9v8RWi9IIbpre0jCZTBiNxlaX16y7G13HBKI3biBm12ZyRqTw9qWv2dTlJkLeWUtk1kJ0HTu2WpBG8NO0qcfkyZNdy++0hhbdgisxMeQ6bPxTdbLQXI3xNu11Zo3v2LZtG9C4/I7OA6M8LS4h/NsB+2htLFTje0R++xinqv70AiPXQ4tNGhcXB4DNasVisXhEjEbwY7FYXGuD1Tfz4eYfosUmffLJxsfySktLef/99z0iRiP4+eijj1xbJN1///0eKbPFJm26a/NUStdoG9jtdpcnxowZ45EyW2xSg8Hg2rdHe1tUo4mm/ihATU2NR8pssUl79erlet8+KyvLI2I0gp933nkHgOTkZLp5aOaxxSZVFAXbt6+menh7Uo0g5pNPPgGgT58+JCQkeKTMVg1iPfjggwCUl5fz+eefe0SQRvBy9OhRvv76a8B98ZDW0iqTjhgxAoCKigpOndKexm/vnD59mm+++QaAOXPmeKzcVpk0ISGB4cOHA/DBBx94RJBG8NK0YEhKSgp9+vTxWLmtMmlcXBw9evQAGlf3bVoKUqN9sn//fgC6detGfHy8x8pt9cTq5MmTAfjyyy/ZunVrqwVpBCclJSWcPn0a+M4TnqLVJh02bJjr/xcuXGhtcRpByp49e7h48SKAxzf4aLVJO3Xq5Noa5c033/T4Hj4awcHy5csB6N+/PzfffLNHy261SePj4/nNbxqfxi8sLGT37t2tFqURXBw/fpySkhIAXn75ZY+NjzbhkVc6b7/9dtcePuvXr/dEkRpBxJ/+9CcqKiqIiopi5MgfWaWkhXjEpF27dnU9TLBjxw6tyW9HmM1mdu3aBTQmq549e3o8hsdejm/ax+nEiROuqTGNts/BgwcpKysD4JFHHvFKDI+Z9NFHHyU5ORnQmvz2xLp164DGl+68tZeXx0waFhbm2ipnxYoVro60Rtvl2LFjLFu2DIBp06bRq1cvr8Tx6Fo4Tz/9NGFhYdTX1/Paa695smiNAOSNN96grq4Ok8nE/PnzvRdIPMxTTz0lgISHh0txcbGni9cIEMrKyiQqKkoASUtL82osj68q9sILL2jZtB3wxhtvUFtb6/0sCp7PpCIiGRkZrmxaVlbmjRAafuTEiRMSGRkpgMyaNcvr8bxi0pKSEgkLCxNAUlNTxWKxeCOMhh9oaGiQqVOnCiAmk0kKCgq8HtMrJhURSU9PFxqXQZVly5Z5K4yGj1m1apXruj7xxBM+iek1k9bU1Ei/fv0EkNjYWO0mqg1gtVolJSVFAOnXr59cvnzZJ3G9thxzVFQUf/zjHwkLC6OqqorXX3/dW6E0fMSCBQtc77L96le/IjY21jeBvf1XMGfOHAEkIiJCPvzwQ2+H0/ASW7ZscQ053XvvvWI2m30Wu9k74jWXkpIShg4disViISkpicOHD2PQtnoMKlRVJSUlhSNHjmAymTh48CBJSUk+i+/13Rf69evH3//+dwCKioqYPn26a0ErjcDHZrMxc+ZMjhw5AsDrr7/uU4MC3m/uRUTq6urk5z//ueuuMCcnxxdhNTzA2rVrXddt4sSJPm3mm/CJSUVE6uvrpU+fPgJIdHS0bNq0yVehNVrIli1bJDY2VgDp3r27Xwwq4kOTiohs2LBBwsPDBZCBAweK3W73ZXiNZuB0Ol3DTSaTSdavX+83LT41qYjIokWLXM3HI488ohk1AHE4HDJ9+nTXdVq4cKFf9fjcpN/vn2pGDSycTqebQX093HQtfG5SERGLxSKTJ0/WjBpgNDQ0uBn0nnvukbq6On/L8o9JRRqNOmnSJFeFTJ06VaxWq7/kaIjISy+95Loed999d0AYVMSPJhW52qjr1q3zp5x2zdatWyU6OloAueWWW/zexF+JX00q0mjUbt26CSBRUVGSkZEhDofD37LaDaqqyvLly13PhxoMBlm7dq2/Zbnhd5OKiOTl5YnJZHJr+jWjeh9VVWXmzJmuejcYDLJmzRp/y7qKgDCpiEhhYaFMnDjRVWHTpk0Tp9Ppb1ltlu8bdODAgQFpUJEAMqlI46zU942q3Ux5HrvdLo8//rirnidMmBAwN0nXIqBMKtLYR73SqElJSbJ161Z/y2oz7Nq1SwYNGhQ0BhUJQJOKXJ1RIyIiJDs7W1RV9be0oGbZsmUSExPjqtfx48cHvEFFAtSkIo1GXbJkiRgMBlelzpgxQ44ePepvaUGH3W6XtLQ0Vz3qdDpZvHhxUBhUJIBN2sTatWslOTnZVcFRUVGyY8cOf8sKGvbu3SuDBw921d+gQYNkxYoV/pbVLALepCKNWTUzM1N0Op0AEhkZKZmZmVpW/REcDoc888wzrlc+ABkzZozU1tb6W1qzCQqTNrFq1Sq38dSYmBhZunSpNu9/BQ6HQ3JycmTIkCGuegoJCZGsrKyAmkVqDkFlUpHGhSfS09NFURS3Jmzv3r3+luZ39u/f79Y1AmTUqFE+WcDBmwSdSZtYuXKlW7aIjIyUJ598MugvSEsoKiqSp59+2jX33jQ4v3jx4qDNnlcStCYVaXw2ddGiRRISEuJ2Y/XUU0+1C7Ney5wGg0Fmz57ts4UbfEFQm7SJwsJCmTNnzlVmHT58uOTk5LSp6VVVVWXlypVy2223XdOcbfFmsk2YtInCwkJJS0sTo9Ho1i9LTk6W7OxsKSws9L4IL004lJSUyNKlS2XYsGFu52YwGOSJJ56QI0eOeCVuINCmTNpEYWGhZGZmuk3/XZlds7OzpaSkxGPxVKtVxGYT5xcnpWHDv8S+b7/Ydu5pdbllZWWydOlSGTFihNtMUZM5H3/8cTl8+LAHziCw8foKJv7EbDazatUqtmzZwvr163E6na7fxcTEkJiYSGZmJjExMaSmpqIoSrNjqGfOYvtgE7Z33sdRVILxzjtwfLIf9eJFwv/z15gy0lCasfd7fn4+1dXVLF68mOLiYqqqqtx+P2DAAObNm8e4cePo27dvs/UGI23apFdy5MgR3nrrLfbu3UtBQcFVv+/bty/x8fGkp6cTGxtLamrqT5Ypp89gzVkJHeKxHzyEeuAgil4PnTtjGDIIx/4DKChE5a2CHzBqfn4+VVVVZGdnc+nSJUpLS6/6Tv/+/Rk1ahQZGRn07duXqGaYvi3QbkzahNlspqysjEWLFrFnzx6Ki4u5VhVcmaXuv/9++vfv7/o8btw4bu7SBcsbC1Hy8jH9268gNBTLV+U0VFURI0Ld0UIQwZb/LpX33c3+BychQFlZGRs2bHCV1bQH0pUoikJiYiIjR44kMzOTvn37unYcbI+0O5NeSW1tLefPn2fz5s18/vnn7N27l9LS0mua9kpiY2Pp37kzs41hHDhdzsRON5FqtfOlKZRPnTacVhuD9QYMl6v5N1sdL+lCmGG+xOkfKE9RFHr37s3o0aMZPHgwEydOpFOnTu3amFfSrk36fWpqarhw4QKVlZVkZ2e7fr59+3ZOnDjh+qyqKrcAS2M7cdFuI1ZvoJOi8HFNFWf1OhINIWTGxvNZdRWLxMEtMTF8fOEce3QK3bt3Z/z48a6y0tLSSEhIoGPHjr5b7zPI0Ex6HVRVVVFRUeH6XP711+x6/a/M2PkJXQYO5FBREbt6dqU8Po7hX52hb0QkA+ob2HzfBO74aBsNCR2w3jkKZkwlPj6e+Ph4P55N8KGZtKVUXqZm2B2Qkkxo8mCMp8+iQ1ArLyMTxlG3czdhegMyoB/23XuJ+H+/hUED/K06KPH6+qRtFVUE3aSJqGfO4airo/bYcSy9euKcm4kjPo7QByZTV1JKw/6D2C9V4ozR+pctRcukrcQ89znUS5WETvkFjt17cV64gGIKAwSx2ZFvLhL+23/HeOco9wOtDQh6lFCjX3QHE1ombSXGMaOxb9+J7V8bMU66F32PHhjHjAanE+eRAkKnPYxx1B3fHeCoxvr7l6geNYHqsZOxZG1EyxI/jpZJW4sIto2bsG3egqLXYxiQhDQ0YP/kUwwpQwh74Rm3r1vfeJ66v+wn4u2/Y0hw4viyipCH7qX5c13tB82kHkQuX0aJiwOnilp5CV3Hju5fcH5DzR0TUO7/HVH/8ZB/RAYhWnPvQZS4uMb/6HVXGxTAYUacCvouN/pWWJCjmdSXhCSgjzZg33fwu5857f7TEyRozb2Pcbz7P9Q8txDjQzPQh9Qi0b0I//cMrU/6I2i7fvkYwwPziInrSUPuZsQZTcikezSD/gRaJtUIeLQ+qUbAo5lUI+DRTKoR8Px/7641nr5X/3AAAAAASUVORK5CYII=)
At point B
PhysicsGrade-10
Physics
What is the direction of the velocity at point mentioned if the ball is revolving anticlockwise?
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jN2x9u5Ca7k6GDBhF5880YR96Oad6TzQqu0XZwFpdQt+DXhDyciiz7XxzHvuA182VmJXSioyrYL11C378fEX94BeP4qyd+pLwQa/4HqJcsKJ17EjpjKrqYxgTYrObemptP7SMzaCgpY2J4NAYRon92Mzgc2Hfvxbo2F5xOz5y1RlCh798Pw52jcO4/QF3HBF6uvshXDfUoXW5BHxpKyOT7iPjLH65pUAC1aBv1r76J2uDEtvhP1L70V5qy53W31db1+ZhnZUB4GMa4GL755gLROj2WkjJMSf0gKor6X/8n6oWLhD37lCfOWyPICP8/C1C/KqcwLYNKm5UeBiO2GzpinPYodOuCcfTIHz5Yp0PpPoTw3/0Wq3oGW5VK0xTSdWVS9fwF1PMXMAxLweBUOfflKY431GNFUL8NYN+2A+Nd4xvHxL481eoT1ghOdF27UJWRxseqk99b67HMTSdkbsZPT4mGhMP5z6m5cxyW1Z+gH/Ld4ynXZVKpq8P20RbUigr0CR1o6NaFcGMII8MiMN1wA/Z9B5D6BmzvvId9+65mzyhotC2qTSFcksbnkQ033XR9B9ks0HEgke9uIGbR09je/Av28sahqutq7tUzZzEOS8GhOtFbbTjrzOhtNhzo0fXqgXHcGKzvbUTXqSM4HDiKitH36N44PKHR7tBd+cD89Q5Rqk7EbgdFAYcNbHaaOqXXlUl1N3RELlehu+UW1D696NGlC9U1NVQYdBh37Mb6wYeE/Pw+sFhw7D8ADifovL6xiUZbIioBnZzD/MAD1L7yLmGvvoqha+OTddeVSXU/+xn2zz7D8cl+TEn9uVxfx2rVToG5mkd7dCcpLBxVURAVFFMohmHJjX8RGhrXiX7Ew8Tsug+xOVBMkShR3y3TdF0mVcJMGJOHoDhV6NSJqF49+GX2Em4SuEFvwB4Whs7pRD1zBsOwYei7dfPayWi0UQxGlJhYrpXarq9NNhgI+82/YZx0L6rdTohex0NRMex22qn+8hRy6DD1v30Vw+BBhP/2N54VrxHUeOKFvOvuOOo6dcKUOQecDmzvb4LwcEaFhqGIis5iwTR7JhFv/BF9v8RWi9IIbpre0jCZTBiNxlaX16y7G13HBKI3biBm12ZyRqTw9qWv2dTlJkLeWUtk1kJ0HTu2WpBG8NO0qcfkyZNdy++0hhbdgisxMeQ6bPxTdbLQXI3xNu11Zo3v2LZtG9C4/I7OA6M8LS4h/NsB+2htLFTje0R++xinqv70AiPXQ4tNGhcXB4DNasVisXhEjEbwY7FYXGuD1Tfz4eYfosUmffLJxsfySktLef/99z0iRiP4+eijj1xbJN1///0eKbPFJm26a/NUStdoG9jtdpcnxowZ45EyW2xSg8Hg2rdHe1tUo4mm/ihATU2NR8pssUl79erlet8+KyvLI2I0gp933nkHgOTkZLp5aOaxxSZVFAXbt6+menh7Uo0g5pNPPgGgT58+JCQkeKTMVg1iPfjggwCUl5fz+eefe0SQRvBy9OhRvv76a8B98ZDW0iqTjhgxAoCKigpOndKexm/vnD59mm+++QaAOXPmeKzcVpk0ISGB4cOHA/DBBx94RJBG8NK0YEhKSgp9+vTxWLmtMmlcXBw9evQAGlf3bVoKUqN9sn//fgC6detGfHy8x8pt9cTq5MmTAfjyyy/ZunVrqwVpBCclJSWcPn0a+M4TnqLVJh02bJjr/xcuXGhtcRpByp49e7h48SKAxzf4aLVJO3Xq5Noa5c033/T4Hj4awcHy5csB6N+/PzfffLNHy261SePj4/nNbxqfxi8sLGT37t2tFqURXBw/fpySkhIAXn75ZY+NjzbhkVc6b7/9dtcePuvXr/dEkRpBxJ/+9CcqKiqIiopi5MgfWaWkhXjEpF27dnU9TLBjxw6tyW9HmM1mdu3aBTQmq549e3o8hsdejm/ax+nEiROuqTGNts/BgwcpKysD4JFHHvFKDI+Z9NFHHyU5ORnQmvz2xLp164DGl+68tZeXx0waFhbm2ipnxYoVro60Rtvl2LFjLFu2DIBp06bRq1cvr8Tx6Fo4Tz/9NGFhYdTX1/Paa695smiNAOSNN96grq4Ok8nE/PnzvRdIPMxTTz0lgISHh0txcbGni9cIEMrKyiQqKkoASUtL82osj68q9sILL2jZtB3wxhtvUFtb6/0sCp7PpCIiGRkZrmxaVlbmjRAafuTEiRMSGRkpgMyaNcvr8bxi0pKSEgkLCxNAUlNTxWKxeCOMhh9oaGiQqVOnCiAmk0kKCgq8HtMrJhURSU9PFxqXQZVly5Z5K4yGj1m1apXruj7xxBM+iek1k9bU1Ei/fv0EkNjYWO0mqg1gtVolJSVFAOnXr59cvnzZJ3G9thxzVFQUf/zjHwkLC6OqqorXX3/dW6E0fMSCBQtc77L96le/IjY21jeBvf1XMGfOHAEkIiJCPvzwQ2+H0/ASW7ZscQ053XvvvWI2m30Wu9k74jWXkpIShg4disViISkpicOHD2PQtnoMKlRVJSUlhSNHjmAymTh48CBJSUk+i+/13Rf69evH3//+dwCKioqYPn26a0ErjcDHZrMxc+ZMjhw5AsDrr7/uU4MC3m/uRUTq6urk5z//ueuuMCcnxxdhNTzA2rVrXddt4sSJPm3mm/CJSUVE6uvrpU+fPgJIdHS0bNq0yVehNVrIli1bJDY2VgDp3r27Xwwq4kOTiohs2LBBwsPDBZCBAweK3W73ZXiNZuB0Ol3DTSaTSdavX+83LT41qYjIokWLXM3HI488ohk1AHE4HDJ9+nTXdVq4cKFf9fjcpN/vn2pGDSycTqebQX093HQtfG5SERGLxSKTJ0/WjBpgNDQ0uBn0nnvukbq6On/L8o9JRRqNOmnSJFeFTJ06VaxWq7/kaIjISy+95Loed999d0AYVMSPJhW52qjr1q3zp5x2zdatWyU6OloAueWWW/zexF+JX00q0mjUbt26CSBRUVGSkZEhDofD37LaDaqqyvLly13PhxoMBlm7dq2/Zbnhd5OKiOTl5YnJZHJr+jWjeh9VVWXmzJmuejcYDLJmzRp/y7qKgDCpiEhhYaFMnDjRVWHTpk0Tp9Ppb1ltlu8bdODAgQFpUJEAMqlI46zU942q3Ux5HrvdLo8//rirnidMmBAwN0nXIqBMKtLYR73SqElJSbJ161Z/y2oz7Nq1SwYNGhQ0BhUJQJOKXJ1RIyIiJDs7W1RV9be0oGbZsmUSExPjqtfx48cHvEFFAtSkIo1GXbJkiRgMBlelzpgxQ44ePepvaUGH3W6XtLQ0Vz3qdDpZvHhxUBhUJIBN2sTatWslOTnZVcFRUVGyY8cOf8sKGvbu3SuDBw921d+gQYNkxYoV/pbVLALepCKNWTUzM1N0Op0AEhkZKZmZmVpW/REcDoc888wzrlc+ABkzZozU1tb6W1qzCQqTNrFq1Sq38dSYmBhZunSpNu9/BQ6HQ3JycmTIkCGuegoJCZGsrKyAmkVqDkFlUpHGhSfS09NFURS3Jmzv3r3+luZ39u/f79Y1AmTUqFE+WcDBmwSdSZtYuXKlW7aIjIyUJ598MugvSEsoKiqSp59+2jX33jQ4v3jx4qDNnlcStCYVaXw2ddGiRRISEuJ2Y/XUU0+1C7Ney5wGg0Fmz57ts4UbfEFQm7SJwsJCmTNnzlVmHT58uOTk5LSp6VVVVWXlypVy2223XdOcbfFmsk2YtInCwkJJS0sTo9Ho1i9LTk6W7OxsKSws9L4IL004lJSUyNKlS2XYsGFu52YwGOSJJ56QI0eOeCVuINCmTNpEYWGhZGZmuk3/XZlds7OzpaSkxGPxVKtVxGYT5xcnpWHDv8S+b7/Ydu5pdbllZWWydOlSGTFihNtMUZM5H3/8cTl8+LAHziCw8foKJv7EbDazatUqtmzZwvr163E6na7fxcTEkJiYSGZmJjExMaSmpqIoSrNjqGfOYvtgE7Z33sdRVILxzjtwfLIf9eJFwv/z15gy0lCasfd7fn4+1dXVLF68mOLiYqqqqtx+P2DAAObNm8e4cePo27dvs/UGI23apFdy5MgR3nrrLfbu3UtBQcFVv+/bty/x8fGkp6cTGxtLamrqT5Ypp89gzVkJHeKxHzyEeuAgil4PnTtjGDIIx/4DKChE5a2CHzBqfn4+VVVVZGdnc+nSJUpLS6/6Tv/+/Rk1ahQZGRn07duXqGaYvi3QbkzahNlspqysjEWLFrFnzx6Ki4u5VhVcmaXuv/9++vfv7/o8btw4bu7SBcsbC1Hy8jH9268gNBTLV+U0VFURI0Ld0UIQwZb/LpX33c3+BychQFlZGRs2bHCV1bQH0pUoikJiYiIjR44kMzOTvn37unYcbI+0O5NeSW1tLefPn2fz5s18/vnn7N27l9LS0mua9kpiY2Pp37kzs41hHDhdzsRON5FqtfOlKZRPnTacVhuD9QYMl6v5N1sdL+lCmGG+xOkfKE9RFHr37s3o0aMZPHgwEydOpFOnTu3amFfSrk36fWpqarhw4QKVlZVkZ2e7fr59+3ZOnDjh+qyqKrcAS2M7cdFuI1ZvoJOi8HFNFWf1OhINIWTGxvNZdRWLxMEtMTF8fOEce3QK3bt3Z/z48a6y0tLSSEhIoGPHjr5b7zPI0Ex6HVRVVVFRUeH6XP711+x6/a/M2PkJXQYO5FBREbt6dqU8Po7hX52hb0QkA+ob2HzfBO74aBsNCR2w3jkKZkwlPj6e+Ph4P55N8KGZtKVUXqZm2B2Qkkxo8mCMp8+iQ1ArLyMTxlG3czdhegMyoB/23XuJ+H+/hUED/K06KPH6+qRtFVUE3aSJqGfO4airo/bYcSy9euKcm4kjPo7QByZTV1JKw/6D2C9V4ozR+pctRcukrcQ89znUS5WETvkFjt17cV64gGIKAwSx2ZFvLhL+23/HeOco9wOtDQh6lFCjX3QHE1ombSXGMaOxb9+J7V8bMU66F32PHhjHjAanE+eRAkKnPYxx1B3fHeCoxvr7l6geNYHqsZOxZG1EyxI/jpZJW4sIto2bsG3egqLXYxiQhDQ0YP/kUwwpQwh74Rm3r1vfeJ66v+wn4u2/Y0hw4viyipCH7qX5c13tB82kHkQuX0aJiwOnilp5CV3Hju5fcH5DzR0TUO7/HVH/8ZB/RAYhWnPvQZS4uMb/6HVXGxTAYUacCvouN/pWWJCjmdSXhCSgjzZg33fwu5857f7TEyRozb2Pcbz7P9Q8txDjQzPQh9Qi0b0I//cMrU/6I2i7fvkYwwPziInrSUPuZsQZTcikezSD/gRaJtUIeLQ+qUbAo5lUI+DRTKoR8Px/7641nr5X/3AAAAAASUVORK5CYII=)
At point A
What is the direction of the velocity at point mentioned if the ball is revolving anticlockwise?
![](data:image/png;base64,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)
At point A
PhysicsGrade-10
Physics
As the velocity of the object moving in a uniform circular motion increases, the time period _______.
As the velocity of the object moving in a uniform circular motion increases, the time period _______.
PhysicsGrade-10
Physics
The time taken for one complete circle is called the _____.
The time taken for one complete circle is called the _____.
PhysicsGrade-10
Physics
An object is moving at a uniform speed in a counterclockwise, horizontal circle. Which of the following images correctly depicts the force and velocity at a point in time?
An object is moving at a uniform speed in a counterclockwise, horizontal circle. Which of the following images correctly depicts the force and velocity at a point in time?
PhysicsGrade-10
Physics
A boy moves a tied stone above his head in circles, time period of circular motion is 4.4 sec, and its speed of rotation is 42 m/s. What is the radius of the circle formed?
A boy moves a tied stone above his head in circles, time period of circular motion is 4.4 sec, and its speed of rotation is 42 m/s. What is the radius of the circle formed?
PhysicsGrade-10
Physics
A boy moves a tied stone above his head in circles, what is the time period of circular motion if it forms a circle of 20 cm radius. The speed of rotation is 23 m/s.
A boy moves a tied stone above his head in circles, what is the time period of circular motion if it forms a circle of 20 cm radius. The speed of rotation is 23 m/s.
PhysicsGrade-10
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A boy moves a tied stone above his head in circles, time period of circular motion is 2 sec and it forms a circle of 20 cm radius. What is the speed of rotation?
A boy moves a tied stone above his head in circles, time period of circular motion is 2 sec and it forms a circle of 20 cm radius. What is the speed of rotation?
PhysicsGrade-10
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What is the velocity formula for uniform circular motion?
What is the velocity formula for uniform circular motion?
PhysicsGrade-10
Physics
Which of the following depicts the direction of velocity of the ball circulated around a point?
![](data:image/png;base64,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)
Which of the following depicts the direction of velocity of the ball circulated around a point?
![](data:image/png;base64,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)
PhysicsGrade-10
Physics
An object is moving in a uniform circular motion. It is released while moving in a circular motion. It will
An object is moving in a uniform circular motion. It is released while moving in a circular motion. It will
PhysicsGrade-10