Physics
Grade-10
Easy
Question
Mass of the blue ball is 0.43 Kg and mass of the pink ball is 0.45 kg
The following example follows the law of conservation of momentum. Is the statement true or false?
Initial:
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)
Final:
![](data:image/png;base64,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)
- True
- False
Hint:
Using formula of linear momentum.
The correct answer is 'True'.
Initial:
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)
Final:
![](data:image/png;base64,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)
As the initial and final momenta are same, momentum is said to be conserved.
Related Questions to study
Physics
“We can derive the law of conservation of momentum from second law of motion.”
This statement is ____.
“We can derive the law of conservation of momentum from second law of motion.”
This statement is ____.
PhysicsGrade-10
Physics
What is the abbreviation used for initial velocity and final velocity?
What is the abbreviation used for initial velocity and final velocity?
PhysicsGrade-10
Physics
Identify the error in the image.
![](data:image/png;base64,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)
Identify the error in the image.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAANsAAAByCAYAAADakKRmAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AADUGSURBVHhe7Z15eFX3eefnr+k87TNpJ+7TdtqZtOmWdJ50S9J0mfbpmjSTuokTx7HxGtvgDQPGmH01xuw7mE0S+45WdtDCLiEEQgIJIUBoQQIkxK59e+f7+d1zsJCFYyzpIsnn1fN7dO+5555z3uX7br/fOfe/WEABBRQWCsAWUEBhogBsAQUUJgrAFlBAYaIAbAEFFCYKK9hqGlvsdkOLXa9vtlv1LVal943NLd6nvYfg6a74hMcb4vWOXtc2tVhL72O1XapFz+L9pqdnZNGVem6WYLElX97YWLXes707UZeCDflW1jbbmZtNlnKl0RLLGizpcoN7fUDjcHmjpVU0Ws6NJqvQfiippxLKLq1qtmPX4LPR47PB9onPg+LziPjMuNZkhXebHPi6myF0hODkRl2z5d1qcvy21fMhT8+n0XNN5+i5XsZ1tabJTl5H1jqnzpckeXNOJ2+Nozpnvq7pRl2LNXQDp95lYLsioR642mCbi+ptS1GDxZU02M7SBqcIFOLAdjUEuEP6f0AjXcIpljEiyJ5CGM5pOZOEknrbKF6jixts66UG2yM+k2UE+1G+eINHn0/+59xodEbQ0+mq9HywvEE6rpeuGyy+lZ4d2MRrWz0flUPC6dQ1eQd5CMJHFd5pknzrbZMn7wSdc5fOCeicc2tzTt6fqGx01/ooTavTwdbUbJYuYa65WG+rC+otRsLYLkFgfAgCARyVhz+ukXkdz6T/lU2WoZGqz1BGhr5/Q5Guu1OZlIcTWX6h3jYU1t8zNJSOglPlPI6JzxPizef1uF6nVzTdA1/+7aYemUo3yeqJ4muk41Ua0QLaNjmZvffpudHx+wk9i3/0jGyu1X52xN1WirhXEWyl5L1W9oXsd3jyxnmTPWB77Z0T8HHOU9pGivkoqFPBdruh2QFrcX69rZQC8HZbJRCAliKBENoBEkIgpchVRCDF5D/v2c7nGCqjrLr7Au6sQBJ1oc6WnQ8BLba43nbI2EhnuHZSmOPyptniiTTZ55XXbMPTpkkeGOZJvaam6ylEyrxbOl2cX3dPz0SX3dK907P4B4ifRc8AoKRKgPsF7BOVkDO2BdBiJO/tHrjJHpDlcR0zq805czRO6T2gQyfsy39qu3BTp4GtTsZCyjgnr85WyPNslGD81JF0grwdT4YwEAQeveBOs13U4H/+7WbLVX7N59Q2KCJJtc/l6s+Ra3QxndO1L5KhLTkXUvwWRW+8Ok5lv66b+oRohpKpY857fDLOi0+2+UbHvqSbx/S/vgcAjtonXinz3LMhPQMAX8/wQbQ+psgFbyE9N9sFj3f0fE7vAQERBj2zP5HJAe4BREkSKce2UEAjirp0VfLeLfvAWeHEiWbZkinH5hy+bXHus3oP6LgmnICfahIpw0mdArYmKWCXcujpZ2qdpyd93CwlJHgG6PJ0GROhHQVgcEV3m+1SVbOLXqUavD8vI+ZzhML+eMlkRQqaLN2FLgn8CwQ0jG25+FwvsMVibOIV50D6hNdG8YAKpZeIT3iEV16z7awHOLwxxrK7FK/cqPTMO1E3JC6NNG56bq0tOV/nGb6XvQhs+6UvIgxRhAiO0Ts9e7wjg2K9v+AB7qT2o07HGZMRlNd8EnBVDS22WjKeeaZOgAs5N+o0nBuNKEDDMbJ0LI5ZIBsqaiVvbKxQ56RRgry5Nq6R76Kr2sbw2VangC1Lxf4UKWCejPCeQKQEUkq6Ugc9A8TTY2RFMrbLEkRFTYtV1rW4TiTv2Y5Q2I/9EcZOGSHer74b1DXk+qvE2zQpfrGiGikUEZxajRQKj0mkcsYmxWNUl6RoPPO12hCvpENsK2hlcEcVCXAs1B8l+qy7EjxNlUPF0UQo0oQMv/5erYbhEzlIk9EzkQWDR78hPbeE9Owbvx/dpGei1MGrDW56qDXRYZyUU6uoVqe0Xc5N8nbOTbICpC6q6RgACXADZmdbnrzLJW+6xDg4nB+ZEzUzAQDbylQKHy7L6jDYMEC83IcCGwIBbOukBHJqjIfIFArzja5rR/TC29ACZi6G7zMvgjGyHQNFqaQFfI/UBM9J2vmoieJ7wumQsS31wNY6gvv1AJH5jBRb6DkVuo7MNVHr8PqK51jO3mp2ygdsFPiuo6bjdMf6jTIBgH1Szw33mhQ0IXzDJ3vBqbTW8x39R8++8ZPFkG7TGEPP1H0Awqdi7TdZ55vhnJvSVsnbpa06J7LCudGEwrlxLI7JsTkH0yuc86bOiYPDiZ0D4Lo2rpFr3SuA4yi4xnBQh8F2qKLBxp1CIB97n3USSFuw0RBw3v5Ok5VJIJUSCAZYL9lihLxvTwl4fJcy6DiPcq6Ea5yfX2sfCGzzPLDdS6M8zw5gACQAwmhIXwDWTQEMANHqdsrXNjww9QxRIF3KJyqgfAyJ5kt3o3Tpb9ypGpuR90mwEWUAS0jPoRSSWsk3fPTcIHuu1v/rkgX6J+oR2V1aJ8AAHPQMiPx5uLhL9TZO8p4teS8R2O7LJDznRkpIdsCx/EjKOYiQlGSAjiiHI8cBYINco3Pk+j7H4nU4pj07BDbavysl8FGALY8Ctn2wkQ66yOY83seRDcNzKy0QiFLK9iIbHpOuE0plbuZRUZauaYz4xLMT2WiOoPxN4rUt2IhsgA3lE9lwJERvFI8h+CmzH9lagw0+SZ0aulF0AyhRnp5ntgO29iIbKR3R5Kr0ek/P+o/hA0LAmKv9fMP302iaH4VVTUoBm22KIhqZxCzJe1HryCaA7PLAhkNuL7IRTTknmQSRDefGNd2LbJ5tEU3RH5PyXU0dAhthHs8zXgOw0TiIkBKYY6Md7EekwxUyqjtmZ2vMCjTK6s2ui7dyCQXhlyunxyP5uTw1G7k/tVqihArYaESQZz8q2q7rGJZV49KaOVK+n9bcV7NJeek3zE7fNTtfa1YkXsW6VTaIVyn8mvgkqrWu2XzPTnOBuiVWxoujuhYG5X9WwvA/EN9jBTaaYPPF/zKVDk7P7dRsOBBqtsK7imLiN8R7qH7yHY3Ts/ajNqdmc05VMtxU2GCZ13HODTYiu8Ymql6b2cqR+zVbyJGHAA5gARGZgt8P8M8J0AAgji9P8m5ds+0FbNiWjlkQBkfeIbAdVbQacKLGeZ9p95QQ6kYyu+9qGTGUWFJtW7MKbcvhLDuQX2b7Tl2w5OM5brVIaXWL0aEj5SKnJqrRtXRzIhII6QLHwYuSYjyKVJJTRhXU2bsna1yxPkvK/0jKZzKb6/ILdgxmx9lyi03Ps/i0U3a0sMJ2HMm0zItXrMyL3H43DmPEqdCN9L0sBkSkQH7IpLvQRenpPTkaHKvfIFnqdSN9Pd9L66S3E4ocZ26bSSxWIocDz/B+T8/in1QTR4OeMXxqXiIMhg9o9yi6v5MZAltrR966G0kmQDZx4pZZvs51UaNMYtOhXFQFZJybiOd3I++VJ/oe14yjhA+2dzV1CGy7FLXelkBQAt1I5ticx8cDeUa4p9xsXfp5e+HNwTZu7jJ7870xNitqvb3Y9y07kHPRShTlyKUxPhTg2sFeVMNzMVGMt2elAhPHpGLhJiLSJPH3XnZtSPmeY4mQY+G6WI6GoaRUttikqC323uQ5NnL6Apu8MMrGTp9vUxdGWKGcSkG1jEKpI+kTXh0FU3NgpLTOOQYZQaSO27pR8KjpkAAxUHomshHZZ3t6xtkADpdK6tqZ+gAomTL+HZnnbdDI8Xb0YrkVCnDoGJD5eibCMLfo6xlnRXq4VsdDDpFybgPl3MiaADh18hLJxdVtkhEgwfkevtFsH8Uk2tCJ052sJ8yYbztSs3XOFqWqLQ5kZBB0PpE34OYaybiIpGQRgC0cjrxDYIvXBb6lyDZaSsAYXbiXEjAWjJD8e6fAtiwly14ZNNISsovt9SGjbMfJC/bOmIl24NwVOydF5NwM1S4IgzQET0/B7LydhIoxr5JiSdluKBfvbLp69art3LHDqqqqvC33U7HSElKaIfLuvvJDdZuKdl1XaAWJwHbTbMxHq21xfIozgFkrNtmaPYdt0vwIy3GetVH/W5xDoeXtFC8+XVSTgdEc2SAntUz1IB3KzqaSkhLbvm271dYqx30IIt3CqVKzEdlnin8XadCzrpcmkb8+cd8VOcsbLTZ2zlL76ld+10ZOnhXSsZwM3WiiORENPVOrOT3re87ReE4VAFMbDhLYADh18my9p27zewL+lMO+SmUdScft61/7E+s/Yry9Lmfe56V+ll1ZZ3kqXTifb1vIm5SV+pBrZWKcyIzTQH9d3QXuENjidMGvHa+x4TLECVLCVAkFI2zt9bZeMZudcMgGfTDbNp0otIHjptq+otv26sBhtuXIKYvcmmIp5yvs+PUWw8vj6RAGCkCYrLkjSgJghNwVy2zO5efbN//8L6zPz35me/fsscZGulMfC57adKiAhvJpkjjHouI9ZHCqXYhuJY22tazJ3v5gli3ZecTGf7TKFm7ZaZHbD9ibQ8fY8p0HLTIh2XbnllqGeMXQSJ9o9ePV46VsnBMpJMugSKE7m3Jzc+0vvvGn9nyfZy0lOcWam5vv4/NBtFv6eENOdZj07JyN+PfrVqdn6cdfmpdcYRZ9ssQef7KP/eM//5v97d/9gx0quW1ZinY0JgAZqWZbPRMdsReyolWKakTQ/gL4SK9uc9mE5LIUBycZ+Q5u5+Vm55T/6d8ftxfffMeeeOYFe77f22495EnVz9SETHq7dbcCNlGU+to5cX2ftBTnxvV3e7C9IrDh8cdKCXgg6hmMcJmEEsrpG23Vycu2/OgFiz9/01YfybODFS22IS3PFhD+p863+dF77Ji8EOkUXp5c2lcAQuU4GODqi3X3wIahvN6vn31LIPm77/x1h8Z3vvVt+8Pf+6o99qu/Zr/52GM27L2hdvu2ig6PKLhxKG9J+SOUSvqOBYPD27raTYX9pou19lFylm3KqbCVR85a3OnLllIq40g5YRMXr7HR8vabj+XbkevmDI2IQZ1GSoSyqf8wNhwW3Vufxo4ebd/8sz9v99ofZnznm9+yP/jd37PHvvSr9htffsxGDBv+wGjemhKll36enp2zwfgVaZyevdoNPcXIWSQpuo+Yt9ye6TfQ3pu20P70G39mM1bF2AmdhqhCCkc0a61nQEPWgqMhW1hXWGdz82utHwD3akUX3SQXamWXOUlWRKX40mbbISf3j9973EbMibBJkZvs97/yFVuzP9OOS4VkSTi10CqVUEQjihIZcRJkJiwDYxEGc4ldSR0C214Vsc8dq3YenzTLN8LWQlktZgBcrISSUCoBXzXbc7lJCmyypXvSbfGuNFu0M9X2X2txXo50ioKbXNopQN/nOHMFYiIbE5UQHnlFlGqi0WNs4oQJDxyTJ02yD96f6MakiR+0u8/gQYOcEf7Ob/6WPfPUz2z3rl33efw6nXOKjOvljOqQwUn5GNx0bcPbMqm/gsgrY4m51Gxxl5pshzzubo1kpdE7Cm7ZvLgUW7TjsCWcrbSkq822SzzSZaVOIQ3juwBtqY6HF2c9n08xW7bY2FGj27320HjfJn8An++7MWnixHb2mWCDBgy0r/7vr9jv/s7/sj5PP227d97P54PotFLgn4t3aiicDtFtiq6R2u0jgQP9kOZvFu+Rx4rsXx5/0t6dtsjWHiuwv/qbv7cfPvOS7bx4y/bLydJdJrKwvA2jd0CT0QO0KE/P8ZdkMxovyrYG65wjBfD3JW+acH7mFOVlFLFXW2xqdIp9/Y+/bk/3fdteGjDMvvWdv7UNGQV2UE6NzIFOKVMF1GgJOh8NFqIoQCMokBbvUQ33GUTRIeoQ2LJuNtqLGVX2pjw+RkhOT8hHKM7rO8ApIkkoMIdRIVzy+20lyvMLq21bca2Mjvw7NOfB5+yH18Fjokiix9TcOufJukIg5eXl9ka/12zTxo1WW9d+PRMlb+s7FgwOb0uqM8vz8KQ3RDjSEpwEnpOIhefeKh7jC+66KLZTXpgUhs+I3MzT8R2ARieXRgBGzPq+zqay0lJ7rW9fi42JtYaGBm/rLyZuJXpDOn5dkebdVnr2ywb0Q/22+mKjRWSV29ykbItML7S1p8stKvWcRRw6Y3EX7oj30MS1r2eiOTUq9oGeAdF06RnDTyxvcGAjlSSFH3uqxqXv/tSDA5xktr640eYfOGvT4g/ZtNgDNnVLsq3LKrVdV1ok71AtjFPjnMibFT9kEACNa2ZKgebecdV1XU0dAhtRZnxujT2fUeO83lAZIV6fORnfCxHhMCKMidAPiAAT3iVWAGPEqN7BOKlZSEfYzzc+vg9wP5RyuUnxYQiDmjt7jqtVTp48aQnx8d4n9xP7/SLj2ykDAGzULoOl/BEyOCI5Hn6mrg/AsV4S74yTQKEblVpiUDEYl6IdfKJwGj58RqR2Hl28MknOMaawNEkO6iYzyZ+RampqLDIiwgoLC+3U6dOWlJjofXI/1dXVWf1DgMynu9LzGOn5hWM1NqCNnjH+j/WslLKwyTapTt9carZFkW6rIvs2jVhPx+jd1zNOxkUXyQzAcpzJOXXuPri824326olqe1Xp6yDJ23dwfiMOp4S8I/S9tSWqE3WOONWLW6+ZJej8yJnzhf6H5u9w+ERDFpBzTpp5HIvIFo4FEx0CG7RCDDx1tNp5Pd/rO0XIEFHEHM/zL9HAe5FuYWBrPYP0B+/ZDsjYj9yd7zGdMFnHoht16yGbI3TdoiKjXOSKj4uzLZs3e588PLFy/TUpH29LZ86P5A5wGIB4nadrxehclBMPGBLKbc0ng218RiQkjcHQ8NY0XcbLg5PuPAwBtmVLllpFRYWlJCe7Jk9nEsnEemUiPz1aJRnIsYp/miUs00PP08Q/0XgBAPD1LN5wOu3pme3t6Rk5Mli4TRd+omTaJz2UOZFOUqqQwgI4Um2c8EINjuGfsz3buidv7QM4iYpcK/2FiToet++EYz1qh8F2/k6TvZJZregmry+h4IWGZde6QppUwxmimCIXR6iklkthWgMB+YP3bMfw2A8vx/f4/mgdL1rKftgU8saNGzZzxkzLzs62hQsWWLRqnytXrlheXp63x8NQiy1XKvkTGVxfGVx/KR/AUU+MF5/UcNwNgNHhdQEdnhcP2ppPBtuIZItUmAMyjGa6vktdgsxKH/IePnh6b8gQy8rKsuWqY1cuX2HJSUkumt+5c8fbq2PELSv95GyeJbqjZ/EP4HCsvp6ZfIYXp2fp8dP0jGxI4ZAVeiYlHaXjbVY08p/Psq+i0X4sR/6yohvpJBkFzpxmnAO5ZAZgHOg8ebNmtb1zOnl7IPPlTdMFh9G6GdWV1GGwQdQzP0xDKB8rghUHeP7xGhgiwnTeyDNGjAzG/cF7btHhc6IE++PB/PqAuuFhidRw7969duTwYTuekWHH0tNdKrlu7VoXDR6WLlY1OR6fTq8OAU68UsOMUDRiPggvSRQmos/SwMHAa2s+GWzjM4DJvpM1+O6wrFqLc07l4bwKvBC5j6alWbYAt2vnThs2dKjNnjXLLpdd9vbqOK0qqrMnZPwv4Vi9TIZ6arT4J8UjrWQOEj3DGw6zXT1r3KdnyYy52gmna6zg7sd6ZjHxOKWvT8jBvSq50w0mwjmQ65xkFQCGyMqxPs22kDdrLLk2/5x0lkkl297W01XUKWCrqGt2Ee1HEsrLUgKpBqkWhug8kRNkyBvhAfFIeBZunfAH76nz+BxBvK/9ARpLpJKuPnyd0R4xqZt25IjFxcRYhVLLz0M7rzTYD1OrrI88PIDDAN7xjI7rxVPiHKgxUSq8tuaTwTY+o8HCvqRG8El3k8e/dZRKS0tt27ZttjUhwSorK72tHSdW7wwXIP4zrcpekvFTOlDDEeGHe9nMZ9NzKGNhP/ZHboAoUbJtS2duN9lzAveTcnBMM5FS0h/AmZNVcE5sBXl/6jn1GcDknMh7qK53pAB7TplZuKhTwAblqqB9Xgr4T0U4PB8pB4boRzlAhwckBcAj+SmTP3jPdjzkKO2H8b4tZa7vxA4kc0q3b92yWxpNTZ9PyPQtFivH/0FqtQPcK0RzjA6vq2tmXohIh+dFqW155TWDz0jBUDg10OjT1S4l7wyqrq52dWp9fb23pfOIa6Rx8bj0/GIrPQOAEOhwOr9Yz3yOPSCv/pLfWmVH9Q9YLrVHzpaI+qTGzyVvnLmfVmIn1HJ+dH3QOZE35+TaCAKD9P39D9lw6yh1GtigjBuN1kcK+A95vmf1n1wbwbwlRaAMhPOeBDNM3mi4BmF8pPMwoffDJAiAiSBek1BXFtaHLcQ/DNU2NdscAe67R6qcx31R1/qq+AR0b4tPojyRCkOAVzqXjk8NXsMrn6H0N/Rd0iJuNu0pxNKzl6TbHyjCU8N9Qs8arfWMfn3+Q3qudXpm337in3WQNZ/6eIIW2365wWVOPxLg6A8Q5V6XnQC6gZ8i73u2pc9wBjiGN3WtTC+EWj/ho04FG0RY7i+mvifPjzcKgS7kAannEA6pB4Im6pGCMXhPikCrl9UK0Zc+nsDujkT3ap2u8QmB7Qfy8j/T/xfEK7UFXUsU6vPamk9eA0iM8+UMRT+lNuG4vaOz6YJqq8FKKf9dDgcAoGeijtMzwGulZ593X898Bu/su0k1KjfmfhZKqWiwp3We78u2iHIv6HxkFv45W9tWa3nzns9/rnPi4NKuPZpbtTodbBA3Cy4vrrfnjlfZ9zxlPCMPSO5NioknBFTUPAxeP0uE0D4fqm7JVITsKXTseqMNkdERzf9dnv4p8YG3B3g/F1944L6teIX/PtoHg9sgGd14BHcxdBZRw60UD31k8IDuh56eiTz36dnj3+lZn6PnCXIyGZLdwxKOacq5WvuxZPg9yfsnOifpPOf05e0ctidvQI28uYaFykYKu2CxwGelLgGbT9wHFV3WYG/Ks/yHvD/KINohoJ9qYJhPe4JaeL7Ojkr4NWGY7+hsYk3docpGmy0efiJ+HhdvOBi/zoBX+GRwm842yaTgUx7d1tOoqLrJYsXT20odifI+77Tt4Z2oT0RCz/PO1VmqZNWx8qDFsm81WpTqefoE2NaD5P16ZrWtk0Ngydmjpi4Fm0902HJvN9kBhe8E5coxpQ1uEfOe8kbLvNkoZbH63Nu5J5N4gBdq170Vjc4A4ZV6AzCeUYrNIyB6K/HoB/R8ULy21jNLr45LJsims33p1dpmyxLwkiXvOO+cnJs5ulOyLZ4C0F0oLGALKKCAArAF1AuIRQAPWtt6/vx5N+F/8OBBS0xMvO/WqXBTjwcb80kH9u//1HkzljNt377dbt686W3pGF2rqLCMYxmWf/asnczMfOgVHwF1Pg0Z/K7FxsZ47z6mvXv22oD+b1tBQYFt3rTJzp87530SfurxYGPdY/833/zETZD+ciwmdpctXeruUbt+/fonJnp9kD5oArj1dv+Y+/ftsxHDR7hbcj78YJID8ZEjR9xnHM8HH9dWVlbmXrddHtYVE87dgS6VlNi0KVPcmD51apePGdOm2ZQPP3T3I37lt3/H3nrjDXcXOhP7EI+7GPzOOw5o6ODzLmboDOrxYGMJ1tB3h7h1gdxaUqFId+zYMRfteM/r98dPsJzcHEtMSrIkjfSjR91SprjYODuZlWWHDx+2tNRUW7dm7T1wVF675rxiTEyMHVIKcuTwEUtOTtZ5jtoORcmPFix0ay2jIiIsNTVN30+zs3l5AuJ+O6rjn8nNdSAvLioKpTB799rhQ4ccUDdt2KD3iRarY/c2OqfI0e+VV9147dW+XT64D7HfK6/Yn/zx1+zXf+1/2Jd++Vfs+WefvafHtavX2MEDB+zChQvu7n5uM6rV4LYrol04qceDDeOdMnmy3b1bZRPff9+GvDPYrfTHo5GrM1jxHxkRaTu07cTx4/Z63342Y/p0RbvdThFDhwxxq+TnzZnrwAuxiBcwXLp0yd6fMMFmzZzplnlxrvnz5jmgpgngAHXLli12SEBiAfDgQQMtPj7e8s6ccXeGA8rIZcsU/UJ3IHBnOR45LfWIDR44yJ0roI5RvcDDM2T+8e//waIiI++tByXbWbpkiWVkZLj31HXoBl2tXr3aIrXvL7qPsTOpx4NtmgyXSAMoRo8cZc/89ClbI0FeU2RirFqxwj0+YXlklCLPWTuoiDdyxAgbO2aMXZNSAAjAunP3jhUXF7tjkgbyqARW0HNP3Pix4yxCgOHzEcOGuRs1OefqVatcpAN83EMGcHfv3m0vvfCCu9Ng/fr1SjeHW0x0tF04f8EmjBtv8+bOdZGVyDt0yHvufD2JiAgpKSnOycBvd6hXiVYRyiIuX77/Dgc/kvmAwgECvpkzZrjMBh3ycKdwUY8H2wYZ9JbNW5ynyjuTZ5mKXIBhj4yeGm1F1HJnGHSlVixf7tJCUp2lS5ZaneomvODatWtdBGQfn/gOaSCpH9Fw1YqVAtdqZ2ynT592isJD8jmD823ZtNkZImknQN++bZtLH9cIlDiAU6rhOC41HinMSjmCz/LAne5EROmpqseoUanL4PNBxP2EZBBxsbHelkdLdCLv3r3rUnucc7hl3+PBhmd1eXirZyFWKaXMyclxdRi3mvg3UPLfb0zg9XxiG4bRlti/rrbOveYcftEN+d/3C27fw6NMn/zPKMz9BknrSMDr1tfREwiwzVFKnSqwPajZgJPDeX3/u9+zX/ml/+bS5ayTJy3zxIkuGpmuK8x/3uMc20a57kA9HmwPIsBHUUydFVDnUIv+aDatVyZAZMZZcMsSjgjgNWuwjcyCJ3jRrPjK//xt+7P/8w37v3/9N/a3f/WdLh9/8+2/co83jFi6zLvq7kO9FmwBdT6RMo5UDZqrrAHCmU2fNs11gmk2JCUmue1kCdREP/j+9+2X/+sv2ZhRo1zaVhqmwfTDo5y8fhAFYAvoMxM1DvWOn05Tn0ZFRblu7Nw5cywuJva+NBmDnzN7tsVGR3tbvtgUgC2gz03MRdLs4bcSACIpZXsUzvZ6d6YAbA8gDKS1l6aR0XYVSECdT42NTa4x1brhVdfqdU+mAGztEO35/fv3e+9ChPKZOggaLl1HrHPdtnWrvffuENu4YYO31dzUwdmz+d67nksB2NoQdQaT1BTaPP6OR98xecuju3mdc/q0t2dAnU1rVq22DevW29o1a93qG/85nywAiInu+UvbArC1oYsFBW6iPOtkppu0BXB03AouXHAT2eFeT/dFIeY6WelTVFRk8+fOcwsNWKEzc9p0N4H+oEeq9yQKwNaGWOWxeeMmt36RtZR41g8mTnQNgIXz51tNL6kfuhuRnkcui3CdzqmTp7htrE0dN3q0JSQkOGfX0ykAWxuiXiOy7d6506WTsaoXBg0Y4JZczZoxw9sroM4mwMb6U+boxo0d52o21qxyZ8XM6dPvW5nTUykAWxsijWGpUUtLs3uyMDUcK/Z5jHl+fs8v0rsrkUZSo3FzJytSaJYQ5VjHeoAFz95+PZkCsLVDbdv+AYWHkHvr9adQb5qjC8AWUEBhogBsAQUUJgrAFlBAYaIAbAEFFCYKwBZQQGGiLxzYGppb7E5Ds92ob3aPRa9qaHng74L1ZKKZyvP0b9W3OF5viedavfd/Qjeg8NMXAmy3ZWhFd5vt6LVGSyxrcCOF58FfabRDVxstlefC32iyy9XNdpdfO+yh1CincbWm2XJuNlmKeEsUj0kavD4gPg+XN1q6eL1wu8mu1zW7/QMKH/VqsN2WRz9xvdFiS+ptU1GDxRU32PZLDbbXgU0GKCM8KCMEcAxeY5DnZIxEvB5DutTiu00OXJuK6m2L+EwoabBd/KiFeN3v8Xm4Da+ZlY0OnAHmwkO9FmxnbzXapsJ6W3mh3jYKaFsFst0yPj+aHZWHz6hssuMamddDg9dp2o4h8r+0imdqeAfspkSquO9qg60qqLc1F+stRkDb4YNMfByR8zh2Tbxp+Hxmik+24ViIeKduNFp1L/51ne5CvQ9sspljSheXnquzKIAmwMULaDtlgMmKZnh3UikMLlupY45GrtIuxmm9zgJ0+j6GSPqVf6up23r+a7XNFl1cb0vEqw80nAqRm2iWKh4yxAs8kSb7fJJmnvJAhyzYF+fDj1gG1HXU68B2REYz72ydLTtXb+tkgNGkjgJakoBGxMK4TsrQMLj8282qX5qt4E5onNNrftsawzwhQwRwfC9PUbK7Ld8qV/q3oqDO5otXotpmpY/xpI6kyAIPEY1IjUOBJ3jz+bygcVbbkAFAJMoR8ZHPDdVyAXUN9SqwZSkdmplXZwvy61z6uEFRjTqN2oUaDQMERKdlYESsQhndpapmK6sOjZK7IWPM841QwCTN2i0DvnDn0f0gQ1vit8bXi7cZZ+os4ny9rcWpCGzbBDai2kEBJ128ZonXMwIbDqVYvJV6fJaK5yLxSW1KZCfCpWn/RCJ/eYPrWgbU+dRrwFahlGqhQIYBLj0f8vY0C2gU7JEB0gwhqgGiMwIToMLoaBBcq22xSo0rMkSM8ryMEyOkzgGgpJ80H+jgdQdKUY02KafW8RslsBHBXa2mFJLuIxGZVJgIjVOBJzqtFfBZ1+KiYpl4x9nk6fPWjoV672Rlz/lN855EvQJs1FTxl+ptwulal1bh7dcIbFuKGmybDDCxLNQUyagIpYj5t0KguioDvCHjuytPzo+xAziM8iLppAB5Eo8vI6SmIWpQCz5qKqlqsplyKNM1FqtWW+FHcK/7SApJrUa0oj4rEC8A65oABo9V4pW5NwBXou1EN2RCbQdI9wqsyAwnFFDnUq8A2xUZxuQztTYlt32wJQlsNEaIVDRBqF8wtPKaFrstw6tXhkjqBPCIbr7HB2w0DvD4GDIGzeePkqg/R2fX2mylyw8CGw6CuhSHAS84kOvirUa+gmlEpjWI5kR2Ukxkgmxcjarvk3oz9xhMCXQu9Qqw7ZE3HnWq1qYJcO1GNqWB7UW2KwLbDRkdxofXxwCpaS7KQDFUV8t4kY26bVNhg5sueFQ2eEOOYYZA9r5SyE8DW9vIRq0GbzgWeL3ppZL3RTaljof0PdJlUm+aLUTBgDqPejzYWH60UEY3Ut5+qiLbXBkhrfD7ajYZIYA5cdMsr9qsoNasuMasUrZU2UALvcXVM0QAV7MJjHj7E17NhgHT5aOzyVwdS74eBZ3UNb2bVWMfCGwz5Vg+aluz6dqo2VKvNVvWHbOz8KpRVi8eFb3hEV7vq9kESGo26lm6kaSRTB8AYDqWAXUe9XiwUW+RQo4Q2CYLbHj8RQLbcnl8OnbO4wsoKVebbFtOqW06eNLiU7MtvbDc4lPSLKuo3C7LAF2HDqB5US1kgE3OAImMpG9ESozwtqLDo6CtQg1gI7LNEM90XZcJbHQjWTUCSBLlGBKLq2zH6RJLOHbG0otv2P7TFy01r8hKFclLq1tcRCN6M/XhnAoRXE6F9j8RnKjGvN1uAS+gzqMeD7aLd5psVHaNDdegQ+d7/EjPCKMFEJZo7a80G79ojQ0cN8XGzl5sH34UaeNnzLcpC5ZZoaJcwV1znTtSr2wBjYbBEQGNKQO6mQk6xkZFypWKmIWPaBpghfh552SNjT+tlFmOhflEP4ozeU+tlVhutjY1z14eMNRmroq2IeMm29LN223AsDGWeem6FYlXuq1ENIDmT2zjVJhTxKkQJeETnpuCwq3TqMeDDXAMlQEOE9jw+NRtoUltL5WUEeKpkwW20QtW2rpDp21RbKIt37Hf1iem2sL18XZOBph7u8WBjMZChnIu6h6mC5i3AqwYIOkaq1LyVed0NvHI7XVr137q74ot0bkHZtbYGIHNj+I4FqK4m8CXY9l11WxZcqa9OniU7cgts1cHDrV958sFtrGWda3O8qvMcm61uDk4IhpAo1bDqZAiIyvSb44Zrdd1TZ0LttqaGvfUYx4R+EWjHg+2HEWjwQIb6dU4jFCAm+UZIcBYK8CR/u2Sx3974mzbdvaajZm/3LZmF9mybfts6rK1tjYxzdYmp9vx6y2WTgtcXp4aj/WFAI2IQeTA27MM7GwXgI0fqfj2X/6l/ds//4tAt67dX8VcJH7eOlFjI0/V2kTxOl2OhYYQ84r+JH6CbHhG7D6bvDrO1qWdtXELV1hK4Q0bMPJ9m7JklS3evMPijuZa5s0W51CYAGceEaBtFbi2FIcygqXnWFNabzWdDDaeVvZv//TP9t1/+VfbtHGD4/OL8nClHg+2PBn+IIFtoAYdyYkCG0bop1h066jdYgS4FceKbHtxrW3KLLa9qmuSS6pteWK6fRi50fqPmqj3d+1gRYslexGNSWI8PUuhMEBSU0DcOrLxS5xf+4M/dD/C15HxnW9+y/7oq79vv/XYr9uX//uX7MknnnC/f9aaANtrx2tsqKK4cyyKbs6xiE+ubbWucXNxo604XmIbcyosOueqRWeXugXJG4/m2RsC3MDxU2z+ll2WfttcjUbqCNDo2hK9ASzAZcJ8g/j2m0H85HGn8Pmtb9vXfv8P7De+/Jh9+Uu/ak8/9dQn+Oyt1OPBxmLc92R8r8vjD1N0Gysj/FBGSO1GA4FIhPGslyHGlrVY/KVG23WlRcW/UqcKs+hTZbbyUI5NXhlrcbnllnS12TVU8PKxMj7SUKIjadUiHW+uQNx6wpefu504foJ7TPYDx/TpNmfWLJs1Y6YbvG+7z8QJE+zrf/TH9psC27/K8y+YP/8TPz28Qsb/ssBG3TbyVChtpgM7R9fEtdGZXK1r3VzSZHGXmmxbqXi93Gx7r2iUKQVOOWmRycdt5cEc8d7sQOY7lBgdGxmtEp8RktnsM3W2Trzza6MQP8j/2fmc8UA+eYb/X3zjTx3YiG5LFi/+wvxYSY8HW73SnDE5NfaKjJB0coSAN0FGyAT3bBkhHppFyQCO6ESUooWPgeHNE4pUQ5TU2U4Z5bZL9SGQafidR+brABpRco6iyFIZNGsTO5saGxvt+T59bPrUaVZRIS/QDu260mDPHau2t1W3DZVjGaNITlNoel4okjPv5gOOaE6HEodBl9LxJl4ZOBu2OZDpc2RCzYeMIpSSIjNWqDDn1hU04K3+NlNgrKxUIf0Foh4PNjzvfBkIRthfYBsiIySdDDVL5KE9wAESQEOqhcfmZlLqk5gSbi4NjRgZH4a3oTDUDKFGi3RAq7f5OsbknDqLLql3c3sPQ9QpeHB+AYcf1OfnctsSTwTmhwU/jVgM/crxausrx0LqPDy71qWTRHImu+fqGpn24Jq5dpwLDmOz+AR4cYrqDAAG78gAUNLmJ91GRqTJpKZMLTDB/zDE9UdFRLq0kCZIe2DCqbR9EOsXhXo82KCM643WR2B7VUY4QF7/Pc/rU78R4WYJdAs8z79MwAR0dCqJWhgkwGLwmm14eCIEKSjGR9TA+MYpdUv/HIt0b8kIeW49RrZz5073Szmfhxpl+9Pza+1n6dX2ptJmP5L7gKNWJfo65wLoxAMgItLBV1s+kQGyYMXNYn2HZgsdTibNl12os7qHbPvjRCZPmuT4TE5Kco9vD+hj6hVgq1UqOTa3xn56tNpekxEOkBGSZo0W4EgpnecX4KhtqOMWKVIRrTAyDJKuJdGA187w9JkDmQZengg5Tsf66Fzt51rChMcfN2aM5eScdjUexpibm+t+zfRhKbG8wX4qsL0kx/KW+BwsPkfo2gDcB+KTGo5rxkGwsgZemPiGL/h0vHrviWREQmSCbIiONF2Ytzxc8fBOBXAN6N/f8s6csbS0NDt3Lt9OnzoVgM6jXgE26GCFjPBolT2X4QHOi3A0EpwhelGOCIX3ZlkXnpyIRyTgP4NtRIdZ2m+aaiGmEribgOVgaZ9z1T+pU8yWaKWQW+369et28uRJi4qMvO+nbD8r1SvaTNS1/ShNkfxEtb0lPolwTOqP1nVyrTgXJr25tw9eAJ7jVXz6vPKe7XyOTKZqANYRWar/tM/dz7FKhp9B3rx5s+3ZvdtFua0JCTZt6lTLEr8B9SKw8bAQarcfpFbbCwJcPwGuv2eIwwQUohwrL0gtMUaMi4hFI6D1YBugnKRB3Ud3k4nk5Uq9OromkvkkAJaenu5+zfTztrzP3G5yToUIR2PoDV0fUx/Uqyxb45oBHTwQqeCpLa+8n6rB5zgi9idCMoeXe6tjtxLBJzUov2+3LyXF/TJQQL0JbCJukRkhw/l/Atzzroartje8KPeuAx3Nk9AKjPEYmAaAaj3YRiQkSozQvv31/RmKcJ114yhgo9XN74115DfH6Ez+UGnzTzR+Lj6J5jgXpgWI6MM14BNe4Kktr7xHBuyDTABqf0XKvTpuZxC/PnO9svIXNn2+SNSrwAaV1TTbkNM19r0j1fa0AIch9pUhkm7h/Yl0GCPRjm4e6WHrwTbqPWohun4YJQt3uyPFlDXYjwQ2xvOKdEQ55hvpytKtZFUNvMATEa8tn8gAkDGV8FZmtcVeYl4toK6iXgc2qEJRaIrqju+nVtnjqm3oVL7kQFftjBHg0UQBfBhl60EUBGSvyHgXKC0tr+2eQPMpqbzBntP1wuuTSitJoV8Rn/00SC+Jdu3xyvs39dnLGaHPk67ym3TeQQPqEuqVYIOahJGtSon6ypB80BHpqHVeBEwaTBUQ9RivamCoz8lg35PH36nvNnTyusCuoot3m9yUwI917d89UmU/0X8cDPz83OOzNa+vaDyrfQDaHH3vfDd6mFFvpl4LNp+Icrvl/anlqHF+JCN7QuPHev2kxs9klM94IJyQW2vJ8vDdPZo9iLJuNVlEYb14qbH/FG9PaMAndd1TGjgbQEjki7xYZ5k3mx7ZjbBfROr1YPOJubjzigCplY22XVFrbUm9rSuud6/Trje5z7piGdajINZuAryUaw0Wp7puTVG9xZY2WHJFo53S9rKaIJI9CvrCgC2ggB41BWALKKAwUQC2gAIKEwVgCwOdP3/etm/b5pZpsbqiI3T06FG3HOrQwYO2c8cOq6urs6tXr3qffkwsfr5z+7b3LqDuQAHYuoDKy8vdKhGAwP+Rw4fbju073L1qp06dcvtcq6hwj0JgMXJ1VZXbjzWUPvG+rKzMveY4/p0CMTExtmTRIlu2ZKnGErcUKikx0X3GMf1VKYCyuLjYrVgpLCx0IOdcPOuE55ywjjGg8FIAtk4kjDlWYNiyebOtWrnK3U6DwXN7zf59+91/VvvvVmTau2ePu5N57Zo1Nm7MWBf5/DuzWTu5auVKt1g5IT7eNqxfb7t0rLi4OFseFeUi2orly93/jxYstOMZGbZ3715bunixHT9+3N1Vzd3SuTk57vg7tm/XMdbZwnnz3P6bN21yxwwovBSArROppKTEhrz7rnuIDUCJiY62c/nn3P/U1FRbuWKFHdi/317r29fyz561REWkDes32Ihhw130AqysJRwyeLAiYLZbX/j2W/0tNjrGRb1RI0faqBEj3G06gC47O9s9kYtomabjjx45yuJj4yzj2DF3S8+USR/afp3vpqLkOwMH2qABA2z3zl0OmIsVHQMKLwVg60Qiin3w/kTLz8+3wYPesegtW1ykW79unVK9JHt//ASLi421wQMHWY6iDmkfESti2TLvCOaiG4Dav2+fuw9swrjx7vYc9lshgE3+YJLAF22rV62ylJQU27hhgztHogAUI1C+9cabLtJNmTzZPtS+1Hfc6kLaOXL4CHevGdczZ9ZsB/CAwkcB2DqRqIvSUtNcekdEIZ37aOFHLo2jBtu+bbvduH7dTpw44VJNnjUCQNs+KxKQrVP6B2ipuQAoxyDynRFYzioqAhpu0SlQLZeXl+eiGakpzZJ6gYiajWczbt261ZKSktwtLzRoqOmIvLwOwBZeCsDWRYTRkyYmJGx1zyAJKKAAbF1ERCGiSFNTsDQqoBAFYAsooDBRALaAAgoTBWALKKAwUQC2bkx3q6rua66w+qO9pVkB9QwKwNZNqaa62iIjIu2yt2SLhgvTBPPmznXTCAH1PArA1k3pUkmJW4VCR5MlV6wOOZWd7ZZxfVF+9aW3UQC2bkqsIElOTnK/bsOkdHZW9r3J8CCy9UwKwNZNafKHH9q+5BR7+cWX7j2ynCcLR0VEdPg2nYAeDQVg66Y0dfJkt94xJTnZLbliNT+/hJMQn+DtEVBPowBs3ZRYH5mVleW9C/1eAJHt8/w+QEDdgwKw9RAKUseeTwHYAgooLGT2/wF694IcmI7Q8QAAAABJRU5ErkJggg==)
PhysicsGrade-10
Physics
“Newton’s first law of motion is used to derive Law of conservation of momentum.” Is the statement true or false?
“Newton’s first law of motion is used to derive Law of conservation of momentum.” Is the statement true or false?
PhysicsGrade-10
Physics
In a collision,
In a collision,
PhysicsGrade-10
Physics
What is being depicted in the given image?
![](data:image/png;base64,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)
What is being depicted in the given image?
![](data:image/png;base64,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)
PhysicsGrade-10
Physics
What is missing in this statement?
The sum of momenta of the two objects before collision is equal to the sum of momenta after the collision.
The sum of momenta of the two objects before collision is equal to the sum of momenta after the collision.
What is missing in this statement?
The sum of momenta of the two objects before collision is equal to the sum of momenta after the collision.
The sum of momenta of the two objects before collision is equal to the sum of momenta after the collision.
PhysicsGrade-10
Physics
“The law of conservation of momentum is valid for all the moving objects colliding together irrespective of the direction they are moving in.”
Identify whether the statement is true or false.
“The law of conservation of momentum is valid for all the moving objects colliding together irrespective of the direction they are moving in.”
Identify whether the statement is true or false.
PhysicsGrade-10
Physics
An object is moving at a uniform speed in a counter clockwise direction in a uniform circular motion. At the location shown, the centripetal force stops acting on the object. Which path will the object follow?
An object is moving at a uniform speed in a counter clockwise direction in a uniform circular motion. At the location shown, the centripetal force stops acting on the object. Which path will the object follow?
PhysicsGrade-10
Physics
A boy is sitting in a merry-go-round. The time period of circular motion is 5 sec, and its speed of rotation is 70 m/s. What is the radius of the circle formed?
A boy is sitting in a merry-go-round. The time period of circular motion is 5 sec, and its speed of rotation is 70 m/s. What is the radius of the circle formed?
PhysicsGrade-10
Physics
Richa is sitting in a merry-go-round. The time period of circular motion if it forms a circle of 56 m radius. The speed of rotation is 40 m/s.
Richa is sitting in a merry-go-round. The time period of circular motion if it forms a circle of 56 m radius. The speed of rotation is 40 m/s.
PhysicsGrade-10
Physics
A girl is sitting in a merry-go-round. The time period of circular motion of the merry-go-round is 8 sec and it forms a circle of 40 m radius. What is the speed of rotation?
A girl is sitting in a merry-go-round. The time period of circular motion of the merry-go-round is 8 sec and it forms a circle of 40 m radius. What is the speed of rotation?
PhysicsGrade-10
Physics
What is the direction of the velocity at point mentioned if the ball is revolving anticlockwise?
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)
At point D
What is the direction of the velocity at point mentioned if the ball is revolving anticlockwise?
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)
At point D
PhysicsGrade-10
Physics
What is the direction of the velocity at point mentioned if the ball is revolving anticlockwise?
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)
At point C
What is the direction of the velocity at point mentioned if the ball is revolving anticlockwise?
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)
At point C
PhysicsGrade-10
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?
![](data:image/png;base64,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)
At point B
PhysicsGrade-10