Physics
General
Easy
Question
A vehicle of 100 kg is moving with u velocity of 5 m/s. To slop it in /10 sec, the required force in opposite direction is N
- 50
- 500
- 5000
- 1000
The correct answer is: 5000
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A ball fills co surface from 10 m height and rebounds tis .2.5 m If duration of contact with floor is .0.01sec the average aceleration during contact is.ms-2
A ball fills co surface from 10 m height and rebounds tis .2.5 m If duration of contact with floor is .0.01sec the average aceleration during contact is.ms-2
physicsGeneral
chemistry-
In group V-A of the periodic table nitrogen forms only a trihalide but other elements form pentahalides also. The reason is
In group V-A of the periodic table nitrogen forms only a trihalide but other elements form pentahalides also. The reason is
chemistry-General
chemistry-
Which of the following elements forms a strongly acidic oxide
Which of the following elements forms a strongly acidic oxide
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Orthophosphoric acid represents the molaysis condition due to
Orthophosphoric acid represents the molaysis condition due to
chemistry-General
chemistry-
Ammonia on reaction with hypochlorite anion, can form
Ammonia on reaction with hypochlorite anion, can form
chemistry-General
chemistry-
In compounds of type
, where
P, As or
, the angles
for different E are in the order
In compounds of type
, where
P, As or
, the angles
for different E are in the order
chemistry-General
chemistry-
On heating ammonium dichromate, the gas evolved is
On heating ammonium dichromate, the gas evolved is
chemistry-General
chemistry-
One mole of calcium phosphide on reaction with excess water gives
One mole of calcium phosphide on reaction with excess water gives
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Which of the following is manufactured from the molecular nitrogen by bacteria
Which of the following is manufactured from the molecular nitrogen by bacteria
chemistry-General
chemistry-
Which of the following compound is tribasic acid
Which of the following compound is tribasic acid
chemistry-General
chemistry-
Sides of match box have coating of
Sides of match box have coating of
chemistry-General
physics
Newton's third law of motion kids to the law of conservation of
Newton's third law of motion kids to the law of conservation of
physicsGeneral
physics
average force necessary to stop a hammer with 25NS momentum in 0.04sec is ……. N
average force necessary to stop a hammer with 25NS momentum in 0.04sec is ……. N
physicsGeneral
physics
A body of mass 0.05 kg is filling with acceleration 9.4ms-2. The force caried by air opposite to motion is N(g=9.8 ms-2)
A body of mass 0.05 kg is filling with acceleration 9.4ms-2. The force caried by air opposite to motion is N(g=9.8 ms-2)
physicsGeneral
physics
A force (F) varies with time (t) as shown in fig. Average force aver a complete cycle is
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5d5MDAIKvkwM3PzylrjN9Felqq4VVBMA02JWL3NFeD9XYXzl9Qq2dbvdmMFTEeG8eRMTft7JkzqueYnmEJEAXZ75wfHj16/hg2c8Li/V2f71Sj9CRfTDAlNiNiHFBxvaQEzseOqXbT8/Nbz2EyVsQIBZRF4ZwCFBsdo9tVNR43Fyj2792rBqqYqm/YZmlqbFQdXy+Fhate/lsJEwjCk9iMiHG//7lzano3A+umYCsiRngc/P3zAUGYmjRvdru5GBoaQlpKqkrgTUtNtZoYMw7HCVOs2ywuLsaEhVI8BPvHJkSMVg/zsg4dOKDq7Zjoagq2KmJcSeMKJVME6uvrddeiZ90K42dgGyP2YLOWiM1p3zFXmjnWzU97WG013ikI61hNxNZvJjY27OrsUitXHICr+tyb6Ebbqogx3YLxMFqHYWFhL+0ka2twZZAtjJjgysA6z4e14PfNnDFfHx810Li9vd2wRxC2htVEbB02JLwcdRl+vudUfaQp6+u2KmK0Fjnin4sNTLdgw0Q9QQuXVs+unZ9rx37TalbYOhRV5v4ddnBAVVWV1eJzgn1hFRFbz1OiFVZRXg63EydUbpipuypsVcTWuZqYhIP7DqjJ1mNjY4ZXbRsKBi1HtvJmyU9XV5dhj/XgMbEhI62xzPSMLQ3rFYR1LC9i6ekYGhxUy+ws8WGwlyPTas1g5ZhKxLiyxmNkPIeiy5vR1uFnv379OrzPnv37iqC1oSXIBpexMbEIvnAR1TdvGvYIgvFYVsSCL6oiZBZW0+pKTU5RU3FKtZuNbpupMZWITUxMorioWKVbXDx/weLJosbABwRTKjiso0Z7QNhKGxyu8vJcMm+N8Tpru7iC/rGoiIWFhqgAc/etW6jV/u3vew4h2hOZdX3mwFQiRuiOsZngCRdX3Lt3z+bznBrq6+F49ChCQ0JtblAHS7kY3A8MCDT5uDhh+2FREePgCI4IS01JxhlPT+VSNDc1mc09M6WIsTd9aHAIPE+eVJbE6GPb7o3FDPl9e/cq123FxgT3Xu89nGNOoL8/2tra1KAWYWts5weBxUSsoaFBlfGwtc4pDw8c3L9f5YSZ06Lhkv66iG213TRzxFpbWhAWHKwaC97qumXYY3uMa5+bbjsXTPLz8g2v2g5sjpiTk6O69jJGOvxo2LBHMBaKGNtGsdieE9h57W8XLCZiHNvFfuuHDx1SpUXRUZdx/555864Yd2NqxAfv/U015NsqHDrLmZduridsNii9urqmEnMjIyJVnWJXZ6dhj+2wvLSkGl3SEmcOXk/31qxk4Qu4eMOuvVzMydY8Hs6kYPz2ZUOm9Y7FRIwdU484OODPf3oX53zPbdm92whT09NKxN7XRMxUfayY38TcK/aMN8e4s62yuLik0lVU25vycpudMjQzPYOQi8GapbwPdbWmKTPb7gwODiAwIEDdY39598/Yt2ev8hp4rbJCwl4L7y0mYix/4QX7+9+9DefjzrhWUoL6unrcuHFDdRo19ca6x9ycXPzXH/4Tb/y/X6lUDv7/eGM/6/0v23j83GKiY1SvM/YbYy1iuXb8VZVVz/wdS2+0wJgwTGv34/c/RMzlaFSWV6jPXH7DuM9t8k07XzXVNepndnt9R7seuIrKFkGVFRXqfH7ldyy0sfNsZUXlE9dImVWPZ6Mbj5vXO0MITCR+/ac/w/e+8wq+9fVv4P/867/how8+ULl5JcUlKr3J3iwzy7mTDQ3wcHPDu//9R2UZHdUu4ONOx9QMRHNsdFlphb35qzfwi9d/jt07d8Hl2PFnvndD25GjamMsjxfFH975D/xFe+Jxlc2cn2Mzm9NRR+zbvQe/f+st/PbXb2Lvrt1wtpFje3I77ugEJ+1cvvfnv6jvh9fEfs1q4HBkdZ6fer+lNh4Tr5lPPvoYOz75FEcOOVj1eDa68bh5bfMaf/ONN/DD136AV1/5B03IvovXXv2+ErJfa+fZWXsPBdoWPYitYFERYyEy2xQz+fJqYiKSk64i+ap5tpSrybialIS42Fg1rp9Z98xLe9Z7N7TxWLWNMTF2KeUNSCsvwM9fZfI/83csvPG88kLd8emnaj4BP3dqyhY+s5k2fjfceHychPRX7VxSPJg3xtef9TuW2Hg8Hu7u6uFEr+GKlY9noxuPkdc2v//PPv4E//LPP8Z3v/Vt/OgH/4Tf/ea32LNrF7y9zqpFFAb+9dbI4GVsUcQ0H3txEpNjIxgceIzhkUnMLC7jWeuNTLEIDQ5GlmbyDui83IQLBuy6QbeS6RamLpcylu7b3bgUGqZW/RiDnDfzXMmtwtpJxhgdjxxR8TFr11JyMtOVK1fUYOGC/HybzwV8mkdDQ2qx5E+aZfuHd97B7s93qowAJjtbarqVNdiaiM0OYLK7DJXXCpGcUoi83HI09Azg0QrwdObXuojlZGVh2ErdRU0JP09QYBAuaoLBJW1boLa6RrkVtBRZFaEHmPrCBR9Wbph7mO/LYPzL68wZxMfF6bJV0MjwiIrZspkCVyfZKYSdfK19Xs2NkSLGxLoZPG6/gar4CCRl5CO9qAAlyZFIyi5Hbuc0Jha+nHzHmz7kOf3E9AZzcphIS/dn544dqg+/teH5ZFH1559+prnRV20uwfV5MC2ALZhOn/JU7cmZxmINGOyOCL+k4kps2qjHDhu8JhsaGlXftu2UQGykiGlf8HIXatMuI8g5DEk3etA304Ph+nCEn4+GZ3QHbg8vfsmttCcRW+f6tWtqjmOw9rlYOmWtrGn+f2l50YJwcnTEtZJrhj22D7uCJCUmIiggQK1Yj1rBglQdP+7dR4Cfn1qkoQjole2YuW+ciK1OAEM5yAz1wcHDV5BSPay5j8NYeJCI8JO+cHLNRUXvJJ7MULJHEbvb04MQzUX2PHVK9eO3VmyM7gJrURn/CA8LU50i9AItHpYesZKDfds6rNAscb2CgB18ExOuqNiSoB+ME7GlR0DHJcT6eeBD51xk1rNj6BiWRnMQ43ISx/ZEIfvWCJ58ptqjiM3OzKhCaxdnZ7WqZa3OrwzaRkddxlkvLzC3iW6FnuCSf4JmRTocPKg6mlgaJl6fOXNGdfzo6e7Ggp2t3tk7xonY/CDQcB5R3ifwnnshspu48jGO5bFcxDm74djnoUjtHMaTzzN7FDFCd+iM52mVHU1ryBqfi8NATnmchIebuyqv0qNLkZ2ZpVodMa5nyWTMVc2V5LV5zMlJJQfbe4mOPWKciC1o8tQUjGhfd7yviVhOM0VMs8QeZyPG2R1OuyOQ0TWMJxvA2KuI8aJPupII1+POKidrYMA8bYVeBFMruCrJGZl0jfTIzZs34XX6tMrVYqqDJUpkKPZsq5SmXZMsz+HEeUF/GCdiy9qN0puApPNe+PxYJrIa6L6MYGkgGeHuXjjqmIrSO2N4sg2fvYoYg8Idbe1qmpDX6TOqBMSS0BVjSREFIDY6WrfZ2AysM3GTOW6s9bPE6hqvwdzsbNWxlx1VaNEK+sM4EVvT5GmmAiVxF+HuGIPk8geYWOrFWGsUgn1D4XahBu2Ds3a/OrnO7Oyc5galq8xopl1Yklu3bqlhw0y+ZYKrXodvsFC9+ma1SrXgAsW4BWYZcCGGokkrlgsKtnFNrmgW4rJmifIBaXhJeCHGiRhTWdeG0XsjBWk+vohIKUL2jWLcuBKISzHZiK56jEezX/4G7FnECDPPWbfI4DDTHSz1+ZiW4HHCDSnJKXisuZK6Pa9rUK6dq7Oz6p7b19dn2GEe2K6bczh9vb1V6Zi5ugtvmoUHmH50Gx3359Gvr/UZq2GkiH3BYl8r7pbEIzMnC7HJechJTEVJTRdaJ4D5p2LL9i5ivb33VMmHj7ePGtBhCbeOMZ3kpCRVPF2kuWB6h4skdO1Y/8mOHOa0Knvv9qrkVsbCysrKbMANX8Xa4hgmWlNQmRaG8IxWFHXMY2ZJ6bvwArYkYliew9JEPwbvdeP2rbu4c38Yw9ML4AL10yfe3kVsbm4e9bV12pPdB/7ak51WhbkZH5/A5cgo1f2BgXG9wwZ+WZmZqgQpSRNnc6as3Ky8iUP7D6qW4yPDwzZwPS5hebQNTTEu8DvwMQ54JyHsxhB6x9ewLCr2QrYmYuusLmJtWfsSDP98FvYuYoSTfDja7dCBQ6odtzlhJ4KmxiZl/bGGk7ExvcMVye7ubtWVlrGxyqpKwx7TwkWDjPQM7Pxsh0putQ2WsTLRjZZIJ/jv/QAHg7IR3TCGwZk1rIiIvRDTiNgG2A4itra6prqqchxZXl4epqfM56IMG4p9GdMpLCzUTcH3y6A1xvjenl27VesYU8PVZBbsR1y6pIbVsBGjzbA0icFcP6Sfc4JXehcK+8SV3AgiYiaGbU/OBwYiLCRUWUrm+pyM6TB2dMrdA3d67thV6+H8/Hx8/NHHiI6KUv34TQmtsPTUNJw19NeymYA+WZ7BcEEgsgOd4ZN9B9ds6NBsGRExE8P4CnumsSNoQly8WT7n6toqmjWBZJUAe1/RjbUneK2wkD3kwgV1rZhSoJkM7OfrC1cXV9WqxqbEf2lKWWIZfpqI5fSiVP8dqyyCiJiJ4YphXW2takjHbprmGA7LcVxFBYU44eyC+Ng4uyuVYUCfHTnYVSJfc8unTNTQTyUmd3SoxGD+bc4StSk0EXuUdw5pZx3gntCAjO5FLDCbybBbeDYiYmaAo7JOuLqqPlns0GDqdsDtbe2q4JvT029W3TS5SFobnq+WlhZlZXKy1MDAgGHP1mCjQ7Zx5ookC81trlmg5k5OlQYh3eMD7HQJg2fGbXQMr+Cp1nzCU4iImQH2xGLffc7Z5E1j6rhLTmY2Trq5a25rpurcaY8wZ4yWrOPRo6qzhCngpKWT7h7ad5KqFkJsTvxXF7HcU4S6ZD/4X4hDeF6XiNgGEBEzA0zS7OzsVOUzbBXc1Wm69tU8b0zSZMcHjpCz1/NIayz4YrBa6W2srze8ajz8e1z15EQoNo20TetVO6alCcw87tOsxiEMPp7FwvKauJMvQUTMTHAVjHEdriA2NTYaXt06tFAuBJ1XY7r03IH0ZTDgnp6WroYA5+XkYGTkyZ4om4NuI93T8LBwNeOSDxjBfhARMyN5ubnKfeGsP1VCs8WnP4WRSbQsWmZHWbassVdUEL69XY3lZykSrU5jofBzeArja6xs0FvTSOHFiIiZkaamJlwKD1ctZpiJvtUhGP0DA4iPj1cixv7+XKW0ZyjabJa4e+dOxERHG+0C8tyzAoB1krZRYiSYEhExM8KcpOLCQtWDn5n8i1tcDevS3CBOUacVNqgJmj0luD6P2ppaHNi3X1lRXCChhbYZuCLJIcoc48+eYZv9fcH2EREzM52aS8ThsCxx2Upch9TX1am/xf5h2+X8sSVPbEysWiBhJv9mrM/FhUWkpaaqxQFaw9L00D4RETMzTKi8eP6Cah1NEWIfK2NQCa6aVcd+/nm5eYZX7R8m8nJuwBfn0GvDhe6MQTKf7rRmBR86cFDl04kbaZ+IiJkZroyxhpJj+gP8/dHaYtyKIguV2XAxNjoGt7r037FiM/Ba4UolV3qZf7eRvDteY6xfdXY6hisJVzA0KFaYvSIiZgG+SBdIw/69+9R07k1liq99MZLtfFCgsihKr5eqgPd2gyuVnGPArq90Ednt4lkw+E/BykhNU6IXFRmprGF7q2oQ/gcRMQvB8qNA/wA1ILZOcys32rWUN2tDfYNmUThpN+UxtdK2HeF5qKqsUkF+JqzSNX9WzShLlCIvReCow2Eletv1fG0nRMQsBIdS1NfVq86vFLLe3t4NWQcP7j9Q8SAKGEfC0Srbrow+HlUJxMc1F5F91DIzMtDc3KxqVTs7OlBWWoroy9FwdXFRDwxrTBMXLI+ImIWgYDE4T/eGg1opSP39/Ya9z4ZuaElxiXJDGQ97cP8+1rbZeXsSnsOx0VElXk5Hj+Lg/v3w9/NTLY9U/EtzH7kSmZSYqM7tdkhBEUTELE675lYyA503IGM7z+twwRu2prpGrcixCLqkuFhynAyw6J1TnuJiYlQysdrCwpUVlp+Xj76HDw3vFLYDImIWhp+7srJSjSZzc3VFQX6+shqedC0nJyZVHIwDM2hdcFHAVO1o7IlJzbKly8iSpMbGBrvt6CG8GBExKzA7N4fa2lrVnO+IgwOSEq6o6UgMVM/OzOBGaZnKMGfsJyE+AY+GhsQKew5cIGHQnxbtRmKMgv0hImYlKFjVN2+qOkgmsJ7zPYeQ4BCEXgyG71kfnPP20c5VukVGvwmCnhERszIPHz5UdZVcUXM4eAjHjjpq5ylYJbdu55VIQdgoImJWhi4QYznMwmcuGXvAs2jZ+hOpBUEfiIgJgqBrRMQEQdA1ImKCIOgaETFBEHSNiJggCLpGREwQBF0jIiYIgq4RERMEQdeIiAmCoGtExARB0DUiYoIg6BoRMUEQdI2ImCAIukZETBAEXSMiJgiCrhEREwRB14iICYKga0TEBEHQNSJigiDoGhExQRB0jYiYIAi6RkRMEARdIyImCIKuERETBEHXiIgJgqBrRMQEQdA1ImKCIOgaETFBEHSN1URsbW3NsEcQBMF4zCpiTwpVfX09wkJCkJ2ZicGBAcOrX36PIAjCZjGriM3PzWNxcVH93NbWistRUSgqLMT4+Lh6jfump6exsrKi/i0IgrBZzCpiU5NT6L3Ti7q6OkRGXIKrszMCAwKQkZ6BivJy3Lp1C2NjYyJigiAYjVlFbG52FmXXS7F/z168/tOf4d9/8lP88ue/UNv77/0NWRmZ6j3iUgqCYCxmFbGV5WXUVNfgL396F9/62jfwyre/g+9881tq+/1bbyMvN1dWKQVB2BJmFTEyODiIs2e88Mt/fx2vvfp9JWS/+sUv1Ws9PT2GdwmCIBiH2UVsVnMXaXF99vEnSsS++bWv48O/vY9rJdcwNzdneJcgCIJxmF3EGLTv6+uD15kz+NFr/4TvffcVuLueQH9/v+EdgiAIxmN2ESMM3MfHxeHNX72Bt9/6nfZzvFhhgiCYBIuIGLlWUgLHI0dULIyJr5JWIQiCKbCYiHXfvo2C/HzU1dRidHRU0ioEQTAJFhMxZuaPjIxgZnpGBEwQBJNhMRETBEEwByJigiDoGhExQRB0jYiYIAi6RkRMEAQdA/x/FiKWciJ9GhcAAAAASUVORK5CYII=)
A force (F) varies with time (t) as shown in fig. Average force aver a complete cycle is
![](data:image/png;base64,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)
physicsGeneral