Physics-
General
Easy
Question
A ball is thrown vertically upwards. Which of the following graph/graphs represent velocity-time graph of the ball during its flight (air resistance is neglected)
![](data:image/png;base64,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)
- A
- B
- C
- D
The correct answer is: D
In the positive region the velocity decreases linearly (during rise) and in the negative region velocity increases linearly (during fall) and the direction is opposite to each other during rise and fall, hence fall is shown in the negative region
Related Questions to study
physics-
Which of the following graphs cannot possibly represent one dimensional motion of a particle
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)
Which of the following graphs cannot possibly represent one dimensional motion of a particle
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAfEAAAGICAMAAABmwSlGAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAMAUExURf////f37+bv7yEhIdbe1q2trYSEjBkZEDExMcXFzubm3sXFxXuEhJSMlL29vZylnFpjY1pSWtbOznt7cwgQCHNrczoxOq21tWtrY0I6QggACAAAAEpSUpycnCkhKUpCSnNjEMXvc3M6Uozvc3M6GaWc5nMQUnMQGRlCUnve5lLee1Ja7zHe5lLeMVJapXuc5lKce1IZ7zGc5lKcMVIZpXverRneexla7zHerRneMRlapXucrRmcexkZ7zGcrRmcMRkZpToQUnNjQu9aEO8ZEO+cEM6c786Uc86cxaWUc87mrToQCMWcnMXvEMWtEIzvEIytEKXF5u/eEO8ZvcXOEMWMEIzOEIyMEKXWrbW9c3u9c+9alEJrGe9aQu8ZQu8ZlO+cQu+clO9aa+8Za++ca0JKGXtjlO/eve+tve9Kve97vcVr785rUu/elMXvQsU6nMWtQsUp784pUu/eQr3v5ozvQoytQoxr785rGYw6nIwp784pGe8Z78VrxaVrUsUQnMUpxaUpUoxrxaVrGYwQnIwpxaUpGVrv5lLvWlJrzhDv5lLvEFJrhFqt5lKtWlIpzhCt5lKtEFIphFrvrRnvWhlrzhDvrRnvEBlrhFqtrRmtWhkpzhCtrRmtEBkphO/ea8VK785KUsXOQsU6e8WMQsUI784IUpzv5ozOQoyMQoxK785KGYw6e4wI784IGcVKxaVKUsUQe8UIxaUIUoxKxaVKGYwQe4wIxaUIGVrO5lLOWlJKzhDO5lLOEFJKhFqM5lKMWlIIzhCM5lKMEFIIhFrOrRnOWhlKzhDOrRnOEBlKhFqMrRmMWhkIzhCMrRmMEBkIhKX3rda9c5y9c++t785jnO9K7xBrKRAQWilrUu9770IQKaVjnBBCKc5jexBrCBAQOghrUqVjexBCCHuUa6WUvc7Fpe//Ou//vUIxEKW9pcXF5u/W93taY9bv79bF7xAIIdbv1u/W3q2UnKW9vXuUhAghIXucjBkICEIxMffv9+b3962tnO////f3/wAAADnhLOUAAAEAdFJOU////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////wBT9wclAAAACXBIWXMAABcRAAAXEQHKJvM/AAAwEklEQVR4Xu2d/XLiPMzoE8efJXExhsU0BN/L+985N3Lufbd0Wthp3zLdmSOH8NmEhD6UJiS/sjQF2iUosiRblryOjo6Ojo6OtoOy7y0F4eygPZCkfee8h1YyO2oLvmVRdthGkI1NdtgWCItViwd2zeKZyI7bwZON4xYr+dMsfmCtUnJ/OYyD2LZVyVHEGQ94mxwZoVTAOU/87OcbAY13I/WCFAu0Z+nkl7G0RVd8MhXT4C0yDTvlgUwRRW+bzPTmKZS8Fhut8fzFBOSvbpGSvwjfBkskGqbjCQ8CazibfGQPHCFUOmohdyenJH0sD4Q89Uq8xSr7uRVAdFb8idQVnPCYSqKDGclVcx+7hxfaje0+Pnk5q6B5p//f+GfZMjtsEpT14F7HwWD9cx54LczTCtxsifvIjVPngSy7zw6bhH52U2UyjtczZnlqjEfxgTDzVb3REhcR8RdJcuKqz8GfPjfxlEO2kzgSZClT5wvLMXYD+p0YII/GsZb430KkwzqWhPTgKR8LjAeELNzrgSZLXHKmEdLcnuV5okkD7biHdCpxGj9jCKoDNWUWfsaj9zmdC29g2AgNbBxbKqVhFMZ1YaziQeh7UjEdac7M0/ovKfZ7fdA8nnSgKPYwAblnDxWTejYp4Lk1cFRfhYwOMGVxhLyIR1jQYIK9ZP4X4yCCaz/uLxDcRxgns1jD+SojhRM+JkFsxxjkvjYHTdZxGUlMYEQXD+apJNpYEbU9TbDjTTxl/WCosZM33xtMpjBq+yamfjgF51xLD2tmsHdnY/DuBDzhrZL0JEXAxgsTu9kHujnrBkscR0REUiQ2No/ZQ0UgCzqQHYMdT7LDBrGijJLow80jfHDQYc/7y9Sj5FxLF5GNmXrysE09t4hpD5m1Ss/jCH52U2wRy866yXZ8yS23bmEkG6+KISzenmczddxf++qOJEglLm3/xac8DkJwY5bPoOOYD+E1YPFDDymWhubRMPHCByfxW9Bxz7sPGBuyoHSWGCsWxyoLVpppxzNf3UEC606lx8F0LzANHmDQ/g0Kn+k4ih5Ax0epgP85zaapn3MTOu79E0lIyekpJgdhwfOQZyfaeB2XPHD660SYEIjU3hX2lqz/4iQuPR9R0HEviUHpPWyscBL3nVXIzrrBvrrDR6h8iliMVJ8ZnS2RNtKOI6mG0ebSTlhA7sbW3nnUJnc4mD6CXk8EjOdDCM6wieESwOpBD3D0GvkIfh6sXkYxxDWORuu4D46MXx6M96jULBLZglEj59WXEFsr41QbwJE1Rofgl/+mUWiM9OSUcYpW8t0QsbSvk6Vz2dVIazB4y8mrJX+Wk0Al6SXfZIn/MWbgCa1liR1fYBRCxJKF5CDx5un4X3q/fMuUFBAJTVdUFuguieBRmSSJhGBknGA4Xr5JGPiQpBQukX/pc1i+JdG46RJHEVzXHqYTXuqr+/rhLTtsajx+MRos8d5yfc3j1/ldelDMSj/Q7LCh8fjlaLDEZZZ3Lt3sw2nQnsRbr+PN9dX9t0kkJdGzGKKPEsCLzY6aGo9fjCZ7bvKdBTyIY575sMUgHW9zvzo73uDTFxCzBLzCrprOju9otMRB5lJWyYcAHe989YyGS9xPU3sG20C1iH0db7sdf22wxDFxJOV5T+Crd3Y8Q7FxdtQ8pA0Ye2XPLhvgNGDHw+yws+PNHdWRiQP+i79zrivoeBePZzRY4oP+OxE9IcTfbPKtmJUe7nS85Xa839wLHi83ksMlSymdHd9j2mBfXWySXwZls6wHOt7Z8eyocSBJww/nrC87X/0MmizxCFz1IAhe2ahCPN7Z8YwGS9yn4Ks7gtLt0J2vvqPJeW7CSPDVpSSlo7rf2fEtDdZxD2E3yeojUVg6YQMadXZ8Q5Ml7rsUrmRJdzuMiuji8R1NljiZsZS4dKeh3/nqWxos8Ucd/+KzyYTzZZnEu3n1HQ2WuAwT8VffP8noJXukkC4HZkeDffWe238U0Uesx2X7Ujo7vqPBOo4jFWJi+qrCbuLOjm/5jxJfIYT8Miv6XXwMHzQOH4ZxmP8O8GbLeDevvsd/kzgiEY1o6WLlN/EUGelhara7c3wsyfZrTOZ/s8e7Obc9/oPEcWLeJ0qbed+OSvOHvwEw3hj+rfZ2Ews+C3gw4/A148FQbd5WZ8d3fDnPTWplRjoZ94SQb0b9QKVPnP2XaLfTUAYsCGYuF2oWBAFTmzeF5nGn4xlfy3NDkoKQx9tlaUxd1aUrIzPBDRTZaPmCJkTKe0PJWP4mNNoOPW9867n9jB1Hi5/ydo750qg++FA2OjwDrGmVxPGLgaSkel2QmCi6cdEQdu9KZLVLRbTdu7BYF7xz/IyO09qUO/6CxJEwlqRVfvcBkV/znAbcza8+pzd29GnK7Ar4mOYp84/YccknV1WIE5yf54YohME5QxQeXVPkiIweYrDVYLif7eEkki+mBsZ2YgKeZ7F+QsexZbWp4X92nhue64LuUVJd1T760WgsyRjCMHE05eZHAeNuC6LO21f+A3YcmWGFspJX4txRXZhNNZLP6Ov2GCpu1eYnCrSf6z/ZzwdcX8cRfdhGDT/PmRIX00nxe0+u2zvNF8nSlWUlg88Dpi/I35yHHde348thbYw4cJ4dx4qfGBFFf35NJX+as1eJFSvQ5SKureM+YWn9tbpwnh3XdhvW5uCH1+0qRZREOlZCfG7+A6HEp2gi49p2XPB61XM/a1QX6nRBTDq5psSFRB4OQH/8Y4kLA/ZlafM3IF5Zx2EQ2m5drwXnSBwberqoEp2UFV26JGKJsYm1J/RRDgyexiBUaXYdofa5rh1faWbqEpetOcOO45EuSTaJgmtKHMlkFCiB1fDQ1Pjjd6NdJK5+5XmS19Xx5MHWyYgD1e041qOyxIOIX/VyRmSkBeiyIQcX2komTxJk7aY9sof2uaodlyy4avxSgcqjOqKl+/K9t6vacSD1ztCxjyZVQhMR8Ti3mOM1dVwG9SvIUFXiK1o887Llyr76jsNJNxTNGAtYnJ/VfEU7ju0wKkvBuzpV7fjSlL8O0f+5psR95L7gtrcwtgaFNmDPBQu436PjQn/WiIVh+l92XB8q2nHZT8ov1oU217miUeKECWZ8rgzc+mnzxgMESYo69H6LHccqjl07qgOi8vKhP0C1UR3islIjDh/zqLR/xWXAyvVyRPM4Y9PKKwMvTxmg79BxeCt2OgwOe4qS1/Jikj9AJYljWr5DGyD9bxgu8/BJemkRpozpG6WOKv+QkytV32DHV29Djj3KmKt1vgHza0aB1alix1fJNkXwJFG1l10AP/XOMXlCKwSMD69Hsjmn3J6m36DjJAicS04CZrbXHv4VVzCEP0AVO151Tcy4zmvXBGdNUvzDjxYnkUAvC3RH8t735e34wLJ13qRQD5v+O2428Dom7lwqjOrSVPuEkDHZ0VXA1CirzFG+nUMozqd2aq3Ne+MX13HXeiZ7E1jH68VFRF1PqlpSLnFhKvpj0mwzhK+ABO84RX2a4xAQij+4p/Ln3C5tx5N4srVmqyRIew4tma3RkvgBpXYc6dKKiBnUuJ7oV0LwIbc61CpgnzxirIwGqM4dnC6s44g8HEyk3oMxF5LPqhnCH6DMjlf12gB1RcOF7abAE9K7jQgZ/mbLgsh76xe24yJgH9nhGmEZD4J6rZDuUzaqC1V1CBTqVLbEhSFs3bwLQMvUUT7EZUQUXH+X1XGsmD5yybF+jo8fqxElEhc6rLgACqP/kap9I1lAnrHu/bWHUFZ65D1/6eeidtyn7HO/eyTLOrD9JKftOIpUVQdE5DrG3wQm243CQNqFfI+BTTMiRkFuAsdFdXxZrxy2Kpy24x+qagWJuwqLqZfjz2G+Pzn81H/bkXaOk8pdLb2kHRez5vVHPDmqQ2CWHZXSs9vtflcAL/dn0hf3BxJH64yIFbhQ3+yrY75rqtUYTkkczUelNXUyEFVVX3oJME3WuwxT7o82OfZUFEbyrSAj4nJ2HI2GdZ1mOcEpO56YykElMeSa3ulCM7fjbP31fLzTEEWz4TojInvggIvpOErYr6YZceCEHRcqqbqej/X8qlPqTzpmz9uvtLn6Pn6k4EpQ+ytZOy5mxyESv5R5uCaFo/rqyVQOt6rkwF0UTOkH+UvGY7iNCf20dd3HhBwtqG25lI6L97hxXpujUOL+snraravAc1UGBxG4f+ir+4uTl9+F7PiiHzfQiAOFdlz0S2tfbrjyNmIAH16MYj86d7764IRTUVnH/YHsFX4Evt4umDWMIjuOdL/iCflS3dfq3JE0kWu4X0BlOy5/seKKr3+D8j739aRoVF9W3hksbKWUqOvhY4Hx36LExso6Lvjre3AcBmwQ782beskokLgw2/pnJWBdt202jhUWosB1q2jH8TSmYszj3Cv/rh/Pa5imWokCOx5W2I+Qgq5cJqA6i0Tlli+ppuNYxW4zvFAxP16ngT8xiuuYl1yNfDsOpjk7KiMytavdvAIJoQFJDPv6vLrLZEonEVeaseOUED9xqatNJXdUL902vIX0l9nRT3I4+4MkIZHblGK+rONIx9tF0GTGjpJCyKx22wfPIE/iiFQdqaU6zP+4Gk7G8C+7iUPJkoAFVhOBjvajralix6P9VCqhhsH+MhFSwyvtxPgW8uz4wFYsPibyMkmvACZah5pmX3p0OOfmJ4GWxe2RynXcJ8FBmhoOH4KdjH0Y8Kt9PPUkx46j5HNaRy6DyoP/hUFhmqq65XCOF4mTc0fldlz8Ogq9/GTPZ09ifjyp2yhyRnWpqq2D4fCKeU6HRMzuc+ha+UUZbmtKdXwwZZ9GbWnBZ3cHPmGzGkajZ/BZ4khXG7QGtGpa8+URFL88vtzduS1ICH2OvO/k8m1ZMEVaZsfBTTefh64X8NndWtwn/W8cn+04MVUis9WTPq+M2kXZNOrwHVgeKx02D/HDMD/NrUzH0Tye5sXaq+R5aPDCsNHJEaT+fLLjSFXaS7S4cnXtPFBiAK2Coy19jyM2DOxk9nlwdpTYcTr8VXBi0j7Y6bCij1NfPo3qVYpBgMDD8OetWcIyz+1wa4Qvuf4rMO4lNG+TzGkdj4bFm76xYfHs5wa2C3Es8ScVVnDbftBp2wJ2JVDWKqPs4TyoLze7F0je9NBJO05O1mZCSVi7Qj5nc2TH/Uq5bT/ptO2Q1HVC+uu9HPViQuDXwVXrY2K2zZD2OKHjvpx9Dl1ujSM7PrDb3T3FiHq0gBAff7DrRvHHHK11YKuSJIlUnLu94oQd/2PzTf9NcTiqIzItN88wpNciIkXRbCql4vx45dInfPgwjNlm9/4hxTqO61T4/ts4lLhQ5fOrYh7WxF0ds4cQLcF9O37Tfi+0fKJF7rkU2nE/rFPh+2/jwI6vPsr3uQvz82FZhk/CHgxLNGeJzBcCF6hroY7T4XsLBH5ox0GaZSpOfmou/TN3mUhf9nLaVj5aFRVWzyiy48v6lVD9Fg5G9bey6YUV+aHVsjwGmYDwXkobplTrdELGF718yRfoOGHPrRD4gcQH85LkNrTs12VSefWyIMkC3d0tkFC7qxDz+CFI88h9cuzCZ+TacV8E5avmt8G+HS9LbsNJ5WSob2egp794Xzns0Dxu1BlpGw7WgkZLlafL+TouLIvqV0L1W9iz4yUz6is8uvbWkxOgKFjPsDrC7fjtjz62iu2/5fqYeXYcG9bMDSZfYG9UX5qTU4hSaVEjNcDEBlrrkR6Fu5qx/mDfb8dRnpLn6DjSD83NTT2XncTRtKBVfwqK1FvxPo8fQZBPFyASB9lOYd5+/hw7fpDWduts7bgvbZ5GZGBasXDjlcH4IOxeCbLX2WMV5lWf+qzjbYnL1mztODbbns6fQFLXch8CuJK/7Hy/SwoO994n0XnX8LEd98Vr09NazmI7qv/Jn4V2IKJqsXRyDJ6zYTwcBnuT4WhvCljw3EnTYx0Xs4c2CXwr8bukaE7ZH+ijBei6kAx/hVEUmf3KrL0JpxK/LLCkfJgrySM7jifx7a+X7bOx471pUa2mROl6FqTDlLq1kn9I7i+Q38+GM6us5UNWJc9toGJdcOI3ysaOJwWrCNKYqKZ+rNxcoyLZf4fScBbHw6Bom8WBHUf6UxGZWycb1XGY21YYJ6NKaW8/Ak5CifGfXmTfDpVZJqGOCselfR1HeUU2b5xM4rkVlpGg6lSM/tOMWfA+BYVmZ8UR+3acBG2Ky9Zkdlx/bnjxb0FsjaZVc0BLO4zj+NQ8Qg57Oi6bWZ/rv7G249J8mquAkKxm9V1ywCSiH2e6GTs7jvlDu9z0lPWorj+FZlIrWt+a0T4eFG8eLWGr48LuLcG0h1TiSB3Vs5TamN0iVP1Aid31mTqTjR3HKq5ZZ/DrkNrxoyIgIgEFr/VaEh7tbegGIWbfK5Hp+F4Ho3YxdS0n9utxIkHmU13ztUOcHOSpDs6JsDI73sK4bI0b1dFk67et8IfiodvSUWvE2hJnoKOK+qeBUR1+e/n6XtOJpe9GMelLu9mtgxOrki/7RNdjsF9eXS7PyqdOJS550Krlkz1UMN72tBFamRo76HtgzXcEgTmnmj/Y8b94wkrztK8E2iRhXwsVyEE6hYEJ+Odpe5HrIsZfOONHHex43bQ+q4ZvA6pq1FRU0oM2P99OPyDSDpBYUqN+xF/D8y8szeGE7Pj4XF/9FMgGAcvtrvAzDFRA8eWvv3XBlEN8d5vyUJvxcsr7ydPKX8Ej+1/u9q34aBEF/Owzxq6aE/JWPtx53uJMzy2Ofw2+/9Qqg9Uw0JeW+SDSURjR/3NwB9+iiDP+HLBgarSOIuqAe/fU+jj9Nffyb7lz/81baNgDj84b2MTh/O9RBb/TIJA44zM+g1t699M3t7jLds1uLwKm7GE4fGAP7h6+ucMhHANZYTTGnhmL2ZCtH4Sv/3Xfhunvwcvjw9++2I/D4f+yZ/j/g4o1AzOwttFeCuN5+iHN1E7spC5Ya0HkF64R58skSZbwb323AX5YcmZIQrIHkiRyd+7x9NvS/XjwK5cG/jjRcKlpeVYqPKL8PyQyPAlXgX19+3/w7/8O1t9/4hjeQ2SZpdebHOj/+AKxNL/65Eyf0ceysGJ+NdZDyo9HaD6cSsirlja/CFlGxM8h+qpCIZLbxSdXrppVIPHrzQvgRkz5fCObaoTXYifxNDJb+XAHY52cVu2a0dEwFMt6IEibTVrOXGL/x2y+frjj1tjo+OqeGxraWFHqmjh/rnV606Bt0b/bZyNxnLh9J5FLC8VJC04f9dwErRy7O+QhFbfmCt9I/DFd0KBpeshgXJN1pW9EcBa4OacA7onn6wa3ujmTjcTXMg5TiTsW7gJwk8/pdt1FtmkXwUHVj6ak5NLP4kuTYBwxIwbERYeoZnvjv5Gdr+5Y67iza9yAHmgtySzQj3c0gHt4XIx4UHHbof9f50i+FbT8vQJvlbnkH5nftfpW2frqDj+TuB8F8dTD72yWSGJZ/7dY2iABId5Lmdjibcf7rIStUuP1p0jLA/19dqumKCsV1BLydVyC0+7hkLmuTyLdqUOGfQ9ZrowJYlVtCJSKq3puQ95A2KZsiJAvcI0KjBMKJysiKlObJBJKC8rCHYMbkCyWki9xLwGJe4/clUe5e5/CuUhmPMG4slPVT7IkIwSfDC24wde9GsZBLUsNbBhnmRGI2Jnwx1MbwYg2+xD3dt0OEUf9SWCrTQrikDZjrCiQOIVR3XuZOO1+4hZ0WgYKpL7/Whj8P5ynC7f03+EB3AfMLYO6T66ubHQchrSgh9WQUeGTIEgwipj654kwwiJi1dx4P5pNSK291YwDiW/suJM46DjmvAd+Op+CTv8FHSdMr9c0N8nNj3KcpZPmQRRjVtY5EXrM1tuQfDlh0sOWJT6E5umcBOc+XP+M8yBO3bsUIYXs5d56QoxDznK62taO/ZqNezoeOR3HqY4jbt2oDjo+eH1wCYH4b6XVe2wCJevtBYOOry9IPHVnqtzZ+/0A3rSYcM+z/CNJPsj2JO5UlkuZx4zPhnHMlrWv/Hg4qmuWlVQJdzqOU4mPQcdXJmYTa3m1YrxS5zaKrRPj1FcHQL1TiSdwgZsAnBc4dc/jdv3sBv9tpIsJ5y6Vpf5Kvi/xD/Ucc1fGyyc8HtLBKI6VlCaOjVzamIWPGI7j+B1eUc6/s7YG/QxbXx1bEDOM5/BZIDXb6jhLw8unaglJmE5sPZpLnGY/HqfgiFuXvI6SqZoaYZQyYI3hnlClrMEe1kq91V+SVRlvJZ4a735a180EIGHsJB6CCRdCRJV2ryB93VSWL3M4qrcKf0Af5i+pIZecER/bhwitBDhxyJdBcOf2G8fDIavWSmNwn9+ko3a0WOIEwkcWOEsuQLRBAiYrSMZwOEsoB5MsPeGs2MTNx1ag9gY8I7Vd7QSG6ySJnFOy+L28T8Q4IfcCk497InofCXF+JyaE1H6j7Zn008mljnN5xH8GWDTxaqj1Cld9+Scio/q61vNLHRdl8XsasyZste+4EL4X8V17lo428NsljXS0iOWvbF2poyUQ3o72SUi4rN8xHrhvpF35Qofc/9Kt8NTRh3rnVgs5n/CJafOeMfKrHTq+QnLCRvjuCfeHU9GenN/P3PMaFZP5VpDhaU1POmv3ZsS26Ljn/Rv9SqfiI95uiYOOt2TGDXS8kzjw99coO7p1kM4k/t5miSNEA/UNZdjqiG/Wo/pbq3UcL+0Da0ZJ0/8MGnU67nniXoc627ly66D5WuK01TruPy0QWqBW+G7/Oh1vGRtfvd12vFXoSZrwvOR53b07bg3/sWdddWiETWBwbivYjpsCfUwZm2k5NgFjNd8e3nEJkCBJspR44ar3dlmRbcBFoP82G4q7PK+Ojo6Ojo6Ojo6Ojo6Ojo6Ojo6Ojo6Ojo6Ojo6Ojo6Ojo6Ojo6Ojo6Ojo6Ojo6OjmK6zUUtY9FtL2oXTzqo1P7n5sGyJbV9BkFsG9HI6btJWlKWEdE4jjslhw9CxbNq3e0ajuQsjqe3dqq4qIsNKhy5oyDeNii/ZfAoUMHENnE889Hi5REjJ0H06I7WDwNIUFrgjcqiugfIxix2TUxvHWKofv0IVQN9FpQYZRR1tUpEqPqqt34YLgX5PrQFEl8y6rbBfzpdtOQsCIK0deltIyWmbLz428BK2r7QLObECfAuYrHZyRiHhY3jcdrDDv0+Pl881SZQdJoWtrppkLfSaSPu7OcmscIqzvrV9Mx+49iVDCYn5xjk6PhpFOEkNii54WEdy+zkUCrxZoKDzBxhfSBCMSvS8ZSnuXrKDveIHozfsCtfEIK91JMpBVGjPtaHPn1orMRX06z17niUnjYerFtNymBtx7EQWUkyJMT6GoDPZxEGE+Je6l7snlh/ZOHQNKsMZ+rIJJJWEh/m8XMmcaSfd03JmwZhE6eVeJnAN/9xrJVxvrjkHOJNX4ZKaVcxeYUTrfQYeUjSJSJBPLQJnVq1RN7AWL2OTSlrlv/qJ4ERIlFxtUBrMN3MrSLa4IbFTzYNqEgajIm3SBLrgmoZvMOwTS0dfwRuFMATO044nGfEWLhAJuZLPJ7GVsJTmrurBaAbp6Ah4JmbK0UyqFjrX882Em+wHXeK6cREU1lFTGkdxGDCQccxfCJTMHLL13eMqPrwkQZlEDaeP3nLGAZ9X3LmJD6PMpveNB3HbJq+X1OxfmrIdzq+XB81EcFByTF154IVp4DRCHR88ujT9SimGMHcTaZhCgKO2Mj37uNUttHwzfP+biP3xul4wKJ0MiId3zAWWY1FJJKs+P+A0I/12Q2SpRvM0mPvUbPx+qiR6Jh6S+rCazk1PrpDrgo66Pgd0u/p2EWDaBBs29okzDx5xOk4fGT8XXpJfxOa04dmtTvyaRwbkr57TMGFW5qJC1GRXIJbDmZuhe8jrZQTLjFGJ2an48MG67hHhhabtBK4mNiNxEDH7zyz9uMjnmD2Kw1Fke/RIQwBSayccsBHRqXZ9uCnzfLVV96jCUDmTp0JiznFQruxiyg6jngcecKMCFExRzAQWvHn7X0rcf38d33USLAZKp0GG3g61AtwviX2epw/bUbpkJOnINYIgSs/AB2HOI7EKh3sFnw6fd/qddN0HIT+2w7jWC8gTmPOi3sCzwSbiTKGg0+imTJ9xbhEagpPrn6xTOJ+2GTPDa5vOOfH9EjHw8BoC3IDX/3OE6mbjibW90cPzM5HOsGg3vDi34G6wy4koyzYLZc1TMdT8FjFQxjhJAMvFT6BBypZ+Hs8lkRiy+VfAgeLXurdeuY2fHU4abtZ3scmBuBKHqg4HmGPBMzoSRqCwTPDGK50yWP2tsKKKeI89IXz6Tc0zo4L93YHIQskXN3WXcGSacmWq3TqEFnr7t2jAXircH634avDaEW2M6xYG2XuV2DB+ioEl8Y5LGs7LcCZ0XBElFGJvyImXM+6qD33vGk6/rKeOUIqWIKoUzuVzBIZp9ru4YF1wSc8jyUbud7pWee6xvvqwJ5mZnPMCEgPnrbP+emRe8IdZA8Lk132DojH11MxDQHPwvQKNfyvJ14nzlQbi/8EsZJCygiHMU+kGH8IwXnP8/7NX8FpdTR5Xv0/gTA2dG9FJXxoWDw+s0TgQdoLX7IgwYOEh54fsXg445z4YMHi4D2AZ8G5FVjamKcRi3fXcDv+VYRWFsbDHQ2bc1v5+g3cVBu4lV8RMGtVoCHo9OlzzNJBHkT+wNxQ/mRYYCITZCvKqOG++ldxKhDuixg8t+yoGawGYKITkmZxSWbJb7KeaUO9j0S6sQuJcfLX2frV4+9EYpytHjbeV/8qaKkPc5ze4qbF40D2jmWwnmGoBKLPe+5LiwEdb1w8vkGsffVqgI433Fe/EFHj5ty2IDoMlpXfvN/wePxiNC4HZoecsNe9zM4Smh+PX4ioiXZ8zUJKks7AVQJGhHbG48c0LR7/Mm311T8RMZUd3Tjgq3d2HA+EMOn05Caz9Ya506zJ6+P/mTvxd5lQrbV1a61a04iQ295J3uhc1v8IQlhGigfWaEptPKGUhvNpEFhNBk9+Y6PzEtprx/1Hoi03kcAYI+TTYf8O+ehlgcVYK64SfKO9ef2wnfE4IoYbnYy3Azgd7nx1LAk1E3uTW01X7ZxzQ0QrTck6L2LN0fr4QlJtTFR98rIxtHFeHUmX7nukwDlrZ8So8PYqYbVPx32xNOrj04Cduz4ulKWbVcZboel5bmeDiLLJy2dHfN+O7/ClsTc2tLdNx5FWb7nhdlEODCZmt43hBli1zFcfzLXMD7qK59UFNbf0ESH93KJ4XI70OtnrMyfy3BDt31Cg1qY5N4jB9V726iH5djwjMclxsaDG0qI5N7Q0tHjq9HQuK+kXlYhrHKDjLYnHYWwmbnNGASXr48LcishbkwPj388L6jWuOa3jTuQ3EqWhlvjqK6nus8N8Ttpxh1C3MRi2JR6HUfm0ux0NT+u426d4EyJvSQ4M1mV5i+HDPDsqJFG3MBUDOt6CHBjw2tZlBYqJhqW5rOhN3UB2TCvm1f2ofKK0Sr76QKdFhprNXRvsuNzfKF5ApXx1kbPo1jTasH8cqeKpti3V9qRE/cab8hbMufnSVjjFsnh8DVw8TVfyFuwfx+tOCyVU3D9OTNM/rsfb13Hp6j2V8lZxb6lq7Pa0jNvPcxOmioq7efVKGepJ0/Mjbt9X/6jWwS+qWOsJ6Sr2vsbcfDwu1mVbS6m8tzRRotFbF25+Xp0WdcI6opqvDpRP2NabptdlLQMG4eyohOr7x5cn++7Unlv31cFvy45KqF4HRtiTC+1159Z9dWq2zQ5PU70ODG727Pqt12ysHD5XrwPzb+kKljeWG7fjd6pqF94zaj0J3tyGYamvfssS/7vp5FdKZV8dLiMbNdiQ33YODNL6T3ZYRnVfHT6zwn0ODeC243Hfpt2nq3BOzUZZeeSoH27f2Q2P6oNNq4hyzqnZiN8rhnx1BOmHG9bxSivja86qy2qr+oM1xL9lO44+qqesnKPj/vT6Ekdo8bTYtQH5Oo/hsMmhxmnOcbHAV6++QDL61LP++1hhkgBRSMMwpFGSECIlfvzyas5NR2cLfdiK/hRn+OpuJu/UlYTQRRfXxpYFQWCVga8pDwJup0q/Edc5/Sv/z5m+erPi0KcztgeeEY973v3J3CcRrRtYXIjV3dMC3d0h+PLR3QLjMSHa2MDOI4Kzrk9nUL2++spHaOAKl647STWBgcqai1fgrD4piTmlJijiquJs/tfwER6I8Udo1LtanmtfKu8tRVJPZpOp5e+GfN2IXBd0xk6xaN3ssRpydPJDu4s4dx31vpkXQRKQuorOmQ/yEX2touM+MUqD30A+olD3Xbfjn0bqcubBVOsw++E04STm2WE5oQpUdpgL1UEcX6fkI5Kjvms2XV0g1Tw3qZVJNlcSBitifnyJeAzezPPJWzB7fXA+TzVYzNzvVOKZsfUf3v/vtjfwrbjroGquNRJKbRUd7xegPEWVOTckjTp80Z+fr3KGhOidvAkpiB25munudhL3vImnZS/LgJfRqc6Ojv/XHjzYk5ozvt8w8bv5J9UklFVSdivlwCCiok/vftyEKhl4uhtZncIV/XNED2foZMk+hYT/SvB1y3Xf9bQ1lZqloLCsDgwIPG8IF2fEuj/Fol99WbO0RsQ+p5PWBd1awCsCxtZWmXAqrefmEzXOvfgFXfdDrjEvxnWlrsZZ8fjp6Azj6qPFJcGJMeV9z0rruRWvDA5GdR/YH3VY+R3S+GJzbj8HpuVVyMp8dXJi67UwNc8FQUnVvMbzdHylP8+ro5/S7EPGSp+e8Cury4pPFswhNS9YChap8jzIWXY8XS1FdxhY38Hlr6a1uPzxPNft2nF6Xh0V1zFNCc/okPoTnLE+fpYd507iYwuh9yy9ceENptN65DSj+9N73E/mufnyKA4/pu47cvAZOTBnzKvjX/BnEZ1SktjYkOWISc8f1GU7GpL61MB8UseFKimCBn5dvfdn2MolHc7Qcf+vUwRfO21InBv0pElNpL2mp4oLB5/Mc0NJ6aANL6notaL7s1d5/jsorBxBnmHHH9OpCOSudaQf7kH4ohZe2w5p7gtn/OAtF0qcTMsv3YEqXDDAhFIaJRHcE+w98mr7uC+LrLx6doaOY5ts5tP8aDuBlfrqcLeQEq6HQXoPL8BS/kCnFVkcmJ+Ix/2wgvcJ7nDR75MZ45zFQ84DRuGvhT8gcVQ5I+0MOy75NgJAm1JZaGxnCC4wJe85G2GsA+ZcnNUf/R7MfmDeIimcBz4RjxfLcp8XGxUMBInqoTsaaIhiFHya/o8MfPOqmltdx8EZ3l67/qZYObExWwi4u/+DFVNLIewDPCMjiaV+nV91jt2xKpokWhXnsvq6Wqpf4Rzzh0vqvn93JRqiH8vvrly2Jaxsxwd7hWVAx9clnbF+CNBdFATw38kgAKVOAr3yDONKBbH7+crgUUEYVazj44obL1DRZr4n5y8m3En85cdCVTGqOKxX13Fpd9HNVsc9ETAEA14AmoUthwcIH/ke5yNjdPgTKytjmz/5Br56Qd1xM6+4wKv3xw95NMmXpJMVAOoR4fk9KiCGBy9Xjta+BSIj850G3jeXrhHhJ3s1IrZ23JMsQJ54d9osOIdRnHD9D89G62d/AD8xuXq2oix/2BtMT1eg34FHe2M2+C50fyoiyiSOteUELScxFSqYLQW1r1z6IPBETbn5xsmLqGKIUFnHsd6L8f1omOk4DOULT2x0HF7hdBxxvv7fq/3pI3wssBjgP4PK93iw/cKY8Mg9kD2LB/Coe0KMGE1fefz7oVqmv1n+hY2Fv5f9WfybxzzZFaXe6DgGYyZfzDDWvicYpy8ecc4sUR+ip+JvnKw9vTKwo7IdT/YvoV1Z21THMXf6DzoOD9y7M7dDK3yESUVn4pCBDTjnszNue18ziJAY/P7uKR6k3wIWpw9vnshu7uXwvdoXCBPu138FfnqIH3bObMTXA8BKOKfmzyQGlXhRLrzBoFTg1jKXYvadns3vSiUbK+s4GKXsyIGMOyHHmMFJCO5GTJC40/EA7Alxnw0P8sfXMvDUJc19kRnIJD5M85utv7GYZUcHsPiVw0vynjogfQmDyyNY/3WQPItjN2Cv2dpxLwAX0Z/GoBKPxgkBBwpJpaV02WLfGL3gka5YszE7Ok20N8nog5WKA+UcOQJH9sPAnfiAQyXDIB4qjJIgjuPJ1zZ6rQR8OGfQy75vf+3tXR//CSHHioW7127oUU6zw2Lgj2V/b/RK0r8BN/EBo/qe9/aW6TgIGHQc2xgCANBx+NQGgfLl5Aph275vXUw1HV89mX1f7Hd/pNdtTaUezfuEaqMHv/XIaEHNaGQwOCpan5VPflHMRt32yffcyFmWVbxvZ6/BQzP7c7NLDobbgWag43fKDYJg+DMdh/EvNYMX3bVzDKpUe7miHa9r9ks+RH1uiZIfj/fO2L4DiF1fT3n0f0RBpsXI6TiyblRHqY4vXo0PZhAGk3EEyvCNyGnOKR5TTcfv7BUGpQuSU0R2F1Du4dNptdznDEQLRIZwP1YDBFbalyymCxHEGvkyYNEdIgzCNenMXMyqudNfpVIZ/Ep2HDWt8rI0n1QX6efPbsXZZePle+4HgZbgxrGZGwBA1rE1/WHMloLFQ0YJPPM+BiPrBH7W9XU+VQo3VtLxnq3XQng5B7Fkip+zdobMua0hXlR+juOT8+vGbhkRgV/Xc7s4JEZjcPgG2Ll9ELRgeOzM/+18PsoXharY8dI2efUD6+NIJc+O66pZDltWZ6QQ/gR+eeJGBR2HUPybB6NvQBwnMHyur16a3JbH3TSs9dWPadkOmnI7Dt5K3bdk5AEm+sASfc5z66n7L9iqCj3kfhQYkE/Pe5Xr+OmNKPXlSDSf+p0J/aWMjUeTxd11pTc9vfhbZsdh6NvmOjULdLif4rhGBA71l+aAfVJ3DShpLVym4w302jZgOtrT8qMcmK/vGEVafelSuR5JcRImcNqOI2K+pgm1ANP5TuRgx/ficam/XmNW9N9qPuoRc6LMwUkdR2TeWA13PEVmWzdkv6ch+j3/L1mXsvZtXKWihRf0KTuO4QPLDhsKhKc6m/ZwvvpaNdEgyqkFcQ4QlNdc5CKcb9dxjzih40gb+S87bizC2GVa8m/jq/uYKFX0aVRkdb9nLuoJfivaDltsx4UZNbvD2RoQsNVjBNdvABJHktpp8p+30qC38+dursxjovKDiiIdxyGMh9lxs/FFopVV88mD1Qa+X6Sy5GPt/VkfwkiTV10v346LyFRre9oMBNGmz4cg8dH9bVzGlUCRK053PJ7l6Th8QLei4DvwiEVPzZxL+jpP1BoiDlX3kx1HA+kKZmU/3Q6f59VbAabWarnYK1d9oOM+QiJRv/QteGzHrG6731khqJdoO9krNrq/fxyBdk8MlS/ZzzdF3vp4O/D//KbaKEU/pAtSkvWojgWh8KAOk94FPNk6gsJb7ndWxtNSG2NGRus5H87mIzicwwMmaeJCeEVaasd3IEEioyaTIH7lEz7V4X3dJw7/I4huttG0mn/n1XNrMn60K3HRapJzqnQ2mn+Lxi8SXASIx9s2LdFyKOvfYPDdUQyNOx1vF5SpWzdvCAsxEAM0EAKLtKgDEvDIbYcmxZxVX72ZLKix02k40HZq001EvjCTae37InwXUVzvosIXwBf3s6HuIWlYPE0Lz99Rxk6le9404bAFdvyOzyAW97GNs7KL2NZ7L9F3Qs/pP95YJpN0+fd+04gZ07aO6SDxNui4n9aiAkErlkp+QfO7HrWCFthxwGYzrEmcbhjH39tRt960wo5vdNwTE1eYxZfVe0XdHtFDvwUzMBsd9ykD3w3TppW8uCRle0tvAtDxzFOTDJT8vIpet8aJPSk3hM3qxHqoHyc+mbd5KQGis+zohgEdzyTuE6ZI2PzNVf8BOmyHjm/GccSDoA3RSTHhcJ4d3Sz/EOJ8m9NFWdysaoSXJhr2b/2KR9E0jmebPfSYuw4fLaYFvvod0aHWH4/Zj8uWpq1vaIOvvvJ9b7Xbh9PydLfyem4dt0UUt8FX79jRAl+944DB23+sidLRMHy/S2Xt6Lg9fCR6GG5oIFxOL4Y791P2bMcNIoy11iQ4mtqpojKausTeNq8h3jxImiEnAg00CxKB3be3QefC3TRkndcpeNpYUXLb3uzOliBZ2r143ULaE9NW54W0Aun6i4LEJ9yV++pNOonfOiTou2+DiWsv6/XstLl11DsqsRnVJ7NM4p2O3zi/16O6mHDnwPUm/U7iN87Ojqc6PrWdxG+c8ZHn1tnxW+dIxzs7fvNIlia/gMSdHccT0+n4bYPIq0W+5/d4gOGb5BOBunpnt4svdBAzRQYJfxhaKiM+HE6j22ma0PGJRaKpphKPtQ5DIsZhqMNdCe6O2+MfWvkrH3mrleevge/Zcx0dHR0dHR0dHR0dHR0dHR23jOf9f+dkmrfcQxVyAAAAAElFTkSuQmCC)
physics-General
physics-
Which of the following graphs cannot possibly represent one dimensional motion of a particle
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VOF2xZy6Lba4b/C3FJ47A2MVBm2AZLgYpDHwlKotGIRmLv0LtN1k29pvgE7Zcm/nKZsgS/6pjI1I/dfz8vIZqC4GKVhOOorNksfzll0wDWiaRr7Li0ZySuOyefYSlS/rMI+1GTmHWDRLeT+xYdrW1CquMRcR8W4KK4RUF8JIUQm5zdbRaZU9fXQuDaeVCfEKeQbK1dCea6NA+5SNpbGeT4DDFkM1BmIVhs29B7eHLhbvzUDvO6iPkGxb1H6md+1F0PHx/R9KMb6wNIhAZX2IvM5B3JsV9EwFzSgEhmBXZtGflAYpmAwpwxnmR0f/+s8W/Bm7URzcePjlPkYrmdk+uFBUWSt1Rkeo7POg/vE4butiWGAlnOsYxIFKcZf5MBQheSkIiQeFxjv/OP1hRD8IJ2zj8IC/cUsobVt3G0Oh7COHQ44/iA2VdBsVvPE0XPb+cLV2uA5PURzQ9ewZjq/SUtf2HOeYuykd6Qz464pOl8P0WlCeRakxdg/75em0g87R9/lKbDYdowS+XxYyvugl3YTFNdQ8Zu3JZDVcexiCbNNqujHAHJYO3x6cjtAAAa78WqiPK5N4tZVhtp+1jvA35bzfjAcN9LbhmH1zonOHjYE4V/9LMh8U4yULor6dBcsywHC6Jrkz8+VlOkvL1ORiNDdmhIBuzcoSazg3ydnffdoPVs0ZL9pR0Mjv1srCirTbL50LmkrcvJDePgCsZTZ+vmy9SBhAtLzPgCyNQSv6ZcSa729K9a0BQhghNedz185FzSiLUxXeIow/pExRK5NVn/GNB+WuKPQgNNZ3g+x/P7OVZ4/mD2Llab6Rl2bFLX28MPf5ymIFetTJc4ysF8ChWSQ1EChiL4s59OLoqQ5Zqbve5jdV2GNLcGp7aARvFBlgKJxnJb7ebQvI/0KlwliP2U6e9kmOrMFfiHbLbfrQ8tdg4/1f/HH2cpWh21PETeWHE3J9kbB7uR8FD4V0DsmCC4PRKQDojsawpv0R8b7dqHaQo6a1F1gZNothRIBY6NAqH5Fl8EoTv7tJ8ceXihuRNyNKHFVVs1tDT/MojGtc6lCQ1lDqI2TSH17M4TLYsabcjNwcTI8DqaFJu7RlMAbaKzi2agJu+DYhE65kEVbrWe2veqlYrq6hNUBK82SFSS6KarIbc8YPGAttKgKYZpFnii80fVnrBVEGRF4li+VlbdJTSiiRT/T91MXP2+yxvdxahVSZOmmOLQMY88NS2qzBNKHsuY1i5YGhrRTH/exNDHLpmfT7APtKy2zRo+gYY4BVLBk0ItbpXIDCWP7me1oblAS2F1Md+PzDkfP+43LqQS06b5kyfSYCnSqx/V1jHiNtW5CoOSnEjh9LI28yqs4i5dB7DzhU4w3UtXHPPaX90ZajUFcSqw84huW5qmvsV+zRrxML/Reoaf3yTqeR7xflJMDZT5aigFw+ksMbuREKvL5O2uUmsp0JGCNa+MVBsziKqRsDV3eztjEmMe0vWi1/uEZF5F2XYMgmK+PYMjJ2Z5XW13k9ocTZqlYYOjx8odfQ+5xVvM8WsZ5oKXjNkDLZkcH/sgLtkZ6XkUN8nD5kD4qFULr5QTqMvRJKEqk4zb2CYGg/1i/Xth7sVB2358hpiXkXsHKGaJqXzcl3FLZ4ieQE0lG7l3aTWR/wlYWv47SJkpx8Mq9sc+QA2gWnfUc3TsA6U1canILcvpw7nlP7s5DPZKTR1NqsKqmSHb0jYxoNaPhqHHUlKQt4UhqMBNg6QD9HAkTmGZrmk1SGju+xRwSzo6DLbFW02RhpWTh567LmzTBtYOYj58GQ7Q9M2U0ZTxJJmw+vGqY5rCO6N1E+aGUxCwcXQ72cwG6yxv55KOHuYhKtPbiZa2iQqS4luHnWP7Ckmy5Qw6FcNq6zUd0RTEJA8N+01dwkwLa92dzNuIZli6DLSJtltJv9BgwWaid4UyvyPoWkbPtSGWw5rCOx6N1wJRmu//sS7yJk4RuZBZgsjet1RPvCK4ccxgzPbPvaj+9ai2wMLwUObVsQHxhTqDNvEmojkMijwMf7R/wIPYBUJCDFfPe8taI1GOXyJl6pI0D9Xm9s7oG2dtm2Hn9YRnz1LkNAs4215PtH7vcwuSYSokSfevXmvM9bW4nelaL+tQbe4/Xc26PJHdzCsUki+DUty4Dkx7yBfMPEVKG83eThsE56Mpm7t5lBRZ3ea54h/HXuaV3BvaqYOoeXumeByAzsATiFnC33SIw9TNZmavOvOa5lFS+vd1SdvzZkdToLR+0u02VOCwgOe3QwU4zfS6dooriZr6P9RkKWi27HDizCnsxikkTo+VtyN4HhTb+naGw3JXhtHWmUQob1r8ZU3TvA9wPFo03+lz2YlTpOxYTeZRe+aWH4FE5T+K1Fa+UIoVrnQnbRBPDZoin3c3O/tUdiyFxMeyEyVuzzq7B0Eomko/8pHvDO+nOvmJi0zu/Pm+3pFomPchlp0f+wxnW1OIY9eCdW2uyrMFUX50tEyocFviWfp15go18SKVqp3LU1sdD6XJZTijBdtximMlz8i4lUX660DYrzxakb0OdNutsdGRqF2cpG61wbxK070UtkZJ1eFgJhXtmhx4iHxIM26cu/L2Ymviz3h7MoasFY51mkIy3v3x8HC26mgSc2h0EEmMO5WNGt3FRULF43Y6zc40Ulp7EdTM+4jcpCvy+kN4zdFE6dt1Mbawrikrpc3ke9GIdLsTkPsDxAVvLQXByW2bFp3+dF5zNIl5ahYMINwW3TsuVmGHdyojXm8Payxq/Yk3EU1fe6SD18O/sE7HG9JZs5SaKhxc/Ko1IPA/AX61dUYXD5sIfW5dbZ+wP+8DHI+OzZX9Z4asckOJahgLgLdSPO/g5BY54wy8UlOVzS94udciLgqakEXDEiz78z4svyjHo2BdR7NxKAxRZcYd7FLzsSuiV4iOt1r0CHPfVJzRXNdPod7L0YQ20d3p4+9kWNXRRGlD4ApZh+mwc33H4GV1t27l4+1BXSKKpQaT5G9DiulujqZkSej0+zOiqqNJsaqzBjmZ36Z1Gr39IKsi9IKIfNh1pZEcP1xh1bhXOzma1Lwu1XE5rPMpnmrTzEBN4GlXLxT5n8FK4ZvkbYJVVca/lu15H+CMXl2UM1pSZXMj5crn2yArsOqmmfD42DR0Ez9vTxvC29IUSPFLc0YLqrGPmqU6EE0ztzXq3EGi387gU+Mrr5riZfFzvy7rhVCOkuL9CTMILTJ3aHJ2J8h/kZN34VVTgOMRXCDwrCgtBdmf7DG0zo1DVrFtJfmdM+9OI93M+5BsMr48kekpxz5SvNtPSIzVtLsHBIlk9m67v573QVlg6cTzoxj7QG7b7wJfDrs/XXbOUbrjcBzLytylmvdBzPK+I8kjH48f+yBbRQ+JFNjUzrztDr8OLwJzmHKUlLjk6mLbhB/7QOl6TvEQUTEzndeXJN72QvNqmmAgCHMBzujy+GSH8wUaBdmU1qZ4hm3LFz0LAKWzzLzeAiY4bVHkaKb80kZGt0HQKGh5AMjCOfW26sun8wlt8Loc3qjgJ01eegShSW/aND8wev7qk8IMtYYMcqnmGD99R/wSvZkB/K+glLkMMMX3iZYCNIXL+PZA6XdD8W6m0OfD3EKJeDpWTn3XbEBr3McOuhG6fQzzdT2KMFZznnCMcj+XrCXI/7hPA6j+wY8CERqNRjXflGiDmTJcz+UoigiJIngYlbfyy3/qc7+iJ55kHyllyO7sr7uTMoQe8SRhIn0aP43hLhXw+M3fqVAs0SF1Q04hl3DWNdv/1v6RL+HCmEwm+obdwAsF/p3Xz5UfLF75nI0bP3DFP7AgKXp+2P5le4vAHCGPbxKu/X77u3JrvfEtj/DFfoI0+ug5NxQzYAa38mvrkU+0njFjDHzgv78MbvAiPPxv6zMzeL6++4RXmPkPWoX5uDHqXL2pc3UCL3b8ewxXKHz5WwtIsyRhDx+dEYmojOuRmtniPRnT4oXNfdNPfDg0Vjox6X4l/H9BugMLOXUPidnnlw6qjlfuH/+eNJc639zWvO+VnRdibNQFR4qOQl32xUGTdTb390FERypefBfo9PH/f2Sdzb0H/CNb1/Xnsj+Nq2eHLzsPG9bZ3IXbSkaEeGcU2gM17BMijT3doMrmBjdu5ubYmFuFfY8C/dh3dys938VwXR2PgNpLFUtwKpyOB0Pa2byrD6MQ4sWdH364oMOxqc1N/cTKlzkHb5gUWVeX3SZyaadSTu+m8u4HXB4pF8cqxJ0Rm0o2xC9sg/AEGsULPRRyvoxjgww32Okbf/dABrE7p7jHUTYVd/1Or+bce8T+ohgSby3IMCcjaCFDsl7ZFeRooLOQd9mroJmSNOXMxlOFoTftfpLJCaCdlYEInpRhEmIzRwYSuzjFDNNo7Jjzn6MP2LHAlc2HT21dOSgAuoDeFOlsBfshvjh09P0wtpW6hkpLAcLKJEuCVLJM71K3zKx9ypYgOkZCiadZaJFRH6lsXmi+1QyJH0UjxQJQg92B+K17zznGWDaaogAsRemgUpxoshJFTbgRW07hFQYH6Fo/Was4X8e70CiWzTcqeGKeaHcNL9FVomZOKOwGiWJCrCX5kNrnooxzTuTCNhZ03iN6s2xVa9mpuAuaosq0kZoTsBfecBDsG8HIZBRh7eZ4jtXaPyMPTMOt9uvGD8z60c+PHt37OiJd2UTpuEAEM2dTxh3IDMN9b4qm2JmapQfruWYdKUK6V5ubzL334ZlqTUBtae+hOmgfgzjLoshhhFYIvazLVYyw1jc3/EbfcMbh7nXjBt6A9pJ0ulEQXQZxcqsTjChLbiyheOkklXg5BuuphLU4Ccz7Jtds1pFmsVPFv/I+gP9bWQowHNAoYK//zywbkYyVSQ/5uk8FixrHo5j6G6UxPPN3sOU3o1Qn5jl+7KasAKJSUwxyirlCjw+Jj/7KYuk4ydWAKIaFwNxfOQXoWYixeGr4ShVPtOvASil7muIRrxvFD/3/PA6o0XAUiAOjAduOoCxxMXqJAieGgHG97q6ZADaaYpBOMDhjSy/KaZEjNv0JjcI55bPl0vURJJnmW/lS+19s5nvTMLPyveysSwpORzUx1/IlBXHphSY13k+VDPrOBU8YVi7QXqbflgr8QWw0xeCJz1cDW9Txlxz/8sdHDKTZq3JDxvcY3zfc4LjphOvaxexaxvZa54gqzefSt3uCE/5EUs0VIeCDCEKU1teIqJ/LJIGN8gfOHdAU1cEBS/E4mCb+Aiothe8+RqYsX/Ea2Mpf0OClZLj3PUBorLUKdVW+l63gFXr2pe/nfkelr4K/eII7WmzG1r8lB2iBzXx6IW2isBSF4XwRXBWWAi6YmPuFSac/r+HKWbJFRGhg2pgw1x1xz3cimqTAHwZEyC+CVvAMwSbcr3z6v98l2C4+e/68rCxnsiiPhZR3MdLEDxf+WYIsQKm3F7FOfjLDXJhwoncd6DlKdiKano1ncelEwnHmfGHF3Bo+s1PHtSCx4/8JMJz8vxShheEJn8lOdAknMGSsM+33i4lSJYTyE/ZyqcS1tXA3prESSkh4oXgnFuJ5S6ifCbn7wEk4Z0thPLctqN8+XHA2J2SFyKqTZvdFdsFv7iBEOOy6suLaG3oJ8SmsLAYPtKHUc8+lIm94dEE5fD0hRP0siZ59Rkb3jaJnF8oux1JU1VWqx3OL23wceZTdXIy3b30lCyZkUfIicLz0IrkkS0GfTKLvY5LiSeK+uEBXpxiZSwoWS46LXqNIwelpYnRBlgI6kInyezt8M5bWs8VFaQpvKe4f4SFvKG3RU3JhloLP/d6inZzfnn1Ipi8onimr5eB7S3EAIvFyKS4mSW0wXVuKWV/DohEi/jJ2QQXefnBcTP9g7P8Uz3tqyCM6ioJn6Hefu4nwE3x6TdHzClgKryleek3RswEsxVpTlC/09Ew5LkT1rI9o9pTQPy7RQhKrlkvc+eXGej6EO6PZjRYxZprpi1wKvOcNCPlZY3m+8g9VdbSenp6enp6enp6enp6enp6enp6enp6enp6enp6enp6enp6enp6enp6enp6enp6enp6enp6enrbgK+r29GyTS2WrzZ6eEmS4qjZ7DpATVS34fP4gyZP/+unkx0GqLDN7CRAzSfi8etLTTKQTdin97A/OYW9HF6U1m6X1gXdEkiQXcvFQzP7TzFzKguYlsRANHeavh6Z36A3nyYWUbbFOYq6e/breZwbCxjlXlAum2LmrTT1cJG940+LUI+3q670RpQ3/z12GJKcxcssUyfOzFGjOkuXPolEQnCTmdT3q2PjFzGtBz4uiFb1Z413O1RUXz+bcy35V+/2CE1FunRs0S67LLWR2zmbMzcH6j0il+41iasl8YoklnSvxFH65IyJldZjAUpxpoxikuiz3OEBPafFYQTU7WGicmKJ26Db5YDVPxv6xU/jzHD2u3hi+Wojgf6tQDMKTc20UUbWc0XD6p7wC8nLJ8phnpYZ6PVbbR42oRL0Upx9eha+y34HjtNOyOsFiNnOz6zQowJJTl6zLKp+xpRiMk+Jw5CotTvHCsZnvGGJd7DzFs9l9oaaQxMz4d8hCUCR4Ag4ZM8ZZsDbO4MI8INy94ySds9I+s7D1zYaUsY2lWFY97/lRnX3i/L4imT4Jw9LhQHpLMZyqK3w7y+DEI+XmmLFnkKCaxShlCcM4A3EKPorl/Hfxu35h3rlG4bTfcYJDF9LdLBR3zpZieJ2AOkDWr5OIrLufWpzwGDTFbATCwcGrlrN4IG+w3zIohuYAh3HsTz+CTgR+BZmDkvCgQlN0i2xZxGDpbbE6B/DaODZb2+3FvFqKydlaCrAJ4GeAoYAOAGVc6xutjS00RZ4uvQXIXSKI8gsVECzIgC5vYmgOxRDhiMHPDpWoDijpoqWYuBh2ncT5CyKUEmrL3hLRO0uLLRpbGRVb0sZkBldIwTlbCmgJsHNxEZVA2hFCEAGnkvLZaCj4wn/Cckzc3OtOX1CYcDC4aDxRXlz6toHMk/8U0EVLIf8uuY/UwJ5NDVMC/y0W6iDCuRvt5ZZ12HED5iEXbOYWF6EpBmAPMF2ACYAjoUvBCHhLMXxYFo1i+hP/cusLBJqLtxRiKXyjAN1FJK4O02CFl53zPvK7WcJvfLNYqSTBkkrD0yEZX6d3Y6anuVWpTTF3aCDMtaQLUFTlD561pRggxh0u1NOKlSuX0Njrz+hlPBG+kUitiEvwL79JoVFo3ygmZThbaIfTTXfcQe8D9kkwEMyL4VCapTcNdz8NsTOnhDBagAK9FgJrE9MiokPYplGcs6UYDHCSZL4teOHIVZqmD3cgNDMCrcFLc+SMzEXCsU1TbH33QQfDJy6KeE9sktdFsh67GKcA5FwnfqFhzP/AM2J0JDi0CTFO44ix9Fo8je1oXFrBv6+W4lzD3AUjlhQWAY6HS4Al/oXGS54ikAyzqbRM5XCklvAOXDlonCRjkJvcpNa3JLEs1soq6KClyEnx30+ZTw+ac28okeBS6WqnIg1elyd/KhvFlvdxzt0HXCGbi51inkBn4UMP3IGeTJn3RfzJp3OecFAe/h02heuE3xYhTzuzax0C3kf3LIUoZNNgnID3Xf775N4QVV0mBERTGZeIRNkoNgvFnbemgF1/HcNCIxqBeADnjBYOWRTHtHwT3vGvIAnvFJ8oG1K6vqYANO/ecXKm2D2pQTPN+W/Yw3g2Hy44VzEhMgXbaSwh4JWm5aJgBsSn/4Fz1xT/AsH31RawwknnLIVJ1HT1KJ2J8yFOmET0CjqIlUsmPoy/QBZM51+jMSGMzyNi+dKVVwlyZzsg9i8M6VhkGS1H0DxoPlmHLDqDcKAo1T1Oh4Ohmtyo8fzWjwLFTi8n3t/ILYN+8y80dmsYTq1juNzjc9cU7wScFfBWqieeLmoKEJpSzX/7PhDhnyJVVbIhWQgR+/4CybHwYwDwklAWSR/69Zy7pngvU613Um26qClKihP9gvkYTEPxQgNbb/aaoh5U+nMbuqgptkC4Gu0NotcUQbx0vJslJpnvtvJD9JYijNUV77ClQGOmzSah/Si9pggDdTrBGVk1FuE5+72lCOMR8865pO+m1xRhoPmkc/kU76a3FGF0Mpv7vfSa4ghEWjG/dU4nzPmJiCKdhsv4jtJbigPk1AqFsXPGGL3UWWYyd4vnSpQpjmdLrymaQJG0KjNuXLaAh3J4mdDpGDOjFpKer8HoLUU9SKa3N0ZJkudF/PdVU+TD4UoqP4J0tuai1xS1UAUmAozBZkBgd5T0BVEprmZ4nfF7ZvSWogb6kKk03ukeCOZ7LinYEuVUlat0XvSa4g1U4CuxX6wALMXb40TEFW6qfdNlekuxB0lxWQBnl4Z5H2SeKXt2irPXFLsQZVRdSRO4eOqP0+jBiLACEN2htxQ7UDwvcpLe0DzvA0l8f2ZdSK8ptpGNEgFc0sYBsZHA51Vis7cUr6DUTz2v52COJhG4+c0O0muKDSAx3xS72oDmh0oRoPS2TIA9D3pLsQYu9wOdwLFsbuvOqFX0mqIiF5uyA3WsjmVzx67ZzHSN3lKUgJ44KBYfj2ZzS3w2WTi9pigYxq4oodcIuj96nJ59Ob2zoLcUBfSAxiwgxyvZIFHWR+k+vabwlMXQDhEyQyxSNfHxLtJbCgAJXz/xIEFzSaEPejzYCXWEXlMAaVF+9SBhc0llVtYJ6Ti9pRggenvcb1iFWIpBfn0WsqLXFIMXfH9cChwa+9iCuKDq6C2ntxQ5Nc/V5gFCq+OlV0d7ovbTawoS5EnCxRN0nBB23TcVvaWQs7tq6xDBlWzSqm5Ul7l0TZGDoQgJLqxUYM0rom47byou3lKkJujKDq+4u+j+SpUXrinyRxWmAUI1BZiKeefjmpduKY4Mjm4Ir46X//CLJXSaS9cUoc7CCXU0SbFSWZe5cEuBXFW0/BhhEc0ComonCXSIC9cUMQ7c+8cTquPZridWXLalCE+BCNcU8Nm/oT1NS7lwTeEeHqutI6DQOAXw4ubdjl9dtKV4ISw0r/IUS5GrebdDFZesKfL8Lrj3P6k2twxVKi3loi3FCXGmk2pzB/s0LeWSNUVO3Hot2qOctt4HNp2OVFy0pRixYN/xFE0xGKijOZ+t5qLjFJEObhSnrffx+3jS50eCECKPKwJEfplmhHaWMD+di7YU9m/wuTvNUizwj690SkkqxPgaO1OWfxWplPRfWsZFxymsCS5vd3Qu6Q7xQ7EydhMfLDhyKvADfoCG8eQXDZs/YJdlM6dS+c5O7JItBUpdcDzhtBWM6Xx7/bE3UPH0ke3ihcSSxrHvN6AfoVTKRTp+mGOMHVbpO0Imp2gKIu1YLGz3080qhmlQ0lVBrpYnzB8m6uBBRcrMP73C98tIjrExV+8oGh1sKZBMxT12DmMlnlsfsEMkonR0+BbJB3c3iuho67X6GyDdUhEajfznj30Rah3e/vn92yh2iRZfUrCXyIeZwVaeVKstUFMgmjp2K2xMbaqMwXfFus/txS9aDTd2+Psnh4fy6xg3POHrzx770vBp7jcbv9nNJFnqE/qjfwCRWBjmFic0izBLgRZZlkYoH+aD/AUhKQxud2FqJJjWjB/+hlP3s9iCryM3xqFR+J/wn72BjUNfcMcnm79S+810knzdqjKE3glnGut5vSFIU5A5Tum2nCZSudfF4dsIiadTOY2nUv5fOa39nsbPOBvHfgu2pZQN38V70poJLrbhN/rfe+ALPpK6zMLH4Fb/lxcu4Xjxlak4RAocXDQ6xFKAlrZ7diEnv5sryXWFfBwuNAf4lNUGiTrofYDbk42//OhR5dTvoGYRoCnkvapRELnFX79fHwucm2BpVFubu5HR4UZBH77ngqJz0JwBf/m4pQA7UZ+IEnfdVqA0C3ajyElLANO5ONi5HopsfSpUgLQ42u8f1RSk8dTnEnc8bfluFhzRRPPkBF0o8bilRwZJjI8uUHrMUvxSB9TJj44XmpU34WHuE8c+2pu6S4U7di0f0RTk+dDqN8OnbtfoiHRw4Rm4eE7QFKKIn+d++BKVd158pt/Wa+yw+o3V4YvhiKWIzb7fscOvbicO0Flwo/j1ZmWgQxRzEYdTNU7TJ5GmqQL//Qe/bYsTL484p4c1BX04UpglPmqK2gy5DZbKp1kKnIFRWM25w07D3RU3ZIDG7amHhQ6nFh+0FMMx7MxBcuvC11VvHSsRvAbYSSsYE+c90lik5JEyHROUKgm/onyzFfw6WIDhoKawx4UkwdeBFxtCrVtAJ5cu9Oo9KUezPG5SgrnIHYPjg2Tb5hwfrN9z0FLgq+OnkZrGvjav8sOKHLHBMDWt81XI39A+4bR5H8VlWFwDxPhGMUDbV055UAv1ubPxpRya8XpAUyAbch0NcaMhItjM59g5NXfGDvJxeEbkl3GFA88IwofW+9gFGbXxM0jGyisS0RQ0+2hhqQTdiYgUxdhBTmwq1Hd0wQeCDQcsBQpbrIC6hqOVSzNTwiU3Ssw1CFbSwmX5nuaBdn11FW4p6JZJRKWl8PHfxCGCE5OmWN+kUjnuc8mJADFabH055Krp/DZrCmSzabV5mCa3FNnFLzhC2k+MmY5DFd3XEhWSMIATNMUQxHe1CUfelJYCTU3iyAgnejFEC80kQik3g4F4sNIq7518PX9wQ0/QaCny5vj2HvF2BfytHGJU5I1CowD3HMl2ZuUMQ+dyvV3BuBGCt+adVZoCjoDgDqGp/gtthDD/otRmgJhW93PHviUImDdpxmZN8YMFWtah2JoPheRr8iHywRqpse9gkVfi/mM+xEdWL7BBqpEZ2Kj/374CFXiNonkSqikI+/MapUJrTTGQHA4TNAd4+vjX/9WYmQHRzuddyO9JWWocvGoKygSWEvRMsy2hFGGzM6ROdVVAKBo7OyBjnPoUlJRQZUzxL6XiHnTotxwUYIr/VFuHCfc+0M7EgY2lyFOeITgavlFEzDcKbymoDuy+6vER9PcwRMPcf/02tHplmwFxiciH1bMtBqAoVtX2Ifyvp+p+tP7/hihlDFtvCkqkvi8e0VjDX5I6cYvnB83Gd+M59KxwCJUStzp8Vs4Hswps+8F1NAej++1uFyxF1XHe6Y2lIDO2WluKG389gLEsP3QiRMDRU8Dpdx7hdAbPdt/x32w5qz60854wHPuPr2+NX/7jmf9s9XPwl3jC8UZCxLrsuNBithyj2IHcAuuwdKBBRXINSn1+92PhJt9V5/zFhuUVBs/7yJ/Ntv9P/rLy6XAxAZMpC0tBSksBQjM3yY2QcvzOZfSnWvs0U5+BHHRXfrrYKuETzvc+A98/l8my+lD5A9VPwYmFj2y+y9fqvoqPL4sfW7+SJMlr7lrM70urAVJNDPIn7q9My73VHEPPZZdm7ietfNsQSj4OmhEUPPZB1FboIycLrZ8j/wIRnMnVVPPnnFitJSIpZzSXLIHDyx/et/sooiNafofcAZF/9HfVA3Z2NILXR/7tUeQ3KY3dBFef2frhiDrjP1JMc/DfxWdrKH+1nLtF8XPFS+Jnol8tKHgf5Q4PlT+sfzgGGyG1ygfDFFpJyi0BHr8nrOeJZ3cBfztYUwi3ZSiQMuyv85cBuKQ3TNw5xpSU9/5+4bfJYOo0nx0Zyv5EYlcXd6hfMI3gE6oxwEneutrSWSa2Ur8lx5WlKNYATjl+9JZCvHirMR4Ibgch5vvzCCuGFhqnGGFo7huQTa1Nn0FA5JG1dkp/LOw0gs2FpbG/h+ZCpjZ+PVxfTX5bU7cF4VpXax7sehQQtjli9AFPt89yGacAkPKePlgK+M2S+0PnLYVN2J9VnpP3zoX9AEazABsQmnml8Fcm7n8A05oKT/Vxiu1AbQjIrH/Jy2j3oCDLnY9RQMNxE5EPniYgNME9myNoJdAeI5ZoUKdm8eqvfDVDFWAqAutoks2B6Aw1i+rVCih0KDGzjvzpvt6nRBZzk/oeM5dmmVHq+MwiiidGEomXWYQk40ky+daxsujqcO61JyyieSR5pZXE92/2vtZSbAfvwxg1jIrFzpgs83+VjJ3Jnhdwl9LUZW48FfDeGOUSm0x970x2eVxBBVWyQbZWtrWcZyf3jv4LfjsgtjOYEQiuX/oEeecl9ldPTmCLwB2NkL8Hl8NP4oZ/B9Hvzr7Jj69BGeR9SPdtkdl/AF3f7nUgNZaCqKvTVV+n61G/rH7jI7YqpJINve/mUoPE7Q191oySpvgdMec8cDGVlnJ0ReoAS0FUMfTXQehe+vXbfIqAxMw6OtmdvgKi6GCjPl6bG4mueaOvTHG6bSjfWIrGRKojoKdvSRT5MKQ7eC38OmYp8vS2u1cF/PPb+Tb7moLi99bo2rdBXcO6Q3t+bOwDpW7R0c7DgxbzrTa/t7PgeIQWJt4ntyZkgc/2Yg+lmh2ZdU4EDhpsbS3D7coSO5YCpfhg/cfDIDVvZ85dKBI3j2AfnnUeXX9tid3PwDoVV6YS4clGU9Dx7fHQ3gHIfN5pWQF953WTZ3po7COnuLsa8xV65WyZIYluq3pcQ2Jv/7G55/ReFHmZnQW8yoZDcEhTxFfBK0S0GpK6MkMyr7wPNHVmHP3rGe18GRMqGoRFc+YVEfuxn86CpMDGpZS6RCH6jM2tmP77+UT027JFPgjwInBac46hm62NU5AUt7ZqzTvIra/ejHXC4PF+vviYPfu2AfAPQ2Kn3mZ31I+SEqvcoaouXcSbC5YYJWzgmnuXQeyMoHvNoq46HqJjg2X3L4M3vLgih7Znm8cphmZR5gZV/NpPW0SIqgzL90Z1Wk1+9XXVgDtDPhgtfJbH1hynPe/DV6LO9soQnw/HwrcXC31S91cO2yqchbYq7lL74BczCKte20WQC54jeXHQ334VFSXGVvqpEA8jSqVNr4XCzj2dbYsAektxEGSxYSzDCgT5TDzMsWPa4HPX5b2lOEz+gkgkUyHY0jwJkdoIfd+8pa+itxQhIEJvJwIRMux0FD+Ul7TLyZVfR65qZ9KdKSQ6k8D953LaaoM9F0Hfzfa84ZQ6mj0XwkkVdzvMy5aSLjf9/dn7W+/jtPU+Ogsxf41hmVQG8GkiflanCV/9+7K4DE3xslJZkmQqSlmS6IV3QUYYXjjn8O0/cDHeB2Ez3xZotqxmghDX6TVdPpOmzKuzY103esGribHxe5bQvwxOqLjbbcrKfWAqZqxUEuIyLob3cELF3W6zrgb7IkpTkYs+PtPEhXgfr5ZiQHVREDR+6l2PJi4lTrFVYR5r2ONcnVGu+kdzMRHNjaXwFYFXL8T046WNBNW8Ogc2lmKAZvw5l9e979HIBVmKIk7hEdyR+25Ppv9cLkZT/DJ/142CMD3vI9wHuCRNsZnLoibaF83uaSCkOt4ZgKaCL4tlED1UT2zedx+NXMjYR8T8Eh2sWsiL3He7jtlng+4vw/vwBXCjaD3xbWeN3Z59SP0SGOdI31+E0udo9rwB4X4ids8eyLpuF4Ts+QSG3S7x1tPT09PzpdhrkQpFiRDjJ5FGKTwTRZZzz+Wi9DLh2lLNk4nG0vEk0fd9o7hscnI/EWSQ55YbivziiZoMz7PSVU84fjldgGpcPDDjH3oum02jKNbDooz5Zz0Xzct12Sjics32WPeWogcsRTES9mop+uzmiydfWwpeWgo28896Lpu1pbgpluMFS9GHuy8eVAnNjabI+kbRs6spRoz1UYqLJ3+1FN5E9JqiBxC8qN4RFZYiB0tRvNpzwSCCJwKhAVnwLEKD4TNnpM+suHCE5sWA2I1OEu3iYkDsHNab7PkHrBinQkREiHQsFlH6lKZiPVemp6enp6enp6enp6enp6enp6dnh8Hg/wcuhNp740AFKwAAAABJRU5ErkJggg==)
Which of the following graphs cannot possibly represent one dimensional motion of a particle
![](data:image/png;base64,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)
physics-General
maths-
The solution of
is
The solution of
is
maths-General
maths-
If ![Sin space x plus Cos space x equals square root of 2 cos space alpha not stretchy rightwards double arrow x equals midline horizontal ellipsis](data:image/png;base64,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)
If ![Sin space x plus Cos space x equals square root of 2 cos space alpha not stretchy rightwards double arrow x equals midline horizontal ellipsis](data:image/png;base64,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)
maths-General
Physics-
A ball is thrown vertically upwards. Which of the following graph/graphs represent velocity-time graph of the ball during its flight (air resistance is neglected)?
![](data:image/png;base64,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)
A ball is thrown vertically upwards. Which of the following graph/graphs represent velocity-time graph of the ball during its flight (air resistance is neglected)?
![](data:image/png;base64,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)
Physics-General
physics-
Acceleration velocity graph of a particle moving in a straight line is as shown in figure. The slope of velocity-displacement graph
![](data:image/png;base64,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)
Acceleration velocity graph of a particle moving in a straight line is as shown in figure. The slope of velocity-displacement graph
![](data:image/png;base64,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)
physics-General
Physics-
A cyclist starts from the centre
of a circular park of radius one kilometre, reaches the edge
of the park, then cycles along the circumference and returns to the centre along
as shown in figure. If the round trip takes ten minutes, the net displacement and average speed of the cyclist (in metre and kilometre per hour) is
![](data:image/png;base64,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)
A cyclist starts from the centre
of a circular park of radius one kilometre, reaches the edge
of the park, then cycles along the circumference and returns to the centre along
as shown in figure. If the round trip takes ten minutes, the net displacement and average speed of the cyclist (in metre and kilometre per hour) is
![](data:image/png;base64,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)
Physics-General
maths-
If
then solutions of
are in -
If
then solutions of
are in -
maths-General
maths-
In
, care in H.P., then
, Sin2
, Sin2
are in
In
, care in H.P., then
, Sin2
, Sin2
are in
maths-General
maths-
Solution of
is
Solution of
is
maths-General
maths-
If
then the general solution of ![A over 2 equals](data:image/png;base64,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)
If
then the general solution of ![A over 2 equals](data:image/png;base64,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)
maths-General
physics-
The graph between the displacement
and
for a particle moving in a straight line is shown in figure. During the interval
and
the acceleration of the particle is
![](data:image/png;base64,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)
, ![C D](data:image/png;base64,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)
The graph between the displacement
and
for a particle moving in a straight line is shown in figure. During the interval
and
the acceleration of the particle is
![](data:image/png;base64,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)
, ![C D](data:image/png;base64,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)
physics-General
maths-
then the general solution of
=
then the general solution of
=
maths-General
physics-
Velocity-time
-
graph for a moving object is shown in the figure. Total displacement of the object during the same interval when there is non-zero acceleration and retardation is
![](data:image/png;base64,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)
Velocity-time
-
graph for a moving object is shown in the figure. Total displacement of the object during the same interval when there is non-zero acceleration and retardation is
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)
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![R to the power of 2 end exponent left parenthesis blank s i n blank 2 A plus blank s i n blank 2 B plus blank s i n blank 2 C right parenthesis equals](data:image/png;base64,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)
In
![R to the power of 2 end exponent left parenthesis blank s i n blank 2 A plus blank s i n blank 2 B plus blank s i n blank 2 C right parenthesis equals](data:image/png;base64,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)
maths-General