Chemistry-
General
Easy
Question
Which of the following is halogen exchange reaction?
- R X + Nal → RI + NaX
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/911873/1/3540817/Picture281.png)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/911873/1/3540819/Picture282.png)
The correct answer is: R X + Nal → RI + NaX
Related Questions to study
chemistry-
(CH3)2CHCl + NaI →(CH3)2CHI + NaCl The above reaction is known as
(CH3)2CHCl + NaI →(CH3)2CHI + NaCl The above reaction is known as
chemistry-General
chemistry-
Which of the following pairs are correctly matched?
![](data:image/png;base64,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)
Which of the following pairs are correctly matched?
![](data:image/png;base64,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)
chemistry-General
chemistry-
Which one is a nucleophilic substitution reaction among the following?
Which one is a nucleophilic substitution reaction among the following?
chemistry-General
chemistry-
The major product in the reaction is
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAhkAAACvCAYAAABQFszKAAAcdElEQVR4nO3dTW/byp4m8IdMvsmlFNzE8wFcVHZeRFJwk8WNZ3YJ0C1SK8vGPQEG9xzM6vRgMDEg0ptjyQ0k7lVPuhc5dyJSgJexlN7H8R2rar5JrOqFJJt6sd4pWdLzA7hwrCIpWiKfFFn/Ms7OzvTOzg6IiIiI5slc9g4QERHRemLIICIiolgwZBAREVEsGDKIiIgoFgwZREREFAuGDCIiIooFQwYRERHFgiGDiIiIYsGQQURERLFgyCAiIqJYMGQQERFRLBgyiIiIKBYMGURERBQLhgwiIiKKBUMGERERxYIhg4iIiGLBkEFERESxYMggIiKiWDBkEBERUSwYMoiIiCgWDBlEREQUC4YMIiIiigVDBhEREcWCIYOIiIhiwZBBREREsWDIICIiolgwZBAREVEsGDKIiIgoFgwZREREFAuGDCIiIooFQwYRERHFgiGDiIiIYsGQQUREU1PhEY7yKaRsG4ZhdC22bcN2XXhBAKl16/VHKaR8ifaPUEcpPDCNvrb9i4OgqaGjG6/m8cA0x2hr4H/VmjfbnPMRQPXoCPlUCrZtwux6LwJCuHC9AFLGsvF7jyGDiIgmoxTCfAqmaSCRKeD/NP+MP//8AQ2toSPL6ekv+K/Gd/z78yyS7TCQKNSgI1d7a+8c100NLSV814RhRDckkKs00GxqaF1GxjTQ9etnx7huNqG1ROjbPW0BUayg0WxCa43/bveue9ZjUEU+lYJpJpH+139F889/xYcP1+19bS/yX/A//puB7//+HI8emTCEg4qU2Ki4cXZ2pomIiMYhfVfbhqEBaIiirjSa47TSoWtrw0CrXa6ir5sD2klf22Z73cNed8c2/JSpjU5bUdRX1+O2nYTUoW9rs30MtoufdWPkPva0yY3TZj2wJ4OIiMYS5lNI7pdQ0xoQRTTOC8gkxukesPDs+BwNz4Y57OVWElvATW+FeGyhp+9ifE+SsObZcwEAUDh6+giZ/RqaWmO7eIXzQhaJkV0kFp7tnePKs2EaBr6ePEfS9tForn+fBkMGERGNpI5SyJZr7ecacqh8KYxxce1m7X1AUZgwvjegYtnLeFXzj3DQebZju4gPe4nhoamHtfceRdto3bb5eoBHqfUPGgwZREQ0nDrCm/36zYOTovgW6akecLCw96EIYUzdP7E06ugpsmWNTibI/bw3ccgCLOz9nIPRaff1AG+OJNY5ZzBkEBHREApHb/ZRv3lYU+BV1sLUKcHKYBd/hwJW6AHIKg4P6pEHVnN4kTamOwbPXiIXuQn09eAQodYrdCwmw5BBRER3UwE+1iOBQLzCLBkDsLB3foz0KvVmVD/hBJEgkHuBaTMG8Awvc4iMdDnB76FepcQ1EYYMIiK6m7zE1+jPT5L4w+rEg7lQje+xhoALqdY1Y+DhsneAiIjuLyUvov+Hh3icWFjEqB88gnmwoI0NoS7riKaM7ccJzNSX81gAqN2s8+ulBDDbOu8r9mQQEdG9JIpX3cWthi4SfsqM5TLdCgXrFwAWgSGDiIjGVr/csIqVA7R6HuZ3FGbtGbnPGDKIiOhOVmJr+oJYa8JKPunOABcSaoaM0Xv7ZSthre0RZsggIqK7pV8gFx1JcfIJ1XhmGru/eoad4uslpu/LUOh6jnS7iJ/SxnznVblHGDKIiGiINH4qimjKwKfq+tZ1GOwZfiqK2yJasww7VQH+rX7bdrqiXquDIYOIiIay9j7AE7f/kz/J5hHOUKZSVfPIhzqmqdfj0VUSHMDJPx3dTF8/ierhAeqd4lu5zzjOrG8vBsCQQUREI1nYO6/AuZlq/QTZp/5UF1lVzePw6i/47dmyL64K1aMUUqYBw2gttuMNeU8W9r5cwetMGf/1AI/yAZoTHANVzSN70i5Nvl3E1XEG5jonDDBkEBHRWNI4vq7AsdtBo36AZMpFIMe9yCpU8ykcNv+C3/YSgwOGauACt3ch6pcKU9+Y+d4Y8nCmwlH+EFfWe3y5bg1/DX0b//HPB0iaLirNu7baChqB05pNFSfPkXKDMcJWK9A8ypTRbGps5z6jUSsgOcnsaqvq7OxsWdPMExHRCpKBq23D0GjlAQ2R08VKRTek7H2lljLQvutq23F0pdHUzbvXqkPX1IaB2/VC6FyloZt3N7pt69s9baFFsaIbAxpL39dBs39fQtfUpgGd+3w9cpsy9LVrG+1tbutcsaIbje5GUkod+K1jZQB6ezs34hisH+Ps7Ezv7OwsMeYQEdEqUipEcPg7Pn77Bl2vo971WwEhtrD16gV+yqaRSAz+X7s6SuHRfm2MmUhzqFyXkDYjozyqeTzIlMe6ZZH7fI1Sxhx6i6aaf4Bs+R/wtx8lZMwxB+4qhWpwiE8fv+Fb/Su+dk12to3t7f+C3d0XyA45BuuMIYOIiEhVkX/zCX96/xvSiU2vDDI/nLuEiIg2mIKqHuJN9hue/O0D0hYDxjzxwU8iItpM6ghPHySRSJdQa9ZRfp6EmXKGPPhJk2LIICKizWTt4ct1E1pKhL4L2zCA+gme5wPoVSricY8xZBAR0WazLDzbO8Z54MA0DeDkd0xb0JO6MWQQEREBt3OUiMdY33lRF4shg4iIKGL7VQbWmlfiXBSGDKIVokIfvmvDtu2bUsg3JZFtG7brwg9DqM7rfRu2r7rX4beqFfa2719chL39xaEL0xynrQE3mKLktJ8ac996FtuGbbtw/RChGr0d2mRVHD19ANOw4VQkbgqWqiryqSy+/ePf8KWQwCYU41yIeVf8lIGnPUdoIURX5TUAWgihheNoLwh0py6c9IQW3m2VOOn1txu8ODro3XjgjNkW2ulrTHRPSakD5/Z7IRxPe4HUfbUVZdD67vV+77zGnev1HKPnuyG0E/SueWBjHXhCG33bqvTt13SkDlyja/2iWNGNvpXLwe9btKpLEg0Suilt9lQWFbnixlXjXIT5hIyZT4IDTktSas/pDQeTnQD7Qo4XzOkESLQY0nNuvy/C02N9/HX39xFOcPeJU3paRE+2w147YDueHS0t7em5Xtelp20jGjIaI/attT9G9HxR4UWDaJlmDhnzOgnesfLuQDJR94PUnkDXCZABYzj2Qt0vXd8R4ek7+iPuJDs9DUODQ6Cd6IX8rl6PwVvoDhlOZc4X9EC7kfkxRoeM230yIp+1yuiJL4goJjM9kxG6NhL75Va9euFB1gpIW+O0tJAu1SA9MeJlSWxFfhSPE1PvK7aSGGvXNo1SCN3W/f1EZh8fsYvdX04htYaOLKenv2AXF/iYySDRvg+e2O+eqcAq1FqvlxKe07shASeQ7fWVkO79dbrU/p1EMOBzIbzgZp9KfY3Xj/JtZMqd4+sgOC9g0k+/VThFURjARQOb85iChewrERkWUMbvIYciEi3L1CGj7yRYK0x8EbcKp/AENuwkeH8o34WdSLT+jsJDIDVqpQIKaavvb2lZaRRKNdS0RODchoD6pexfsWWh8NZDV1RwfkFprARqId35XHQID6eF9OaEROXjdSTACe8npKd6CM1C4bQIAQ7FI6LlmC5k9J0E3/b/z3QsFgqnPRcjWgj2Qt1XCv7r/chslgK7mRmOnZXFLi4xIAquLfn3eqTrQuCPieEhS4U+8ikThu21Rxoo+PnOKBcbrifB4o9E05kiZAw4CWZnuARs4Elw2dgLdY+pCj5G70KJXcySMQALhdqA21NrSoV5ZMu3804I52cUrAERQymE+RRS7duEpVqnRYh8Kon9Uq29jjrKB4cIecOFVtSDBw/6hnxfX18vbPuTh4wBJ8FZMsamnQSXjr1Q95u8RNeTLhvVizOKHBxolYIKQ/iujWSm1O51EHCKDZyXMuivqaTgv0ni12811Lr+/e84TP0K/dcrNLVE4NowAAjnBdK84UQr6vr6Gg8ePOj6t4cPHy4seEw+1TtPgissjl6od5AAPwNzohoXXT+Lx4mFXt7q+0kY+wvc4ATqB1kkD0a/TjhF/PJ2f8jtPwuF8yYKABDmYWbbwaReBipNHGdaU32nj8/RPJ7X3hMtz48fP/Dw4cOhQeLhw/448OPHj76AMqmJezIGnQQXpb6fmKAKYAI9gx+IvVA0gvAaXaOKhi8Snr24CCSKDTQH7IeUEoHnwRGtfamXD5BJGDBsF94k5T9FET+lDfZZ0Fr68eMHtNYThYZBPR6T9nqsVFlx4cnJToAL6MufuPzxnJeJbGAv1Er9fQaoX0o+DTCCZVlIFwoo1ZqQgdearhsA6mUcZBKwvcUfQ9M0l/7Z48Jl0DKP2yKT3G6ZOWQMHMK4IQxj+f/nmWQfNq0XatX+PgBgJbdGv4juZKULOG8Ub4MGgPrBG/hycTHDNE1oDkehDXPX7ZiJQwZPgrfG71WJd1kFy+iFWvbfZaq/T/oluuqYlT+huhp/4vvDKuBnJzpstY6Dw3Bhw1CbzebSP3NcuAxbZn3OotewWzGT92QMOAmG0+8bLdEm90LdX2m87UpYZXxiyphY4o+CFciIenRuc0x7y6QTJiYJLVPcLhlwEmTKWAnshVoNVk/F03Im3z/l+gRU6MLd8O+oGFWRi2jNjRpd0mtQoJimB2SqZzL6T4LuTL0Z9+MkqBD6NuzIswG2669XoSn2Qq0IC4VaEPlblZFJ+VMVrFOhi3eNt8uf70W16lhEn72xbRdhLM9KhDg8qENHqn6+ylrMGLSROsW4hgWMeQWKQaZ88HPASdCe7oJ8P06CCr77Do3kKWpaozNJV728j4QxW4C6X9gLtTrSKOkAN9PE1PeRtF2MPyKzNfHdO7xFqTBkDJFqIPo4cP1STT8S40JCDWqsfKSSGeyXu5/mrdfLyCRN2P4doz9UAxcT742Cn8qifJsw4FTOUUgwYtBmihbjmuZ2x8xmm+o90E7XdOrOmFO9a92Z7t0Z1mBBU71Lz+ufelxrHTjrOLV4z3EZNO36JGsLnDuOT6Cd6FTx3tgfjP59XK8/wMRk4HR/D4SjvSDQUvYeU6mlDLTnOFo443wXpQ6cyFTtgAZGfCejbTtTyXf9nSt937PAMbRwKroR+YWUgXZupokfNB271IFrdK1fOEXdkHLA97jzvkXfcSoOfS9SB56tDeP2vRcbnBaeaJ5mDBkt8ZwE5c1FftoTIPpOgMGdQWOQ1vZnuwjfT90BYFgAG0YGjnbuDA8MGfN2890RPRfT9ndDCEc7XqD7vna96xkQDgYvjg56r7mBE7koD1+cSlNrHWjHk3rgpVt62ja6Q4b07DH3bcAihBZCaMfxdDDiIMiucDFgcSq6L/cQ0cTmEjI65nESlAPCwZ0nwN7GgTP2CWnkdUsG2pmoZ2bVrEcvFK2wTsjgBZ1obc01ZKwH2e6ZGbfXZLWtay8U3X+tXguhPd6iIFpbxtnZmd7Z2QEBUD7sxH536W3hINiA+TmUClF59wkfLy6Aer37GEBAiC1s7b7E22wa1h3PESrfRmKsUp0OAt1zTEMXRqY81r46gV7+aAmaUYi8mcW34hXOC4udBI6IFochYxClEFbe4df9cuti6wTQvKoRzYmCn0ri4ysGDKJ1t1ITpC2MZSFdKKEWtAfpsp4E0ZwohPk3DBhEG4IhY5hO8SrxGIubSoxoXSn4qTf49Y/vGTCINgRDxhjEbnbtp0QnipUKkU+9xuXPAwKGCpF3/cGFvIhopTFkIIRvGzAMG26obquWqhCuncGFE6A2rGIiEQ3XrvhZqtVRziRhRkqLG4YBI5GBfrGHP7Br415R4RH8fAopu7scfKskvA3bdeEFwU25e3WUQsqXN+Xc1VEKpmn0te1fHARNja6MWc3jgWmO0daAEzQjJeTnegRQPTpCPpWCbZs970VACBeuF0COWRpfHT0d8z05qAw6Hg/GPB6VuI7HlDiEVevA6R0yKbRwvDWukUG0GHKs4l2DKn7SUkipA/e2UJnIFXWxInWj72WB9l27XUwtMtS82OiveSKl9l2z53MgdK4y4LX9O6RDv79wmihWdCOuz4wMtWu3i8IJoXPFim70DrOWUoe+q23baO3bdk5/bjQGF53rW/+g47Gtc5/HPR4pbRrdlXq3i5/11T39DjFkEBGRlr6r7c7FSxR1Zaz6Jd2hBLmKvh7UTPraNiMXxlxFX499UZTaT5m3lWBFUV8N3MisWoHG7ASs4ucxgkynTeu9befGaaO1lr5OmZGy+bnPkx+PzjHfjut4zAdvlxARbbgwn0Jyv4Sa1oAoonFeQGasSeUspI/P0fBsGMNebiWxBdw8iyMeWzCmffT3SRLW3G+tKRw9fYRMoYamBkTxCl8KWSSGvikAsPBs7xxXng3TMPD15DmSto9Gc8T9CiuJJ5H3v/04AUx7PLYSMRyP+WHIICLaYOoohWy51r6Pn0PlS2GMi2s3a+8DPGHA+N7A/8eIC+w9VM0/wkGt2dpzUcT7vQTMCQ6BtfceRdtoBa2vB3iUGiNobAiGDCKiTaWO8Ga/fvOgoCi+RXrCgNFiYe+DBzFV2+VSR0+RLTfRyQS5v+5NHLIAC3s/52B02n09wJsjCeYMhgwiog2lcPRmH/WboQgCr7LW1L32sDLYxd9vR+ithCoOD+qR0Rg5vEgb0x2DZy+Ri9wE+npwiFDrFezXmS+GDCKiTaQCfKzj9iIoXmGWjAFY2Ds/nrInZEmqn3CCSBDIvcC0GQN4hpc5RJ5NOcHvocampwyGDCKiTSQv8TX685Mk/rBhdVhV4zviLCpxIdWmZww8XPYOEBHR4il5Ef0/PMTjxZV6rx88gnmwoI0NoS575pueZZQHAOuxAFBDp/vi66UEMHqdXw8e4cE9OB5xYE8GEREtlCheodnU0HqcRcJPmbEEoFYoWL7t4hWuJz0eK9LpxJBBIxmr8mkmoqnVL+XGd+3XLyXm+RDFTPUv1gRDBg3FgEG0nqzE1vQFsdaElXyCri6B73Kmifpat19uV7CVsDb8CDNkEBFtpvQL5KIjKU4+oXqvZtZagJ5hp6hfYvq+DIXG90jb7SJ+Shsrc1sjLgwZREQbKY2fiiKaMvCpuml1HZ7hp6KYz7BTFeDf6rdtcz9PU9Rr/TBkEBFtqJty4O2fT7J5hDOUqVRhHvlwtYJKqyT47YOlJ//zCHKKHp3q4QHqneJbuc84zrAXA2DIICLaYBb2zitwzE7QOEH2qT/VRVaFeRw2/oLfni37SQ+F6lEKKdOAYbQW2/GGvCcLe1+u4HVGsNQP8CgfoDnBMVDVPLInulVGfLuIq+MMTCYMAAwZREQbLo3j6woc27i5yCZTLgI57kVWIcyncKj/gt8KicH/e1cNXOD2LkT9UmHq/o7vjSEPZyoc5Q9xZb3Hl+vWcM/Qt/Ef/3yApOmi0rxrq62gEbh2a2K0k+d46gZjhK1WoHmUKaPZ1NjOfUajVkBy1OxqqoHvkT35OsuolovZHlaN3dnZ2aKnl6cVgtYnf9m7QUQLIANX24Zx872HyOlipaIbUva+UksZaN91te04utJoDlurDl1TGwZu1wuhc5WGbg5r1mnr2z1toUWxohsDGkvf10GzqXt/E7qmNg3o3OfrkduUoa9d29BGZz+LFd3oeX9SSh34rWNlAHp7O6crjf7t3vme2vtz+562de7zuMcjpc3o3wjQ28XP+mp046VgyKChGDKINo+UgfZcV9tCaIHuCzwgtBCOdooV3WgMWceAcDB4yenKdc8FOnT7LqR3LbnK6ODQuqjn9Ofe7Qw/CDr0Xe3aQgujEzpuQ8H2tqOLAwLI3cejPxzcdTz69jN0tWmOeTzGCFKLZJydnemdnZ059o3QOunUydCbNrSNiNaDqiL/5hP+9P43pBPLfl5k83DuEiIiWkMKqnqIN5lvePJ/PyBtMWAsAx/8JCKi9aKO8PRBEol0CTVdR/l5EmbKGfLgJ8WFIYOIiNaLtYcv101oKRH6LmzDAOoneJ4PeOt3wRgyiIhoPVkWnu0d4zxwYJoGcPI7pi3oSdNhyCAiovXWmaNEPAbnRV0shgwiItoI268ysFiJc6EYMoiIaA1UcfTUhGnYcAKJm4Klqop8Kotv//g3fCkkMKoYJ80XQwYREa2BZ0g+sQGjjpNsEknTgGHYsP/3/8Of3v/AeSnL+USWgHUyiIhoLTw7/oLm8bL3gqLYk0FERESxYMggIiKiWDBkEBERUSwYMoiIiCgWDBlEREQUC4YMIiIiigVDBhEREcWCIYOIiIhiwZBBREREsWDFTxpKa06KTERE02FPBhEREcWCIYOIiIhiwZBBREREsWDIICIiolgwZBAREVEsGDKIiIgoFgwZREREFAuGDCIiIooFQwYNpUIfvmvDtm0YhtG12LYN23XhhyFU5/W+DdtXt+39/naDFxdh78ZDd8y2Bty+xkREtGwMGdRPKYRuKxwkMvv4iF3s/nIKqTV0ZDk9/QW7uMDHTAaJ9sU+sV/vWpVVqLVeLyU8p3dDAk4g2+srId3763Sp/TuJwBN9uym84GafSn2NiYho2YyzszO9s7Oz7P2ge0L5Ll7vl1EHAOEhOC0gbY1shdB9jUy5HTCcAHrQVV/5sBP7uIkhd73ujm34dgI3GUZ4kLUCRu4aEREtDXsy6Ebo2khEAoasjRMwAMBCulSDHNDb0P2yJLYiP4rHian3FVtJBgwionuOIYMAtJ6duOmJgINgil4Cq3AKTwC4aECNfDUREa07hgwClI/XkWcphPe2//mIsVgonHoY0Z9BREQbgiFj4yn4ryPPSUBgNzvDjQgri11cQs5hz4iIaLU9XPYO0JKpCj5GB4SIXcySMQALhVppxp0iIqJ1wJ6MTScv0TXolA9UEhHRnLAnY8OpxkXXzzON+JhQfT8BY39hmyMiogVjTwYtjfBkV3Gv4YvEqBGyRER0vzBkUJf6JR/ZJCKi+WDI2HBWcmv0i4iIiKbAkLHp0i/RNaVI+VP/RGVERERTYMjYeGm87XrYoYxPTBlERDQHDBl0Ww68rZwZMO36BFTocup1IiJiyCCgVUAriNw2KSNj+1PNP6JCF+8ab+/B1OsKoW/Dbk9BbxgGbHe690RERNNhyKC2NEo6gNPp0ajvI2G7CMe+KiuEro13eItS4Y5yXqqBaFWOmUayDJ2ETcF336GRPEWtPfw18ATq5X0kjNl6aYiIaHwMGRSRRqmmIQOnNclZvYxMwoBhu/DDEEr1XtYVlArhuy5s9x3wtobSnXPDK4Tv9ruri5Z/hTtWilEI/dfYjzau7+O1Hw4MGsqvIFkqoXCzLxbShRoCB+AzJ0REi2OcnZ3pnZ2dZe8H3UNKhai8+4SPFxdAvd4dECAgxBa2dl/ibTYN667OC99GYr8++JddHAS61D37a+jCyJTH2lcn0CNv0YSugUx5wHaIiCgWDBm0GVQI9/UnvDwt4c7OFiIimivOXUJrTkGF7/A6c4Gt4JQBg4hogfhMBq0v5cM2EkhkyqijjnImAcPmg59ERIvCkEHryyq0RpdIicCLPMzKIh5ERAvBkEHrz7KQLpRQC9qVQFg6nYhoIRgyaHN05mkRj5FY9r4QEW0AhgzaOGI3Cz7/SUQUP4YMWjMhfNuAYdhwQ3VbrEuFcO0MLpwAtbsqkhIR0VwxZNCaSSO5JYD2aJKE0Qoc9rsGXp5q1JY/qQoR0cZgnQxaO+lSDbq07L0gIiL2ZBAREVEsGDKIiIgoFgwZREREFAuGDCIiIooFQwYRERHFgiGDiIiIYsGQQURERLFgyCAiIqJYMGQQERFRLBgyiIiIKBb/CR9uuInbSlDWAAAAAElFTkSuQmCC)
The major product in the reaction is
![](data:image/png;base64,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)
chemistry-General
chemistry-
In the following reaction :
The major product obtained is
In the following reaction :
The major product obtained is
chemistry-General
chemistry-
The reagents for the following conversions is / are
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)
The reagents for the following conversions is / are
![](data:image/png;base64,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)
chemistry-General
chemistry-
In the reaction R – OH + HX → R – X + H2O, The reactivity of different alcohols is
In the reaction R – OH + HX → R – X + H2O, The reactivity of different alcohols is
chemistry-General
Maths-
If
is a square matrix of order 3 then
Adj ![open parentheses bold Adj space A squared close parentheses ∣ equals](data:image/png;base64,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)
If
is a square matrix of order 3 then
Adj ![open parentheses bold Adj space A squared close parentheses ∣ equals](data:image/png;base64,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)
Maths-General
chemistry-
Which of the following compounds will undergo racemization when solution of KOH hydrolyses?
i) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/486125/1/914925/Picture231.png)
ii) CH3CH2CH2Cl
iii) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/486125/1/914925/Picture232.png)
iv)
</span
Which of the following compounds will undergo racemization when solution of KOH hydrolyses?
i) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/486125/1/914925/Picture231.png)
ii) CH3CH2CH2Cl
iii) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/486125/1/914925/Picture232.png)
iv)
</span
chemistry-General
physics-
An aero plane moving horizontally at a speed of
and at a height of
is to drop a bomb on a target. At what horizontal distance from the target should the bomb be released
An aero plane moving horizontally at a speed of
and at a height of
is to drop a bomb on a target. At what horizontal distance from the target should the bomb be released
physics-General
chemistry-
Which of the carbon atoms present in the molecule given below are asymmetric?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZwAAAC+CAYAAAABUrmwAAAY9UlEQVR4nO3dzXLiWJoG4FdM3UkLz7THfQF5lBcwwERMbpJZujeWcpWQE52bKS9dK1eERa4KcpPeUrNwLZDmAhLVDbjdERzNpRTfLPiTsDGSAEmg94kgIgkjLAtSr3R+vmOIiICIiOjAakXvABERVQMDh4iIcsHAISKiXDBwiIgoFwwcIiLKBQOHiIhywcAhIqJcMHCIiCgXDBwiIsoFA4eIiHLBwCEiolwwcIiIKBcMHCIiygUDhwoXhj56jgPLsmAYRvxhWbCcHnp+mOi9fMd4/h4vPRx/fUs4SbYzDDzbdEdp9jle2t2HU0u6zywKTyUgRAXRni0KEACibFc8rUXHXyHac8VWSgAIoMR2vbXXbHx38ezFdovfkXBb7Ykd2Q5Q4nrJfutudtxno4h9JkqOgUP5057YKnJiTHJe1O4ynKBsSXQujW6T9PcsN42c+JWbMOT2QLuijMg+T9JsqsSI7HOKTYlywSY1ylfYg1VvYhAAgIKrx+iYCbYzOxhrFwoAggGadQu9ZK1sRFQSDBzKkQ+n3kUwf6bc+2Rhs2B2cO+q+ZMA3bqDPXenENEBMXAoN77TxGD5zMZ1qrSZMTvXsJfPBmjuuwefiA6GgUP5CHu4GUSe2+/QyPRGDbyzI08HN2xaIzoSDBzKRTgaLpvSAECd1zO/V/1cRZ4FGI6YOETHgIFDudBPQez5xVn65rRNgie9t/ciosP5oegdIErLPLsAEGx9XVyAbt1A9xA7dDABumfHts9Em/EOhwrxOMm7GUzB1QKRZA/tqu1veXAK7iTdPhtF7zLRKxg4lIt4v8tuwslj7Pku/UFElB8GDuXCbLUR6+ofjpD1HifeH6TQbu2vP4iIDoeBQ/kwO7iODmcOnpCtq9/HQ2x49XW6yaNEVBgGDuWm8dmN3OUMcJNlAo3/EJs86vWzzeYhovw9C5wylXffZ9l6KgGzg7FnL0Mn6F6mm7QZ+nCai7hRcHU/4+RRIirCs8Bp9BejXjQ8O97Rq2wPejEq5tmVZQP9xc+0Bzu+JVxPL0fTbLsoDX0HlmGgXm9iiHNc39+vfu983/R1GxePQ3SbdRiGBafnZ+4ToBw1+hhrF7OvVoBu3Up20bAo+gkAyoaXtOhnRuvzho6BfvodXPWGSu3VWtJ5l3fPq2w9lYAWz42sh6PsZOvhJP6AtXg2sq8tU9h6OAbXw6GTVZ7A2eF37bQtFU57rri2EqXii4/NgkiJPV+cLYn1kNn4sL31LddCZvPj2aY7SrPP0/V9NpLu83TDbyfKjyEim+/Cwx6sZTn5FGuXAAh7FurdebOEcqHHHWze1IdjrCoJK1djnLK9JPb7YMMTtu8TEZVJKUapsWw9EdHpKz5wWLaeiKgSCg8clq0nIqqGwgOHZeuJiKohxfIE5S/vnq1sPRER5SHFHU4+5d3zL1tPRFRNYeij9+ED3m6s5uLOJu3v6fcV3qTGsvVERPkK/Q94W6vNqrlM/wX//e2lai7/ib/8/X/wX60z1AwLtutB75g8hQcOy9YTEeUk9PHhbQ1nzT7G8gZ3kym+D7po1s21eZImzMZH/PL9O6a6B8v4HV8/tXD21oa3Q+oUHjgsW0/rFrf0tFmtVoNhGHht3jZRTPgFb89a6I8FAoW7yXd06sb2VWLNj/g+cWEZBhB8Revs7ax7JcMuFB84YNl6IqLD8vHhn7sI5hco6u4bOmaCsFkwP+KbqzC7Dgzw6cyBP00fOaUIHJatJyI6HP/Dv2Mgi7uSK/z40UTaRgTz44+wjUVIfUXrg4+0mXOwwEld3v1IytYTER2V8At+GgiWra9X7/BvmZqsG/iPKwPL26KvP+FLmK5p7ZXACeHfdiOzWgIMbxOuOROu9acEQ4yShIfZQX+s4bk2FAJ0m3VYlgM/DNd+b4jQ78GxLBj1LgIo2J6GjPtoMGyIiJZCb4ggEgvqvJ68KW1N/fxN5FmAX0ch0iTOKyt+1tEcxH8WDJqoJ1nxsx4txjnbsdlCaUlW/DTR6PQxFoH2XLQvHnFzebn6vfN9u7wZAhdteFpDZIw+k4aI6Bn99Hvs+b+e/QmZE2dN8JRujs6zSgONvkD6WX71bMXPTJtuYDY66DQ66OzxPYnouIVhCK1HeHgY4vExQBDMRlx16xzZeGhm/QIGAmQbo5aqtA0RUbHC3lucDQVvgoBFrDL6++T/gEZ9b3c5aZRjlBrRXoQIfR+9njPr3zMMWFyj4qSYne+YjscY6/m8ENoq3u+ym1A/xu5u0vYHMXDoNIQ9OMYlLm+a6HYHGAS8/j1p5hkuit6HI2E221CRWAh+HSHM2CQW7w9SeN8yU90pVSpwOHv9hJkd9GWM8Vjg2dtfTlQZ5kf8aBureTfBU8aaaD5++yqrUWlXP+JjmsmjqFjgACybUgX7LAhLdAoaf7uL3OV8xU9fQqSuiuT/hlXeXGH0SwO1lKfSSgVOtO4UQ4eIKsP8iO8je9nvFXz6K3ppJm2GPj60BvNzqMLdpI9G2rRBxQIHwLL8NnDioROG8HsOrGfrXFiwLCdZFQeiQkUmeEe/v44PLanmGxIANH7B94kLxzJgIMCns7foJVnrZlH0UwSirjCaD0HPdPaUCsPsO1v0buyd9mxR879NuZ7o1Q/EVVj+3bC9Indzo10/F+2q5XsoV2/f4AgZhiEAZDqdZnwHLZ5ri1KrYwVAoJTY0e9MUbQrjmUIoMQeTSLfYS2ebYmh1PI7Dii5m2Q9DlWkxes5Ys2/Q0pdyWgyWfvMtWivJ45liTE/xlejiex6lE/vbJtS9D/bafDEXv5NtjyLFO3G/qOW8Xx8kMDRnrh29OSqRNklOLFmtEvgLC9IlC2ejv1A7Pn7zk70BZ3EtTs/GW4OEu1aYhjVDJzdLzZWtNcT17HEWr/wAEQpJbZ9J6PJZA97PXMqZ9mdnFbo6NVdjHJfOKFGfl6RwIne8T1/lPMYbJP1pKNdNbtiVa68dBrR7uKKdnbBkn/meOIsrrzvXrmiXoZStQLHWP7N+wmcvFWuD+clclL9OiY64/kyseMOKl9hbniJy5tzXOvV8rk6shTGrDK5g1fL+52KsIfLTwEECu63Dl5agN3sfMOdNf8/oM5ffM0hhb2fMMCsY/p9y9zcT1DBeTi1Wg0igul0ChE5ynMVAyfidELnBeFsBr5l1dGt0pzIi2uMx51YFXGz0cdYe1hN18m46N+R8W8/IRAAuMDZxisRE53v0+UFS77lyUKMfg3mowFe28fqiYbNMZ+fGDhroqFzzB8sgFnIOBYsw4BRv8ET3uH+XsOt0jSV8w3X6GYDnyMHIhiOki29cbR8PHydj0dS5zBL+dXW+Mcib/CIyWl/IIlElxI/9rABGDgvkmOfrxP6s6GP9Sa6jxdoe/MlHDoNmLxqXDJb7VXTWvAEXeTO5Cl4Qlj6McUB/qGrPfR5cVcDYGvYLIJpOp3mtXuZMHA2ONp+ncUKqAEA5UKP++hwraCXVbAfYKasdw91/FmtSnMNfvMrmzhJ+2uid0B//PEHarVyn9LLvXclcGyhE12l1b7moIHECuggz1cD766WxbTQ/dlPMOGvByfXvi0TrffRxGnhbW/DxMRwgscc9yxPSftr1u+Ayh42AAMnkWPt13l88TJW42n57wBPGvO+nl41RmpFRU5aqt06+XBuvLtajfoaNPG293ojon/7K85bfzr4fkWZnW+4U6tZ7MGnM7x1XEQLY4T+B7y9HEaavk+j+S1Nf83RjljLafj1ScAxzNfx7NgcE3s5s28+HyU2Q7ucc1F2PcZJKw2sXvfCBNmSyzoPx7ON2GevbDc++VNEtNbi2bOJscXM9NDiWkZkPtD6w5bRNDpJdTVREfZIjnB6SuL5Ncc+D6fEZ87yKn3oaFdsFQ+U6IkldkJ+4YRTtFwCZ1lxoVxhm1T22eazMHn5RB4tceNK0XMpteeKrZ5Xh5jt12KCqBJl2+K6nnj6CD9ISf5ZHnvYiDBwMjuKu50jtfNx9dzYXdx6qG4s7XJEdi5vMi/1E7/bXVyYHOlBOTJpAmSf5WyKZIikXhWB5qLtpjyM+7M4rrse09DvYfQwxHAQYDXXVUHZbVx/bqHBMeJUkLRDnuVE5uEwcPZgXydImuHxpFOWdRTasYcNwFFqe8ET435JZA4U0SmpctgAwA9F78Cp4AmSiDapahPaOgYOEdEBJQ2bU72riWLgEBEdSNWb0NYxcIiI9oxNaC/joAEioj1i2GzGOxwioj1hE9rreIdDRLQHDJvtGDhFWS75PF+RM/qwLFiWA6fnIwwXL3dgVWAZZHoBvyvZJDxuenncPsyWQ0g5w6ESVZ735cClc2jNrGJzpJqz64ler12ltXhu9HXzh31sNY1pF7t+V4676lZ22nPEsiLH7W4kkxePmyPWs+OWrtp0Vao87wsDJzda3MiX+7Wy+bGtIpWPTzpwtCeuu2H5BKVEKXt+wl283E58DI+PFlcZke/KJNlWrlqV9K9k4MSXNVB3k0THQLuWGEb2wKlCled9YeDkwhM7cgK1U5Yo1os1bpQrp3aK5R3fOk9sI/pdSRY2C9qzZydc5Uq6LY/dYrmC+XEbJQubBe05s9BRdzLZYyicSpXnfWHgHFz8zibrSdKzTy1weMf3XPzOJutdimcbFQuctQXbMi7C5jmGGHsMHIbNcwycA4udIHdZ7Eu7oo5wZcqX8Y7vJbEmMShJ2JL20huJMmzxKnKeizWJQcld1pXjdE8sw5bRjgHBJrTNOErtoHzcdlcrsUC10cq6BIvZwbW9l50qWIie1cRg8dT20G+kOyhmow/vJI5FlI/bTwGWA6RUG816xrcyO7i+AlCJAVA+fv4UrEaWqfdomRn/cPMjfrSNvR22qg15TqToxDtpiyvxlM1Gp4x3fBss+l5SDhSovEXfS8qBAlQMVho4IP9hsP1FOyrTFZRsncCw7zs+J+PG5eM/fMW2o3co0YmIZZLkDsH/bYDCDhylxsDJ0cXZaS9pvJj8tpH/gGgEq3YLuxyRRr//4j6UVZqTel7flbKGDTDbt7TNUqf+f+zYMXCOXFlPFi/J446P0plOp0XvAlUIBw0cUP1cxZ4/TlhuJOoQV6MyX566jI/X1M/fxDqr+V1Jpv5nFRscweNWbgycAzJbbUQjJ3jShe0LlZvZauNN5MQZPIXsmkjAbL2HiiRO8A/NPp0SY+AcktlCO5o4gwf4he1M8XjH9wqzhXY0cQYP+F+eOLczW3gfvckZ/AafiVNaDJyDMtG5dyN3OQPc7FLF1++hd8SJxTu+15jo3N9Brc6cuPmyw/E58u9KciY63+6glgMLBvipt8Pdof8FX3xhZB3KQQZbU4xem4+Tdma9iIh4tthHP49nrczPKc2j2RO9Nh8nbS01ETmR70o6em0+TtpaaiIi4jniuJNMZXEoGQZOTrRnx6ogK9dLWJZlVrjyZE4g2l07Djv8XZ4r7gkmFr8r2WjPESs2CXSUsJ7cbKkCm2FzcAycPGlPXDs+017ZrnhaPzuh6GWFZDv7bPyS4h1fAvyuZKM9cR0rVpNO2a6MJpuOmyOWssWdTFmhIAeGyBFN5DgZIfzeCA9PQzw+BgiC+E+VUrhot/Gu1UHKMmNHI/QdXDYHWPzpyvVw32kkmAgawu/d4gGf0e+c6MGJ4XclGx63MmLgUHFCH73bG3QHy9iBstu4/txC3TRj4ROGIfToFjdDoH3fRyWyhujEMHCoBHg1SlQFDBwiIsoF5+EQEVEuGDhERJQLBg4REeWCgUNERLlg4BARUS4YOERECdRqte2r2tKrGDh7YhhGqZc3JqLdLJa7ZvBkx8DZg0XQvPYFZCDRvtVqNZ70crYIHYDHPwsGzo6Shs2219BzDOnteNLL33Q6hYgs73Z4/JNj4OyAYUNUXdEmNv7/ToaBkxHDhojYr5MOAyelRTOPzNYSevV1AMOG6NSxXyc5Bk4KaQYHbAskIjod7NdJhoGTEJvQiGgbNrG9joGTAMOGiJJiE9tmDJxXsL+GiLJgE9vLGDgbsL+GiHbFodNxDJwXsAmNiPaF/TorDJw1DBsi2jf268wwcCIYNkR0KOzXYeAA4OAAIspPlZvYKh84HBxARHmrahNbpQOHTWhEVJQqNrFVNnAYNkRUBlUaOl25wGF/DRGVTVX6dSoVOOyvIaKyqkK/TqUCh3c1RFRmp96vU6nAeQ3DhojK4lT7dX4oegfKgGFDRGUznU6L3oW9q/wdDsOGiCgflb/DYdAQEeWj8nc4RESUDwYOERHlgoFDRES5YOAQEVEuGDhEREfE/1BDrWYsq6JsfNgeprExUT4+/FMNtW3bGQZsb4pDDKdi4FBpcQQh0XONX6aYTgUiGp5jYT6zAwCgrkaYTGcVVWTQRM2IbYlf/phiKgLRHhzDwOrHCnejyexnIhg0a4htuielD5ww9NFzHFiW9TyJLQuW00PPD4veTToQhg7RJiYaf2tDLaNB4f3nBswkSWE28DdXYbXpe7Qa5kFCJqq0gRP6DizDQL3exBDnuL6/h56n7+yhoa/buHgcotuswzAsOD0fjB6qimjdLaJjUL7ACX04loF6c4AACq4WjPsdNEwTZuyFJsxGB/3xGKJdKAQYdJuoWw54w0NEVD7lCpywB6vexCAAAAVXj9Ext20EwOxgrF0oAAgGaNYt9Bg6RESlUqLA8eHUuwjmz5R7nyxsFswO7l01fxKgW3fg73kPiYgou9IEju80MVg+s3GdKm1mzM417OWzAZoOI4eIqCzKEThhDzeDyHP7HRqZ3qiBd3bk6eCGTWtERCVRisAJR8NlUxoAqPN65veqn6vIswDDEROHiKogwKezZBM7DcNAvTNG3rMOShE4+imIPb84S9+ctknwpPf2XkRE5aVwN5kuJ29ue+hefNJoHkoROPtknl0UvQtERPSCUgbO44TNYEREp6YUgRPvd9lNOHmMPd+lP4iojPZZ7sl3aona+w3HWyvm6MOpJdvW8eQghSDp+JQicMxWG7Gu/uEoc4maeH+QQru1v/4goiIdotxToz9dbuvZKlZLS9mj1fv3m2t1throz0vriPZgxzoDFNzRZLlf/aZx8BpddCSkJDwbAiwetnjZ3kVsRN7HzvYuRKWiPbHV4nutxJ0k2cYVZcy3UbZ4Otk2lhH9PdPku+haYiz+3ylXUmxKu9A9sQxj+ZndTaaS9NDrniXG8jtyJ5Pp4T+0UtzhAEDjsxu5yxngJssEGv8hNnnU62ebzUNUGmEP1lmk3NNkjE6SVmKzg/HEhTKwKvfEAZsUoZ9+z/13liZwYHYw9uxl6ATdy3STNkMfTnMRNwqu7mecPEpUFj6csy6CeQeIcr8lC5sFs4P7u0UzWYDumQOfnSknJIT/cxfBsocswK+3PsIkn3Ho47eBYLXprxj54eH72g5+D5WWduPNB0naArQrCimbD6gw8ebTVx7PmkTXmkxfeZxCa6pnG5G/yRYvU4uHJ7YRP6Yb34ZNakfBc4xVU9hrj6uR/BH7HDxxasbqc3rlcTX6I3HTXBrlCxwREdHiufYyRJSyxdNa9NprtOeKrdTyP4jNpDkyWjxbxb7oyvYk0aeo18Mn4cXJsYj2wWwLii3iwfVKHxADhw6sPE1qMSYanT7GItCei/bFI24uL1GPDbes4/JmCFy04WkNkTH6DY5IOy4mGp+jIxQV2p8bSPQpmg18diNjG1UbrRP6/MPREL9H2jfUefbVGOvnbyLbBhh67MyhYvxQ9A5sYzY66DQ66BS9I0Q50k+/x9rT91vuKYSgzqHKlLvSBw4R7WZW7inY+rq4AN2zGrqH2CGqrJI2qRFRVP7lnhTcyTRREUgRgXYt3jHRVgwcohKK97vs5nm5p+z9QUS7YOAQlZDZauNNJBWCoYesXf3x/iCFdpP1BakYDByiMjI7uL6KJs5Tsgl9z/h4+BrZ0L7GR+YNFYSBQyUSoFtPtlqhYRiod9N2hB+Xxue7WWkaAMAAN18y3OP4D1jljQ3vlwab06gwDBwqEQVXJ+uknnVU729Zi1IyOxiPouWe/pquHlrow2kN5s1pCu6kjwbThgrEwCEqs0YfY+3CVsBsqLKVbK2bRdFPAaBseDph0c+M1peJJ3oJA4eo7MwO+mMNz7WhEKDbrMOyHPhhuLbWTYjQ78GxLBj1LgJRsD0NGfexvQhDCP/207JQKBBg+PPra+msNvXx8HVVBxLBEJ7Pagb0HAOH6CgcptzTasXPOpqD+MqcwaC1ev/XVvysNzGQ2Jbots644ic9w0oDREdmn+WeGv0ppJ9pS/SnU2TalCqLdzhERJQLBg4dLXZUEx0XBg4VKIR/242UlQwwvE3RUT2IPA+GGCUZvUVEhTFEhP15lCvfMdAcbH8dbA/Sjy4U7sMxmki2qaDPNcaJSoWBQ0REuWCTGhER5YKBQ0REuWDgEBFRLhg4RESUCwYOERHlgoFDRES5YOAQEVEuGDhERJQLBg4REeWCgUNERLlg4BARUS4YOERElAsGDhER5YKBQ0REuWDgEBFRLhg4RESUi/8H/LQrtyGUo+sAAAAASUVORK5CYII=)
Which of the carbon atoms present in the molecule given below are asymmetric?
![](data:image/png;base64,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)
chemistry-General
chemistry-
chemistry-General
chemistry-
The major product obtained on monobromination (with Br2/ FeBr3) of the following compound A is
![](data:image/png;base64,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)
The major product obtained on monobromination (with Br2/ FeBr3) of the following compound A is
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAALgAAADjCAYAAAA2et7zAAAPRElEQVR4nO3dMUxaW8AH8D9fvhGfw3UoMU0qRt5mRVPSpM1LI6+J1A6mqcsbcNImdiHo8iarU5NHLZOJTRx8g7yky0uEulTTwc0ATbcHiU4UFwZz736+wY8bwAvcKyD3HP6/hETKvYcD/Dk999xzuB4hhACRov6n3xUg6iUGnJTGgJPSGHBSGgNOSmPASWnSB/zLly9YWVnByMgIPB6PeYtEIvjy5QsMw7hVuZeXl/j48SOePHlSV+7IyAgikQj29vZgGAYMw8DKygrK5TIAYGlpqW77xtv4+Li5LQCk0+mW23s8HqTT6a68VwNJSCqTyYhHjx4JTdPE9va2KJfL5mPlcllsb28LTdOEpmkilUrZLlfXdbG8vCwAiEAgIFKplNB1va7sVColAoGAACAACL/fL37+/FlXTiqVMh8HIF69elVXTqNCoSD8fn9dmblczsE7QlakDHgikTBDUCgUmm6Xy+WEpmkCgEgkEm3Lrd3+3bt3LQOp67qIRqMCgNA07UYYdV0X4XC46eOtXhcAEY1G225P7UkX8GoI7Ibm8PDQDE2rkNeG20m4otFoTwJu5wtJ7UnVB0+n01hfXwcAzM/PIxgMtt3n5cuXiEajAID19XXL/my5XMbr169RqVTg9/vx/v1723WKxWLQNM329nS3pAm4YRhIJpPm/cXFRdv71m6bTCZvHHgeHBzg/PwcALC6ugqfz2e77GAwiMePH6NUKtneh+6ONAH/9u0bjo+PAQB+vx8zMzO2952ZmYHf7wcAHB8f49u3b+Zj5XIZOzs7AABN0zA7O+u4brFYDL/88ovj/aj3pAn4f//9Z/49NjaGoaEh2/sODQ1hbGzMsqxsNmu23sPDw7h3757jugWDQfz222+O96PekyLghmHg6OjIvD86Ogqv12t7f6/Xi9HRUfP+0dGR2U35/Pmz+e9OvzjkflIEvFcMw6jrOzv94pD7/W+/K3Abk5OT/a6CI5VKBdPT0/2uxkCSsgX/8eNHv6vgiKZpyOVyENfnHZreEolEv6uqHClb8E7VdkVq++akHilacK/Xi0gkYt4vlUqOJlE19rVruzi1fzstl9xPioADwK+//mr+fXFxAV3Xbe+r6zouLi4A3Bzrnp2dNc9EOi2X3E+agD979gzhcBgAcH5+jmw2a3vfy8tLXF1dAQCmpqYwMTFhPjYxMYGpqalblUvuJ03AvV4vYrGYed/qlHszyWQSlUoFmqbhr7/+qhsK7KTcKsMwsLe352if2yoWiwiFQuZc8VAohGKxeCfPLSNpAg5cT5yqjjQ0nnJvJp/PI5PJAAD+/PNPywlajeW+ffvWdp0Mw8Dm5iZevHhhe5/byufz+PTpE05OTiCEQKFQAADMzc3VLaKgGn2bx9iBeDxuaxqq0/ng1XIBiHg83nI+uBDXixTW19ct56R3ez64rutia2vrRp2qr/Hw8LBt+YNIyoALcb1iprpix2pFTzweF5qmiUePHjlaGVMttxrMxrKFEKJYLIp4PC6Wl5ebfgkaV/SEw+GWizMaV/RomiYymUzb+jLgrUkbcCGuW7VMJiPm5ubMUFbDMTc3ZysgzViVi/9fxra1tdU0rNVVPs1ujcvbahdkNLu1Cm80GuXqnxY8QvC3CWWUz+fx5s0b3L9/H/v7+5xD08RAnsmUmWEYWFhYMOfGn52d4cGDB9jc3GTILUg1ikLXw5pfv36FrutIpVLQNA3b29vY3d3td9VciV0UyeXzeTx//hzDw8M4PT11tNxuELAFl1wwGMT8/Hy/q+Fa7IMrYHJyEqVSiauRLLAFl1x1OV8kEuFBpgUGXBLFYhHj4+MIhULI5/MArsO9sbGBhw8fYm1trc81dCdlAu7xePpdhZ7y+XwIh8M4OzvD9PQ0PB4PFhcXEQ6H8eHDh35Xz7WUGEWphluBl0JdpkwLTmSFASelMeCkNAaclMaAk9IYcFIaA05KY8BJaQw4KY0BJ6Ux4KQ0BpyUxoCT0hhwUhoDTkpjwElpDDgpjQEnpTHgpDQGnJTGgJPSGHBSGgNOSmPASWkMOCmNASelMeCkNAaclMaAk9IYcFIaA05KY8BJaQw4KY0BJ6VJH/Daa/Oofp0eck7a62Q2CzOv10O1pGvBPR7PjXALIW4Emq05AZJdZc0q2J1sR+qTIuC3CSxDToDLA27VzXBaXQZ9sLky4N0Idi/LI3m4KuC9DiJb88HjioDfdQvLoA+Ovg8T2hnys1OGk2FBDikOjr614N1sRTspi6252u68BW92oqYTnbTIbM3Vdmct+F31s9maU62eB7wfQ3SdPCdDrpaeBdwNY89szaknAXdbOG5bH7e9DnKuqwF3cyDYmg+mrgTcDd0Ru9iaD5aOAi5TsGuxNR8ctwq4rMFu1K3W3Mm+dLccB1y1FoytudocBbz2A1Xtw2TQ1WT7VL3K4QasT9nbPW3P0/3u5Xguiorhrupk8XLjvgy5O/R9uqwbWYX1tq059RcD3gK7HvLrWsCdLjqQRSetOfUfW3Cb2PWQk7Q/3dYPDLl82IKT0hhwUhoDTkpjwElpDDgpjQEnpTHgpDQGnJTGgJPSGHBSGgNOSmPASWkMOCmNASelMeCkNAaclMaAk9IYcFIaA05KY8BJaQw4KY0BJ6Ux4KQ0BpyUxoCT0hhwUhoDTkpjwElpDDgpjQEnpTHgpDQGnJTWtYDzx+HJjbragg9KyHmdHnnwEiYOMNTyYcBtsAr2oPxvJTvHAfd4PAPz4TLY8rPdBx+0a0U2vj6ry3yT+zk6yByEK/82fnkZbLl5xC0/PasWTmbd6I40+8LL/t7I7NYBB9QIeS+D3Wm51LmOAm4WImHQexXsdt04Gd4blXQl4IA8Iw53Fex2+7jxvVFR1wJuFujSD7Jfwe52HciZrgfcLNhFQe+0Lt0OJoN+d3oWcKD/Ie/G8/fyNfT7/RkEPQ24+SR3/EH2ojvSyzoz6L1zJwEH7uZDdEM/+7bYbemNOwu4+YQ9CLrMwW5XD4a8M3cecKC7YXLbAWS3MOjd0ZeAm0/exXCqEuxaMtTR7fq6JrNxIpPTWYrV/Z2ORcsyU9CqXr2c4HZ5eYmPHz/iyZMn5vvk8XgwMjKCSCSCvb09GIYBwzCwsrKCcrkMAFhaWqrbvvE2Pj5ubgsA6XS65fYejwfpdLo7L0q4BIC6m6zP0Uu9qr+u62J5eVkAEIFAQKRSKaHruvl4uVwWqVRKBAIB87n9fr/4+fNnXTmpVKqufq9evaorp1GhUBB+v7+uzFwu17XXJcR1C+EqvfgQZQ92rcbX0unryeVyQtM0AUC8e/euZSB1XRfRaFQAEJqm3QijrusiHA43fdxKIpEwX0c0Gu3otVhx3ZI1IUTdf8OdrCBSsQ9brX833qN8Po/nz5+jUqkgGo1iY2Oj5fZerxf7+/sAgEwm4/j52pmcnOx6ma78XRTRYd9cpn72bXX6HpXLZbx+/RqVSgV+vx/v37+3vW8sFoOmaY7q2y+uDHhVYyDbfYiDEOxGVu+RHQcHBzg/PwcArK6uwufz2X7OYDCIx48fo1Qq2a9on7iui9LIzn/JKnZFnLB6j1opl8vY2dkBAGiahtnZWcfPGYvFoOu64/3umusDXtX4IXJ52E12X3s2mzVb7+HhYdy7d8/xcwWDQcf79IOruyhWmn2IqndFuunz58/m32NjYxgaGupjbXpLuoADN8PMYNtnGEZd33l0dBRer7ePNeotabooVhhs96pUKpienu53NeRswcn9NE1DLperm05hdUskEj2tBwM+YLxeL0ZHR/tdjTvDgA+g2jOGpVIJhmH0sTa9xYAPoNnZWfNM5MXFhRTj2bfFgA+giYkJTE1NAQDOz8+RzWb7XKPeYcAHkNfrRSwWM+8nk0nH3RTDMLC3t9ftqlkqFosIhULmVIxQKIRisWhrXwZ8QL18+dIcwTg+Psbbt29t72sYBjY3N/HixYteVc+Uz+fx6dMnnJycQAiBQqEAAJibm6tbRNEMAz7A1tbWEI/HAQB///031tbW2rbkxWIRm5ubWFlZcTRBy44fP37U3TcMA+l0GhsbG+bJqImJCezu7uLq6spe16rrM8xJOqlUylz0oGma2N7eFuVyuW6bYrEo4vG4WF5ebrooonFFTzgcFoVCoenzNq7o0TRNZDKZtvWtLtI4PDxsuy0DTqZMJiPm5ubMsFdvgUBAbG1tNQ1rdZVPs1vj8rbDw8OW2wNoGd5oNGp79U9fV9UTOZHP5/HmzRvcv38f+/v7tubQSD0XhQaDYRhYWFjA8fExAODs7AwPHjzA5uZm25DzIJNcz+v14uvXr9B1HalUCpqmYXt7G7u7u233ZReFpFNdLD08PIzT09OWozlswUk6wWAQ8/PztrZlH5ykNDk5iVKp1HY1Eltwko5hGDg6OkIkEuFBJsmrWCxifHwcoVAI+XwewHW4NzY28PDhQ6ytrbUtgwEn1/L5fAiHwzg7O8P09DQ8Hg8WFxcRDofx4cMHW2VwFIWUxhaclMaAk9IYcFIaA05KY8BJaQw4KY0BJ6VJGfClpSX8/vvvSv9gDXWHdAEvl8s4PT3F9+/fbf90AA0u6QJevfRGpVLByclJv6tDLifVqfpyuYynT5+aVyfw+/1tJ7zTYJOqBc9ms7i6ukIgEACg/s+OUeekCbhhGEgmk5ifn6+bSVZ7OQ6iRtIEvFgs4vv371hcXMTMzAz8fj+A6wuSVucKEzWSJuDJZBJTU1N49uwZfD4fVldXAYAHm9SSFAGvDg3GYjFziVLtb1wfHR1xTJwsSRHwg4MDAMDMzIz5b7W/cc0xcWrG9QGvXpW38XLTXq8XkUgEwHU3JZlM9quK5GKuD3h1aNDqctN//PGHebB5enpq6/eiabC4OuC1Q4NWl472+Xx4+vQpAI6JkzVXn8ms/kRXpVKxtX04HMa///6r9JV7yRlXt+DVoUFd15teSFTXdYTDYQA82KSbXBtwq6FBK40HmxwTp1quDbjV0GAztWPiOzs7PNgkkysD3mxosJnaXxvlwSbVcmXADw4Omg4NNrO4uGj+fZvrPpKaXBfwf/75B+vr66hUKshms7aCahhG3azC4+NjLCws8ICT3HMZQV3XRTgctrziViKRaLpfuyt2tdqX1OfqcXCiTrmui0LUTQw4KY0BJ6Ux4KQ0BpyUxoCT0hhwUhoDTkpjwElpDDgpjQEnpTHgpDQGnJTGgJPSGHBS2v8BWLjMclZ4t14AAAAASUVORK5CYII=)
chemistry-General
chemistry-
The name of monomers present in the following polymer
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)
The name of monomers present in the following polymer
![](data:image/png;base64,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)
chemistry-General
physics-
Two particles 1 and 2 are projected with same speed
as shown in figure. Particle 2 is on the ground and particle 1 is at a height
from the ground and at a horizontal distance
from particle 2. If a graph is plotted between
and
for the condition of collision of the two then (
on
-axis and
on
-axis)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAASAAAACMCAMAAADr9ISTAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAL3UExURf////7+/vf39+fn59bW1rW1ta+vr+3t7fv7++vr69DQ0LGxsdTU1NfX16qqqrm5ufLy8vn5+dXV1Z6enlZWVhERES0tLeDg4JCQkD4+PhAQEHx8fPr6+icnJzAwMO7u7jMzMwAAABMTE9HR0bq6ullZWd/f397e3k1NTRUVFc3NzfX19dra2nNzcw0NDR4eHtLS0r+/v8XFxerq6paWllpaWkdHR8nJyaurq1xcXNnZ2RoaGh8fH+jo6OXl5c/Pz3R0dE5OToGBgby8vOLi4isrKyMjI62trcvLy+/v76amps7OzoiIiFFRUYCAgA8PDwsLCxsbG319fa6urvDw8Pb29kBAQIyMjP39/b29vaSkpBkZGfz8/LS0tEFBQRgYGAcHBwICAggICBYWFrCwsD09PQYGBi4uLjg4OEpKSnJycqKiovHx8fT09G1tbSgoKIaGhsHBwUZGRkhISKenp8zMzGpqahQUFBISEjQ0NFNTU2dnZ3d3d76+vvPz83t7e5KSksDAwOTk5H5+fgMDAyoqKkJCQkREREVFRTY2Ng4ODjs7O46OjjIyMmlpadvb2+Hh4V9fXyAgICUlJR0dHSkpKXFxcbKysiYmJubm5ri4uIODgwkJCRcXF0NDQ8TExMrKytzc3AQEBFdXV2ZmZl1dXYKCgpycnHZ2dpeXl6ioqPj4+H9/f4mJiQEBAaWlpd3d3SIiInBwcLe3t+np6SwsLDExMZubmzc3N2JiYoeHh8bGxpiYmJqammFhYcfHx2RkZLa2tmNjY4uLi25ubtjY2IqKiiEhIYSEhOzs7Gtra6mpqcLCwsPDwz8/P5GRkU9PT8jIyFRUVNPT052dnVhYWLOzszo6Oru7u0tLS6ysrJmZmQUFBZSUlI+Pj4WFhaGhoZ+fn3h4eExMTF5eXmBgYJOTk6Ojo1JSUmVlZW9vb3l5eXV1dSQkJDw8PBwcHAoKCuPj41tbWwwMDC8vL5WVlXp6emhoaFBQUFVVVY2NjaCgoAAAANatak0AAAD9dFJOU////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////wD2TzQDAAAACXBIWXMAABcRAAAXEQHKJvM/AAAGIklEQVR4Xu2dS3LkKBCG6wTsWCe6D9dhx56LcIDkNkRwEnaT6C3PuDUuAyGq85Oj69F2qZT68yGRQi+GYRiGYRiGYRiGYRiGYRiGYRiGYQCjgPV5S8AIpAcUcXk9CiY5Gco3bwxqN1l6FKHH2uoBMalJmvVVQ6KbpkymQddjbfUANHaqt08xmm/cFXWWrphGFDMNhQjXfQrGfLeVtxjrrIjmP02AKgh6MLFHxKuJuMYg2kaV7ZtuAFZOUpKREOCrHUBJPaJ9vihIOCmnSbqys9+ghJppCkE5L77q0AYyUBwsiRHprKBlAwlHnvIG0ZN5Z6TK3qZ4fDRYlcCc3hiFi4LsunmkAuec+vHi1GagGan8UWRp5Ue0z0VBmNctI8J7rH+9IGWwu4GoBBovABFnBZnDQCqiwZ//6JOFSrQ+ZbQY1HgBiCAF7QY6KSivb/0MyKuLKa/F2Tr0X9GmEQVUFHRsh142j/a+fmdjsPx9cJms8+9aCnFI+5CCTkF6z2Lv1bvGB5X1kJHmOwDtJNO+byEuMcS9Fy0gRioR1xefAVpHOz3teqFqhQoYfSod/3JQJCHS4RQgyDqDBosuQPJD5uJukIHePAz7S0A20J+BlNnF/gS72A2soBtYQTewgm5gBd3ACrqB66AbQLCC/gi72A0cpG/gGHQDu9gFAGPwcvaZXeyK0d5eFMMGugCov4zmsYt9IS5tTTusoC/E4NdnC5TFWEEnIAVL/x5jWeRirKAT6JUonZy7asjFWEEnossGU1JuG0rnGHRFSB2FMEpuVulVSc9eDc/vZ0jSCjJIDlsjWB8FmaTLaDet7OFj3OhljvhCpbZyuksdhFZOpfxCH9L61kMxeSplkJB7u1QXBdFemErLK4XALteJvE+SU4IXaFW+7UyXOgjQLFdumKe3keip+Bbk43CjVx1kZSbtmIcLCPKcvYw8+sl61UFJKnjh07uCjZuDs5AWtnzbqw6KigwUn96sl1Q5EKOcko8evE5H84YM9PzrNoQtaoHk9NnFuigIXRCPb7uH9bonPPUzd6uk86SH7PTrpaBz5hyKXjEIxMNr6O/opSA6Wl2fDAafUbyhVyU9LL0q6WHpFoNGpVcWGxZW0A29KulhYQXdwDHoBlbQDZ9QSTc9iBm/kkYh5rmuGtGzkm4xroopO+Vyu8GATjGo9P4JfZzIrAWk5apt1WwOgw51ELwAhXZBTr66gcQ2M4ZqNeDWXkFGWPKCsiFlwqW64DF7zVszR/wPmsYgNEnbvM2gI4+JYWphtokjpgbqXIDkLKWB+Wr66j82n+aGIQOVFVXFHrMXteobAaHkOhNQbSRFnQv0RpAVoY9bP5monwBWwMRWaH+Zn0pmXR2/fva0d4QNBcYSg7bdLC2WU/fVlvKzzxBFnz0qLbMYfXpRqVRP71y7odRBWQXZItOg8Nl+wAxGgBjnPsXqQGF9PjgfsyEMw1QD09gJsjkmjzkbZDfi+AZqmxtNbnUipRvYpLzaiG54BbWdXOMDYpBQLY/k4/gulpq2h5puLjZfTddiXaKpgbplMWOVStjisLutgXplMeNDtsm3OG/zGQrS0sEL83VWgzr0VRBAmwmiUzEQ+dmvS5YSyq5fsKeCwOismpzeFcuNbH5vfOOVT5f54RtnsV1BGClEODVN9cf3CLBTnXKlDKYql/1xj5PmCiqyjSJZN4/RnK5GrArmd+eF/wIu3zM4m0Qs/SKNY5DTxohinHUIK1isyMmlyEJ+e0WB5F0oCqzjSPSV5xt5tHWxqJQK5yFQ6XI13GnyfFpVmMMQAeI3KzmPRsoQnDruE9IAQ0HnipRFTZWWpe5ZL+ZV86XhBU3bePqtny3ldlYXQlsFOQrNpzFuqud0vWVpjou+ZEYM2/gwRHv+pR8u281gCEnf3uamBipH82ASpa/Vz053L6pGzFnEaNUeg35DuelbQSqyTkn4HbJYGbGaI3VRbwOPjilqFVSdBowYipett8Urb3SrpNGUhowWA8S0IShEnQNV9DLkkuD3jtDWCro0iJZR9GdPH4EpkXTWFzNtDYSiZY7sQlsDNTmF1Ze2heIH0FhB49N22IdhGIZhnsPr9Q+C1SinCjAoggAAAABJRU5ErkJggg==)
Two particles 1 and 2 are projected with same speed
as shown in figure. Particle 2 is on the ground and particle 1 is at a height
from the ground and at a horizontal distance
from particle 2. If a graph is plotted between
and
for the condition of collision of the two then (
on
-axis and
on
-axis)
![](data:image/png;base64,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)
physics-General