Maths-
General
Easy
Question
- 1
- 3
- 0
![1 third](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAAjCAYAAACZ6FpfAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAKNJREFUeNpjYMAP1IC4FogvMFAIFgNxGhD/Z6ASGDVo1KBBYdB/LHgUDCbwn0w8CgYLcATibUD8DYh/APEtIJ4AxMKkGrQfiIOAmA1JzACId1DLpZ+oYYgSEN+gxABxIE6EhpMXNbJMAaVeEgTiACA+CcT21AgjHqhhVAE/qGGIHjTASQIHgTgUiFmAmAma0u8DcTypBtkC8RaoV35AU7oPPg0ArQs4erRAu/EAAABidEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1mcmFjPjxtbj4xPC9tbj48bW4+MzwvbW4+PC9tZnJhYz48L21hdGg+q+QgMwAAAABJRU5ErkJggg==)
Hint:
We can apply L'Hopital's rule, also commonly spelled L'Hospital's rule, whenever direct substitution of a limit yields an indeterminate form. This means that the limit of a quotient of functions (i.e., an algebraic fraction) is equal to the limit of their derivatives.
In this question, we have to find value of
.
The correct answer is: 0
![L t subscript x not stretchy rightwards arrow 3 end subscript fraction numerator x cubed minus 6 x squared plus 9 x over denominator x squared minus 9 end fraction](data:image/png;base64,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)
If we put x=3 in the given Function, we get
= ![L t subscript x not stretchy rightwards arrow 3 end subscript fraction numerator 3 cubed minus 6 cross times 3 squared plus 9 cross times 3 over denominator 3 squared minus 9 end fraction space equals 0 over 0](data:image/png;base64,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)
Therefore, Factorizing Numerator and Denominator.
![x cubed minus 6 x squared plus 9 x space equals x left parenthesis x minus 3 right parenthesis left parenthesis x minus 3 right parenthesis](data:image/png;base64,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)
![x squared minus 9 equals left parenthesis x minus 3 right parenthesis left parenthesis x plus 3 right parenthesis](data:image/png;base64,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)
= ![L t subscript x not stretchy rightwards arrow 3 end subscript fraction numerator left parenthesis x squared minus 3 x right parenthesis over denominator left parenthesis x plus 3 right parenthesis end fraction](data:image/png;base64,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)
On substituting, We get
=
= 0
We can only apply the L’Hospital’s rule if the direct substitution returns an indeterminate form, that means .
Related Questions to study
physics-
The graph shown in the adjacent diagram, represents the variation of temperature T of two bodies x and y having same surface area, with time (t) due to emission of radiation. Find the correct relation between emissive power(E) and absorptive power(a) of the two bodies
![](data:image/png;base64,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)
The graph shown in the adjacent diagram, represents the variation of temperature T of two bodies x and y having same surface area, with time (t) due to emission of radiation. Find the correct relation between emissive power(E) and absorptive power(a) of the two bodies
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAASsAAADOCAYAAABmWiQxAAAgAElEQVR4nO3deZxdVZ3v/c/aw9n7zFWn5jmpVKZKZSYjhFFmEEUEx4uKiu316r3d6mNr327ap31sbW1nBbHBoQEVZBaQQQIZgBAyJxCSVFXGGlLzdMa99/NHRZwSU0lODSf1e/PKq0ISzl5FTn1rrd/+rbWV53keQggxwWnjPQAhhBgJCSshRE6QsBJC5AQJKyFETpCwEkLkBAkrIUROkLASQuQECSshRE4wsvEiie5mXlz9ErubDzGU0SibWs/iFecysyyCchIc2r2F1Wtfod8LUFEzk0svXE4o4MvGpYUQk0RWZlaaXUBVWZhDW1/kFz/9BXsGwkQtDaVAaRrR4lJatq2jqTND+ZQp6LpM6IQQpyYrqeHzh5nWsIx333glMT3O3jf3MpRKA+C5Lm56kGRwKu9999XMnVGF38rKhE4IMYlkbYrjCxUxbcHl3HzVAjY8/nPW7jzAQDJNor+TLU8/QmzV+6kuLSZgqGxdUggxiWR1PRYtKucdH/sU54RbuPenv2bjrr20HWnkd/ujvOuCacTCVjYvJ4SYRFRWT13wXNKJfl5+6Hv80w+eoWrRuZxT4mPGFR/ikvlVWKaetUsJISaX7Fa6lYZhBVn0tndz4fQQe197iabgfJbMqcI0JKiEEKcv67fllGYQLJ7BhUtriYYiFE+pocivo0mpSghxBkaph0BhGgamYaBp0qYghDhzo5Yknucx/I8QQpy5rIeV66TpbjvA3qZDtLQeoXnvAY509OK4brYvJYSYRLLenakUpOKD5M+9gg9XJgmXWAwmM4AUrYQQpy+7rQtCCDFKpPothMgJElZCiJwgYSWEyAkSVkKInCBhJYTICaMWVhnXw5H7jEKILBm1sGruz7C9I4kjvaBCiCwYtbB6snmIn70xwIGBzGhdQggxiWS9g9314Gjc4bHmIVoGHZaWWEyNhLJ9GSHEJJP1mVXa9djQlqCxL0NTf5rf7BtkIO0iffJCiDOR1bDygKTj8eC+ITriDoNpj11dKbZ2pMhIWgkhzkBWwyrjehwayPC7A0P0p4cr6+1xl0caB0k52bySEGKyyWpY9SRdHtg7SF/axT02kepLuTzSNERHwiHjju3sykun6HnhOfpfe4VMb8+YXlsIkV1ZCyvPg/Yhhyf3D5Fyhg+EUQzPtloGHZ5oHqI/PbZh5bgOu/Zt4fBdt5N8Yxc4Mr0TIldlLaxSrseRoQwJx2NxkY9pUYPqsMHCIh+zYyabjiYZSI9t01VGKXZUhDjQ3kzXM0+S6Tg6ptcXQmRP1loXEo6HrSu+c34Bc2MWd+7so7EvzafmRbF1xdaOJKYa2wP4XE3RV5TH4w0xIrs2Ef7dE0Tf90GUYSCHAQqRW7IWVmFTY0WpjQfoSqEdCyZLV0yNmlSFDcwxfsSNAsI+P60N00gZDgNP/RarYR72vPkowxzTsQghzkzWloGaAkNTmJoafuzWsVxSCnQ1HFpj/TgupRQh049j+dAuvgizto7uO3+E092N50hnvRC55Kw+dUGhCBg2joJMcSGRd74bd3CIvl/fh9PZhXSqCpE7zvqwCpl+HNchYSh8ddOJvPNdDDz/LImtm3H7+8d7iEKIETq7w0pBxBcg4zr0p+Lo0Sihy6/Ev3gJvb+6l8TWzXgZWQ4KkQvO6rDSlEbMjpDxHPrSg8O/ZvvJ/+gn0IIB+h55kFTjvnEepRBiJM7qsFIo8q0wadehLzk0/Iuahh4rIP/jnwTHoeeuH5NpbwN5CKsQE9rZHVZKEfEF0FD0p4dwvOFAUrqOr7aO0NXXkunspPeX9+D09eJJh7sQE9aI+qw8z8XNpEmk0ie8gaY0HcMwsXxZPyLrtCnAp5tErABDmSTJTIqAaQOg+f34z1mGl0rTfeePMCurCF50CXpe/nCxSwgxoYwoWdx0is4Db7CluePYLzik0xkyniJg+1B4eLpNyZR65k0tGM3xnpYSfz7JTIrBTOKtsALQ8/IILFtBpuUw3T/9CXpePv7lK9ECgXEcrRDieEa0DEwMdLPj+Qd5Zuth0spHqqeJh3/8Lb7y0+dQuonpxdm45lkeXfvGaI/3tFSECok7KQbS8b/6PT0/n8gNNxFYcR7dd/2Y+EvrZMOzEBPQiGZWmmnjq1jCLdesoCRk07lngOcMhWPmUz+ngYhfp7yshK2H/aM93tMyJVLG3t4j9KUG//o3NQ0tFCbv5o/Q9cPv0vfQA2jRKP7FS2Q5KMQEMqKwMu0g9UtXEonlo2saQ7YPw9BRuoHf7ycUDlA1rYGC8onZs1QdLiHlpOlM9B3395WuY5aVk/fBD9N778/p+cVPUYaB1TBX9hAKMUGMaBlomD5ihQUYmnbCswpsf5BYLJrFoWVPzApj6Sb7+9pO/IeUwpo+g8j17wbXpfun/0X64EG8ZHLsBiqEOKGzunXhDyK+IAHDprmv5W//QU3DmjOX/I//HU7HUbrv/BGZliPS5S7EBDApwipqDYdV48nCCoaXf9NnUvj/fInkm7vp/vldpJubxmCUQoi/ZVKEVcj0E7WCtAx2EM8k8fjbpy0oy8KaPoPCz36BdHMTvff9glRT4xiNVghxPJMirEzNoNifhwe0DHbinuxoGKVQlo1/4WLyPvAhMh1H6b3nZ6Qa98k5WEKMk9MKK9f1cB0H13Xx4CTzlImhLFiIpfvY39/61rabv0kplGURWHkekbdfT6pxH733/TeZw4fxUlJ0F2KsnXJYea5DJplgMO3ipuIkM87JZyoTQHmwANvw0dzXhnsKm5aVbeM/dxX5t9xK/LUNdP/XHWRaWqToLsQYO+Ww6mvZy649bRTVL+aSOpMXN+ygvT/ORD+zIGaHKQ3EeLPn4MhmVn9CsyzsRedQ9H+/TPKNXXTd8X1Se3aP0kiFEMdzyruOg0U1rLqiiCUXpXDRsANBAn5rwj8rJuwLMDVSytojO045rFAKzbaxZtVT+Pkv0f3jH9Lz0/8ievNHsGfPkU53IcbAKc+sDJ9NJC9GcUkppSXF5IWD+Ax94oeVGaAuWsmenoMkMslTX7oeCyx73gLyP/wxAHruupOhDS8PN47mwFJYiFw2Ke4GAtiGj4pQIY7n0tzfSspNn/qLKIUyTezFS4i+5wN4mQzdP7mdxPatuAMDElhCjKJJE1YKRcQXpDZSzuaje4hnTv+OnjJN7PkLKPj036NH8+n4j68S37wRd2hQAkuIUTJpwgogbPqZnlfJ9o5GBtOJM3sxTcOsrqHwC1/Cnjufzu9+i/7fPoY7NJSdwQoh/sykCquAaTO/cBpv9hyiP3XmoaIMAz0/Rv4ttxK6/EoGnnyc7rt+jNPRIWe6C5FlkyusDJsFhXUc6G+jNzVw6ncFj0PpOkZZGZFr30HositJbt9K9113kNrfhJc8w9mbEOItkyqsfJrBlGgZPt1kb+8Rhs6gbvWXjNIyQldeTeQ97yexbQs9P/0vUvv24Q4e58A/IcQpO73tNt7wj1yjlMLSTVaUzeG19t10xnuz+vp6Xj7Blaso+NwXSe15k64ffofElk14iYQU3oU4Q6cVVt1Jh8MDubndxNB0zittoLH3CIcGjmb99ZVlYdfPoeTfv4EWjgwflfzwb4aXhBJYQpy2Uw6rjOvxuwNxvrutl5RzssNWJh5D6cwvms5AOsHunoPZH79SKNOHUV5J7JOfJnjx2xh46nE6vvNNMm2teOnT6O8SQpx6WLUOOTxzMM7zhxLs7Erh5Nh6UFcatdEygubwyaEDWbgreDzKMDArqwhfcx3ht19PunEfXT/6Hsmd23EH+kflmkKczU45rLZ3pnilNcGhwQy/OxAnlWN36JVShEw/C4umc2Sgg9ahrtG8GEZJKaHLriDvwx8jffAAXXfeTnzjBpzOTlkWCnEKRhxWHpB2PX61Z4BDAw49SZdf7xlkIO3mZLH9wooF9KfjbO8c/RNAtVCYwJJlFP3LVzBiMbru+AF9v/kVTk/P8FEzElpCnNSIw8pxPXZ2ptl8NMVAxiXleDT2pVl9OM5AOsemV8CMvCoK7AhP738VbyzCQtfxVVZS8A9fIHLd9Qyu/j3t//olUk2NUscSYgRGHFYpF546MERb3MHzhmdaCcfjgb2DdCVyL6wK/VGmRSvY13eEgwPtWWkQPSldR49ECF1+NQX/57MoXefov/0Lgy88P7wsFEKc0IjCyvE8epIODzUO0pv84xd1xvVY35KguT9NysmtpYylm8wpmIKpGWxq30PGHaNHxmsaen4+VsM88m+5Fbu+gb7776P31/eRfHP38CxLloVC/JURhVUi47HpaJKepEt12KDIrxMyNWbkmWhK8VJLgr5cq7QDM/OqqAmX8Nyh107vyJgzoPkDWLPqyf/YJwheeMnwkck//iGJza/h9PbKsclC/IURhdVQxuNAf4bPzIvwgwsKeUdtgGlRg59cXMS/Ls3HA9riYzQzyaLiQD4XVMzn2QOv0ZcaGpul4J/SNPRYAZGb3kfsk59G6Trt/+8/0//EYzhdnVLLEuJPjOhY4wJb55b6CK4HuoIXjyQImWmWlFgsKrJAgTHRjwo9jqBhMztWQ74d5vmDm7l26kqiVnDMx6F0HXvufMzKKgaee4bee39BYssmoje+F3vBIpRxyqdPC3HWGdHMSlNg6Qq/ofDpCl0NHztuagrbUNi6wtByL62UUhT581lZ1sBTBzbQlewbv7GYJnqsgPCV11D8z18GoOuH36X77jvJtBwBJ/dmrkJk06Q6deF48qwgV09Zzo7ORo4MdJB2x69WpAwDPRrFXrCI2Mf/jsDKVSQ2baTrR99jcO0LON1deHJOlpikJn1Y+XWL+YXTyLNCvNy6i57kwPgO6Ng57766GUTefRN5H/oomY4Oen5+NwPP/I70gWY5jVRMSpM+rJRS+A2Ld9Sex7qW7eztOTRhNmfr0TwCS5ZR8m//TmDlefTe83O6vvstEtu24A4N4TmOtDmISWPShxWATze5asoKuhL9rG/ZSWYcl4J/RdPQ8/LJe//NFH/l66hgkKP/37/S+a3/IL2/We4YiklDwgrQlKImXMI5JbPY1bWf5r7W8R7Sn9M0lG1j1U0n9olPUfC//p5MWyvt//JFeu//JelDB4dnWUKcxeSeOMOP6bJ0k+tqz+W7W3/D6sNbqMurQE2wR7cq28Ysr0CP5mGUljK4+vcMrX2B1N43Caw4D3vhYoyCAtDke5A4+0hY/YnZ+TVMi5bzeNNLXD/tfPKtMNpEezS8UmihEHbDPHy1dSS2bqbvoQfovednpJr2ETz/IoyyMrRQOIv9WR7xvm7a24/SPZCioLya4lgIU2Xo6+6mraOf0qpqQn4feg62sIjcIN+C/0ShP8qS4lkMpIdYc2TruLYxnJRSaMEggZXnUfj5LxJ+5w0MPvc07V/+J/ofe3j4VNJkErLSle/SeXg3v/ne/+WD/+NWfvnSPnoGU2QSPeze/Cy3ffXHNLb1knakrUKMHgmrv7C0ZDYLi6bzk52/JZHFp9+MJqOgkPCVV1P2/R8Tuvxq+n/7GG3/+Fn6HnsYp7c3C4GlU1Y3j8tuvJFqs4dkSgeloXseIR/MueBKppfmYRl6Vj4fIY5HwuovFAfyuG7qeRwZ7GTNkW1ZeRjqqNM0lGWjFxQSue6dFP/zlwmcu4qBJx6n7fN/z8DTT+J0HD2jLnjd9FNW3cDl587mxd89wdGuXjo72tm1uYnlKxfgswwm2opZnF2kZvUXLN3HjPxK3jP9Yu7a9SRV4WJm59fg083xHtpJKV1Hz4+hR6LoRcVY9XNIvfEGmY4O+p98HFwXLS8fe/5CzPIKlGky8oTRCBeUccVN72Pd1+7m6RfrmR4YpC26mAum5GFIUV+MMnmHHUehP48P1V9JT7KfRxrX0pHI7vMFR52uYxQVE1x1Ifm3fJzwte/AVzed5O436Hvg1/TcfSdDG14mffgQ7tDgiBtLfYEINQsv5YZlMZ67/z4e39zCnKXzKbY1pK4uRpuE1XHoSiPiC3DLnKtZc2Q7L7fuGvvjY7JF09AjUQIrzqPoH/+Z2N99Cjce5+iX/4mu73+bxKbXcPv78FKpEYSWwvRZXHDV9bjdh8ioAHXVpWPyaQghy8ATsDSTa6eu5JHGdTxzYCNLS2ZTGSoa72GdES0Uwr9kGfbceSTf3E3fQw/Q8Y1/x6yqIvz26/EvX4keDP7NPi1NNymcs4SLli+hbNkCSkNSVBdjQ2ZWJ6CUImwGuLXhWo4MdvLb5pfG5sESo+nYJmktFMaeM5eCT36aws9/EaOsgp57f07bZz9N36MPkT544ITbeDzXIdG6n3TJYmbNnpqT55iJ3CQzq79BKcX8wjoWFU3n8aaXuKB8PnV5lRhajs8mlELZNkZ5BXqsALNmCsmd24lveo2BZ35H/LVXsWbPwb9wMWZ1DZrfz2B/J0eaG2mLa/Tt3UzN4vOpLs6fYD3+4mwmYXUShf4oF1ct4uXWXTy4bw2fXvAugpo94bbinC5l25gVlZhl5fiXrSC5+w36H32IvgfvZ2jdGsJXXIU9fyHxvkYe/eVDbO1wqapbxMcvraAgbI338MUkImE1ArPyq7miZil37XqSG6ZfwNRIGaZ2lv2v07ThI2mWLsc3pZb4xg30P/YQnd//NvbCRfhWLuf6697FSidE/fw5hAOW3AEUY0pqViNQYEe4rHoJUyKl/GDbw7QNdY/3kEaVUVhI6G2XUfq1/6T4y19F8wcZuPtnqK9/nWnbXsI63Azp1HgPU0wyZ9n0YHRoSqMyXMQn5r6dL6y7g0urzyFqBQmbgfEe2ujQNJTPhzJN/PMW4KuZQqa9jcS2LcRfeZmOtS/gq51G8JLLsGbNxigpPYXmUiFOz2mFVcSnUWTneJH5FAUNmxWlc7h26kr++42nCZt+zi1rwDjbloN/SimU34/h96MXFmFW12DPX0hi+zacri4GV/+e+IaX0fLy8E2rw6qbgV5YiBYISniJrDutr7RV5TbTomfxF+lxaEoj7AvwsTnX8L/XfJ8H9r5ATaSUKeHJ0RSpDAM9Lx89Lx977nzc/n7SBw8wuOYF4uvXEX/5JczKSvzLz8VXOw09NrztR/l8cr6WyArljVLz0Dc297K3J8VnF+VRF534++pOxVP7N/CDbQ+xrHQ2X1j8/txvZTgTrovT10di80YGVz9PfNOraJaNfc4SQhdfim/GTLRAcPhsLQktcQYm1/QoS1aU1bOuZTtPH9jItVNXMic2dfIGlqahR6MEzj0f/zlLSb6+i8Hnn32rZytw7iqCF1yEPXcBRnHxeI9W5DCZWZ0Gx3PZ1dnE1zbdhwd8Z9X/It8Oo6tJPnPwPLxEAmegH6eri3RzE0MvrSV98AC4Lr6ZswiedwHmtDqMWAxl2eM9YpFD9Ntuu+220Xjh9a1JuhIOK8tsYmdZMV5TiqDpp8ifx6NN68m4DtPyKgiak/yL7w/beYJBjIICjIpKrFmzMSuqUH4/ztGjJDa/RnLHNlLNTbj9fSgUyvSBrqNkmSj+BlkGnqaQ6Wd+YR031F3Ar978PbPyq1lR1kDEd5a2M5wqpdD8frSqasyqagIrzyPTcZTUvr0MrX2B+EvriL/yEkZZOf5Fi/HVzUDPj6GFw3+scckdRfEnJKzOQIE/ws2zLmdHZyO373iUgDnc3jBp61d/g7JtzMoqzMoqgudfSKa9jeSuHQyuX0v3nbejTB++GTPxL16K/5wlGMUlYBooTR+edem6hNckJzWrM+R4Lgf72/ni+jsJmjafWXADDQVTx3tYE5/r4mUyeJk0XjxOYsc2Etu2kjl8iNSB/SjTwL9gEeaUWswpU7Gmz0QLSv/WZCZhlQUZ12FXVzPf3PxrXM/lKys+SkWoSAruI+V5uPEhvEQCNx7HHejH6eoksWM7ydd34nZ3g+tizZmLf9kKzOoajMIitHB4vEcuxpCEVZbEM0meP7SZO3Y8yqz8av5+4U0U2BFZEp4Oz8PLpHF6esi0t5FubCTVtA+nvR2nrwctGEIvKMQoKcWsmYJZUYmenz/8rESfb7xHL0aJ1KyyxG9YrCibw0A6zj+uv5O5hdN4+9RzpeB+OtTwHUKjqBijqBi7vgEvlSJztJ1UcxND69cw9NI6nK5OtFAYs6qKwIrz8C9fiVlSgvIHpEB/FpKwyqKIL8jM/Cpqo2U8f3ATy0vqCZoWupLZ1RlRCmVZmJVV6PkxjIJCrJn1JLZtIbH5NVJ73sTt7ye1bw9WwzzsufMxSkqGN2PrOmjHCvTSGpHTZBmYZfFMkh2dTXzi+W9yZc1yPjrnaqZEJsf+wTHheXiOA44z/DGTId3aQnLndhLbt5Fu3Et6fzN6rABffQPWnAZ8U2vxTalFL4ihjMnzXjzbyMwqy2zdR31sCrct+zDf3nI/lmHy0fqrKQsWjPfQzg5KDS/xDOOts1p9fj9mWRmBlefh9vfj9PWSbm4iuedNhta+yOCzv8NLJNCiUazpM7HqGzCrqtELCtHzoiifnHiaCySsskwpRcCwuKhyIe3xbh5rXI+lmXy4/koK7Aia3CHMOmWaw53z4QiUlILnYc2YiX/5SpyebjKHD5M5fIhMx1EynR2knnwMpRto4Qh6LIZRUoJRWo5RVIwWiaCFQmj+gBTrJxgJq1GglCJk+nln7SqSmTQP7HuBPCvEDXUXELWCUsMabUqhhcLDxffyCqhvAMAdGMDp6cbpOEpy757hpeOmV8H1UJaFsv0Y5eWYVdWYldXDHfUBP8ofQLPt4T/js07xSdYiWySsRlHMjnDj9AvRNY1vb7mfgGFx1ZQV5FkhNHmzjzktFEILhTArq7AXLIIbbsKNx8m0HiF98CCZAwdINu5h4KknyBw5DLqOWVqGUVaOUVWNr3bacJNqWdlw7UvThk9VPfbxrZ/L3+2okLAaZTE7wjtqVxHPpPjqxntAKa6espx8SxoaJwLNtjGrp2BWVsHS5XiuC66Dm0iQaWkh3bSXVGMj6eYm4i+tI9PehpdMYpRXDM/AqmuG+7yKSzCO/dDC4eG7jyKrJKxGmaY0YnaE9864GNdzuWvXE/SnBrlx+kUU2NHxHp5QajhYdB1M3iraa4EgeiSKb8pU/CsTeIkEXnwIdyiO09tDpq0Vp7WFdGsrqd2v46VSeKk0XiaNCgQwy8oxq2owq6rQi4rRgsHhDdqBIFoggGZZ0kpxiiSsxoCp6RT683jvjEvIuA5P7X8Vx3V5z4yLiUnRfWL6w0MzfL4/39ZzrHXCi8eHtwgNDeH09+F0deJ0deF0duL09eINDZJq2kdy1w4810VZPjTrj3UvLRgcLvBHo2iR4R96OIyy7bce1qHM4Y+YpszUkLAaM7rSKAsWcPPsy9GVxoONa/DpBtfVriJmh8++5xCerY61Tqhw+K0Q+7POLc/DTSZxBwfw+vtw+vtxenpw2lrJtLeSaWsjffAA7sDAW+d/KcMEw0CzLLRYDD2aN3xUTjiCfuyjZvuHT6EwjGOtG+ZbP1eWNbz0NM/uu5fyFTLGSgIx/sfsywn7/Hx7ywMMphO8Z8YlFAfy5C7h2UApNNtGs20oKORELahuIoHb04PT3TX8o6sLp6uDTHs7mZYWnNd34fR0D/+Z/j7wvOHZWDCIFgz98WMohFFWTuSGmzCKzu5joyWsxkGBHeGGugsJmn6+uvEeupMD3Dz7CqZFy8d7aGKMaJaFVlyMXlgIngeeC66Hd+zj8K95by073fgQbm8PTm8vTm/PWz93+/rwUmlw3fH+lEadhNU40JRG1Apy1ZTlhEw/P9j2EF3Jfj459zrqY1PGe3hiLCg1vAz8iyL7cZsePA89GsUrKvrjVqPM8EdcBw+FHomMybDHk4TVONGVTp4vxCVViwH45Zu/51ub7+fD9VeyqHgGlm6ijv/WFZPNW8HmQ03irY1yG2oc/aHT/fKapXys4RqOJnr4j02/ZEPrG/QkB3C9s39qL8RISVhNALbu4/zy+Xxl+UcJmX4+t+6HPHvgNXpTgxJYQhwjYTVBGJrOzPxq/vO8/8mVNcv499fu4YfbHuZovGe8hybEhCA1qwnE0HRi/gifaHg7ddEK7n3zOfb1HuYz82+gvmCK9GKJSU1mVhOMrjRKgwVcUbOMj825hpST4Wub7uXxpvV0xHtlWSgmLQmrCarQH+WKmqV8fvF78WkmP9j+MI81redAfztJJz3ewxNizElYTWB+w6KhoJZvnf8pLq9ewve3Pcg3N/+K5r4Wkk4Kj1E5kVqICUnCaoLTlCLqC/E/513P11beyuGBo3zkua/x0L61xDMpiSsxaUjFdkx4uE6G7o4OEmmH4aqTQtcN8gsL8ZFhYGCA/sE4HgplWBTkR/BbwxtTtWNHJS8rrac0GOPBfWv40fZHeKV1F7fOfTtTIqXY+tm9iVUICasx4zLQeYj1Lz7Pxl3NJPQIq656L1esKsAyNHoO72b1c8/z+mA+l11+CUvz/vqsq7AvwMz8aj5SfxVVoSKeaH6Fr792L9dOXcmKsgZKA7Fx+LyEGBuyDBwTCk3zUVE7mwUL6xnYv51169bTnbHwKdB0DcM0iR89QmFtPXPrqrF9x/8+YmoGlaEi3jfzUv5h0Y2kXYc7djzGfbufY3f3AQbTCbljKM5K+m233XbbaLzw+tYkXQmHlWU2MVuOPkEpNMNHUXkNxWGXnRs383p/kMtXzcV0h9j6yiu0RRZyy42XkBcw0U9yjreh6VSGillVPg/X87hn9zOsObKdilAhBXYEUzPkUD9xVpGwGmtKJ1ZUSDRzmPv/+36oW0Fy31r299tccdUlFId8p7R92W/4mFtQywXl82nub+G7W39DR6KX8mABRf58lDy8QJwlJKzGnEI3bUL5hXTvXsdvn1lNW7yQy667hhkVMUzt1MJFKYWpGYStAPML65gTm8LvD23m6YMb6UsNUhYsIGj65Wk6IudJgX0caIZNrKSKd113PkA8j4AAAAwRSURBVI//490cnHEpoLCM01+22bqPylARBXaE8lAhT+3fwFP7N7Cto5HLqpewvLSeQn9UtuyInCVFjXHguRkc16VnyGDuwnq6dz3Dmld30T2YOqPXVUoRMG2Wlszmk3Pfwafnv4uOeC8/3P4wd+96ku0djXQmZMuOyE0SVmPOIx3vo3nnK6xtL+Ur//Z55kWHeO7RB1m/rx0nS12ehf4oF1Uu4ieXfI4PzLyUJ/a/zGfX/Yh73niW1qFu4pmkhJbIKVKzGmtemtdffZEnnt/D9R/5ENOqpzIl1MP6F9fxamOKCy5cTsincYqlq+NSSmHpJrNiNVw1ZTkZz+HRxrX8/I2nsXST8mAhQdMvRXiREySsxowHTpq9W17gqRd2MueKd7G4thifaRAtLmfg8OusWb2anuAUzplVhc/Us3KosVIKQ9MJGDYz86pYVlqPbfh4rGkdTx3YgOu55FthIlZQDlEWE5pUW8eC5+Ik+9m1eQNPPvIgh/WpzPEUhjF8yrqha8RKKijOb2Tb6qd4tiafVcvmUhSyszLDguG+rEJ/lKgVpCpczLzCWp4/tIUH961hQ9vrLC+dw4qyOZQGYvgNKzsXFSKLlOd5o7IX9hube9nbk+Kzi/Koi07iU+4BPJdMKs6h5iY6+4bAF6SgqJSq8gJ0YKivg9bWNo529uEqjUCkiKqqMqIhP/ooTnfahrrZ0PY6v3zzOY4MdjCnoJbra1dRGy2n0B8lZPpH7+JCnCIJK0FvaoCXWnZx164n2N19gHOKZ3LTjItZVlKPZZj4pBteTACyDBSEzSAXVy5kZdkcNrbt5pd7fs/n1t5ORaiQD866jIsqF1Lsz5PAEuNKwkqgKYVPN/HpJstK66nLq6C5r5Wn9m/g7l1P8os3nuby6iVcVr2EadFyTN2QZxqKMSdhJf5M0LQJmjYlgRjTouVs7djHy627WN+6k01H9zA7VsPy0npm5VcTs8L4dFnii7EhYSWOy9JNKkJFVISKWFnWwJs9B3mkcR1P7d/A+iM7WFY6m1Xl86gOlxCzI4Rk/6EYZRJW4qTyrBBLS2azsGg6hwc6ePrAq9y/dzX3713NvMJpXDf1XFZVzCdo2Ph0A0Pp0mgqsk7uBooR8wDXc0k7GeKZJJuP7uHhxrWsbdmOAq6ZsoLLqpcwv6hO2h5E1snMSoyYYvi5hrrhwzpWjJ+ZX83NQ11sat/N84c2s751JyHTz5U1y1hVPo+qcDFB05aCvDhjElbitCil3irGlwULmBYtZ0VZA5uP7mF7ZyPPHXyNNUe2MS1awdyCqTQUTKU0WEDYDEhtS5wWCStxxjSlyLNC5FkhZsdq6E0OsK/3yHAxvmU761t2UB4s4IKKBcwrrKXIn0fUChE0bAxN9o2KkZGwElmlK42YHSFmR1hSMovORC+b2vfw7MHX+M7WBwBYXDSDS6oWc25ZA7Fj58Ubmo6uabJcFCckBXYxqlzPI+M6pN0MQ5kEG9pe5+n9r7KxfTdH470sKp7BZdWLWVZaT22kXDZRixOSsBJjxvU8hjIJepODdCZ6OdjfzrqWHezsamIgHafIn8eq8nksK6mnJlJCnhWSY5jFW+SdIMaMphQh00/I9FMeLGB6XiXzi+rY39/Gzs4m+tNxDM1gV3czu7qbSTkZ+lNDKKWYnlfBtGgFRf48wmYAny5v3clG/sbFuFBK4TcsKkNFVIaKOLesAYCM69CfHuJAfxtbju5le2cjzf2tWLpJaSDGwsLpNBRMpTiQT54VImT6CZrDhXqpd53dZBkoJrSM69A61MXWjr280vo6Lx7eyuHBDkoC+TTEprK0ZBbnls+lOlwi9a6znISVmPBczz1WpHcYSA+x5ehe1rfsZEvHXnZ1NxOzwnxh8ft557RV4z1UMYpkGSgmPE1p+HQNn25iGz7OK5/HwqLp9KYG6UkO0BHvZVaseryHKUaZhJXIKbrS3uqcLw7kA5B2M1KvmgQkrETOk/aGyUHOqRVC5AQJKyFETpCwEkLkBAkrIUROkLASQuQECSshRE6QsBJC5AQJKyFETpCwEkLkBGn9FUKMIg/PSdPT001f3wDxZBql+8gvLCI/EkT3Mgz09dLV3UNGs8jLyycaCWLqfz2PkrASQpyQ60HG9dA1haY49R2YnoebHGDv1vU8+shjbHj9MG6gils/93+4ZEEdAYZo2rWBu+68m/7YfN7znhtYOncaeQHfX72UhJUQ4oS6Eg7rWxLMLfRRETTw6acYV0pD9+excNVVRP2Kzq9/m8f3tVFUVorlM/FpAaKFxZjhKXziU7cypzKG33f8Jx5JzUoIcUIZD148kuD9T7fz+fWdrD4cp23IObUXURqGaVHdcB43f/wDzDCbuOvnT9Da2cvRlv1sX7OaVe+7hfrKGH6fccLnSsrMSghxQj5NMTVicMfONG/2pFlzJMmyEouVZRbnFFtUBA2CpoY2ggmXHcpnxoILed/V6/juU/fw+Ix8Kuigq2AZ182vI+DT/+brjFpYKaAj4bL5aJLWwVNMYiHEhJBwPBKOh+t5dCY8OhNJdnSleKRpkHOKLW6aHmJZiUVlyMA62RJR6UQKynj7zR/mudWf4r47vsc5b7uBW2+eS3Hw5KcJj1pYRXyK17tSfOL5+GhdQggxylwg40Lc+ePp52nHo23I4ZmDcTa2J/nQrDCfmR+lOHDyp2vrvgDhsgW8/z2X8qXbn2Mo5ZAX9Y9oLKMWVh+YGeLddUFcOcFRiJwVT7usa01wy3MdDKRdAExNURnSuaImwE3TQ8wv9BE2R1b+9tw06cGjbDvgMLfC4vW1T3HvgoX8w/XLONnEbNTCym9o+KUiNuElEkkcxyEYDIz3UMQE1Ol5HOzP4OFR5Nepzze5rjbI+eU2pUGdfEvH1tWIalbg0tvZzjP33UvJBR/ksmsu5M7v3s5v7/4xS+fWsbI2H59x4tCTOMlxKcdDU2CM7N3yZ9xUP3u3baVJVXDtkqmjMDqR69IutMcdbqwLcU6xxbISiykRg5itn/Kaqb+zlT2bXuBwsIEbV9YTVdW846rXabzrCe78+cPU/cN7KYn6MU/wXtZvu+222878UxLjwQPWtSToTblkPDCUwtQUJ7jz+yf/oYeTSdLStIMH7n+UFq2YhuoYps9EKXn0gvijtAtFfp131YU4t8ymKmwQMLSRv0c8DyeToqerjW1rnuKBZ/dx4Q03MrMkjN8fwG+bDOxew32PrSVv+mJqCsPYPhNDOtjPLgp4vSvNvW8OUBs1uWl6kGUlNn5jOLRONKP2PJd412F+9r1v8OiGw5R2mDyixbn2+kuIWafwRhRnvXxLY3mpfdr/ved5xLsP8fT9v+BXT7zMULSBG5RzbNno4mXSGMF8LKeRX3z/WxhDN/OOKy6gujD4V681ag85FWNjY3uSz7zYyaajSfyGoiHm4z0zglxcGWB61OQ436AADzeTZseLd/Oft6+m/JpP8oV3LiYY8qOfdFomxKnxXJd0Okkq7eApDb9tvzVzcjNpUqkUiVQapRtYloXPMNCOsxSUmVWWxDMeP3ujn3veHBjT6/YlXQ4OZEg4HknHY+PRJPv60tz9+gAryyyurw0y79jdmj/WtRSabuL3W/h8Pny2n3DIj5KgEqNAaRo+y4/P+uvf0wwT2zCxR3B/R8IqSzyGe0+6E+6YXjee8XC9P4xh+N/jGYfelEvC8fDriqqQQeQvby0r9ccHgyolQSUmPAmrLDGU4oMzQ1xSObIGt2w5NJjhm5t72dieRFMQMjUKbY3aqMlVNQEurfJTFjzxfishcoWEVZb4dEVt1KQ2evJtA9n0UmsCXUHQUIR9Gm+r9POuuiArSm1KTtZRrAA8XCeDk8mgdGOE/TJCjD0Jqxz3SmuSQr/O/14Q5abpQarDJrauTtir8qd03cJJDXJgzz527/RTOKOemG1gSGCJCUjCKod5wMWVNlfUBIjZGnk+DVMfeZ9UYdVC5s1cw3PbnubJaWV8bBYn3fIgxHiR1oUc53jDq7nTWb65qUEOHWimuaWPsqkzmFqWf9xmPCEmAgkrIUROkG+jQoicIGElhMgJElZCiJwgYSWEyAkSVkKInCBhJYTICRJWQoicIGElhMgJElZCiJzw/wOCjYWvf4jtRAAAAABJRU5ErkJggg==)
physics-General
physics-
Two circular disc A and B with equal radii are blackened. They are heated to same temperature and are cooled under identical conditions. What inference do you draw from their cooling curves (R is rate of cooling)
![](data:image/png;base64,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)
Two circular disc A and B with equal radii are blackened. They are heated to same temperature and are cooled under identical conditions. What inference do you draw from their cooling curves (R is rate of cooling)
![](data:image/png;base64,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)
physics-General
physics-
A block of steel heated to 100
C is left in a room to cool. Which of the curves shown in the figure, represents the correct behaviour
![](data:image/png;base64,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)
A block of steel heated to 100
C is left in a room to cool. Which of the curves shown in the figure, represents the correct behaviour
![](data:image/png;base64,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)
physics-General
physics-
Cooling graphs are drawn for three liquids a,b and c The specific heat is maximum for liquid
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAMwAAADFCAYAAAAYLR06AAAgAElEQVR4nO29d5gc1Zm3fVfu3D3Tk/NoRmGUc0IJEUTOwQa8xnmd/fm11zmtXwdss++uF69tHMGYNTkJCYEAARLKOeeRJueZns5d4fujB4GMpJlBmiCp7ou+elRdVJ3qrl+dc57zBMGyLAsbG5s+IQ51A2xszidswdjY9ANbMDY2/cAWjI1NP7AFY2PTD2zB2Nj0A1swNjb9wBaMjU0/sAVjY9MPbMHY2PQDeaAOnIxHicUTpHSjZ4uAJCs4XU5URUYUBLBMDD1JJBIjZRhYFoiyguZw4naoA9U0G5sPzIAJpn7/Rla+uYmalk5SuokgyeSUjGLOJfMZX1mIS5UwjRTddftY9sobHKxrQ7ckMnLLmDx7AYumltvdn82wY8DuyeJxc7hs7ig6Dq3noT//lX88/gpVcy9nbEUhTkVKn1xS8RWO4aqpWax//TX2NVnMXHwl8yaW2GKxGZYM2H0pySoFo+dx643XMDJbIxRqZOfhBhIpHUHo2UkQQBCpO3qM4KiZ3HX3HUwuy0KVpYFqlo3NWTGgD3LNk8GEeVfzsTsvxyPGeOKhhznc0EZCT0cUWEaSRHc9z75ZzexrbmPWhHI8DmUgm2Rjc1YM+MgnM6+URTfdw8JxBRx86zkeeWEd9e3dWEA8EmL7K49z3DWey6dVkuN3DnRzbGzOioGfKkgO8kqr+NqXPkShK8pLTz7C6p2HCUciNNce4Y//WMfNH76ZgtxMZKH3w9nYDCWDMrfWvFmMWPQJPnLlRJLVb/P440vZsH0b2197CmnBp5g7MgevNmAGOxubc4YwWCHKppGk88hqPvnxr7Kl0aJs9ATysvL4/s9/xMhsF4pkdy82w59Bs96KokJG2Uw+dfcS8hwxGprbmH7zHVRku5BtsdicJwzecocgICgexlaNJ8+v4PB4GFFRhCYJ2HKxOV8Y9PVBp1NFUWQkUUCW7OVJm/OLQb9j7aRONuczQyAY68TLtNVjc54x6IJpbm4lFI4RDkc53tI92Ke3sTkrBmnxw8TQQ2xZs541mw6SWTIGVfBw6PWXeElvZfrsmWS6ZER79m8zzBmkdRgLw0jS2thER1c3yZSOhYAkq3h9fnJzc9AU6V2nTBubYcqgLVza2FwI2HZdG5t+YAvGxqYf2IKxsekHtmBsbPrBkAjGtNIvG5vzjSERTFvcoCask7RVY3OeMSSC2dyc4MHdIVpjRu8729gMIwZdMKZl8XpdjOXHorxZFx/s09vYnBWDLphtrUnWNSY42Knz8L4wUd20PZhtzhsGXTCr6uIcDulEUiaHulLsbkuh24qxOU8YNMGYFrTHTZZVR2mLGVhAW8LgiUNhYvrQCsawTGJ6AttLyKY3Bk0wKdPizfoYBztTxI30jRlKmjxyIExzzEAfQotZIhpmz94NdNRXYyQTQ9YOm+HPoAkmblj8bV+Y9oR5YptupnudN+tiRIawl6k/uIvj//ZlVv/wy0TbmoesHTbDn0ERjG5aNEd11jbFierm+z773wMRmqNDY2JOmTp0tFPYGiHsdmCKtvODzekZlLujLW7yl71hOhLm+1b4TQvWNyXY054ckrnM/qbDLF3/HC5TxDNzDoLTTldrc3oGXDAW0Bg1WFodJWW8XxAW0J0yeeFolMZB7mWaoh28umMlyZ07sASoz9DQ7Uw2NmdgwEOUu5Mm+zqShJImVRkqGQ6RurBOZ8KkyCPjUURa4wZ7O5Mc7ExS4pWQBin0cnPzfrbtXcdVtR10qjIHrBBJbO8Dm9Mz4ILpSprsaU9y7xgv8wo0ij0yv9vVzRt1cb40yce0HI3DXSlerY1RG9bRTZAGoTxMdzLK3/atIFpzhKyoyc58hYPxFpKmPvAntzlvGXDB5LkkvjktA+d7UvP7VBFVgqBDZEJQZUJQ5cZyFykTpEHKhLGseh2bWw5waVJEUGQ2FznZ21lDwkgNyvltzk8GfMAuiwKOPtSxEAQBVRIYjDTLlmXx6IGVeGQXM9U8ZFUjNHoEddF2ewHT5owMuGCEntdwIaYnWHF8A1taDjInMIKpUhYOp4fikjEYWISSUTvBoM1p6ZtgLBPD0NH1vr3MYRznEk7F+NOeZWiSyjXBcWSlBNxuP5MLxyIKIu2JELplT/xtTk2vcxhLT5BsP85rmw+judw4NRUJg2Q8SktHGKcvgNflQBYhlYgTjSfwlU5gUnkOTnV4FUnSTYOmaAdv1u/gyuLplFtupO4IbpeXKQVVKJJMQ6SNpJlCk+xamzbvp3fBJMN0bn+eb31/KbMXL2ZCRT4OI0zTtuX87NF1VC26nduvmEbQJdFSe5DVb63Fufir/PpzS4adYLpTUdY27qY9HuKG8kvIaYZYqAs1ECDbm4VPdXGsu5FIKo5XcQ11c22GIb3e0aZpEU+afOSbv+Key8aS43dgdtWy21nNff+7nqIJc7jpjlupzPVjpcLcW7Od//tkIyLDb1hWHWrkdzufJ6B6mJhVgXZ0F5FQCDknF0nVyHR42dl6lNZYJ3muzKFurs0wpPc5jORAClSxeM4YfB4NQeiZxr9nJi8IAoIgICpuvPmTWTi5BJc2/IY0DZE22uMhPj3+erKdfkgmsQwdweFAFiWKPDnsajtKU7QDaxgK3mbo6VUwkuogZ9J8qnKcaL25jQgimsPFZbPH4RxmggklI+zrOI5hmVxTOhuX7MDSU2BZCKqKJilcUzqLlKlzqKuOpGEvYNq8n14FI0gyqsePQxb7lF1fEkUy/G6kYeaTVRNuZm3jblyyxqiMIhRJBt04IRhVVLimbDYe1cXOtiOEU9GhbrLNMGR43dUDyKHOOva0VzMmo4RMzYckiFimmRaMLCOLEhX+Qoo92RzsrKM61DjUTbYZhlw0gtnfWYMoiNxcMR+xp6sUBAEEAct4N0ZndKCYY6FGNjUfsFf8bd7HRSEYwzKp7W7BJTuYmz+eE3WbNQ0EATMaPrHvpUVTEAWBrS0HiBvJIWqxzXDlohDMsVATx7qb8GtuMh3eE9tFzQGSjBWNnahWu7hoKuX+fPZ31FDTbYcr25zMRSGY/Z3HqQ23ENR8uJV3IyoFpwNR07B0Hcz0sCzg8DAnbzxN0XaeOvymbV62OYmLQjBHuxqIpGKUeHPQxHfN3aLHi+jxQCqF1WNGFhBYUDCRoMPPqzWbbWdMm5P4QIKxsDB7nsiWaQ37yXFdpAWHpDLCX9Cz8JpGyshADAQwkwmsVOrEsGxCcARz88dxrLuJDY1704kybGz4AIIxDYN4LEZbexcWEOnuJh5LoBvGsB28tMS68KpOyrx5J22XMoJIGZlYiQRW8t3AsQyHlwWFk7Askx+s/zPdyeiwfyjYDA79FIxJU81BXlv5Mn98dj2GZbJ79XJeemUluw7VEh+mwYqtsU68qotS3z8JxudD8gewkkms1MkWsclZldxauZDd7dXsbj9KwhymF2czqPTTnVggmF/G/KvvYNLcK/lOPIWkOMkI+PH5PGjDyzkZSLv0t8S6yHcHCaiekz8URUS/HyuVIlVXixzMOpFQINsZ4KrSWTy0bwU/3fQIDyz8CpWBwndN0jYXJf0WjKo5UDUHGVk5A9Oic4iFRUeim7iRxK+6UaX3X64UzMJKpYhtXI9j/ESEHsGoksK4YBkfr7qaP+5ZxqrareQ4A/g1z/uOYXPxcGFbySxoj4dImjpOWUMS3p+ORs7OAQFiG9eDeXKkZYbm5TPjbyDPlcnTR9464bxpc/FyQQvGAjoSYXRTxyGrSKdIAytlZiJnZZM8sB8rkeC9xWoUUSbPHeTOkYvZ2XaUP+55kaZo+yBegc1w4wIXTHpIljKNtGCE91+unJ2DNm48VjKB0dGB9U+9jCYpfH3ancwvmMCrNVt4dP9K28x8EXNBCwagKxFBNw0ckop4CsFIWdk4Jk4GyyJVXwup94tBERW+Muk2Sr25PHFoFW/V7RiMptsMQy54wZiWiYWFcBr7liDLyFnZICtE3ngdMxJ+/z7AhKwRfGLstaQMnZ9ueoTqUCMp084uc7FxwQtGFkUEBKwzeIWJmZlImZlE3ngdozvEqYpuumQHi4uncEvlAo6EGvjuuj9SH2lFt0VzUXERCEZGEASMnp7mVEiBDFzzFqDX1qDX1aWdMU9BgTuLu0ZdwZUlM3jh6Fr+sOsF6iItGHYes4uGC14wiigjImCewRws+QP4rrsJQVFI7N2NGY2cdt9yXx7fnHYXM3NG8/vdL/DH3S/SFO044/FtziUWyXiUzrZWGpuaaW5qpK6+gbaOEPHUwD+4huHa/LlDIG3lEgUB3TRP63UsqCpyXh5STi7R9etwzV+E5A+cel9BoMSbyxPX/Du3Lvsev9v5PJZl8bWpH8KvuW1PgAHGMlLU7F3Pk489zd5OCb/YzaHj7VRdch0f/citTCg69e92rrjAexiBoMOPIsrE9PgZh06CouKYNJnEnl2kjlWDcfp9RUHAp7p4cPHXmZlXxV/2Ludbbz9Ic7Rj2DqgXii0HniTP/76P1h5XOHHP/sRP/rpfXxyXpCtL/6ZPz/x6oBX97mgBSMIkOMKoEoKkVQcwzz9sElwOPDf/iFEh4PY+rUYoa4zHlsUREq9ufxszqe4tGgKLx/fyBfe+C/2th+zS2YMIMmuNlrjAv7sIvIz/AQCQcZOGoVDSHLsyFFiA/zE6ueQzCTaHSIU6iaWsnB4/GQFvCjy8NSdgECWw58WjB4/o0VLkGUcEyahlFcQ37GNxM4duOYvTKvuNMiixLhgOd+afg8P7nqeF6vX8a23f8+9VVczv2AiQafPHqKdY/wjpvOxj3uIOPPobjrOoQMH2Lr5IO2xFFmpBAOdhaGPgrGw9AT1tcepPnKE4zW1NDS3EcXH3EWLmDymjIDXOSy7K6es4ZYdRFPxM1cXEwQEzYFr3ny6Hv0bsY3rcc6ag6BpZzy+JIiMzSzl/0y5E6/i4olDq7hv86M0Rdu5smQGhZ5sO7F5PzEsk45EN93JKE5ZOyltrzurjHFTPRw/eoCXlr3I0aYYPtWBYJhYFgy06aVP97hlmnTU7uKh3/2BPU0pKidOY9q4YtY/8f/4+rd/xlv7aomlhq+VyK+6iehxuhLvX5T8ZzyXXYmck0t8+1b0hvo+HV8gbQj41vS7+emcT2FYJr/c8hj/d+Pf2N12lFAyYoc594JpWSSMJO3xEEe7Gnh47wp+tP6vLK9ef9J+8e5WNq54lF/86kFqHWP49Be/wPXzxpGbOTjJ4/skmFQyzj/+6yd0Fy/g0ssWM2PKFGbOvZyv3b2Itj0v8/BjKzna0vvNOFTkujIIJSIc7updAEpxCa7Zc0ker6bz0b+dchHzdLgVJ7dWLuThK77NvPzxPH34TW5b/gP+uHsZUT1uJ9Q4AzE9wYamfXx37Z+Y9+QX+ObbD7Kj7QiK+F4Pc5NdKx/ht396Bnn0Yr724UvJcqt9ysh6ruh9SGYmSIX3sWLVXlypdTz192N4NBEzGaVzfxOGJVB7aB91rd2ML/ANQpP7T64rg65khENddX3a333FEuK7dhDfsgm9pQU5KwtO4el8OioChfxq/ue4umwWD+5eys83/52nD7/Bv064kcVFU8l3B+2ZDZA0dHa1HeHN+u08f/RtDnTUICAwK6+KWysWMr9wIlkO/7v/gxljx7YDVNfHme/393yHFslYHD2lg2Wln28D+OX2qaCSXruXI+0W146ZxOyZo/CrYFkm5pzZzL4liiOjgJHFGQPXyrOkyJNDytQ5Gmo44Vd2JpTiEpwzZ9P58F/ofOhPZH7+S4gud5/Pp4oy2c4AV5fOosJfyEvHN/DckdXct/lRnj70JrdVLmRu/jhKffkXlXAsy6IrGeF4dxObm/fzSs1mDnfVE9MT+FQXd4y8lCuKpzHCX0CeK4hHdZ7sYS7IeFwqYqqF9atW8srcMtzRGl5duo66zihq/XG2bdtMVkYl40t8KANQMLUPPYyB0d1FRE+g+gsZXTWePO/5td5Z7MnGo7hojnaQNPReJ+Giy41rzjyi696me+lzeK+7AbViJIKq9uu8fs3DlOyRlPvymZo9kpeObWBD0z7u3/o4Lx0rY0HhJGbmVlHqy8WrOE/pTX0+Y2GRNHRaYp3UhlvY13GMXW1H2d1WTVOsAwEYnVHClOyRzMgZw8hAIQXurJMy+5yEoDBl/qXM2rKXtUc387vfWlSNGsm4WQsYua+Zmmg9b607zN23jTuTcfOs6P3OFyRElwenmGTXlu00L6gi15v57pPRjNPaHkZxefG7zmxRGipG+AvIdwfpSHQTTsX6ZLVSikvw3XAzLT/+Ad1LnyPw0U/0RGf275eQRYksp59ry+YwI3cMm5v2878HXmVH22HWNe1hTKCEq0pnMjVnFHmuTDIcXnyq67w1R8f0BJFUnFAyQls8xLHuJlbX72R762FaYum6O1mOAAsKJ7KkeCbjg+XkuDL6aEkUGTFtMV/4dpBRK9eS8hRw2ZIllPoNct1BdjdYzFlwCaNzHAN2fb0KRlBUlOIqyjM19qxeyuoFEykOTsWtKQiWSbTtIM8tO8D0yxcyqXR4CqbMl0eZN5eNTftojXURdPQ+1xI9HhyTp6KNm0DXY4+iTZyMZ+FiBMcH/zFynBlcXTabeQUT2dl2hCcOruKF6rdZ07CTPFeQqTkjubJkOgsLJ+NWHKiSiiqmKwucKvhtKLGw0E0D3TRImQYpUydppNjfUcOGpr1sbN7H/o4aasMtKKJEhb+Am0bMY2HhJCZmVZD7ASu8yc4AY6YsZMyUhSdtX3zdnSw+FxfW2/l73UN0oHjHcu1lk7n/yXU88Muf09rwEa6bPwEl3sKTDz1M7uWfID/o7/VQQ4UiypT58nmjbjur63cyKqOoT09wOS+f7B/8mLqP3En388+gllegjRp91u3xqC5m541lRu4Yvjn9blYc38CLR9eyqnYbjx18HU1SmF8wkYWFk5mRM5qxwbJhV0Iwric53FV/Ypi1qfkAm5v305kIY2FR5M5mRu4YPj3+ehYWTqLcl98TxCecfsh1HtCnyYiiObnzS9/lWMt3WLp+Dw/e920efcCF4vAw/6aP8S8zR5PpGt7zmhH+fFKmzkvH1vGxsVf3aWQlSBJyTi7e624gvGI5kZUrUPLyEX1nZw0UAEEQEQWRLKefm0fM54ri6bTFQ2xs3sfK45s53FXH73Y+xwOWgVt2UObLZ2buGKoySinyZJPrzkhnsVE9A3IDWpZFytTpSHTTEuukOdpJbaSFAx217Gk/yv7OWiKpOLqpo0kqua4MLskfz/Sc0T3zsjzcsgOnouGUNRRBOq+F8g59ussFUSSzeDyf++7PmbVxA9v3HiFialSMn8L8eXPJD/qRB9MY/gEo9eZS5stjX2cN4VQUj+JC7O0HFARETcP/oXtI7NtLePmLyPkFeG+4+UQ6prNFEkS8qguv6iLbGaDYm8Oiwsk0RNqoDbdwoLOWve3VHOtuYvmx9Tx3ZDWyKONVnfhVN17VRY4zg1xXJllOP37VhUdx4VWdPZ7aIiJi+sneE0hnWCamZWJYJgkjRSQVpzsZJZyK0ZHopjXWRUusi85k94n5SDQVx8RCFRVUSabSX0iFv4CR/kIKPdlkuwJkOwL4tXSbNEk5b+dhZ6KP3YIAkkbJ6EnkllSyIBwlZQr4MjJwKFLvN94woNiTw/Sc0ezbf5yacAsjA0WoQh8uXxRRSkrx3/UR2n/za0LPPoU6cjSO8RPOeRtlUcKvuvGrbsp9+RiWSSgZoTXWRX2kjaOhemrDLTRE2mmJddKe6KYx2sG+9hpEUUAUBEREBCHtfaCIMpIgpgv2CuKJuCCDdKiDaZnoZjqwzrLSMammlf5MQECVFHyqizJfHlkOP3muTPLdWRR5sshzB8nUvAQ0D055eM5dB4J+J/LTnB405/mXzC7LGWBydiUP73uZNfU7KfbkoKp9v3z3/EWkjh8j9ORjdD78J7K/+X0kv/9EpsyBQBJEMjQvGZqXkYEiFhZOAiCmJ+lKhmmPd5+wRtWFW2iKttORCNOZ6KYzEaY7FSNl6OnJuWWcWINSJBlVlE/42fk1DwHVjU9znxBGtjOAR3XhU11kaF68iuuUiRAvNi6ab0AUBArd2Thklb/uWc61ZXPwqX33PxI0Dc8VV5Gqriay6lW6n3sK3613Inq9/TY1ny1OWcUpZ/bLEGBhgcUFMY8YSoaXrXKAyXNnMjdvHBtb9n+gBBZKYRG+2+9Eqaik7b/uJ7ZxPWYsNkCtPbcInN/WqeHCRSWYXFcGd45ajABsbz1ERI/37wCiiFo5iuBnv4iYGaT1/p+T2LUDK2nXwrxYuKgE45A0RgaKKHBlsbR6LQ2Rtn4fQ3Q60cZNIOvr38aKJ2j/za+Jbd182kwzNhcWF5VgREEgQ/NyWfFUtjQf4GBn7QdK+yq6XHguvxL/XfeQaqyn4w+/I759K9YZ8gDYXBhcVIIB8CgOPj3+ekDg9dqtdPQhqOx9CAKCohC45158t9xO6thR2v/n16SOnzl5hs35z0UnGE1SmZU3llGBIjY3H2B329EPHNYlOBwE7v4ovhtvJbFnN83f+yappgYs3U6CcaFy0QnmHS4rnsqx7kZW1W4loX/wSbvoduP/8D1kfOyTJPbvo/7THyexd2+6yKzNBcdFK5i7Rl1OsTeHN+q2s6f92Ac/kCAgBQJ4b76NrP/zDYzWFpp/9N0ek3P03DXYZlhw0Qqm2JvD9WVzaUuEeOLQqrOr+SJJyMEsPEuuIfjlr2JFwrT9+j/oXvo8ekvzuWu0zZDT60q/aRoko2HaWluor2/Ck1tMbtBPd1M1h483YSoeKseMJjfDgxnv5viRw9S2dKJ6shg5qoLsDP+AhIqeLaIgsrhoCq/WbOaNum3UdDdT5sv74FGPoogUyMB3250gioSeeIyuRx7CaGvFe831KIVFA+pGYzM4SD/84Q9/eKYdjGSCY3s38Nhff89v//B36k0/mVqYx//4ex55/AmeW7qS4zE/JQV+mnat4re//xNPPPUMy19dQ9RbxpjyAryOk6PpVtXFOdyVYkGBg9EZ/Qv7PZdkuwK0xrtYU78TEJidNxappzzGB0IQECQJx7gJKIVFxHfvJLZ+LXpdLWrlSESHE0GWB92V5oLBskgm40SiMRJJHU0b/HunV8GYlkU8adG6ZxXLVu8iphtYgsbo6fO5at449qx+mTVb91JdXUNnXGDOFddw2fQSNrzyIluPdFE0dioTSk72eRougpEEEVmU2NC0l2XH1nFr5UL8qufsY+sFAaWkFG38BIzWFrqXvUB880bk4hLk3FxbNB8QQ49xcPt6Vry0kv0tFpOrSge9Db0KRhBFnC4HRuNulq3ZQ/ncG/ncZ+5l9oSRlJaPRmzexvrtNYyefx1f/sK9TB5dQfmoibTvfo1Nx8KUV03lkgklJz2zh4tgAIIOHx7VyQtH1xJKhpmROwZvP5wyz4Tk8+OYOBk5r4Do228RfuUlzO5u5IICpIzhFUE5rLEsLD3Kq0uf4fcP/Ianlq+FnNFcv3DSoDel10epIAhIkozm0BBFCa8/gNfrxeV0oDldZGVloAgyXp8Pr9+L0+HA4fSQkeEDXSceTwzr9HUOWWNWbhWXF0/j2SNr2N56iPhZmJnfi6AoSFnZeK+7kbxf/D8ckyYTee2VdGKNF5/HDIfBrivTO4KAIDuYufAKFkwqxWFGSSSHxmzf57HHO7HYwj/FZMuShHgiSOnd7aIoAhbWeXBD5Dgz+PzEmxEEgb/uXcHRUMM5S+0qSBJSIIBz2gyCX/gKniXXYHZ30/Hg/9D2n78kumEd5mnKBNq8B0HCnxkkJ9OHWx264ewAxsO8e1HD/VZwKQ4mZVVy84h5vFi9juePruETTj9ZznNYnEcU0arGIWfnoo0dR+iZp4i8vpL47p14r70R5/SZyPkF6aA0m9MgIInCiSSklmkQDYeIJQxkhxOX04k6wJUkLpoAst5wKw6+N/Oj7Gk/xrNHVjM2s4yrS2chi+fWFCxlZeG5fAmOqdOJrFxB598eouP3vyH8ykt4r7sR94JFiB4votPZr/S0FxOWZaEn47Q1Hmfr26+z9XALmaXjmX/JDIpzg7jUgTPf91kwZ6pCfCEgCSJ5rkw+PvYa/n3DQzy09yVm5Iwhzz0Ak3NBQA5m4b/jLtyLLiP05GOEnnualn//Hl2Vowjc9RHcV16F5PPb1rRTYek0H93Or765jI0NCeoP76clZDBu0S18/8c/4LKq7AE7dd/KXVgWoa5ujFSCZCJB6p3imxZEo3F0PU4qmSSlvyMpi3g8jh6LEI9FSZ1HSrupYh7Xls1hc/MBfr7576RMfeAeFIKAlJVN4F8+RsHv/kzm576EIIq0/urn1N59O63/dT/xHduwzpOozrPGsrB0neTB/YSefZrWX91HeOWK9+2mpxKEw0mu+toD/O1vj/DiC4/y0asmU7/1FR747V+JWQM3DejVrKwnYxzato5Va7cQwYFTVZE1B8HsAAc3vsaaTbtJyS40VUHRNHKDTrasWs66HUcQHW4cqoLTHaCoMAe552E5nMzK/4wmKRR7czjYWcvqhp3kODOoDBSiiAMzehVEEUHTED1etMpROCZNQS4sxGhpJbF9K9HVbxDfvg0rHkOQZASn64Jax7EMA6OtleTB/XSvWE7nX/9E93NPE1u/FjPUhTqiEq1q7Dt7c2jDStZsPUzx3Jv51zsuJ9Pvw5+RTY4nxe6tWzhQ082Um+4g3ymcuN/OJb2nihUk8keM4bp7vsAVuoEoK3h8AdyKTNmoCdzxqTJu0g0kRcPr86MqTirGTePjJVWkdBNFdeALZDIMvWNOS6W/gI9VXc1PNz/CfVsepcSXy5TsSlzywOXsFRQFKRhEygigVlbinD6L+PYtxLduIXn4EMnDB5GzclDHVKGNHoNaUYmclYMYCKQFdD5gWZjxOMxAPXcAABscSURBVGZXJ0ZbK6naWlK1x0keOUyq+mi63LsoopSUoVVUolWNQx1T9b7DiJKCqjnxaOm5iqS4KBs7kSmVuezY2MTemhTTAyraAOTK6/WblhQVf1Y+/qz893/ocXPKza5y8s5F64YITVKZmVfFJ8Zey/fW/YkHtj/ND2bdS4W/YMB6mhOIEqLXh2PiJBzjx6NfvoT4rp1E17xJYu8ewiuWEV31KlJOLo4JE3FMmIyUnY3kDyB6PAhOJ4KqnbNEgx8Uy9CxEkmseAwzHseKRDBCXaRqjpPYtZPEwf2YXV2Y8RiipiFl5+CePRfnjJkopeXIwSCC2vd8Z5o7i6zsTCyzg1jMHDAr/XnyaBp8gg4fS0pmsKf9KL/f9QIj/Pl8fuLN5LmCg5e4UJSQ8wvw5BfgXnw5Rmsz8Z07iK55i9iGdXTt2kHX3x9GzstHKS1HqxqLNmYsSvkIJJ8PJBlBlkCU0gISxRPvZ41pYpkmmCYYBpZpgGGm33Udo6uL5JHDJA/uJ1l9BL2xEb2+DjMU6lnQzcIxZRqOiZNRR49BLSlLp6z6oFgWpiUgKx7ycxSkAcrEagvmDOS5M/nujI+yvfUwD+5eiltx8sWJt5wz15n+kM7znIdncS7uSy/DikRJHD5IfOsW4ju2kti5g8iqV8EwEFQVOb8AtXIUyogKlPwC5JxcpJyc9Htm8KyGcZZlYYbDGC3N6E2N6E1N6M2N6I0N6PV1JI8ewWhqTAfRCQJSZhClrBzXgktxjJ+IY8JElLJyEHsWwQXxrOdkyVgLbV1RMgoqmF8u048cjf3CFswZEBBwKw7+Z9H/x6dfu58/7X4RSRD58uTbcEhDYKwQhLSbCCKCx4Nj3Hi0ipF4r78RK5FAb2okefAAiYP70Wtq0BsbSOzfhxWLpj0JJAlBlhFUFdHjSa/3uD3pl9fTUzFawLKs9P6WBVhY0ShGKITZ1YUR6sIMd6dzFxhGOluOZcF7jqlWVKIsXIw2chTqyFFIwSwEVU0PFbWed+WDV5a2rHRPdqI6n5ni4OatHGqxWHLHh8mVBy7QyxZML0iCSLkvn3+f9TG+v/4vPLxvBZqk8vmJNyGL0tAl3BbF9I2naoikqwnIObloI0fhji7GjIQxurowu7vTf3e0Y7S2oLe2YrS1YcWiWHoKo6MdvbU17dN2khuTcPK5RDEd8+P3I+fmIXo8SJlB5KxspKwsJK8PweVCdLkRvV5EtxvR6UrPqc5CHCcjkF1cRlbQy4F1K/jzsyOZU1VIpHE/L68/xLglH+GOq6cP6E1tC6YPiILIzLwqvjntLu7b/CgP7nqBbGeA68vn4FVcwyajZPopriL6/sm9xjSxkknMWBQzFsOKxbCSSaxUEiseT0/KE/F38xC8cz09Gf8FTUVwutIC0FQEJX0eweFIb3M4BslSJ1Ax6xq+9BUfb27az6Ft6zA6i5H1KFWLbmbKhCpG5A+sa5EtmD6iiDLzCiaQMu/g22v/wLfXPogoCFxZMoMMzTu8KxiIIoLDgeRwIA3f2r19QCCQN4L515cy8/Io7a1txAyBQDALr9uJKg28K5HtrNQPnLLGoqLJ/HLevyIA31jzO54+9CahZCQ97rcZFARBwuHyUlBSRkV5KUGfe1DEArZg+o1T1phfMIlnr/0JAc3LDzf8hT/vWdb/PM025yW2YPqJgIAmKVRllvHHy/6NCn8hv9nxDD/Z+Deaoh0XtIOqjS2YD8Q7opmcVclP5nySSVkVPHP4Lb719oPsbD18ziI2bYYf9qT/LFAlmTl54/DM/Ci/2fEMq+q205kI89kJNzIjdwx+zXMBVnm8uOlTXrJUPEZ3OEwkpuPxulFlga6ODqIJHcXhIjMzE4/LMWDuCMMZWZSYkj2SH8y6l4JdS/nL3uU0b+jgq1PuYF7BRIIOH9LZZqGxGTb0Khg9EeXg1tW8uGwZr2+s48q7PsRYfxePPvwkO440EiiZwEc+80VuXDSZoEe7aJ+oxZ4c/m3ah6nwF/DTTX/n66t/y92jr+BfJ9xItjOAco4jN22Ght4T+ZkGoUiUrS8/xuvbaojEw0R1F7PnL6DSn2D166/zxto9ZJSMZsKooj7FIAzneJizQRFlxmSWMi17FPs6jvPckTWsrt9JiSebYm+O3dNcAPQqGFGUcDrdNO99k7d2NDJm/o187lN3MW3CWCZMm4XStJUtu/cTd+QyY/oUMl29u0FcqIIRBAFZlMh2ZXBJ/nicisbm5gMsrV5LOBml3F+AW3EO70VOmzPSe14yUUTVNJyaiiQ7KB1RQkFBLhmBAFm5xVx9zRKy3SLHDx/kcFv3YLR52OOSNSr9hXx63PV8a/rdVPgK+POe5Xxt9W95+tAb1IVbL/AMCRcu/bOSCTKSJCH1hE8KgsCIsaPJ9XuoDnfTErEX795BEATy3UFuKL+EMRkl/H7X86xt3MMvttRxRfEhri2fzdjMMvyq++xT09oMGmf3SwkCij+AT1VQRBH5IrSS9YZbcTA5u5L/XPBF/n3Wx8h0+PjHwdf4P2/9D08cXEV1qJFQMtrvEug2Q0M/12HeP4ywUilSpoU3O5NC3+AHVp0PCAg4JJUbR8xjTv44njn0Fr/d9RxffvO/mZVXxb+MWcI1pbPJcvqRerKI2gxP+tXDWIZOSjcwenRjWRatR47QGFcoGzWWEdl21sbeCDr8fKTqSh6/+kd8Y9qHaYuH+Nbbf+DGF7/Nb3c+R3V341A30eYM9K+H0TvYu/cwtQ2d+Au8GPEQy5atxFU4jiVXLiDLZa819IYkiLhkB+W+PD434SZuGHEJK45tZGn12/xm5zM8fuh1rimdzZUl0xkZKMKnuoe6ycMUC9PQ6Wiup7UjjCk5yAgGyckKDKi/V/8EI6l0H9vKi88HOJjvJ9JWy7bOIHd9+kPMm1CKej7lUhpiFFEmx5VBjiuDInc2l+SPZ1XdNt6q38H/HniVlTWbmJRVyey8sUzOrqTYk4NT7nsWlQsZy9Tpam9m46qXqQ7LuBWTY/v30GV6mbvkeq6ZPxEJBmQRvV+CEWQvlROnM67YTUNDG5Ijhw9/5nrGlObhdw9czq4LnXeEMym7kqtKZrL8+HrWNuxmZc0mVtVtpSqjlCtLZjAmo4Q8dyaZmg+X4rhIF0Itwm0NbHr5CR56tZZ7P/8pKrKcZCZruf/3j/P2/nZGT/oVFR6BgchL3s9Jv0RuSQULr70Gr92ZnHP8qpuZeVXMzKuiLtzK+qY9PH34TdY07OK12q2UeHOZECzn8uLpTMsZhV9145Q1HLI6tPkFBhHLTFG9Zw2PPr6M7Bt+xtzxI3FpMp5Z05j88mu8VruPbY0GJSPk4SAYe7FtsCj0ZHGLZwE3jZjH0VADzx1Zw0vHNvDEoTf4857l5LuDXJI/nsuKprKwaDJl3jw0Oe1lcSELx4yF2L5uA5vqZL576VRkJT1vzqy8hE99w8e8+gSLKmS0AZpO90kwlmXSFQqTSkSIRmMkUiZe9WIcDgw+oiBS6s3jk+Ou457RV9AS7+Ktuh2sqtvKvo7jvFa7BU1SyHcFmZozilm5VVRlllLpLyTYY6a+kEgmumloaEAXVVyu9xTwUlyUj5tG8WgTTRqyNEsW8UgbG958g3ozl3kLvFit1axdu5lLZ089kdvWZmCRRQmf6sKnush0+ChwB7miZDpN0XaOdDWwqXkf+zqOs63lIGsbdiOKIpmalxJvDhX+Qkb4Cyj15hJ0+Mh0+MjQvKiiPKTrPYZl0J2M0pWMEkpGCCUjNEbaqYu0MsKXz5z8cQQd71+mMC2dlK4TT4SoOR7GzPL2JAQUURQVRUkn4xwoxfSeW1l2M3ridAoqJ2JaFqIk4/b4BmR8aNM7siiRoXnJ0LyM8OUzLWc0i4om0xLrpDrUyJFQPUdDDVSHGtnfUcPejuMIpJ1CA5qbPFeQPFcGWY4Afs2NT3XhVXveFRcOSUWVZGRRQhJEJEFCEsWev8UTbjyWZWFipd+tdPUg0zIxLJOkoZM0UySM9CuaihFOxYnocbqTUToS3bTHQ7T1vNrjIULJKGZPXrQZuWOYmjPq1Ncvu/B5XSRCLWx47U0+MuFKkNMOvKaeIBxqYXutxqyqIKpy7m/SXgQjoGhOcgtLyT3np7Y5WwQhHSpd5MmmyJPNlOyRGJZJJBWjPtJGQ6SVI10NHOqq40hXPU2xDra3HubtVAwBAVWSUUQZVZJRRQWHrJGpeQlonh5jgoJTShsVHJLaI6b0PEk3dXTLRDd0dMtANw1SpkHCSNGZCNOR6KYzESacipEy9Z6XQdJMkTRSGKaJQ1Zxyhou2XHiGoq9OczNG4dbcZ7ymhWHl8qRFWSwirVLH2Hr1aOpKs3FIVmE2hvZsW41TUXXM32AsvjYIcoXGJIg4lPd+FQ3YzJKuLQovd2wTMLJKHWRVurCrbTEOmmKddAUaacx1k5jpJ3GSBt72qvTRaSsd/yprRN/W9a7degEBNL/9TjivrO1Z5skiDhkjaDmJej0UeTIJujwk+30U+AOkuvKJMcZINuVQZYjbSbvi7FC1NyMnjKXxRNe4LENb/Fv3/8V99x2BaV+2Lt5AzXJLL53aw4DVbXPFsxFgiSI+DUPPs3NmIxSOCGHNO/kVYsbScLJGFE9TtxIEtMTxPUkMSNJXE+QMHUE0kNDWZBRRAlFlNL/FmU0SSGgecjQvLjfI4L3zpdOiKvnH/2z6kmUjJvDv37zOzR967u88ubjfGvVYyiuTGZecSvf+Pa9ZA/gXW0L5iJD6OkF3rcO3vNPt+DAKWsnepN35ifWifee3YV3jnZybyOQtuylXwNjVJAUJxVTruA/HxrLjs0bqG5LkD9iLJPGjSQ7OLCpPW3B2JyEIAhIPQIYtggimtNNXkkl/qw8ZukWquZAc2gDXunOFozNeYsgirg8PgYzqMQ2DtvY9ANbMDY2/cAWjI1NP7AFY2PTD+xJv82FhWVhGgmqjxympT1EIqkDaeufKKvkFVdQkOPHIUO4q53jNXW0d4XTZTqdXnLyCygqyuF02fJswdhceJg6bc2N7Nqynrfe3sTR2mYEh4exiz7EHdflkZ8TACzMWCfH9m/kD797DKVwFDMvWcCCS/wUFp3+0LZgbIYNpgXhlIlhgUsW0D7IooogIKoeZsxbzKiKUtR4M7/YtJHmhJOJ98xg/IhcXD1+M97sQqZNHsl/t0eYcvcN3HbtHEpzA2dcgrLnMDbDhoRhsbYxzp92h9jTnqQ7ZZI03vUu6B8C/vxKbrjrE3zh9nmIeoy3nv0bHaFuDNMCyyTa1cnWN1dTeMe/8bHrL6GsF7GALRibYYQiwuiAwp/2dnP1C4184tUWnjsapT1hfOBYX1/+aJbc9UlumhTgyOp/8MeVe6jrjJOKtrN3yyr+sVHn+59dQn7Q26fj2UMym2GDJArkuWScksCRhMlLx2JsaEpQ5JG5sdzFVaUuynwy3n7EuQiSQm7pRP7lEx/jlS0/5tkHfsLU4h9TLDbx9AtbuOuzXyHf6+xzbaNes/cPBBdq9n6bs0MAJEFgfVOcQ106oZRJV9KkMWqwqy3JhqYEBztTpExwSgJeVaR3/04BWdHwZuWide5j9dZ9HK1rpLWpg3GX3cSSOeNwKmKfXeeGrIfpTJi8URenK2kn1rB5FwvoSp5c2yBlWtRFDOoiBptbkrx0PMbCAgeLi5zMzNXIcUmoZ+ghBFHGm1nAhz71OV5e+xW2rFmJ5PsUt1ZV4VP7Z1gYEsF4VAHdgof2h3lof3gommAzjImkTBLGqR+k4aTJwc4UzVGDjU0JvjjJz40jXGcUDIAoq2SWT+WKySUcrNtO89FdHKlvYlZFJv3J5zIkgrmx3E1AlehK2hnrbU7GsuClYzHWN8eJpN4VjQBIIiiiQFWGwq0Vbm4a4WZ0htoHl34LPRnj2OZlvNlVRllJK/sObuTPv/kDsybex6iAQl8LTwyJYMp9MkUeD+YAxV3bnL9YwOqG+EmmZFEAvyqyuMjJHZVuLsl34NdEHJLQp/gXMxWj8cg2fvCL5/nUj35Ofvcm/uMXv2blppf55QPTeeAbd+BU+yaFIRGMIgqkDR3DOUrJZrAxLYjqJkdDOgnDwqeKlPlkripxcl2ZmyKPTJZDxKWIfQ4Us8wUDceP8I+//J2pH/06M0YV4yaDu+44wpH7/8LrT/6ZJy6fx42T8vH3odykbVbuA6Zh9Ks3lCQJwYzT2FBPY3uc4pFjyHRIfbDoXNzopsXRkI5XEbmq1MW8fAezcjVGZyjkueQ+D5tOYJm01hxgzfKnCOXP5TNLpuN3yyiCxtQF13Lr1u3c/9gaHvzPBxj3068yviy3V+8CWzC9YOg6e95+nZqwgeJw4tRkzFSKrrYWYrpFIDMTl8sJpkEiFqGtI8y8xVeQ647xxnOPsHx7J3d952dcViwi2Yo5IxYQSpp8dryXKTkaJR75A2dYtcwUrXVHWfnCE6zcHefer15Lke+dHkQgq3gUV3/4HlasXM36VU/w0LNT+PyHllCRn3HGSnq2YHohlUzw5H/dx4ZULnMWzKU0x0+sq4kn7/8lm9sT3PTJr7Jgcjkkwxzbu5EnnnqJ+/++gksnZpKbn09BqxufYmel7guqJDAzR2NuvuMsBuvpujHdnQ0s+98/8OjLW8iceisTitxYvDsJsAQFT0Yh08cVsm99C6889heKswN89MaFZHicKKfpaWzB9IYgEfVN4Xtf+SwzJpSjiALNx/az5cFfs6MzxcxLLuXDN16CQxaIh25lYWYnHpeM4Mxj0S2fZtEtQ30B5w8CnPZG7SuWaRDtqOelpS/RKuZw6RVL0Fwyq9bu5LrFM3rqxliEWmrZv3cvGdNv57PTeh5obYdYtdrFJZfMoTBw6gV1WzC9ICkK0266jcri3F6L3mouL7M/+klaTP+AZy+xOTWCKOHOLOT62+9GN9KpZwVBRFbU9xRZEvBlF3PJkluYsfg9SxuCgCyrqNrpJ/+2YHpBlkSuWDQJr1vtdZggyCrO/HkU4kQUIRJqJxyNogTzyVAkBMDU43S2d9AdSVJcVoIZ76KuvoUEGoHMIDkZ6RJ9kY5Gmlq7sFQvmdnZZJzCgpNKxOlobaC1I4Lo8JCbk0WGz3Puv4QeTAsMy0IUBMRhm4lJQBBlXO4zfw+SrCDJCo5TZ6Q9LbZgekEQBIL+vlZXE0HyYoQa2bVtI2+tWcuhdosbvvNDFvhFWo4dYsOaN3h77WYSjgK+86WbeXnZCtZt3k5LBEbPXsJtt1yNt3kLy15dzdZdB4niYvri67n3rusJKO/kiDRprq9h54a1tOoyencrO3fswZE7iiuvuYpZEysZiEypFhYHOlI8ezTCnDwHVRkqQYd4UZVqtAUzABjxCF0dtax+fTnbQ0FmJQwsCyLhbmr3rmPZM0tRy2awaZKbXbURMoMBtm95na27D9OJk9Eda6gxA+Rk+3j9tTVsP9hIwcxF3DbaiyQKRFuPs+mVp3iz3sOHb11CUNOR2vfw3088zJaaKPf98MtUZZ/7epjvZLh8YEeIpw9HuaLYyeXFTsp9MtlOCd9FUDPowr/CIcCZU8GCqy5lxpSRJ60dVI6fysJZ0xidLZHQQRx7M9///rf50c/u5ysfvxGjqZZXn1vB+Du/wfe/821+8otf8ZkPXUZbazP/WH4oHfgEHFy7lGVvH6ZkwdWU5gTw+LNYctt1jM+X2fr2Sv76evWAXJcoQNAhMS/fwb6OJL/Y0sm9K5v5xtvtLD8WpSFiEEqapMwL1yZo9zADhaQhK++f96iajKbJZGRks3BSWXqhTIC8nGyKNY24I585o3OQBQA3GYEslGSCptp6LGsSYPHa6u2s3ribuPc3VD/fc2Azyr76CPH2JIfWbYI7Rg/IZXkUgdsr3bxeFyeqG9RHDJ45EmFpdZQKv8xdozzcUuFmVKAvPl7nH7ZgBgyBU02LBUE4seIvCO/OnEVBQBIBy+I9mxFFEREwzXesOTrNHZ1kjprCJ772dUae+AUtEl9JkNQFHM4zRw8aFqxvjNMQ7b/zq25a1Ib1E71IugwGJA2Lg506/7G1i7/s7WZevoPbKz3MytUIXkBeDrZgBpS+3yVnvqGsk/5O6TrhqE6H4Scr72TrmdUHFx7DtPjP7V1sbk70uX3vbYluQky33rc9ZVq0Jyw6kybhVIymmEF73MOHR3mQLxDF2II57xBxOzRaj+1n3arNXHX37PdMRC2amls5VN3FvFmVpz+CAIsKnZR6+//z6xY0Rw2ePRIhZZ78mQAEHSLlPoVpORrz8h3MzNWGtJbmucYWzAehZz3CoufZf8qHunXKD6xTb35PZaPTHeqdD2RGVxThWL6Jlx59iJtmFFCeF0STId7dzo41b7MjWsm8WadvviwKfG6C7/Q7nIFwymRZdZQVx6NEdQsBcMgCQYdErktiUaGDG8vdVGUoZDkvvKLBtmD6g2ViGDqxeJS2lIlpWXR3h4kmksiigiz1POtNg2Q8RiKRwNANwqEYyQwNBJNYIkk8ZWIYKeLxOLJTwzRSJFI6KcPANBLE4wlcmoKh66RSSUzTwIiFiSdSKLLIwvlzeHvV6zy1bQWf+EqCz/3LLVRkqxzZ/BrHUjnc9tnbB+wriKQsXqiOkjTTucPcisi4TIU7Kz1cXeaiwC2h9Nut+PxhSJJgnK8YsU6O7dvMqyuX8eiKt4jqBgnJjeLy4XT7yQ6kl42NzhrWvrKUZ55/hb21ISLJDMpLSojW7ePlpc+wYs0uIgjklpWTXZDH8b1bWPbcs7y2eQ8p0aBkRBF5eX4O79zAC88+x9odhxASMSpGlFNYkEVWyRgKcgPU79vCunVree2lF3jiyedplEdw010fZeHIrAGZZFsWHAvrfG1NOwFN5OYRbr4/M4OvTwkwM08joEm9ug+d7whWX2aJNgBYpk4qmSAcjtDa1o5pgcvrx+3x4XZqOHqi9iwjSTTcRWdXN5EkaJ4AwYAPyUzS3dlOdzgCskJmMBuPx42ejNPVnt4uyBpZ2UG8bifJRJyOjk5C4SiS7CAnOwuP24EkicQiIVobatizbRN7azrJKqti2uTxFOYE8bnP/aIlpI0FO9qSrKyJcVWp68RipVPuX5XK8xlbMOcxpqGTjEWJJFKoTg8OTT1rb98zns+ChGESTllkOqQLcp2lN2zB2Nj0A9s1xsamH9iCsbHpB7ZgbGz6gS0YG5t+YAvGxqYf2IKxsekHtmBsbPqBLRgbm35gC8bGph/YgrGx6Qe2YGxs+oEtGBubfvD/Aw6tsM0njSNkAAAAAElFTkSuQmCC)
Cooling graphs are drawn for three liquids a,b and c The specific heat is maximum for liquid
![](data:image/png;base64,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)
physics-General
physics-
Absorptive power of a white body and of a perfectly black body respectively are
Absorptive power of a white body and of a perfectly black body respectively are
physics-General
chemistry-
The energies E1 and E2 of two radiations are 25 eV and 50 eV respectively. The relation between their wavelengths i.e. λ and λ will be:
The energies E1 and E2 of two radiations are 25 eV and 50 eV respectively. The relation between their wavelengths i.e. λ and λ will be:
chemistry-General
chemistry-
The first Lyman transition in the hydrogen spectrum has ΔE =10.2 eV. The same energy change is observed in the second Balmer transition of -
The first Lyman transition in the hydrogen spectrum has ΔE =10.2 eV. The same energy change is observed in the second Balmer transition of -
chemistry-General
chemistry-
Which of the following substance will have highest b.p.t.?
Which of the following substance will have highest b.p.t.?
chemistry-General
chemistry-
Which of the following has the lowest melting point-
Which of the following has the lowest melting point-
chemistry-General
chemistry-
The electronic structure of four elements a,b,c and d are a=1s2,b =1s2,2s22p2,c =1s22s22p5,d=1s2 2s22p6 The tendency to form electrovalent bond is greatest in-
The electronic structure of four elements a,b,c and d are a=1s2,b =1s2,2s22p2,c =1s22s22p5,d=1s2 2s22p6 The tendency to form electrovalent bond is greatest in-
chemistry-General
chemistry-
In which of the following pair the boilling point of first compound is not more than the second:
In which of the following pair the boilling point of first compound is not more than the second:
chemistry-General
chemistry-
Compound of a metal ‘M’ is M2O3. The formula of its nitride will be-
Compound of a metal ‘M’ is M2O3. The formula of its nitride will be-
chemistry-General
chemistry-
The compound formed by which of the following pair of ions will have lowest melting
point:
The compound formed by which of the following pair of ions will have lowest melting
point:
chemistry-General
chemistry-
Formula of a metal oxide is MO, formula of its phosphate will be-
Formula of a metal oxide is MO, formula of its phosphate will be-
chemistry-General
chemistry-
In which of the following solvents, KI has highest solubility? The dielectric constant() of each liquid is given in parentheses:
In which of the following solvents, KI has highest solubility? The dielectric constant() of each liquid is given in parentheses:
chemistry-General