Maths-
General
Easy
Question
and
is a hyperbola whose asympotes are the tangents drawn from origin to S = 0, and length of transverse axis is equal to length of latus rectum of S = 0. If
intersect at two points A and B then distance AB is
![2 square root of 3](data:image/png;base64,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)
![4 square root of 3](data:image/png;base64,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)
![6 square root of 3](data:image/png;base64,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)
- 8
The correct answer is: ![4 square root of 3](data:image/png;base64,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)
Related Questions to study
Chemistry-
The major product formed in the following reaction is ![](data:image/png;base64,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)
The major product formed in the following reaction is ![](data:image/png;base64,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)
Chemistry-General
Maths-
If coefficient of in
is,
then coefficient of
is
If coefficient of in
is,
then coefficient of
is
Maths-General
Chemistry-
Chemistry-General
Chemistry-
What is the product(Q)of the following reaction? ![](data:image/png;base64,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)
What is the product(Q)of the following reaction? ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAKUAAAAwCAYAAABwgLoqAAAcPUlEQVR4nO19e3hV1bXvb8619iNvEpKQbJKIgMijBiJEBFSsD0BUbo9a5AAWXxWs1VKBVOvttfUIIiof0u/D3lrx/UA+oWDx4BGwPYJYQUIEEYRQUoXySkh2dvZezznuH2uvtdfe2TsvCeI9jO+b2esx15hjzjnmeM2xVpgQghhjICIwxuAGIkIiuOvY9+3n7WtEBM65cyyEcOpJkoRk7bXXVkfpsXELISCEAOccpmlClmWYpgnOufOMG5/7elf7nkhvMlzt1Tmdc9FRerpzLhJpa4semxbZzUxtEd8WsmR1hRDQNA2apiEjIwOc87i6ifXba6sz9NgDIkmS09a+ffvwwgsvoLS0FFOmTEFBQQEYY2CMQQjRaXra6ntn6e4Ivu6kpzvnoit15XZb7yQQEXRdR01NDZYtW4aams9xyy03Y/Lkyejbty8kSTrdTaYEIQTq6+uxbNkyPP/88wiFQhBC4I033kBVVRWuvvrqVgvmHHz3wEzT7JL6tqWLLW1siVRbW4s//vFPeHvF2yAAAwcORHV1NQKBAKZNm4Zbb70FJSW9wRjAuQTGACEIFloWLfFttUdPojoyTRPBYBBr1qzBiy++iD179mDixImYPn069u/fj1dffRV1dXUoLy/Hvffei7FjxyI7OxsAizM9ErXNOfXdOXq6qr7PiYhzcPaBaZokhCD7111M02xVhBBkGAbpuk6appGu62QYBp06dYpef/11Ki8vp549C+n22++i7duq6ciRo7Ro0TNUWXkpZWRk06hRo+ill16ipqZG0nWNTNMg0zTJMHTn2N1WW/TYdLjpiUQitH37drrxxhspKyuLRo4cSStXrqSmpiYyDINUVaVDhw7R/Pnz6fzzz6eCggKaMmUKbdz4IbW0hEnTdFJVnQwjed8TaUk8Tlba6lMqfB2di9NBTypcnZmLZDiS0daRvkMIQURE9q8bkiEgIjIMw2HIlpYWev/99+lHP/oRFRUV0aRJk2jFircpFGohXTdI1w0KhxX64os99Nhjj9OwYcOpsKCIbrjhf9Hq1Wupvv4UGbrpMEFiW23RYxiGQ4tpmnTw4EH61a9+RX369KELL7yQnn32WfrHP/5BqqqSaZoOAxuGQYqi0M6dO6mqqooGDx5CgUAJ3X33PVRdXUOappOmGa1oSkZL4nEyaKtPqfB1dC5OBz2pcHVmLpLhSEZbR/reJaa0pVJtbS399Kc/pcLCQiorK6OlS5fSyZP1cRLMMMwoc+oUiSj0xe699Ph/PEnnlfWjQPF5dNedM+njLZ9SJKySoXecKe3Vpes6hUIhWrduHY0aNYp69uxJ06dPp+3bt5OiKKTrulNshrSLqqoUCoVo+/bP6Cc/uZ0KCnrRoEFD6KmnnqGDBw+Rquqk6+eY8qxgSlsKJapKwzBICEGnTp2i5cuX00UXXUTZ2dk0adIk+vjjj0lRFKdOcjEtyDQEKRGNtn68naZNvZ3yexbTgAuG0P/5zX/QP+u+IcMwHclnGEZKmuyFsXv3bpo6dSrl5+fTmDFjaP369dTY2NghleFm7ubmEH3wwUaaMGEi5eTk0iWXXEoLFiykgwcPtWrXbcakkqRtMUFHJqYrTPD/DVMmsysSbQWbSVRVpc2bN9P48eMpLS2NKioqaN26dXTq1CnSNM2RkEKYrYptL4ooYxq6SY2ngvRf72+km2+aTPn5RTR8+CW0cOFCOnr0qIPPZk5N0xw6dF2n+vp6Wrx4MQ0YMIAKCgpo7ty5VFdXR6qqxjFRW0wZYy67nzqdOFFPq1atppEjR1F6eiYNGDCQVq5cGSd13ZogEVdbbZ2zKTvW95SOjj2xmqaRqqpUW1tL9913H+Xl5dHAgQNpyZIldPjwYce2tJnWNA0SonUxTT1ajLj2DMOghoYGWr58OY0ePZoyMzOpsrKS1q1bR83Nza3w26r68ssvp+zsbLrxxhtp8+bNpChKK2nWmYHQNINMUzjmxjffHKEFCxZSv34XUH5+Pt1xxx306aefUiQSIUVRnAVyjinPEFO6J/f48RP0zDPP0MCBg6ioqIjuvfde2rdvnyM13KrW/hVCb1VMUyPT1EkIgwxDJ8OwznVdI8PQSNdV+uabr+n555+nkSNHUn5+AV177bW0atUqCgaDpKoq1dTU0I9//GMqLi6mCRMm0OrVqykYDDq0umnonKS0nzPJMOLPa2st5+n888+nwsJeNG3aNProo48oEom0O3HnmLKLTClETJe71VFzcwv9939vphtumERZWTl0zTXjaNOmv1JLS4TczyQ7JhKtiqXG4+2MRLvCIk7QoUN1NHduFQ0cOJjKyvrQnXfeTQ88MJsuuOACKikpoQcffJCOHDmStKPJbKaO2DHJ6LFpCocV2r//AM2f/wSVlfWh3r1L6YMPNp5VNmVMIMQYoqP0pOp7W3S3VydxrjvT9zimtDn266+/oQcemE2lpefRFVdcSa+++jodO3aCdD0WJkmGrKMNpxoIezAVRSVVVWnPnr20ePESKikpI1n20rRp02jLli0UiUTi1Gd3M2UwGKK//OU9OnLkX/TOO6spP7+Qli37Q3QsOt7WmWBKO/z1fWZKZ0eHXEkS1dU78Morr2DcuHF4+eWXMXnyj9GzZ55ds1uD+UJY23yrV6+BpqmYNWsmbrrpJuTk5KCqqgojRoyAx+Nxsnrcpbtg7969uOeee3Do0CH07dsXHo8HkUik29rrKhARFEVxsrK+r8BtZrQZkohw9OhRMMYwdeq/IxAohixLzl6mEBS31306iwWEcDiCuXPnYsWKt+HxeNGzZ09kZGSgR48eTupbd9GQjKbjx4+hubkZkYgCxgBJkqKLAs6YfdcFsNLvsrKy4tIGv4/FyRJySxohRDQH0eNk9XBu3Zfl7s3yYYxB17UoE0TAucWAhmFA142UCQvdBUQEr9cHSZLg8XgAMCdP075/hkj5HwMpEzKEkwV0JsmxQJZleDweRw1Jkp2A272mQ3Jg8Pv9rXIv7UVxphbH/yRIypREBI/HA7/fd6bpAREcqUREEIJgGKZLvZ9ximCaVvuSFFOLMab8jsg6S0AkSZD+tiC7nQQHOQGc2erJVt12zhuhrbzH9iRHe3Vtpkx8xSKVhErE0d55Z+mJUuWYMUKYDk0A61TfE+tEox/gnIHIzisVYIw7fWcs9oxhxF7nsMbEBGPcqWOapkMnY9ZYxuxN676qqjAMAz6fD7IsQ5blTo9T4vVUzmbiudvsSXbfPpcTLxIRBBFUTYeiKAkkULR0n13pngQAjk3ZHSuyo9DSEoZhGNFJTkxg/Xa4GeNoaWnBjh07sGNHNYLBICorKxEIBLBmzRoMHToU48aNw5dffomXXnoJY8aMRnn5ULz00ksIh8NOJODaa6/BX//6N2RlZYIxjsLCQsyYMQOZmekAOIiAcDiCJ59chC++2IWHHnoIw4cPhxDiW5kgncna55zHtZeq3biQkJvbDV2Hpunfqc1ke7icc4cpvgtIpk1Oz7gQVFXBkiXP4pFH/jeqq6tRU1ODOXPm4KuvvsJTTz2FXbt2weOR4ff7sGHDBhw9egzp6WnYtGkTsrKyMG7cOITDYeTk5KCurg7p6em48sqxeOGFF7B582YYhoCmqQiHw07kpLk5hIEDB0adSr1DlJ4OodBRB1VOVJGMMXDOIUmSEwqKokwo3fOyki2J3OduhnDfS9VGRwavPdrd7Xu93rhXJOzBjR+bjrXlBsYY9uz5Eu+++y4WLFiAUaMuRWNjE9avX49hw4ahtLQUY8aMAecc/fv3R1FREQYNGoRAoBiDBg1CRUUFxowZA0VRcOmlo7BixdsoLS3F4MGDkZubC1mWsW7dX7B06e+RmZmJH/7wh/D5fMjKyoTf7wcA5+W69ujtSJ1U9+1jwzDQ3NyMHj16OOOZrG6rF8ccve+EXtps+7RDYntWSMYLIQTS09Oidc4sUVYoyG7Xtu+Mb41XCMLGjRsRCARwxRWXQ5YlpKWlYcaMn+Bf//oXVFXFfffdhwsvvBB9+vTB559/DlmWQQSEQiG8+OKLWLt2LXJzc3HddRNgGAbeemsFXn31NdTW1iIvLw/Z2dnYt28fli1bhssuuwzPP/9HRCKK8wqybVO2BW7nzs1AJ0+exLJly3DgwAEsWbIEeXl5iEQUfPjhX7Ft2zYwBlx11VUYOXIkOOfYvXs3Zs2aheuuuw5z5sxBZmZm0vZaGQQxZye1ROpusKW1PfHC9d64DWeOttg75ADg9/vh9XpPy4IVQiASiUDTNJim6Tg+FjDk5eVh3rx5+PWvf40JEyagrKzMYQ6Px4PKykpUVlairKzMwTlx4kS88cYbuP3227F06VL4/X6Ulpbi2muvQc+eeSCydsw45x1iSBvcrysDgKZpePrpp7F27VrMnDkTOTk5aGg4hXnzqvDII49EQ3qEu+66G0uXLoVpmhg6dCiWL1+OlStX4rnnnosbVzfIbs8pVXFDe28dng5v1x40m2Bd1+PsH3cA/cx43zFwT44QVpioM8+760gSx8UXX4w///nP+PTTbbj00pEIhUJYv/59DB8+HIZhoKKiAkOGDIZhmMjIyHBeE+aco1+/fpgy5VaHURRFgSzLjrnh8/mgqpY92dzcjLS0NKiqhkgkjFAohJ49ezq42qLdHn+3sNi5cydWr16NV155BSNGjEAkEkFVVRVqaj7H6tWrUFpaCiEEysrK8PDDD+OSS0bissvGYPDgwZgzZw4effRRTJkyBaWlpc642DSkcJ0IBJHCuP22qlOkKDFbNeaBW9c0TQPnHKqqWtR1SUqmas8+Tg2SZEkUtySzFoYdIrOKRVf8eUy6JL83duzlGDFiOB544H48+eSTqKqqwsKFT6CmZicOHz6MjRs3goiwa9cu1NXVYdu2baitrcXWrVvx7rvvor6+AZxLOH78OKqrq/H222/joYcewpYtWzBz5kzs3bsXDQ0N2Lx5CxRFwcGDB3HixAls3foxiETcOCez14UQeO+99/D66687goBzCevWrcOQIT9ARUUFAKC6uhobNnyAuXPnorS0FJxzeDweVFQMQ3NzM/75zzrYMd/x48cjEong73//e9x2sQ1JtxktVWJAUdxJBwyJErJr4J6cRFwW/mieZ9TpYY6adH/IoPMfEIgxfWtIjYsxBr/PDwYJjFmfgLFUugHOAdO0mTwWTI/ZnuR4vIBV1w5xWQwNZGVl4ne/exQffvghDh06hH79zsf06VORm5uHRYsWYcCAAeCco7i4GM8++ywuuKA/Cgt74amnnkLfvn2Rm5sDAMjMzMTChQsdhigoyEdhYS8EAgEMHToUgUAxvF4P5s9/HLquoVevgigjCNcYx2hzM0lZ2XlYtOhpNDUFcc8990CSOLZv34Hy8nLIsgdCmHjzzRXo1asYV111lTXaBHBu/Xo8Hsiy7DjQubm58Hg82L17N2655ZZWUrrVZ1sYYy4bR8TdazXNXfa+WTS8k8xGbL1qGYvtM7fVTvved7L2WNL68dein4GJqi47SB0zIySL+QAAHGCAEDFpb9FtfXzBjnWyaBuMcxQVBXDrrf8O0zTAGQfjDIxxlJeXw9prJ5SUBFBUdH10Vwm4+eZ/A2O2icOQk5ODSZNugLWozahZwRAIFCMQKIIQFg0lJSVRmgAQczxLIg4Ggili9BJZmrJ//wtw9dVXY8GCJ2AYJmbMmIFwOAyfzwcrL0HgwIED6NOnTzQhRIIlFQWOHDkCj8eD4uKAK5DPkZ2d7ahs97wl9b6JCLIsJ7XXTg+wFMexc/c+M+fsNKVicSSXlO33UdfNqGRmrdUNcei6EWVODsAEkUA4ooCEgGEYCIfDYIwhMzPDMQE0TUMkEoEkSxCmwMmT9VA1DS2hZhBZdlxEaUE4HIaqqpbE9vvAGEcwGHRswcbGU2hqCoIxIDMzC5qmRZ0ZBtMU0HUdQgioqgpZlqHrOlRFg2laNCiKguPHj0FRNPj9PmRnZ8EwdZw6dQqapiEnJwd5eXlobGxEY2Mj5s+fj/z8fBiGAY/HA8Ziu1yyLEOSODi3FqWqqnjnnXfQr18/DBgwwBlPIivFLhAIJHViZTe32r/29pMkSc4Xy1JBR5wNNzGxiRVOMNzNhG7J1dTU5MRP3SlriW0ktkcUy2qKvxcf77RNALtKfICcwd6qa2xsgilMiKjksJnGPj55sh6zZz+I2tpayLIMTdPQ1NQEXdedeowzZGVmAQBycnJAZJkoPXr0QHp6OoLBIEzThM9n5RvIsoSIEkZ6eho8Hg80TYPX60VamnWel5eHhoYGpKenQ5IkhEIhqOohFBcXIycnJzbBsozCwkL4fD4oimJJraIAsrNz4PP5Ye3pS45zJEkcPr8VAvP7/UhL88Pr9eGFF/6Empoa3Hnnnbj++olYu3YtGhoaQGS1EQgEsG/fPpw8eRKBQDGEENiy5WP87W9/wxNPPIGCgvy4eQ2Hw+jXr1+c9HS2GVMFMO2VKEkSDMOIC7K22itHvOp0B0bt+slVq4VHiHhVKoSA1+tFQUGBs1j8fr8TL0zEbdl5FlNL3LI7TUMAjDl2DWOx/WBbHbsD5DY1gggggHHANK0bffv2wayZs9C/X3+cOHkMfr8Pfr8/ypQMGRkZuPXWydA03ckosifa67XsKb/fj6ysDAAMaWlpkCQJQgAZGenIyEh3JJrtVHHOIciAz+cFYO17W5sZiDISj3r/zBk3m8FiAkZEzQjLBHLmD3aOAYvakwnfEnLZwkRWfu377/8XFi5ciNtum4709DSMHz8eb731FnRdB+cMP/vZz/CLX/wCDz44B7fddhvq6uqwZMkSTJ8+HZMm3ehEKzjn2LBhA4qKilBRUdFK8xBR65CQe7J9Pp8jpeyOusEtYd3XEhnXXWz70Dao3c8ZhhENB0l45JFHUFlZCV3XEQwGQUQIh8NQFAUtLS1R1RFT7ZpqgIjBMHQYhgFZtlSLqqpRNclhGDoABs4ZFEWFoiiIRCLWhEsSAIZQqAUtLS2QZdlZjMeOHcfgwYPxySdb8cqrL6OhocFZIJIMZGVn4N9umuSozfi+2cnRiQsjJqGFIHh9MgACZxwEe5x8zmRZQfOYULCZysZDjhS3J1dEnQyLka15ZI75YDtjBAK3CbPItfolMee5zz/fhXHjxmHGjJ84i/H666/HsmXL8NZbKzBlyq0YPrwCb775JlavXo0333wDn3zyd2RlZeGOO26HLMtOTLKmZicWLVqEX/7yl+jRo0fc/CdNyHCDrRJCoRYYhuWJRyKRGBNEvz1prU7Z8TojEctGcdRWVJIpigJN0yBxj2NEB4PNaGhoAJc40tPS0BwKIRhscj50umPHDng8HqxatQrBYBDz5lXB5/Pi8OEjyM3tAdM0owF2hubmFhi6gKJEoKoa0tL84FxCJBJBsDkIkHCYXpJlaJoKEbW5rD54wLnl5CEq6Vh0sOwtVwDgEkNubi5KSkqikxvv0FhSK6b6GbMle2xRuhcsY4hmCdnBeAFhCsSysazdIyGE8xqIjdfGYTO2EIRt27bho48+gmEYuO6661BefhGamoJYsWIFhg4diuHDL8bKlW8jIyMdN9xwg5UiCIpZ1oyBIRYdkCQJ11xzNa655mpnXqxoQC/MmzcPixYtQnNzM+6++y706XMefv7zn4Nzhk2bNmHmzFm4//4HUFJSgrFjxyI3NwePPfYYpk2bhqlTpzpCLTGS4nwK0J0atmXLVjy37P/GSUArGOuHz+eFx+NxdjUURUFubi7y8vIsppMkpKX5kZGZgebmZgghkJ2dhezsbPh8Png8HmRmZkLTNLS0tCDNnwbZI0OWPUhPTweRpbozMjJAgsAlHpXY5Kxi0xTw+32QJNnxRokETKE5tNkmRGIYyR7UZIORuGJtSDRb3Ko/8TgZJJobsevW4t669RMMGzbU8UgtBmYwTQOvvfY6lixZguXLl+P3v/896uvr8dvf/hYHDuzHxIkT8cUXX6C5uRkjRozA2LFXoqpqHiZPngzTNPHEE0+gunonXn75ZYwZMwZ/+MNz2LBhI9LSfJg9eza8Xi/sgHh7u2WpxsTti6TCkYr5ko1vK+/bnpDRoy/FsKHDwBh3xDiAqGcVe2Erpi5YtEEr1mGHTGy7xHY6rHNypIDbBjJNEcXrfvclZhNGrziTyRghfuysyUxkEnvBJXOQkp0ng1TPflsgImza9CHuv/9+TJkyBQ8//LBrfx9OfLJXr14oLS1Bjx49UF9fj/3792Px4sW48sof4j//cz2++eYbFBUV4dixYxg6dJizIzZq1Gi8+eZbCAaDYIzhoYceRiAQwJ/+9Dz8fn+r/MauQEfGprPt8LjtHcdBYcjMykB6hh9+vx/+NB/8aT5LSno9kD0yJFmCJEuWlPNI4BLAo68teDwyOGeQZYupLfSWUc45AUwAzASXCAQDYAKcC4DF7ydbzGvbYtHnYIAxaxeGRZ/j3E6OjbePY3ZsbOAS34JMHOBUg+vGcboKQGhsbISqqvjBD37gpOq5aRBC4KuvvsLvfvcYVq1aheLiYlx8cQUyMzPBOUN5eXk05KNFnQ7LHLA0iGXH2er/sssuw7Fjx/DZZ585C9X+7XofWktF9z17zBMFRVuFu5HZjCnLEji3JByLdpJzFhfSc9vG9kDa9lHShrh9n4MzCQwcjHErWByVkDyKI1ZSMYgtcQGweFqSMVkisyUOWqrzVMx7uoAIGDRoEAoLCzFmzGh4vR7HubAcEw6v14PevXvjwQd/iTVr1qCmpgZ1df+Ex+OBrhuQJCtC0rt3b+Tm5qKmZheEIGiajurqnRg4cCDy8/MRiURQUVGByZMn4ze/+Q2+/PLL05Y47V7oqa53Zgzjthk7pspan8erTCBZkNq9g2JLCWYHy50/8VuBrcgh+6KLwVz0x3C76Utt57klqruu+1pHcHUVGGOOna0oqvMuUEtLGJxzpKX5YRgm0tPTkZWVhcOHjyAUCiEtzY9QKITHH38cJ06cQH19PQDC7Nmz8fTTT+Prr79GS0sL3nvvPTz99FM4fPgwIpEI9u3bh5kz78HGjRswa9YsvPbaa05CxLfpQ7Jj97l7rDsC0qOPPvrbzthMyerEEwYk3zmxY2QcAAeIRY+jTOYwXGz3pnVTvFWxQid26bzN2NagtlW3K88nq9PSEsbKlStx4MABlJdfhM2bt2DevHnYt28fxo69AosXL8auXbuwf/8BvPbaa7jllpsxadKN6N//AihKBIMHD8KVV16JAQMGoLJyBIYMGYKjR4+Bc4677roLo0dbScIjR47EFVdcht69SzBixHD0798fffv2RXp6ertZQl3tW1fnossf4nffby1t3NuC7gA1g3sfOxkut7SMJ8cKtbRHT6KUa0tSJqc9kZ7UbbX1fLK2WuOw0s22b/8MXq8HF110EQ4dOoS6ujoMGjQIpaUl2LNnLyTJyrgxDBN9+pwHr9cLd0KLRUMsAcLegAAQdTitY3vrkbGY82HbfJ3pe0fHJ9Hm7OhcdBNTtt1wItEdaauj9HyfmLItes7EXKRq77tmyrhXbE+P+u5eddlene+b+k51/0zMRWfaO5Nzce5flpyDsw7OMeU5OOvgHFOeg7MOzjHlOTjroNv+i217uNo77wiOVPc7i+tM9/1so6c756Irdf8fMEGxQQdKpbsAAAAASUVORK5CYII=)
Chemistry-General
Chemistry-
,Rate of reaction to ward Beck man n rearrangement when 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)
,Rate of reaction to ward Beck man n rearrangement when ![](data:image/png;base64,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)
Chemistry-General
Maths-
r is the radius of a circle whose centre is the origin. If the circle does not intersect the hyperbola xy=1, then the range of r is the interval
r is the radius of a circle whose centre is the origin. If the circle does not intersect the hyperbola xy=1, then the range of r is the interval
Maths-General
Maths-
A ray emanating from the point (5,0) is incident on the hyperbola
at the point P with abscissa 8. The equation of the reflected ray after first reflection is (P lies in first quadrant)
A ray emanating from the point (5,0) is incident on the hyperbola
at the point P with abscissa 8. The equation of the reflected ray after first reflection is (P lies in first quadrant)
Maths-General
Maths-
Let and
be the points of a rectangular hyperbola
which subtends at another point R ' of the given hyperbola, if ' s ' be the mid polint of PQ and '
centre of the hyperbola then area of the
is equal to
Let and
be the points of a rectangular hyperbola
which subtends at another point R ' of the given hyperbola, if ' s ' be the mid polint of PQ and '
centre of the hyperbola then area of the
is equal to
Maths-General
Maths-
Statement 1: The number of triangles that can be formed with sides of length a,b,c where a,b,c are integers such that
is 64 and
Statement 2: In a triangle the longest sides is less than the sum of the other two sides.
Statement 1: The number of triangles that can be formed with sides of length a,b,c where a,b,c are integers such that
is 64 and
Statement 2: In a triangle the longest sides is less than the sum of the other two sides.
Maths-General
Maths-
Number of quadrilaterals which can be constructed by joining the vertices of a convex polygon of 20 sides if none of the side of the polygon is also the side of the quadrilateral
Number of quadrilaterals which can be constructed by joining the vertices of a convex polygon of 20 sides if none of the side of the polygon is also the side of the quadrilateral
Maths-General
Maths-
Number of positive integers that are divisors of atleast one of the numbers
is
Number of positive integers that are divisors of atleast one of the numbers
is
Maths-General
Maths-
Let m denote the number of four digit numbers such that the left most digit is odd, the second digit is even and all four digits are different and n denotes the number of four digit numbers such that the left most digit is even, an odd second digit and all four different digits. If m = nk then the value of k equals
Let m denote the number of four digit numbers such that the left most digit is odd, the second digit is even and all four digits are different and n denotes the number of four digit numbers such that the left most digit is even, an odd second digit and all four different digits. If m = nk then the value of k equals
Maths-General
Maths-
If f(x) is a real valued function discontinuous at all integral points lying in [0,n] and if
then number of functions f(x) are
If f(x) is a real valued function discontinuous at all integral points lying in [0,n] and if
then number of functions f(x) are
Maths-General
Maths-
Number of positive integers that are divisiors of atleast one of the numbers
is
Number of positive integers that are divisiors of atleast one of the numbers
is
Maths-General
Maths-
Find the eccentricity of the conic formed by the locus of the point of intersection of the lines
and ![square root of 3 kx plus ky minus 4 square root of 3 equals 0](data:image/png;base64,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)
Find the eccentricity of the conic formed by the locus of the point of intersection of the lines
and ![square root of 3 kx plus ky minus 4 square root of 3 equals 0](data:image/png;base64,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)
Maths-General