Question
Find the probability of getting a number less than 5 in a single throw of a die
The correct answer is: ![2 over 3](data:image/png;base64,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)
To find the probability of finding a number less than 5
Numbers less than 5 are {1,2,3,4}
Die ={1,2,3,4,5,6}
Hence probability is 4/6=2/3
Hence option 2 is correct
Related Questions to study
In the spinner shown, pointer can land on any of three parts of the same size. So there are three outcomes. What part of the whole is coloured?
![](data:image/png;base64,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)
So here we used the concept of fractions to understand the question. The numerical numbers that make up a fraction of the whole are called fractions. A whole can be a single item or a collection of items. When anything or a number is divided into equal parts, each piece represents a portion of the total. So the fraction in this question is 1/3.
In the spinner shown, pointer can land on any of three parts of the same size. So there are three outcomes. What part of the whole is coloured?
![](data:image/png;base64,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)
So here we used the concept of fractions to understand the question. The numerical numbers that make up a fraction of the whole are called fractions. A whole can be a single item or a collection of items. When anything or a number is divided into equal parts, each piece represents a portion of the total. So the fraction in this question is 1/3.
A box contains 4 packs of chocolates. Anusha picks out a pack at random. What is the probability that she picks
A) Perk?
B) Kitkat?
![](data:image/png;base64,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)
Here we used the concept of probability to find the answer using events. A set of results from an experiment might be referred to as a probability event. In other words, a probability definition of an event is the subset of the relevant sample space. So the probabilities are .
A box contains 4 packs of chocolates. Anusha picks out a pack at random. What is the probability that she picks
A) Perk?
B) Kitkat?
![](data:image/png;base64,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)
Here we used the concept of probability to find the answer using events. A set of results from an experiment might be referred to as a probability event. In other words, a probability definition of an event is the subset of the relevant sample space. So the probabilities are .
In which class interval of wages there are less number of workers?
Hence option 4 is correct
In which class interval of wages there are less number of workers?
Hence option 4 is correct
What is the size of the class?
Hence option 1 is correct
What is the size of the class?
Hence option 1 is correct
What is the lowest value of rainfall?
Hence option 3 is corrrect
What is the lowest value of rainfall?
Hence option 3 is corrrect
In a Parallelogram the diagonals intersect at O. If
then AC is
Hence option 4 is correct
In a Parallelogram the diagonals intersect at O. If
then AC is
Hence option 4 is correct
ABCD is a Parallelogram. If ![](data:image/png;base64,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)
ABCD is a Parallelogram. If ![](data:image/png;base64,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)
ABCD is a Quadrilateral in which ![](data:image/png;base64,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)
ABCD is a Quadrilateral in which ![](data:image/png;base64,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)
PQRS is a Quadrilateral in which ![](data:image/png;base64,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)
PQRS is a Quadrilateral in which ![](data:image/png;base64,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)
PQRS is a Quadrilateral in which ![](data:image/png;base64,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)
So here we used the concept of a quadrilateral to understand the question. It is basically 4 sided shape that can take any figure. We also used the angle sum property of a quadrilateral which is 360 degrees. So here the angle R + S is 180 degrees.
PQRS is a Quadrilateral in which ![](data:image/png;base64,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)
So here we used the concept of a quadrilateral to understand the question. It is basically 4 sided shape that can take any figure. We also used the angle sum property of a quadrilateral which is 360 degrees. So here the angle R + S is 180 degrees.
ABCD is a Quadrilateral in which ![](data:image/png;base64,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)
ABCD is a Quadrilateral in which ![](data:image/png;base64,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)
The diagonals of a Rectangle ABCD meet at O. If ![angle B O C equals 44 to the power of ring operator end exponent blank t h e n blank angle O A D equals](data:image/png;base64,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)
Hence option 2 is correct
The diagonals of a Rectangle ABCD meet at O. If ![angle B O C equals 44 to the power of ring operator end exponent blank t h e n blank angle O A D equals](data:image/png;base64,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)
Hence option 2 is correct
A Square of side 4 units is combined with two right angled triangles of bases each 3units to form a Trapezium (as shown in figure). Then perimeter of the Trapezium is
![](data:image/png;base64,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)
Therefore, the perimeter of trapezium is 24 units.
A Square of side 4 units is combined with two right angled triangles of bases each 3units to form a Trapezium (as shown in figure). Then perimeter of the Trapezium is
![](data:image/png;base64,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)
Therefore, the perimeter of trapezium is 24 units.
In the figure, ABCD is a kite with AB = AD, BC = CD and
O. If
then a – b + c – d + e – f =
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJMAAACeCAYAAAA2ezjLAAAgAElEQVR4nO2deVzN2f/HX5UklfYVUVnzpaIaW8byte87DfPLWqQxliFjZ6wTvmOZhLJMRtI3shVaMJaSJUpoEUmLilbd/f37I/V13Vvd6ta91ef5ePjD55zPOe97e92zvM/7nKNARAQGBimgKGsDGBoPjJgYpAYjJgapwYiJQWowYmKQGoyYGKQGIyYGqcGIiUFqMGKqFp/xPvUDBLI2Q05hxFQNBO98sWjq74hky9oS+YQRk8TwEHfqHB4mnoFXcL6sjZFLGDFJSvFN/J0+CQec1HHp6Fm8Z/o6ERgxSYQAWRcugDPMEePnzUbHO8dwPJ4na6PkDkZMksBPxOnrzTDQ+jOytUdgos1LnDp6FyxZ2yVnMGKSAHakLx5rdERueAhCrj2DXr8+KPT3wqWPsrZMvmgmawPkHkE2Lp4twPjNWzFV98szdke8+O9YHPZ9jUk/mUNJpgbKD0zLVBmCbDw4+jM2huYgOyEd/C+Pi9/mgav+Gbd2ueK3q0n4LFMj5QcFJtKSQVowLROD1GDExCA1GDFVExaLcQhUBCOmanDw4EGoqanh7du3sjZFLmHEJCEFBQXYtWsXBAIB1qxZI2tz5BJGTBKycuVKDBs2DAAQFhaGwMBAGVskhxBDlVy7do1MTU0pKyuLANCZM2dIT0+PMjIyZG2aXMGIqQry8/PJ1NSUrl27Rjwej65cuUIsFosWL15MI0eOJIFAIGsT5QbGaVkFzs7OICIcOXJE6Pnnz5/Rs2dP/Pzzz3BxcZGRdXKGjMUs11y/fp1MTU0pPz9fbHp0dDRpamrSq1ev6tky+YQRUwWUdW8hISGV5tu6dSvZ2dkRh8OpJ8vkF2Y2VwG//PILhg4diuHDh5c/4/F48PHxQUlJSfkzd3d3NGvWDNu2bZOFmfKFrNUsj9y4cYPatGlDeXl5Qs9LSkoIAH348EHoeVJSEmlpaVFkZGR9mil3MC3TNxQUFGD+/Pk4cuQINDU1JXrHwsICHh4emDVrFoqLi+vYQvmFmc19g4uLC7hcLry9vUXSWCwWVFVV8eHDB+jr6wulEREmTpwIPT09HDt2rL7MlSuYlukrQkNDcenSJXh4eIhNV1BQgL29PQoLC8Wmff/99zhx4gQuXrxY16bKJzLuZuWGgoICateuHU2dOpXs7e3pwoULxOfzy9MzMzNp3LhxZGtrS/r6+nT48GHi8XhERMRiscjZ2ZnatGlDe/fuJUNDQ5FxVVOA6ea+4OLiAjabDR8fH1y7dg2bNm2ChoYGsrKyAAC6urqwtrbGrl27EBsbi4ULF0JBQQFWVlZIS0sDl8uFn58fDAwM4OLigqysLAQGBkJBQUHGn6z+YMSE0u7NyckJcXFx0NLSAlA6BoqMjMTHj6VbUHR0dNCnT5/yd/h8Pjw9PcHhcGBjYwMHBwc0a1a6P6O4uBg2NjZwd3fH3Llz6/8DyQqZtotyQFn3dvnyZamWGxUVRVpaWpScnCzVcuWZJt8yubi4gMVi4cSJE1XmZbFYaNWqFd6/fy8ymxPH5s2bcePGDdy6dQtKSo1/Q1STns2Vzd727dsn8TtcLlfivGvXrgWPx8Pu3btrYl7DQ9ZNo6wo694uXrwo8TsVecArIyEhgbS0tOjRo0c1MbNB0WRbplWrVmHAgAEYO3ZsndbTsWNH7Ny5E7NmzRJa02uUyFrNsiA0NJRMTEwoNze3Wu8JBAJKS0sr9y+Vwf3wmM5uW0kH77OJqJBe379OoTEZxP7qvTFjxtBPP/0knQ8gpzS5lqmwsBDz5s3D4cOHoV4Uh5N7tmHXkWtIElpS4+Pd/QsIOHcO5wKCEJVeujG8+E0U4l/mIJv/9WBagPycRISfPoX7GZ9xb5MrTrAtwPVxhKNPCvgo9Y4fO3YMfn5+uHHjRj1+2vqlyYlp1apVcHBwwKgeefjJzRuxH7MRtX8G+oz7A8+/HLkkyA7EjpXb8buHB/YcCkOakgJY9zbB9QQbFlwfODr6IKXs4AEoQrezA/5lrATwE3E9JBtGXdpj8BQrJF+PQtmJhYaGhjh69CicnJzKfVeNjSZ1CkpYWBiCgoIQF/cM2Y/uYpbvSfTXAATOnTHS+gTOJyxBN0tC3PFbaO/5D/7sofLlTR6eeYYg22gR2g+eAqs1hxDFnovW2WE4GfAEeQLgVb4AUDKFvU0Ojge/xzRNRdgP7w2Vr+ofN24cLl26hEWLFsHPz6/xecdl3c/WF2WztwsXLogmsq7Sgs4TyCeLT1QYQq4dVUhRxZB6/bCX/vlQuj6Xd8WFek06Sk7zR9GSOX9S8vtAmj/UhS5m8YmfFUCz2+rTD4ElRNx0enDBn4Ii31CJGDsKCwvJwsKCfH196/YDy4AmI6ZFixaRo6Oj2DT2/TU0evFV+lT+pITSo07RMgdD0hm4h55ziYi49PoffwJAj1Iz6MWOftRx0Q1iERHx0+ngv41LxSQB9+7dIx0dHXr79m2tP5c80STGTOHh4Th//jz2798vmsh7ieOnFeG6aTi0yh+2gLH9bOwNOo4p6X/DL44HoBmMbUvdCG1b8PDmdSo4gpotHvTp0weurq74v//7PwgElZ+0Ki7cRV5pdGLicrlwdXVFdnY2gNI/xty5c+Hp6QldXV3hzIJP+OdPP7RctB4j9cV8FdqDMHaANkjkLFRlWFp3Qf6NMwjOEgDggMPlgsuR/Aje9evXo6ioqELvO4/Hw44dO2BjY1Mtr7ssaXRiKlu5HzVqFAoLC7F69Wr07dsXEyZM+CZnIaJ9DuJl72WYbakCsN/g7v3X4EMAfpkmeClIUhmMCT1Ky1RSUsK6devQsqU6TOftx4F/v8TKgf/GbHcfPGFp4tPjK4iXsCFRVlaGr68vtm3bhtjYWKG02NhY9O7dG7dv30ZERASUlZVr8Y3UI7LuZ+sCHo9H06dPJxsbGzIwMKDs7OxvchTTg50DyUBVg7S1tUlbW5u01NvSnKACKgicTe3MBtF89w20bs12OveCVae2Hjp0iLp3704sFos4HA5t2bKF9PX1ycfHp8HtFm60UQMfP35E69atYWNjg3/++acaq/ZsfHj1AhlKrdGlg77Q1L4uICKMHj0a+vr6iI2NhbGxMby8vNCmTZs6rln6NLpuroz169dj1KhR4PF4WLJkCST/zajAoLM1rOpBSEDpGM/S0hJ//fUXhg8fjsuXLzdIIQFonN1cWFhYeRz2hw8fqHPnzrRx48Zal8vn8yk+Pp64XK4UrCR6/PgxWVlZ0ZgxY+jYsWNkamoqslevIdHoxFRYWEjt27engICA8mdv3ryh1q1b08GDB2tVdk1CUCri77//JgMDA/rrr7/Kx0Zz5syh2bNn17psWdHoxLR48WKaNm2ayPO4uDhq27YtZWVl1bhsaYopNTWV0tPThZ4VFBSQmZkZ+fv717p8WdCoxBQeHk4GBgYV/rE/f/5cq/KlKaaKuHPnDunp6VFaWlqd1VFXNJoBeFFREebOnYuDBw9WGJ+tqqpa63r09PTqdIG2X79+WLhwIebOnVuld1zeaDSugSVLliArKwvnzp2TtSm1hsPhoE+fPnBycoKbm5uszZEcWTeN0iA8PJz09fVrNR6SN+Lj40lHR4eeP38ua1MkpsGLqWz2dvbsWVmbInUOHDhAPXv2JDabXXVmOaDBd3NLlixBZmYmzp071+iCzYgII0eORK9evRrGYWIyFnOtCA8PJz09PcrMzKyX+lgsFg0YMIA+ffpUdWYp8f79ezIwMKA7d+7UW501pcGKqbCwkMzMzOjMmTP1Vmd9uAbEERAQQObm5lRQUFCv9VaXBusacHd3h7W1NaZPny5B7iKkRN5A2NNMcOrcMilQlILIG2Hltk6ePBn9+/fHsmXLZGpWVTRIMd28eRNnz56Fp6enBOMkltjtR3IL6x42uZ4A24IrZOv+/fsRFhaGCxcuyNS8ymhwYipzTu7fvx+GhoZVv8BLqHD7UXVRVlZGQEAAWrVqVcMSqoaXcB0h2Ubo0n6wkK2ampo4depU+dlP8kiD2+q0Zs0aWFlZYcaMGWJSBfj0xB+nwt6jsIAFi0lLMNO6XaXbj6qDkpISJk+eXBvzRWG/RcS5a3iRngVWp6lwHmQPm5zjCH4/TcRWBwcHODk5Yd68ebh06ZL8zV5lPWirDhEREaSrq1vxBTisKzTPbDQdzeVTQZATteu/i17xqMrtRzKD94q8Zs2iAy9YxM89TZMNrGjtQy5x0x/QBf8gsbay2WyytrYmLy+veje3KhqMmIqKisjMzKzy/Wb8HIq5GU2JsVfIZ/0Yat/DnaKkE3pUJ3AfryPbQXsohU9ExKfCzAwq4Ff1VmkEhK6uLiUkJNS1idWiwYyZ3N3d0b17dzg6OlacSZCHF+cPwOtpW4wZZw0dBQBSXCvl8/k4c+aM1K5W5X/6hLysDKTzAEAR6voqYH0S2QojQrdu3bBu3TrMnj0bPF7V+esNWatZEq5evUq6uroi8T/fwr6znLparqC7bKKCUFfq/K9f6E5eMUlrS0CZnykmJobevXtX4b/U1FQqLi6usjx+1l80Sc+IRng8oI/sT/Ts5A7yiZGsKeXz+TRkyBDavHlzbT+W1JB7MRUVFVHLli2pZ8+e9ODBg0rz8nMu00/WranL0Pm0Ye9S+r7td7T47AupjZPKxFTVvz59+kjoTOVRyvnlNMhMizSNbGj6H1EkiVuSy+VSdHQ0rV27lrS1tav8XuoLuReTm5sbDRs2jDZt2kQGBgY0dOhQevz4sUxskdQD7ujoWGee+by8PJo0aRKZmprSvHnzaM+ePdSpUycqKiqqk/qqg1yL6ebNm6Sjo0Pv378notI/poeHB7Vr106ibkTasNlsGjJkSJVrc3UlpuzsbOrZsyctW7ZMaE/dDz/8QIsXL5Z6fdVFbsVUVFRE5ubmdPLkSaHnAoGARo8eTTdv3pSRZVVTF2LKycmhrl27igiJiOjTp09kampKV69elWqd1UVuZ3Nr1qyBpaUlZs+eLfRcQUEBLVu2RHx8vIwskw0ZGRlo1aoVPDw8RJyVWlpaOHnyJObPn4+cnBwZWSinHvBbt27B19cXcXFxYr28nTt3brSnr1VEt27d8Pr1a6SkpMDCwkIkfeDAgZg5cyacnZ0REBAg5nsrQtI/YYjJ4oBIAQqKSmiupoPWnXrAylxbKkKQu5apuLgYc+fOxb59+2BiYiI2D4vFktv1qbpCQUEBgwYNQkRERIV5tm3bhsTERJw6dUpMqjo69LVG+p9z4HbqNVrq60Ht8wv4/9QPnR3c4OB2Fkm1DKmos5apKOk2wmI+gEMEKChAsVlL6JlZw87KBC0ree/XX39Fly5d8OOPP9aVaTWGxWLB0NAQycnJ0NPTq/f6Bw8ejPDwcMyfP19suoqKCk6fPo3BgwdjwIABMDMzE86gZAjTNmpQ07TDkAEOUIEDhowfDasf+uLihROYoWOOu5vtarx2WWdiUu/QFz0uD8O/PAxxMHgbHOgtbh+ZhoXPvseh81vxb13RRtHf3x8+Pj44c+YMoqOjYWxsjLZt2wrlSUpKgpqaGlRUVPDgwQO0a9dOJHogJiYGHM7/fmYdOnSAjo6OUJ4HDx4I/d/Gxkbo6BoOh4OYmJjy/ysoKKB79+4oKCgoP7fg48ePSEpKKs+joaGBrl27CpWbmZmJ1NTU8v/r6uqKdFNJSUlC3baRkRFMTU2F8sTHx0NXVxdpaWl48OABOnbsCG1tbbGf+8cff8SePXuwa9cuqKmpoVKU2mKa+xxYBl7Ed95HEL7GDiNbVP5KhdTl6L4kcBYZmC+h8DIXNDuSVlu2pH67E4knJr+hoSGpqKiQkZERGRkZ0bZt20TyODs7U8uWLUlXV5eMjIzI29tbJE+vXr3KyzAyMqIrV66I5DExMRHK8+2xO5mZmULpbdq0EfEzXb58WSjPxIkTiYjoyZMn5e6Mo0ePCuURN4VfuHChUJ4tW7aI5Bk3bhxpa2uXf+7g4GCRPHZ2dmRkZESampqkqKhI9+/f/yZHCZ2fbUDmS8KFVwWK/anYfzppNh9Ae1IkWBysgLoV0/nZwmIqvEoLTNVp8P43JM7kjIwMat++fZVT3NGjR8tkC7WswnaJSr3eXbt2pdOnT1ea79GjR9SqVSu6ffu2mNQKxFToS4W+E0m9xTA6nFVzMdX5bI7youG7YzvuKeQh4cZ/Ed3bA37z2okd+RsZGcHf3x/jx49HVFSUSBdXhq6uLt69e1e3houhefPmSExMFOky64MjR45AT08PM2fOrDBPVlYWxo8fj927d8PBwUHisj/fv4P7d55A0GM++uvUfE5W52JS0OyJmatWw4H9Fg/b5iHWfRc2+w7A2YVdxVZuZ2eHX3/9FdOmTcOtW7fQvHlzkTza2toyuYdEUVERHTp0qPd6ASA4OBjOzs4VBsRxOBxMnjwZY8aMgbOzc4XlCL451FWQewtb1wYi7K0hFpxahK61UETd+5kUlKCkpAQVbXP0m/sfbL3XERP/OIlHTjvxnahOAACurq64ffs2Vq9eLXKA6Js3b+Dr64vHjx/XibmsjGeIevwGxRoWsP2uGwzq48QvCVBVVUVGRobYNCLCkiVLoKioiD/++KOCEorx+vbfuPgwD7ktj2LTlntQ4+UgMS4NrZwC4WTVAS79dGrlK6pbMQkEEPodCD4hI7MEau3MYVJJzWV3jdja2sLBwQGTJk0qT1u+fDmWLVsmMtupNZzXCFizCv9VHYv54/8FzffX8OvkjTBddgjrhhjK3CHXr18/PHz4UGyap6cnQkJC8PDhQ7EteSlqMB+wACdeLqg7I2s82qqCouRbdNSpCylrWtPU5etp85Z15DZtIPUevZrOp0gWsxMTE0OGhoaUmJhIRERBQUHUoUMHKimRdvBtIUWs6EFmM8/S1+NP7rOt9J3xEPpPfOnck81m0/Tp0yk/P1/K9VdNVFQUDR48mF69eiX0PCIiglq1aiWzSIqvkduF3jKOHj1K1tbWFBoaSrq6uhQaGir1OvhZ3jRWU59mBX4TxsF7STt6tyBztwhikWxnczwej37//XfS19enyMhIIiJKSUkhPT098vPzq3d7xCH3YhIIBDR79mwaMWIERUREVJiv+M0t8t7gTseeirZ6ha/v0/XQGMqo4PwH9u2fqaNKN1rz4Nt3i+nMFHVSGXyA3vOlICZeKt07f478/f3p3IVIev/F2cbLiqKznn/SyesvqfB/VhMVvqb710Mp5ivDT58+TWZmZvThwwfq0aMHrVmzpma21AGyHgpUiYKCAjw9PZGamoq0tLQKcgnA5ucg2t8fj7KFt1hWfLXXV6i0QHNwwWJ/GzBOEAgARdWWaFHrb0qA7MAdWLn9d3h47MGhsDQoKQCCj8FY4eSNZhPmol/yNsz5z1Owv2wcLduM6fNV3LujoyNiY2OxePFitG3bFlu3bq2tYVJD7sUEAGpqajh37hxWrFiB58+fi8mhCO12PWAmcmUFDwnXQ5Bt1KX0aq/k64gSswOzeTcH9NZPR9yzHOH9B7wkvEpRhO2g/tBE6b65FStW1OwEOl4cjt9qD89/ohAVFYmI/ZNhqMhD3IFNuNZhJkYbqcBi+hDw9m6Bf8ZLXA/JLt+MOcUqWaiovXv3IjY2FqdPn5arW8kbhJgAwNLSEnv27MHUqVNRVFQkJocCFABQQQz+2vgzVmz3R2xRM7Szt0FOeDDeF+ZA0X44eoub6qsNh/vGIUj02Y/I8qIFyLp6AEHKS7BtYScooXRHr4eHB9TV1attf1HYERw7tgb27Wwxa98dZAsA8N/hRlg82nTpAmUAUOuEjhqRCI82hr1NDmxywhH8vhA5ivbl5QQFBWHv3r0ICgqCpqZmte2oU2Tdz1aXBQsWkKOjo+hVELwk2t3fiPrO30Ge3v+hxX30yWCcN73hcyn9wQXyD4qkN5VOAosp/uwamjdvOW34bTttWetGC34+RPdyar68IEJJOkWdWkYOhjo0cM9z4rJv08+dtGjKmS8hyNxntKmXGo3wyiHippdvxoz8YnhsbCxpamrKPKKyIhqcmEpKSsja2poOHz4snMBLot0OHWhRaOmqE+/VTuqrOYa8q3enc73w8epC6tRrPT0pvkcru2jRVL8yMT2gNf9SpzE+ojHmubm5ZG5uTjt37qxnayWnwXRzZbRo0QLnzp3D+vXrK/WCK7UxhUlzRShKcTu+QCDAzZs3hcJbaoL2oLEYoE3gNTNHJzPgY05+6ViNn4ucAhNYdBCO+OLxeJg+fTrs7e2xatWqWtVdlzQ4MQGl8Ul//vknpk6diry8PLF52E9jkNV/PIZIcVjB4XAwaNAg5OfnV/9lAR//u3ksCSqDJ6BHc32MmvI90h9HowQAPy0WidrjMNVe2Iv9yy+/IDc3F97e3vJ3WMVXNOgzLZcuXYrU1FQEBgZCQaEIUQfdsDW8OWzsLaBQrI6hbovgYCC93wuLxYKqqio+fPhQ4Vnj4inE+R+7Y0XaUEx3MIJCCyv8uHwKuqgA4L3EsfkbkDh0JtpHXUL2JA+sG/i/NbITJ05g1apVePjwofSXkKSNrPvZ2sBms8ne3p727NlTL/XVymnJyqKXT2Io8YO4zepF9P5FPKV+c2rF/fv3SV1dvYLYJPmjQYuJqHRJwcDAgO7evVvndZWUlJCamlq9LKekpaWRsbGx6ERDjmnwYiIiunTpErVt21Yk9Pb58+c0duxYub6HJDc3lyZOnCh0k3hJSQnZ2dmRi4uLDC2rPg1yAP4tY8aMwcyZMzFr1iwIBAIUFBRg5cqV+P777zF06FDJjiuUERoaGujcuTN69eqF4OBgEBEWLlyIFi1aVBKbJKfIWs3SgsPhUL9+/WjSpElkbGxMc+fOFbr+QiAQUEBAgFzcexsYGChyVkJwcDAZGBjQkCFDqE2bNg3y6o5GI6YnT56Qra0tNWvWjA4cOCCUVlBQQFOmTKFOnTrJ/I/E5XJpxIgR1LVrV3ry5IlQmq+vLykqKlKvXr2qPItKHmnwYsrNzaXFixeToaEhHT16lEJCQsjY2Lh8q1F8fDx16dKFJk6cWOugNhaLRZ07d6bc3Nq51fl8Pu3bt480NDTIw8OD+Hw+JSQkkJaWFvn6+tLatWvJ2NiYwsPDa1VPfdNgxcTj8cjLy4sMDAzI1dVV6A+8ceNGGjBgAPn5+ZGmpibt3LlTou6Nn3mf/A5tpqUL3enEk9K7cr+Ohaqxa0BMXBIR0dOnT8nS0pIGDhxIHTp0IHd39/K069evk7GxMf3222/E50txfbAOabBi+vz5M82YMYNiYmJE0lgsFpmampKqqqrkkZm8eNozYT75F7Dp1fE5NMI9lD7d3Ug/brhJycE/0aDJ3vSiqAZiKrlLG3/cQDeTg+mnQZPJ+7Xw9tOioiJq3749KSsrC90rTESUnp5OAwcOpJEjR1JOTo7kdcqIBjubU1VVxZkzZ2BlZSX0PCsrCyNGjICuri5atWol8ZYoQfoNXH2uDJ3mzdHJyQfBO75H6jexUA9qcBr914fET7FKxvVvAqq2b99efkbA4sWL4ezsjOLiYgCAsbExQkNDYWdnJ7KdXS6RtZqlyb1798jExIRcXFyIxWLRrVu3SF9fn1JSUip9j5caSn/+MpLa6fcn59/20PkXpeG7eVdcyG7KcUrNCaTlC30oic2jU6dOVbqhoeD5RTq8ewOtXPU7XXxVTJR3hVzsptDx1BwKXL6QfFL+1zKVdcMvX74kotIt6aNGjaJOnTrRw4cPpfCN1C+NRkyJiYnUqlUrOn78uNDzHTt2kJ2dXZUXAPKeb6XvOn21lZ2IiCSNhfpSxqvD5Op+mbL4fHp/ahKZdHSjsGISiUsiInr8+DGpq6uLnIMgEAjo4MGDpKGhQTt37iQeT9ypDPJJoxETEQl5kcvg8/k0atQocnNzq/Rd8WKqDjyK29KX+izyIh8fH/Lx2kNbNhym22KC67KyssjU1LTS2KS4uDjq0aMHHTlypKYG1TuNSkwVkZOTQ6amppUedlF7MbHpznJLst34lMr3uPC4xP1GS2w2mxwcHGjGjBlVzjBLSkqIw+HU1KB6p8EOwKuDrq4uzp49CxcXFyQkJIjPRAT6dgfyN/B4PPzxxx/4/PmzmNTm6GrfA++8fsa2G29RzM5AxMEjuFkonGvp0qUoKiqSKDapRYsWQmdGyT2yVnN9sm/fPurevTt9/vxZOKHgFV3dMJh01XrRT3/fpdcVHKldpZ+Jn0qX1wynTjrqpG0xhFZdShM6OsjT05P09fXFdseNgQYdHFddiAiTJ0+GtrY2vL29q/1+zYPjgNu3b2PkyJEICQmp1nE3DQoZi7ne+fTpE5mbm4vM+iShph7wN2/ekJ6eXoOKTaoJTU5MRKWnq2lra9OzZ8+q9R6LxaK+ffvSx48fJX6nqKiIrKysGlxsUk1oUt3c13h5eWHfvn2Ijo6GhoZGndRBRJg+fToyMzMRGhpayXE3jYMmKyYiwqxZs8rvkKuLXR/btm2Dl5cXHj58CAMDA6mXL3fIslmUNYWFhdSlSxc6dOiQ1MsOCgoiNTU1evTokdTLlleatJiISrdca2lpUXR0tEgalyt8xI5AICAWi1Wls/H58+ekoaFRZ9eEyStNXkxERCdOnKD27duXD6zfvXtHM2fOpO+++45MTExowIABNGfOHNq+fXv5bI7P51NKSoqIhzo3N5csLCyEYpOaCk12zPQt8+bNQ2ZmJvr27Yvdu3fD0dERGzZsAI/HQ3JyMpKSkpCZmYn169eje/fuSE5ORo8ePZCWlgY3NzcsWLAAGhoaGDVqFJSVlXHx4kW5Ou6mXpC1muWF4uJi6tixI3Xt2pWeP38uNk+Zn+nKlSuUn59PAoGAIiIiaOzYsaShoUELFiygzp07U15eXj1bLx8wYvqKly9fkra2doU7aCtzWnp4eAjFJjVFGDF9g5+fH8iVA/MAAAJuSURBVJmYmIjdxcLn8+nZs2ciA/PIyEhSVVUVe0dLU4IZM4nB1dUVCQkJCAkJqXLck56eDltbWyxduhSrV6+uJwvlE0ZMYmCz2ejXrx/GjBmDTZs2VZiPxWJh4MCBMDMzw99//y3Xx93UB4yYKiAlJQW2trY4c+YMhg0bJpJORJgzZw6ePXuGO3fuoGXLyq5kbCLIsIuVey5cuED6+vrlB19wOBxycnKi/Px82rdvX6OOTaoJjJiqYMWKFdSvXz/icDjlszl/f39q0aJFgzk3qb5gxFQFHA6H+vTpQytXriwXk6amZqOPTaoJcnkVvTyhrKyMs2fPomfPnrCxsQEATJgwodI73ZoqzABcQkJCQpCQkIDg4GD4+vpCV1dX1ibJHYyYGKRGk9jqxFA/MGJikBqMmBikBiMmBqnBuAaqBQ+5CdF4kpiH5u17onfX5sjJUoGJMbOUAjAtk8TwUy/h14njsDLgDZT0dYFX/8WmWSPwf0cSwZO1cXIC0zJJAjsav01dhIezbyF4iQWUAMDeHv3t1LHyeB74YL5IgPEzSUR+gCM6LeBgX0oAHLW+TuEg9U02WrdvjSYW7S0WppurEg5eRMcg36QDLESGRs1hygipHEZMEqCgoAAIBPj2bnEGYRgxVUlzdOtjB520x3icJSonPofDiOwLjJgkQH20O9Y5vMB/fvXHm69uVGW/DsZfIa/BlZ1pckWdDcCTk5NRWFgIS0vLxnH6R/5TnNy0Ht5PlWBu2RHtjPWh13EQZk2xhTbzkwTAzOYYpAjzm2KQGoyYGKQGIyYGqcGIiUFqMGJikBqMmBikBiMmBqnx/5XOAi7Opyr/AAAAAElFTkSuQmCC)
In the figure, ABCD is a kite with AB = AD, BC = CD and
O. If
then a – b + c – d + e – f =
![](data:image/png;base64,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)
Area of square field is
. The length of each side is
Hence option 3 is correct
Area of square field is
. The length of each side is
Hence option 3 is correct