Maths-
General
Easy
Question
Identify the incorrect statement in respect of two square matrices A and B conformable for sum and product.
- tr(A + B) = tr(A) + tr(B)
- tr(
A) =
tr(A), ![alpha](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAwAAAAKCAYAAACALL/6AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAJufgqOgAAAJVJREFUeNpjYEAFwkC8EIh/QGkeJDkQPxRZMRsQHwViLyh7PxBPgcrJA/E5NMMZaoG4EolvAMR3oeylQGyLruExmhNA4CAQuwHxNHTFxkB8mAETJAPxcSwGgT2zHIuGhVB/YYAgIF6HJjYbiBOhNquga+AD4vtArAbEgkA8H4hnQuW2QQMEA8hDg/IcWnjHA/ElBnIBAHRLGk6b6b/RAAAAT3RFWHRNYXRoTUwAPG1hdGggeG1sbnM9Imh0dHA6Ly93d3cudzMub3JnLzE5OTgvTWF0aC9NYXRoTUwiPjxtaT4mI3gzQjE7PC9taT48L21hdGg+O57raQAAAABJRU5ErkJggg==)
R
- tr(AT) = tr(A)
- tr(AB) ≠ tr(BA)
Hint:
check whether the properties of matrices match with those given in the options. you can also assume a matrix and do the operations and then verify whether the properties are correct.
The correct answer is: tr(AB) ≠ tr(BA)
tr(AB) ≠ tr(BA)
tr( A+ B) = tr(A) + tr(B )
tr(aA) = a x tr(A), a c R
tr(AT) = tr(A)
tr( AB)= tr(BA)
these properties are correct.
trace of a matrix is the sum of the diagonal elements of a matrix.
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maths-
Section-wise expenditure of a State Govt. is shown in the given figure. The expenditure incurred on transport is
![](data:image/png;base64,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)
Section-wise expenditure of a State Govt. is shown in the given figure. The expenditure incurred on transport is
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAMcAAADJCAYAAACXDya2AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAFnISURBVHhe7b0FWNTb2v5/rt//fd9Te59ddieYYHdtW1FRQexAJEWQDmkQxCSkS0XFQhAQxAIUUAkpke4U6S69/2t9me3RLSDoDAzu+ZyLfZw1o8DMutd6nrWe+Bt48ODRLjxx8ODRATxx8ODRATxx8ODRATxx8ODRATxx8ODRATxx8ODRATxxfCVNTU2orKlERXUFCouKkZWZxXxlZGR8+HNeXh7zPH1dfV0t8P4962/z6AvwxNEBtbXVKCosREpSCoIfB8Pd3R2mJ47j6OHDkJM7jD1790J46xaIiIpi62ZRrF6+BmtXroXIxq1Yv2odVi1bBaG1QhAVE8PmrVuxZ/duHJGRxVF5eRjo68HJ2QEB9wOR8CoB+Xm5qKyqREvrO9Z358EN8MRBeP/+HQoKihF47z5srM5DXV0N+w/swuo1qzF92gxMnDIZc2bPwZJFi7Bm7VpsJaLYTcRxQEIcUlIy0NDSgPYxLRgaGsHWxgaG+kbQ1tKElrYmZOXlsF/8IBHTfoiQv7d+3RosW7aC/LvTwMc3AVMmT8bvS5dix67tUDiiiHOnz8HHxxvpWVloamll/YQ8eoO/rDjevnmLiBcRsHdywv59+zBVYDLG8vGBbwwfZs6YiY3Cm6F0VAnnbU/Cy9sbT0NfIDU5BSWlpaipqkZzSwvz79C1/j35X0fQZ+hXM5no1TXV5O+/RUpGDiIioxDgGwgHGweoqKlDlOxAc+fNA//4CRg9ciTGjx+PTZs34/TpMwgLe4Li4mLm3+PRc/x1xEHs/aysDLhfvoIjR+SxeMES9B84AP0H9MOCeQtwVEEBly9fReKrZGbyt/Twqt1KTKqGhgakpWbgxrUbUFFRxYoVyzFs2BD89uuP5GecB1kpKbi6OCPpdRLe8XYVjvPdi6PsTQm8vO5AUloS/HzjMHDAAAgITMeB/eJwveiMmLiXKC+rYL2au6gjTnxKchJuXLkCGRkZzJ07DyOHD8O4seOJD7MHly64Iz8nh/VqHuzmuxNHeWUlCoqK8CTkEbH7tTGfTKhBZIeYPnMWeXwMD+8/QmlpJevVfYvG5gZERbyAqelxLF68EEOGDMLU6dOgIK8Efz9fFOQVsF7Jgx18V+J49iwMYtvEGId3quAUCM4UhIzcYXjf9kRxYSHrVd8HFRUVCHz0CCqqalg0dz5GjBmFRUsWw9hQF/ExUXj/rs0n4vH1fBfiSHiViBPGxzFDcBr+9re/YdzoscSRdkBySjJa333ftjk9DMjKTMdVYnrJyshCgOwkU6dNgYryUYQ+C0dzazPrlTy6S98VB5n0sdGR0NJUg6CgIPEjpkBRXoE5eZpHTKmI57GsF/51qK9vRvizaKhraBAzcg4mTp4C2cOyCAkJQUszTyTdpU+KIy46FkpKyhjPP55MAH6oaKni6YsXaGlqwYvISMyaPRfmJqbklX/NG+mW5hbEv0wkJpYJZk2fiVGjx+Cg+EEEBYUQc4t3S99V+pQ4it+8wTkrS0yaPBFjx47HkSPKiImN+eQDr6quhYTEIaxasQz5+bms0b8uqUkpMDYwxiR+fgwcNASamprIys5kPcujM/qEOBobGuDv64e164UwdMhgHNy/Hy9fxrCe/RzPWzcxaSIfLrlfYo3wSHr9CuqaGhg6dDDmzJ2BCxcuMCErPDqG68WRGJsABTl5DCOr3pIly3DL0xNN9Q2sZ9unqCAfq9euxs7de9DQWM8a5S5o4GJ6RiayczJRW1/fYzGJQY8fYouIKFlkhmP37l0Ie/qEMUd5fA7XiqO0rAxWNtaYMnkq+Pkn4oTZCRQVFrGe7Zz3ZKadtbbCWL7xCAsPY41yD1XlVczvQ4MWxcREcP3mTYSGPkFtZc9cRlbXNsDezhGzps0iPttEGBgZIa8gj/Usjz/gSnHEx77CJuGt6NdvAPaK70VEZPdPnmgYyCT+SVBXU2ONcA9uTs6QkZImovDAnp174XHJAwpHDuPe3Xs9eoSQkZEDNQ0NDB8xFEsWL0FwyBPWMzwoXCaO9/C8cQsCZLeYNHUqrrhfQGtLE+u57kFjlZQUFTFhwjgUFr5hjXIHqhrquHTJnYn10iIOcmlZNU6amcPB3hHveviEjd4CBT54iGVLl2DQoP6wtrZGU/PXveffG1wjjvKKSujo6uDX/r9gi/BmxL2MZz3z9YQTk6pfv59ha+PEGuEOAvwDsF1MjOyKEpCXl8btO7ewf/9eBPjdYb2i58nMzYKkjAx+/PGf2L93P9LSs1jP/HXhCnHEx8dDSEgY/X7pBx1tPZS+LWM9823QKNd1GzZg2vSpqK/r3InvKerr65AQnwgb2/NYtHAhFi5ZjA3r1+HU2bMor65mvap3oPkjNnbWGDJoEObOmYdH9x+ynvlr0qviaG1+j5u3b2HGDAFMnDgRHleusv2S6sq16/if//07bt3yZI30LiFPHuOI/GEikgbU1tYgMSUZmRnZaOaiG+yHIUFMiPz4cXywdbBFbXUV65m/Fr0mjubGBjg7uWA8Pz+EhTchMjKS9Qx7qaiqxGQiPLFtW9DU1Mga7T1ue3tjyaKl8PPzQ3V1Lbj1wjo1JR3i4gcxZuwo6OrroKqcO8P6OUmviKO+thZnTpljHN9oHDx4EPkF+axnOMOpU6cxeMhgRDznjAC7Q2joc+zauQdioiJQUlGFoaEJrl3zwNsS7jo0oJSVl+OYjgZGEoEcPaqI4jffV2Tzl+hxcdQTu/qYlhaGDB8IVTUNFBaUsp7hHFlZORg3dgz5oLXQWUorp2lubkF6ejpi42IR9iyUSb+1OmcFyzNWSCbj3EhVbRXMTpzAsOFDsH+/OPLzu3bX9D3Qo+IoryjFYXlJ/PDbzzDQN0BVTc85yXKHFTBz9jRkZPVeXNGbN8UwOW5MzBVxGBkZ4JL7BTx4/BDJia9RV9/Yi7LtnObGRtg7OmPggMHYJCSEjIy/xklWj4mjkGzJ27eL4Z//+hcsLa3R2tSzDuj9ByEYM2IMXKwdWSM9T1NjPV69ToDPHV+yY1hix/ZtmDZLEE5OTmhu4v67BW8vHwzsPxizZ89BUlISa/T7pUfEUfSmCJu3bsb//e//wd39Cmu0Z6murMaWTZshvFEIb4u5wzSob2jCMT093Lx+gzXC/QSFhGDk+NFkF56NZ+GhTOGK7xWOi6PybRn279uPH3/4AdeuX2ON9g6uF13AN3Uy/HzvsUZ6jibib9y54w97Wxs8fvgQebk5TAi+kuIRXHBzZb2qb/Ak+An+8c+/YxTfWLyM7Tg6uq/DUXFUl5dDWVkRAwYPhC2ZFL1NSkoyFi5eDEUlRTQ01rFGe4Z3794zN+FS0hLYsW0n9hzYC9HtomThOIjXSa9Yr+J+mloacc78FAYO7IcfiIm8b/deFBZ9n046x8RRV1MLIwNjjBwzEoZGRmhgFUHrTWho9jHNY5g/bzainoezRjlLTW0NnoWFwcfTC5c9LiElOZ2YmaV4+Soe169dQ1hoFNc64n+mtq4Wx40NMXjgABiZmMDeyQVjR42D/GE5lJa+Zb3q+4Ej4mh+1wxra0uMGjsOGurqqK7gnqSaJ0FBTOroKfPTPWIuNzY2wuWCG1auWY25xE7X1tSF+xV3PH4cDBcHZ7hfdCO7CvfXyK2sqoOhoSGGDBgELR19stg1gy53luesMHLUaOjoaKOml8Nf2A1HxHHN4zLG8Y+BpJQ0igo5f4/RHaqqKrGfmDSr169DfhFnL7Xet77D26ISpGVk4jIRhMXZc7jkegFGZPVVJL7GgX274e15m+t3DlrG1MBQD0MHD4CJoQEaPwp1aaith4nRcYweOwInzI+jtfX7SZxiuziiIyPAxz8J20S3Iz+XO3O4r1+/hkmTJsDj5nXWCGdorK+H5alzRAiKMCcT58pld7yMjEZ6ehoyMzNRVFzEVTFV7VFDTCkDfUOMGDYcxsZGaGr6/G6KhsGoKmtgyMCBZCe8zBrt+7BVHOVlpfh9xWJMnyGI14mvWaPcR35+AVauWM04k80cireiu0FT63skJMTjgttFmJua4sgRBYiJ7iAO+TbmUODGjdtoauj9eK+OqG+oYy5rhw8eSXYOI9Q2dizk0jdvsWmLMMaNH4eXMd/HCRZbxSEpI4X/+X//Hx4GBrJGuJeTJ8wxgX88IiKesUbYCxVHC8teamysR152NgoKCpCZlUm+ZwTsnBxhbWWJ2pqathdxGS2NTTDWM0S/X3+Bgd4xtHThQCU5LRVTBaYQ/2olyrjIz/xa2CaOiy7OTLVBMzNz1gh3kxAXg4lTJkJL14A1wjkio55j1+7d2LplC7SOqcPNzQ3PIyOJ/8OdwmhsfAdjs+P4+RciDH2ddk2pjvD38UG/fr9BQ1Mb75gGDX0Xtojj6dOnGD5yCPbu2omW5q8vv9lK7G8aXnGTOKkP799HIVlpOUVzUzNkpeQwiX8yinI565jT0JD0tHT4ePvAiJhXq5cvxZxZM/DkKfflbL8nE/qEqRmZ4P2gY6DX7TD/BmJK6hmQHWfAL7hxzZ2McPtxQ8d8szgy0rOwdu06zJo1F9k531bBIvn1K+zesROqR9Vx0swMOlq6CAoOQROHkh4e33+AIYMHwcHBjjXCft61vkPLn+LI0tLTsUVkK9LSklkj3EFjcyMTGDngt37Q19MjzvjXBYZWvCnH1s0iEJwqiJiX0azRvsc3iaOxoZpp7TVuwjj4BQSwRr+e7Jws4rBug6uzGxrq6+DlcQOycoeRU8SZfI+6ujqs3SCEhQsXoq6WMzfmFeWlcHJ0hqn5KXjcuIbI2Dj43fWH0KYNKObgzthd6urpqZQ+fv7Pz9CidxYN31bvKzY6FlMnT8G+/eIo66PF475JHPfvB0JAYCJ0jul/84VaQWExMjIy8ejxA8gfUcB5awskJibh1g1PlJRwruXXxYuX8NvPv8H3jj9rhL3Uk0nmdccH+gb6OKqsBMXDh7F3+x6cO2PF1NfiBmpqamBsZMCYUobECW/sho/RGeft7JiyP25X+2blya8WR3FxCbbv2oVly5YjLfnbE3V8/fyhoaqJlpZmpKWkQF9HD+rEqcsvLCQTrIHsTH6M+XPf9wHelrKnAAOF9tqbNmsmdu7aS0wg9rcrKCwohIvLBQQG3kNWZiY8b3niUXAgczfADdCQEANDfQwdNIwIxIjxxdhFaUUVRLZswaL5s5l7nb7GV4vD3tYR/BP4ceHSRdbIt0EvxsT374OroytZyaqRnZUDEWK3et/1htuFC9guthPObhdx/LgpYxe/KWafE21iehzDhg5DQsxL1gh7ePf+Hc5aWEBSUhJxsQlMZK75KXOYW5xEKxfsGnXEdDUxOY6RQ4bA8JguY8qymwdBTzBs4GAc09Ylj/qWc/5V4khOSsb8uXOwY4cYKqq6l3jf2vIe7zuIJUpMeAVVNU0oKCpAXUMNB/dLICDwLnaIbcWtazeZ17wpKYKsrCS8PW+hmpgDd+89xsPA+yhiVVSvra1FRHg4crKymcddITHxFYaNHA4jXR3WCHuoJj/LYTkFsmv8997nxcs4iBC/Kjm5dy9J6+uacPK4OYYOHopjWtpobORMslUr0YOCkipGjBqO0KfBrNG+QbfFQe1kVTUlTODjw5OgENbol2kippEXmdAGBsZwsrdFxMvIdleqWjIWHv4cvr53kU624vKKMuzbuxuet9sSgnKysyEjIwcXVzcYETNATloOZ85YQE9HFy9fvsLbigpcvuaOhNddDwOn1RHFxSUwa/Zs5LIxjZbmjOvrGMHY0BiFeTmor6pC2NNnRPT7kJ2dwXpVz9NCPgvzk6cwZMgwaGqokx2Es8W2czIzIDh1CoSFNqC8pIQ1yv10WxxPngRhyLBh0NY/1q1o0ogX0Zg7Zy4srCzh5uIGVcUjcHFyQ2Xtl52/wHsPoKigCJvz56GpqcVcpDm6OGHvzj0ozm87ybp+8waciW3v7esLj6vX0NrcxJT/qalr31T4s3fx4ME9DB8+FBcv0LP5b6OphXxvVknNjKwsKCgoQfzgQSgePQoxUVE4OzkyJldvQN0qsxPmGECc72Pamqjs4P1hNxcvumFA/99gZ+fAGuF+uiUOuvVu2boJc+bM6HYDlMI3xdhNJrOt5Xkm2C76ZQzT+/t1UiLrFZ3z6nUGrl+7BR+f2ygpfYPrN25BSkYadawjx8qyEiS/TsRRRSXYWNojPSUVNtaWRIxn4Rvgiyrix1CycrLgf+8eysgq/jFltXVYuX49hLcKo7zy2xz+i5ecEeDni/SsdGJzBxFzIpTsmp64ev0qIp4/R0MvBRvSG2sjE1P88lM/aGlrkc+TPadSXYF2wt2xZydmzZuH1Iyum7y9SbfEEXAvAP3794Od9XnWSNdIJfZ1YtIrpKWlQ1nlKNMkPyQoGK8SY8nkbju1qanvXijFm6IS6Okb4uxZK1hZWTFCCLjnD6lDhxBH7PrIiEjY2NrC3z8AWuqa0NPTZ3K2LxLnXl1FiTj0n2ev2drag2/SeDx+9G2xYU+CgxAd8wo+RCB79+3DQYl9xPeQZe4R7vh6MwF9PU0DjZUiZmi/X36Gvp4mqup6vm/JvcCHGDN6DCwsz7JGuJsui6O5qRXCGzZjxuyZyOtm1XKasyAlJcnYti3vW+FK/IXde/YQHyEWFRXlcHRygI6+DhztbZCS3PVb45K3b/HgYSCuetxAeFgkrMmbrmdgBP+Ae9DW1IbVOWtcuHARh2VlsWXLFsZfUVdVgauzU7uHAulpyZhHfj9VVVU0fGO0bD0xF2kPjvuB9/DiRRjcLl6EibEpTEyNkVfQs6H8dNU+bnSc7Bg/Qt9QH3XNPS9OSnV1NXbv2oHli5cgN5f7e6Z3WRwPHwXhp//8Quz+M6yRrlNI/AI1FRUok0n3LDSMrKrPsIE4Z66OTjh78gyWLliGC1euwuP6FWhoaBJnNZvY7c0oLy0nf7uLx39krkdGRSI+MRFubs7Yvn0bgoKeIpRMzLnzZsOUTMrn4c8gKSlOnPX2K7i/I8JVU1PFnLnzEP8qgTX6deSRD38zEWTIk09PaMqraohZyf77lI6oJ6bTcRMTIoxfYKRvjKZezh/x9vJmDnMc7K1ZI9xLl8TRSpzHvXv3YOKUSeRD/7r4qZLiYmLm2EBWRgoHD+6FgZ4enoc9w85deyAnI4NzZy1hb+uArZu3wPuOD/zu+kDykAQcHRwQFx+DurquFzMuKiqEm+sFGBjpQ1FZAaPHjEb482c4b2kNDXWtTk9nHj4OAt/4cbC2sf2mOrZxsS+xaP58rFu3lnFGqXDzySLRldBvdlFPnO2T5icxeOAQaOvooKm+92tjlZeVQ2znLqxZvQKlpdxdmKFL4gh+EoYhgwbi5OlTrJGvp6SkBDk5ucRsqWfieehR4rkzZ/EqJhYurq7E7NFkbHYpCUnGXndydCTOozbs7c6gtZX14dKFl0zcVwlxiOng4o4G/BUUFjIFqm3O2yA9JwdH5I/Ay/su6xXtQ+9JxMREsUloHUpLvr5oQHZ+HjyuXYOhgQEkDhzEJuHNjNjDnvZMG7YaYtadPHkaI4ePIAuCWo8631/ixjUPTOTnh+etW6wR7uSL4qC29yFJaUyYwIfcTPafzdOMwbOnz+DMSXMYGBri8eNQYv5EYNOmzWTixzGvuXz5KmQOSTJdZQsL8snW7IX01GzcveuHoCddC/uuJavoo5AQlJR++Zzd5aI7Jkzkg5/3bdZI97n34AHc3a8SoYch8lkEwsPDEfjwMfLzOFs0m9JEdsazZ86QHXMM8Z9UUEkEz00UFpZi/VohiIhuRU0l97Y3+KI44mKjiDDGQ0PzGN63cMZWfltRyTSQDwoKZpw2eydXaGqqfrgruOcfiMMy8khNTcbx4wZQUVNi7jMsiQNezioJ08jG83q6sy1YtARSUlLMsXN3oTWqDsvJQHDyFOzdvQvyMrKQl5XDqdOniVhCmF2TUzS3NOGU+SmMGDoM6irKXFsRxIF8xlS89wO5t0FOp+KgJzpWZ8+Bbxw/EmK7dh/BDhKIM/z6I4f4RUQUtmzbBilJCaYETF5hPs6ctYDS0SPEdCqAnb0tzE2MccvjBoqK2VPKX19fH2PH8n1VPnRcdBQUFI/gVXwc8vKyyS4SAFEREWzeIIR9u3fiukdbKAy7ofcYx08cx2+//gYNNVXUcnGpnNTULMyaOQvqykr0LIUr6VQcpRUV2CAsjH//6wecO3kKWdm9c3lTWFyA7Tu2QVZaHm9KilFWXgbxAxK47XkbJ0xOQlpaDmGhT2FtYQUzczNUseK9aNuzryWOTOwJ4yZAX5cGzHUPX59ASIhLsR614eHuBgcXF7i5E79KTYPt4eoNDc0wMTLGb7/1hyZZQHrjLqU70IzRowqKmD59BrILuDOkpFNx0Cy8CeMngn/iRIwcPRJ8o0fgsLwiQkPD0dRJJQp20/quFekZqSh7S492iZl17z4OHjyEmLjX2LRhI1mZHzHjpTXVuBcYiKePQ4j5dRzqGhqwtrZB3ldkKNIP74CEJCZOnoyc7BzWaNcoKirFIfLzSctKweuONy5fuYwD4uLEV7qDq8RJNzYyYY6N2UXruxaYmZrh159/YUL9aUxXX+CO3x38NmgQbt3kzE76rXQijvcwMTHEjGnTEBH1AtEvo4mtrwx+sprSqne0weXFixfxhpg1PU1qShqiXkShrq4WhyQOwMnZninWlpGTjeTUdMgfVsCSJYvge/cuLrlfIeaYNMoq2u5MqqqqutxK+O5dXwwa3B92tt0/k8/Ly8G5c2exT1wCknIKuOnphTs+Pti+bSce33/MetW300KEQY9rf/z3v6GtS4sh9P5xbVcpKyvFrBmzsH//AY7k0nwrHYojn0z6VetWQVxK8pMguczMVFidP4kFSxZj2PBhWLhgPkzNTBETFUUmXc9bjwnE/NHS0iLmlCm0tdWZ8pq0HpWy0lFYnrOAxVlLCAoK4HHIY1y85EZMGlVYWVoimvy8LV8QCW1ouWbtaixfsxJVld1I9WR90A3NjQh7/gzeN70QHhzGLDBRUdFMQhc7oEI4c/oM+v3Uj+ySWt9kRvYWBgZ6GDFyBDK4MBmqQ3H4+tzF5EmTceVS+/00aPn8W7dv4sD+/eDn58PUqVMhffgI/Hx8UZjXs7tJWXkNomPjkZaaxly0GRrow9bGGrHRMUS4J5l4ruT4RCjIK0FdUxNODs4wNjRCduaXzaVLbhcwbNhw3PfvOEeedsB9+/YNIskOe4v4QefOnIKahjp2EedbVHQLRIQ3w0TfEDVszKWmNXjPnjuHoYOHQF1VmeuOa7tKRMRz9B/QH1Y23YvX6wnaFQdd2dTUVbF4yRJkZHR+t0GrqYc+CYGejj4WLFiMCcQ/2SS8kbkNj4mhN9s9H+AWFx8POxt7OFg74ISZGVPuJyY6lonpOm5sQsyQ0/C87YXSki/X8aXHunMXLIDEAXGmSnt70DCtCxcvY9nCeUwvkhMnzGFmbAYB4q9YEdMqJek1SokJwS4amhpw7uw5jBgxCirKR1Ff3zeFQaG73/Lly7BOaD1zF8VNtCuOooIirCbmhLQkMam6URg4NS0DLhdcICYmBgGBaVi4aBETxPcg4B4q2Dg5ugLNwntFdouU1zSQ8T3c3FxgrK+Le77+2L59FyxsaWTol81A+goD4tzzT56AhIT2463owVNISCj27d0H8f2SeP4sAq8Tk7Bn1x7yXrK3OAQNCTl79gxz801Nx5qavt8j/MSJkxg5chReclkZn3bFEf40FNMEBGBva88a6R5V5eUIDAgkwlDG3LmzGfNMZNtWOF9wZYIKe+NgOy0zFw4OTjh52hRS0lK4evUqGe3aDxIdGYVJUybCxMSUNdI+Wbk5xNSxwH4iEmHhLdi9b89nSVXfQhMxpU6an8BAYkopqR5BRW3fL7lJefbsOX755Se4X7jAGuEO2hWHo7MLJk6YiKgXL1gjX8e7dy1ITU0h9qQdVq5YgSGDBhPneBq01TQQExGN1h5uaFPf9A5p2TnII35JYz0NSe/aXUMd2YUO7JfAvLnzkF/0pR3wPZ6HPcWOnXswc9YsXHL3YG79vxVq6p4wMyHv4RBoaumilpiz3wvlFeWYMnUK5OUPo5WLTq0+EwdNfT10SIqYVavY2q2nqqYOwUGPcVBKDkOHDCQrxS9MATcvnzto5GA4Bbvwue2DEUOG4tp1uuN8mebGJly+eAmLFi7CyRNmRDJff+lHb75PmZvj136/MYUnmjhUDKG3oO+MlKw05s2bx1bf7Fv5TBw0pHj27NmQP3oErd3IEe8ONDPwuLEx+MZPwL/+9W/iyM+DnZ0t8r8yHL4nqCwrw/Lfl0JEbGu3HMfklCS8iHzxTTfitDX1f/79A3MM3cyh+LbextnJGWNGjcbT8Keskd7nM3EEBz8C//hxuODqxhrhHKWlpcRRdsX6dUKMyTWJ+CY0qDDk0SPU1HJfXNApC0sMGzMKoWE900+wubEV1tZW6P9zPygrq6G2D95jdJVoYmZP4p8IG1vO1S3uLp+Jg5aFnEjEER0dyRrhPHW19QgKDsLRo4qM7ck3bjx27dwGR0dnpCWnMeEj3EBiUhImTuSDtqYmx21jumtbWthg4MBBUFVRQuWfCkJ8b9DGoqtWrmJqI9OC1tzAJ+JobGrC1m3bsHz5CmI69HzvCKYFQUI8zpJJsXHjJvBNnICli5dAX1+HbLehxLTp5d2EmEYK8jKYO302U6GRU9DJcfbsaeaC76jyUVR858L4A1VlJaxasxK5edzRLu8TcdB+0gsXLYa0tCRrpHeg1nlhQTHu+HlDVlqOaW8wVUAQ+w+I49rlK8jN6V4gIDsJfvQA48aOgZM9Z+ov0RCQ06fNMWTAQNY9BnsXhBzy3vne9WPyKIoL/5umStMTUlNS8DDwEdLT0j6kCNO03pysLKQmJXP8IMDRyR6zZs5AHJfcd3wijsSEBCZ90fSEGWuk96mpa8IzYo8eNzHFqlUrMWHCOKxYtQxmJ0/gZXQMmpgj2Z6D1pcV2rwRmzduQFl590qhfomGRpraao7hw4YRYaihms1tEWKIqbxnz06oaWkx6clGenpIS22Labp/PwCHpWWgp2sAaRkp3PXzZw4RXkRG4LyNDfMVEvTomw4WvoRfoD8mT5mMuz5+rJHe5RNxPLr/EIMGDcDNW1+fHspJCnLycPXKFezevRvjiF8ybgwfFA4rIODBY1RV95wZaOfkgnGjRuM+K1SeHdBI4dOnTmPYkGFQV9cmZi17j7dpTr2clAxTQ6u0vJzZQY4Q+55GDmfmZGDfgT2wd3RgopbtHeyxXUwEWVnZ8Pb2hqXledja2ePc6dMc9bVobNrsObNgx6Fdubt8Ig7aq2LosCEID+uZIgBfS2NjK54/f84E940ePx4//vgz1qxehQsXnFDylvOJM29LyjB7+kxIS0mypZoIzcewsDyD4UMHQ1VVgzin7L/ga2xqhtCmzcSX+W9BNfMTJ5le8U7Ozti4SQg5uW357VmZOdi0cSNCHj9iKrlcvnIJ9nZ2TLE8TpKZnILVy3+HgQHn+zR2hU/EoW9oiJkzZyItPZU1wv3k5ObC1tYW8+fMxn9+/gkTJ0+Cro4OEqJiiWPL/nua+po6+PndId+HD4MHDcTrhK4XrG6P9+9acf78eQzuNwhKKvJkx+BMSAg1huzt7bFo7iJccHNlerFTQezevYdpciq2YzsqWMUO6A69XUQUN297MY/b4Jw59Qcl5dXYJrYT0uKH0NzY+ydWn4hj/979ENqwgatuKbtKTWMzsZMDcGDvHgwjNvuIsaMhTj74O57eKK9gz+8T9/Ilduzehd/69cc0gen49ed+MNY3Zj3bfah0bc7bY1D/AVCUl0dlFWejUhtq6uHkaAcJCXHo6xsykRDq6iqMaLZTcbDSi7NzCrFZeDN5P+8xj3sKWphCTuYwNgltZMq99jYfxFFfV4sVv//OZM219Olb2PeIio6Fjr4B5s+eiyHDh2LpsiVkdTzJnIJQ86K70JJA7pcuY8qUScRhnABXN2fk5RdhNxHirHmzkU92r6/Bjtj2g/oPgsJRBVTVcD6I0Nf3Hq573CDfqwa5uXk4IqsAWxtHPHseDpHNwnjBiqW7e9cf61evQ2I8Z82o9jhuYozfly5Hwuve7V9C+SCO/IJ8TBMUZHpefC/k5OfC3eMadojtwqQJfGS1nwQ5WTncvu3d5SoltHWwpbUthg0djh07dyI64b9VWO7d9ye71BAoK6nA3f0y3C5chPft23jyJBj5xDShLZbbo6W1CRYWp/HrT79CUe4Iyqt65v7G/54/Nm8Vgz6x6VWVjzJ9Q/ILiph7FZPjRpAgO4mbqzP27dtNHHVLYtr0XJ2AP7jg7o7FSxfjydOu937hFB/EkZiYiOnTBGFN7N/vjdraejwlb/YxHV0snL8Y4/nHYf36dbCxskRaSicr1Lt3uEgm/IgRI7Fv/4HPnP3qqioIb9yAf/7wb8yYMQuz588mu9VMzJ42E8uWLCEOuxSuX778ST/1uvoGIoxz+OmH/+Bvf/sbWbktWc9wnpbWd3gWEQHPW9cQ4O9DFoj//lxv35YyjT1trCxw+9ZNvC1nX9Bpd7jjdQtzFs6Fv3/PmnTt8UEckdGRmC44GRdcXVgj3x+NLe+RlJIGZ1dHbBfdivF8EzBzpiCUlRXw6FHQZ2HgtE3X6FEjsGXrZhS9aX+ncXZxxdChg3Dm1GlEvXgOP28/OLm44aiqMpODP5b4PitX/o6Ll9xRlFfInBYNHToCakpa2LNvLyPUR0FBrH+t92nu5fitQP8AJvD1jtfHhwG9wwdxPH0SBgHBKbjh0X7O+PdGZXkZHgQ+guwRefATX2Lo4GEQ3bIVV65eRnlZKUrLKyEishVTBQSQmNTx7pKZmYXFixZBiZhWH0MTk3LfFOPa9WsQEd6ECVMmk93kd4waOQoqKrRr7jvmpG3mjNnYIrwFJR2I769GyJOnmDt/HjyusKcR67fwQRwPH9zHxKlTccf7Dmvkr0N8/Cuml8asWTMxaOAArFq9ClvFxDBwwCBmZ+iM9y0t0FbXxvQZAnidEMsa/ZS3xByjQqNmlLyiEtPo8w8uXbyIcWNHwuNy1ydDSWERivILmMIOnUEDNkuJuVRPTLlvhoM34x/zPCoCc+fNg7NT5+97T/BBHH6+d4g4puBewH3WyF+PkpJSXLrgjs2bhTGYiOSXn3/GUUVFPH38BJWd9D5/EvIUk6ZOxlnixP55CtFEJVdXV0ydPAUKcvIoZXqO/JcyIhyhTUIQ2Up2j49inTrD8qwV2X00yKTvPNapsroKLs4uiCDm3tfQUF+PXFoRv74RpSUlZOH04nhlmbi4l1hI83tsHFkjvccHcXje8MSkSVMQHNK1quXfM3V1dQgLCYGGigp+IgKhtWfXEQfeydkOaRmpaP1TRcHyqlpIiB/AylXrUFjy38n/ngiD3iGMHTUaR47IorKDXoMOji6YPFkA9+76s0Y6R0lZEdt37UZdQzMqq2pQVpiP1JTXKMzNY0oEVVZUEv+G/JlM6LDQUKabaxvvUV1bw+xcrX/adeguQ6uYfBwuHvkiEqpKyoiNf41cIoqTZqZIZQpWcI7klGSsWL4Y5yy63ySJ3XwQB23LNWnyRERFfVve+PdEcWEBpkwXwGQBQWzeKIyhw4YRv0wAauqaRDxP0PJRazQag8Q/YQJc3JzR0tQ27ujogN9++gWy8nIoq/x0x/iYiJh4zJ07B8ePGzFpyl9CRk4WUtKSzIS2tXXA7n2HcOjAXqZhj6GpERSOKjNxU9euesDe0RYvyCR/3/oOjs5OOEx8LJ1j2jA3NcPlK1dRRXaX+LgEnDx1EkZ6WjA21EOA/33UNjXD1sEakydOhLm5GdIy05muTG+K2nwjWurIydEejkT8MVFt5iSND0tPT8frxGT4eXrhUUAAI8bukJ6RhdVrVuO4qUmX3gtO8kEcjnaOZOufyhzp8mjD944PxowaQybRFcbBDvC/x/Qq4Z8yAaNGjMBOsW1M7dvsnBxcunSBqVU7dOBQSElIMJ1yhw8dBoXDR1DxhWqJVdWVENsuRv697aiq/HKkr6ysLJNWQMVBWzivXLUGzyKiEEdEtkZoLUR2iCAk7Ckeh4Qxzv6NW7fhdfM2Vqxehxs3bsDP7z5+X7YU27aKkJ0wHafPnoaBgRFCn4aTP5/FUvJcbHwMnFydMX/uAkYET0MfQ3TnTqSkZiI4+CnEtu3AaTMzGBIx7dy9C0+fBqOoIA/bxESxm7xOlwhQRHQbEZsJysq6fvOfmZGNtWs2QEdHhy1xa9/CB3HY2dlh6hQBJCX1nbgqTnPK/CT4+PgR/1G9qiayWyS+TsKpUxZYsmQxRo8cxVyeDh82hHG4P/5avXo1aj5yvjuDdq9au2YNEwn7JT6Io7UFskR8RsaGzDhtOSC2QwzOLk7MYxo0ePCAODzv3GYqmuuS7/EHp8+cw4FD4sxhQUTEC1y8eIXZSXQNDDGd7JbPnj/Dg0ePsW/ffqRl5SA65iXWEtMyOjqaaVNHq8+/f/8OTS3voK1tAOWjCoiNjcHy1StgQcTW2NBEROnJRF2kpXe96VFmVi6EVm+EtpY294iDJrhPJmZVbCx3FdbqTbS1tSAgMBXFb9p3lIuL38D98hWMHDn8M2HQr2XLlqOC2P9dwezkSaxYsQyJrzq36Wk+xc6duyBLTCvqQ8jJSOLUmbZI27clbyG6bTu8vNpOHGkx6317dsGLiOPIEUVoq6kz4xSb89aQkpNkqlJqKKtBWVkZzm4X4ezoioXz5yE87BnuBwYyNbjyif9CC9WtXbOOOPfPsImYmO6X/1uFxYHMnX27djGpzhtFhBH0uK1QdujTp1i7ajmSiB/RVdKyUhkRGhka93qZng/iuO5xFZMnTUQoG8PVabVE6tx+LbRUJK35RE9NaEZcT3dClSEr9OxZs5g+gR2RmZOFaTOmtSuOsWPHIj6+/c61f+b8eUv8vmQRXkR2vjjR49sd23dAUUWJPsIh6f04fe4081x+YSHWb9jEhMdQaAbfVpGt8A24i3sB97B+03piBl6GrxdZ0Zf8DhlpaWJi+RAHeCncLrmgtLSMadkwYsRwhD8j4njwECJbtiD6xQuEEFNq3fr1xKdIgaKSEqRkDzOOf+mbEsiSneSYnjYiIiMhvHkTQsOfMd8/ODgY64U2ITk5nXncFVIyXuH3VQtx5vQJ1kjv8UEc3l63yc4xCQ/ZeFtbQt6485ZWxFn1IRO9+1vkk6eh0NPRhoT4fqb4Qk4Pl+45fFgO02bORHkniVSFZEIuWrCoXXFMnSaIfGLadIXTFuewlEzYuNgviInsHPfu+SPk6RPm6iEgMBiRL9uKYVQS38aFmFSvEtvMwNKycri5XSZmYAqqamrh7HoFhkZGTONTka2iUCU7Rm5uLs5YWpCFQBrHtHVgam4OaSlZhD1/jiwifBlZKRzT0kBAgB8RpArellbh9at47Nm/F+qaqtBU14CK4lHiSKchNT0TUtKySGB9/5AnIdi7dzf53LKYx13hFfm3aRde63M9F1bTER/EERjojynTJsHf35c18m3Qc4Y6ande9SCO5g6ct3Ho9mVUdnY+zp47w5gtevq6qO/hotQmhkZkN52EjE4ahb4nW/9JU1P8859//0wco0eNZoIQu4IucWxXrlmLtDT2dc/6+LD2zh0/GBub4EX0S9wlvoT4QXE4uDgzr2km/8krKkIW+T1pH8byiioiprZgyGIi/tdkspe8KURmdtaHiG1qsgXe98ejR4/whnW7X1tbh5fRsahkVZMvKi5CSEgwartR6PpZRAzmz1sAJwfOl4b6Eh/EERL8BIJkpbvh4cEaYQ8NDXWQl5PDpKmTYHLcGG/Ih9BVKsiHpKaqAXU1FfKBtd0RVFRUID0zGxXlHR+NsgtXJydMnDABT8kO1hnx8YmYJjAFP/zrH/jXD//C//zP/2Lvzt1YTnaCmTNm4ra3F5mAHZuEtFL9wX3iECMmEL2n4ARpyclM2wV9XX3o6urA3u483pRxX7uxR4/DMHvuHFy9cok10nt8EMczYmMKThNgwhnYyfWbN7BDbBvcnO0Yp1BHR4/sIF/eAWi7YFMDQ7It70cWqz3xi/Dn0FDXhMIRBZiZmiA3s+u27NcQeD8QY8aOhotz57e1NzxvMocZlsQ0MiQTsH+/3xBEdoyUtBQIrd8APr5xcHJzZI6D2yMjMwmLly6CloYqWt9xrsIH3eXycnKYBYqGvXAjD/wfYRbx8255XmeN9B4fxBETF4vp06czlcjZRXDQE2xaL8SU/6dUklU/ODiECSHvjBbyIdoSB3Urce5exbfZr+FPHpOJthYnTM0RGxsJ3WNasLflbCJ+6du3WLhgLnbv2tVhAlh1TRW2bROF0MYNaGpuYU6b6PGuC9l1KNlZuUyDn1GjRsDMzBRN7ZiGvl7emDp1Ci5dYu+u3Re56+WJ2bNnEj+VPeb9t/BBHFkZGZg1fTbOnT7HGvk2kpNfYcuWzThuZIrGxjZfo47Ynh0di35MEnHKdu3dBf+AQOYxTRzaSIRibGaOVlYCka2NHTEPvj5FtavQ22G+8eORltT+cWSA313wj+OHi1vbjltRXQkBwek4onCEeUyprKmAqpoy+vX7iex8aqip/e/uUN/cikMSkli8eAlepXB2J+wLXL16AfPmzcS9+w9YI73HB3HQ0jb0NlRZUelTT+4ryC0swr59OyEvL4e3rEC7+oYGyMhJEfNhCePEtXTSFKemsgLZuVnMj0GLjZmaGkOW+C3VrFU3PTMfu/btY87vy8lrr1y5igcPAj809WcnUdExGDF6FAxN2i7aPobWzBIT3Y6Fixai6CPRbxPZRpzrVUyJyz+gfoW5+Un89OtPxB/ZhYqyNh8q4vkzIq6xTAbml6Js/wqcOXcOvy/7nemf2Nt8EAc1GsS2bcPOHWJdvtXtiKSk10wn2pSUtiO81pZ3OHHiBObNn8sc/9GTkqTUFOa5L0HrKB2SkUZIcNsRc3nZW6gqq0BJ4SjqqquhoKKC31cuJaaNMCwtLTu9k/gampuaoaKkjJEjRuDFnwpIBwTcxQgy7uT6qU9iZGyC8XyjkJ39aRNIWv/Wwc4ev/z0KzYKCeHV60Ts37cXc+fOJO9ZEutVf13o0bSiggrWrV2HgoI2P7M3+SAOigZxCBcvXoCc3G87Tnz3rvXDhV1zcyPcXC8Sf0GIaaRPoT36HF0ccdXjCrIzOz8Dp/V79fUNYG9tg5dRMdDWVMeBvXsRExOF8PAICK3egLTUZMTGxGDXzt2IjGJ/AeyM1FSyq86D6ObNePO2rZJJC/n9duzcgRHDh+HRg4dtlRdZXXcfEJOgf7+fEfKk/Qhn2naZFqUbMmQIRowahauX3VnP/LWpq63D3t27maP/qh7Kq++MT8RhY2OPMePG4GX0S9bIt5OYGAcpqYO449MW0tDY2IzkxFewsbSGpro2dHSP4fXrzuO56KWTrq4+WcHVYGZ+Gr4P/Jn+Hvv3H8S6NWvhaG8HJ0cHpgZTTHwiY7Lk5RegiY0nMp63vDGGmFeHFRRRWVWLpyFBGDZiGAYNHIjFC5eQ31EKp83N4eFxGVYWFvjhPz8ylQI7IjgkGNOnTkX/QQNw48btb7VkvwuysvKwZs1qKCqrobm199+RT8Thf/chhpLV7B4bk9uLiwsQGfmMCSIrelNMdgETsvpr4eq1q4iKjIbkwYOMc/0l3paVIjsvh7lIvExWWpo/8Tj4CTy9PTF7zhwyOaURcC8AeQW5cL98GXY2toiKoOH37HmTG5tbYGFtzRzLqiqrQlREGLMWzIKbmxt0dfSY06rFi5Zh4byFmDt/Af7f//4PDoofYv3t9kmIjcPmTcIQnC7A/MwNDZw7xu0LxJHdf9G8BUzlE27gE3HQHWPM6DE4b8eZBiL+9+5hEXHIvX29mVwHxaNHsWb1Wty5fQe5+TmIehnBemXn0PL8xsb6zJ9ptttqsnv4sQqQJcTF4MzZs7Akjt31q1fQykYnvZ7mONg6gJ9vLP7xf3+HjW3bztDa0orioiIkJKUj6kUUgp8GY/nvKzBr5mwmX6IzUtJzsHPPHvBN4Ce/lzVx4ns2CoCbeBD0AJMEpuKaxw3WSO/yiThys3OwgKzCtOk7J0h6lQixHTtxN8AXgff8sXTJEmhr6yAzKxuSUoewavVqeN32ZALgOiM8NBTyhxWYFFAtLTUIbxRCEevmvaikBNduXoejgwtexb9moljZCQ1h2Ux8j1mz5yMnp2On8fTp0xg1ciSzGn4JR3tH/PjjD/jx55+ho6eD6tq+V3GSHbiSXVhQUADPyefLDXwiDtrjmoYjCwttZC7i2A6Zpy/Co3Dq7AnMmzcf+/YdQF5OFvQN9CBMzAsarnFEXh7GJsfJKt1xHBad7+HPo6GnfQxKCqqIjPjUCW9614qab4gG7oy46BimdfQpsnt1prvAew+IiTqUmI+d3/Reu3YFo4kvc3C/ONO8ZeCA3yAtK8EEEf7V0NHWxdy5s5Ca1vUQd07yiTgoioqqmCw4Bdm5nx5DshM68S2trBEa8hT2DrYQ2bwFiawkK5oLILR2PQqLuxaD1ZNBEO+J+aR4RAkTJvEj+XXnGZN5ObkYNmQwdA3brxj+trICqupq+L+//x07RUVRwoqpsj9/Hn//1z+wbv0GFBeyt8E/N9PyrgWbtwhDVEwMZV3MgeE0n4nj1q0bxOkcD587bTkBnOR1fDz27t3HXOBRauqqcfToEWhq6CIvIw8BgXcRFx+Lni9K2T7xxEQaN2Y09PTa/J3OoEUYFhPnfNeuncz9xh+8KSzAravXMXPGLPzjH/+EmroGmQyf+iU3bt5E//79MX/uXCS86vl6tb1BenoyE0LDTeVoPxMHje+fMUMQhoZfngDfCo2wpTkA1NyqqayCvr4+xCUOMD6Ikb4RRLaKQEaOnkLdxTvWHULv8R56utrg4+dHbGzX2g5oqKphuuB03PUPwB0fLyYhaPGihUzd3dWrVuPRw7aMufZ4+OAhJk6eiJnTZ+AhfV0vFxvgNDeJEz521Cjms+YWPhNHU1MzREW3YQsxdXqyW5Kvzx1sF9uG0LBQFBUXE1HIwIqYXu7u7pCSlkZZGedD1DuCuhZJr1MwbZogNNVU8a61a3vZ5ctX8Pd//B38/OMxbfpMzF+8hPwucvAhvyvt9/5naBXE6po6JheGEh39EksW/860oL55/QZaOihM/T2gpqYFgSnTkJ3D2bpY3eEzcVBOmJ2CwFQBJPVgJZKEV4nEWQ+H540bsD1vi7tkBTl06BD87njh5u2byCfmyJPgYBR1sfAZO6HRtsam5hjPPxYRUV0vkEZL+g8aNgh79+zC4wePkZD4GlWdJGx5eXrCxsYWlR+FwKSmpEJsmwj4Jk2ErZUdqqu/v6NemsKwbPlypnJJI4ebcnaHdsXh6+vH9CK/ca3nQ6gvXb0ByUMHmT51B8QP4ey5c0zcl6OTMxPgd9zUGK+TerZ8EO10NWfeHEjLyaK+G6d4+fm5mL9wLvSO6bJGOubJ4yAIrV0NK0vrz3aI/IJcplbV6DGjYGSoi1pWpt33QkpKMtMli9sq/LcrjpSMTCxavAiaxGZm0wVzlykuecukxsorHsHGjRtw65Yn/APuQXi9EE6Zn4LVOStoqWshI6vr5V6+FRoOMo4sFuHhnxefoPco9KuxsZEJeqSV2qkvRY9i62rrIbJFDGJbxVDTiYlKY8O2iopCRVMVVcSsag9a81ZL9xiGjxgKOVnZHul92FNcunQFQwYPRehT7upF2a44aM2hgwclsGbNOrwp7vk+DTVVVbh//xGiXkQg5OEjrF67Ch4eN5nnKirKcET+MLx7qB1vcXEhk6W3a/cu4mv8d9egu8npM6eYQwR6eKGpqYFjx45BXVUDoltFsWbtGrx69Qq6OgZYsnQJUlLbjx+rqqmCjKQ0Ux8qn5iM+QUFxO5uP/CzsbkJZ8+cRf9fBzAJVjk5XS9cwM3QmLj58+cRwfdOT5COaFccFFcnV0ycPAWB/r13elBeUQmh9Ruxas1qVFW3RWmGhT2DtKQUnpFVJjMzg/gq8WhkRxXxDrCxs8PgoUNw36/tuPkPoqNiGN/MxdUVNvYOMD5uSkQrg5WrlmPm9DkQ37cPBURY7h7uECCOfNDjzzsV0XgzA2NdrFm9kglZz83Ow8YNwjggKYHE169ojDvrlZ9yyf0yBg4ajLWrViGO+DF9meysLGIujoSmOrFSuIwOxfGKOMiz586ElpYma6Rnqa6thrKqCnHKD0JZQYVMiAu4cfMGk3J6wswMZ0+fg+gmEezesQMnTU+iggN2eGFRMdM/g9Zu+rMAW1rqkZQYhzvePnCwd8bpkxawOW+Lh0EPkVtc+sEcDQsLg8DUKUw74z/j5uKE6XNm4nFIEDG7KiEjfRiLFi2Gmro6dojthrvbpQ7DX+4TB3/yBD7MmD0H4X24+LeT/Xn81v83RER2La6uJ+lQHHQLp41d6PFjIVkBe5oM4pCbnzxFJmghU93DxOg4FMnP4+jqCFdXB+zctQvBwU+QnZmJQ5IysLVhvzNna2OLoUNHMqEgfyYuPhpbtm7AogXzoXJUAb6+PsgtyPks7CYnKxfLly8lQj/6SfZja2sz9HW0cPnyJdBOAobEPKPNc16ntCWBXbjkztS9onn3HREdEYW58xZg3NhR8L/r2+fuQui1AS1AsWLFGubP3EaH4qB43rqJiRMm4rZnz7egohW2P141m5tayBvYhPLKcjLRlJld5A9oH20VZWW8I2YKLbtPW/Z+K8VFBfid+Ap012ivZmt1dS0inkczTShpDz1bexvo6mpBR0eXKaJsYXmOmH3pqKltwN79+7BVRAQVHwVU0t+tqqqe+DFkB3F2gfCmTXj6pC3bsZmI6BjZsXeIbiave0ceN3/W9oA8wfxfMhETzSocNWo47J0voqGhJwNqvo3nzyMxkJisVlY2rBHuolNxZGdnYylZ9Q4TB7iFS/KbK4g4NDTJinv1KpkfzUxG4BqhNbjlfYe5JxCXOIiAAH80NzYwAisvLyOrdPdXVDtHB4wcPRI+Xp6skU+h9aWuXbkMWwsrWBIT75j2McjJyWL3rp1YungpFi9agus32g4RDPV1maqISR0cQXv7+TEh93+8wy5Ojli6ZCEiIyKIrxIK5aNK0NfVwwvymL7o3l0/3Lxx68Prc4gjv1/8EEYOH4VTJ4xR38DeVGFOcdzIiEkgi4njzsr+nYqjubkV2lrHMH3mNCSnckdlDBpGcj/wIZRVjkBLTw2bt2zGKWJ++d9/gHVr1jHl8BXk5XHNw4Os3pZwdHDodkFimpuxcuUKiIruIDtE+0ewJW+KcNv7Nm5du8lk8t3x92eqG9Jaw7Fx8Xj0MAgxsW19KzyuuhPfZRruBbbfnIaaW3Si0y8asv/7imW45eUFLyKatWvW4syJkzh3+iRTetOV+C60oPMV90+LntGOUce0tTBk0AAoHFX8Yth/b5NP/LmVK5Zg5/ZtaOCii7+P6VQclKDgexhPC5s5cU+X2eaWVkTExuCi+zU8ehCEuJcvsWv3DlhaWRKzq5L4A4nEcd+L4SOG4LZv9498aU73pImTcdur49pJtA6wo4sLjExMYGxiypTu19JWw/Hjx5GRmQ1f4qjT5jGUsPBwzJo5C+etOzcfaJ8OPR192Ng4o6DwDTYLb4S9nTXzXGtLMxSVjmLk2JE4bmbGmFt/pq6hASfPnMGgQYOwU2wncjK4t9TPXb+7ZNcYgaus94gb+aI4yolDuH69EPlajXLWcSo3QcvZyMjIQeuYOtnp2py68PAX2CKyGQclxJlVvDtUlJdCWHgDk9BUVtrxuXvp2zJ4E1PuEnGcacn/wIBA3Lp9k+wODxh/pIa8V1WVbdG2GTn5WLF6DWMetXSSmUj7bZSVloK2JPP3D2CayNQ3tIWL0DThDVuEISEpgZKSt3iV+JqYdp8nRdHdx4WIduSIodi0YR1e0yNhLoNWzBcX348F8xehML/nw4G6yhfFQbnicQ2//voLrl+/xhrhHmjB4yvXr6OQONCUxNhEprGLnZ0taokz3PxnR/YLXL/uAb7x43DB7cIHp7c9qNPv5++Hc+fOMs1ZLly8BFlpWWiraxFBflqggt7RHCBCFSGC7Wot3AjiX2zYtBlxr5OZyotG+oZkQkkiMyOX7Ghe2LJlK5JedTzx79z2goCAIBHlSoR+odZvj0Le0uCgYPDxj4epiVnbAJfSJXFUVlUzxdjWr1mNxnrOZNixg2qyy+nq6EBLU/vDqt0daitrsGObGDbQtNuCzqNDs4jptH7DRly+ehmPQ0KxUWgjrt+6AXl5BZw+e/JDZC2FqdtlchwLF87rcn0qWn7U1sYGkhIHsXHDJggJCSHmZSwx0UKxas0a2Jw/z/Q/oYcOFRWlaG7Hbn/y5AkWLFwEAerv+HFHC+3auiooqysxRTG+lDDW23RJHJQLFy/i1/4DcO8u98Tb/5mCvDwoKh6B26UrrJGuQ9cv2rSfRgU4u365mHYRcSh379lDfA5TqKiqQEn+MKJjIiGvJAuvAL9P10PywMPjKqYJTkNAN1pZ0wqOQQ8DsXPnNviTyZ2ZmgbRbduYOl5/HDI8DA5mTrIKiY/SHnFxr7BhwwbmLsTj2nUQnfYa9D0JD30KQcHJ0NXX/WQB4Ua6LI6qyjLiVE6H8KYNqO9mh9CeooF88i9jY5kCb93tRNpY34I9B/Zh8eJFyM3LYY12Du3adPrUGeKEmyAk+BHSkmgn1QQmivjPhIaGkvdvBiwsul+LuKKqgjHjDPRNmBivP45q09JSILxxA3T1jjGVIcuIv9QeObn5TPzSjz/9AsszFkxKam/Q3NgKDQ1NCEyehFeshjvcTJfFQXFwdcZPP/8CX+/brJHvh6chwRgxZCgsLGn/667ZwXUNVXB0sIeqkhLUaYE67WOwsrBGfubnVUloG4VVK1ZD8bAC3nVQsf1LmJqZMV1ns7IzkJqeil07RYl/dQh5eQU4ZX4CYqKiOHHctN1EqqrySigcUcTPP/wEVRVVlJV9uWstu0khJuV0QQEckTuClkbuv6zsljjoyZXg9GkQEt74IRDwe2HfQXHMEBAgE69rx590Xzp1ygRKCocR/CQM6ZlZSEtNgY6WBvSPHUNzw6exWFW19Uxn183Cm/Cm5OvuIHJzC6BvYABpGSnMnDUbW7cIo7KyApFRcVi1chkcXZyIWOShb2iI5pb/hmPQIt4UetNvanICv/7yK1OvuKCwZ7PudPX0wDd+LMKedT1hrDfpljgoto4OTETo5SvfT33X2JcxGD5yFFl96elJ12ghm8uBg1KMvd/U0uYM05wOAzJ55Q7LoOZP4iBuOU6cNGBM04RvyLCkMW/+Dx9i+44dCHvylDj4qQh/EYlNm9bh+o0bePj4MbZtF0VmRhoT/m593houTs5M+A2FHsBdungBo0YOZ/Jlkl/3TBmcZ8/DMWb0SKaQH62l3BfotjgqqmuZN3XJokXEQez7/SRojNNRxaMYO348E+zYHcJCw6GlqQP3SxeZrrcREdEwMTVD/Kv4dg0zz5s3MWkCP+7dC2CNfB009qq8vJzp0rR7z17cD3wAL29viIhsxf17gXj24hmSk1OICbYDAoLTEHj38/Kut29cY1q1LV+5Ai+ePWvbCjlEdWUVtgpvhuCUqX2qmny3xUF5GBjItGU20NdB42crZN8iKjIKQ0cMwzHyu3TN0/iU+w8DoaWtBTU1NSgqKMHKxgZFBYVtS/SfiImOgcD06bBg9Q3/Vt4Qv0FWWgZm5qZIT0vD8qUr4WDdVsrVnwhw9vSZ2LNjF3Hc20+0op/j3EXzMX/hAjwIeEx+Zs6s6LTL1YD+A+FwnjsDDDviq8TRQrZo2ptPQFAQD+8/ZI32Qd6/wxH5Ixg9ZhxSiIPbXUJCgqBAzAQLy/PYuXM7DoiLM9mAWhoaHzqqfkx+YT5+X7ECMgclWSPfzosXETiqogwFhSNMg/7gp+HETIzFdvLz2FhbEdFkwOPaVfj4eqGurm0hq21sxtsSmnPyHmERkUz81gzB6bjGBHOydwtJz0zHrNlzmNbOVX0s9/2rxEFJSEhkCh7Qfgpv3/Ze2ZxvIT4+BvwT+KClpc0a6R4nTI/jsLwcqmtqiHN+DlZkZfTy8oTI5s3MPcifob1KJIgjvGrlclSx8TI1M6sQAXf9EBsbhdT0NOzbuw96OjpMD5H4hDgsX74Evy/9HXrHjJjL0bSMDFhaWJCfse1ULTU1FWJi2zFi+CjGR2luJ0T/a6B3MUqqyhjLNw4hXJYf3hW+WhzUVre1c8L40WPg5Nb7PaO7C01K0tTRwqhRw/A68evij4KCgnBQ4iBuXL8Ga6vz2Lp5G1SVj8Kjk8OKk6fMGJP0VXIaa4S9WFqexdLly1D0phS5+QXYLbYTkuIS8LztxVwe+vv74UnIYwSFPEXZRw1iiooKmNz8//z0AzQ1NVHLhuYxwY8eYMSwETA05nzvRk7w1eKg0B1DRFQU02fNQHIiZz5sTvEyIRYTiHOsfvTrK8pTtyL6ZTzCn4cSUyYa7q7OTJuF9MwcJMTF4UXYC7wp+vTm2sfPF8OHDiMrffvh69+Kn7cvpGWkERH5DIcPy2PvfnGUvG07Os7KzsGK1atgT3aH9mhorIP5CVP849//hqSUJN6Wfn2t3oKScqxbuxaLiHWRn5XLGu1bfJM4KE/DQ8nqOwo7d+xGKxemOrYL8Tv1NHUxgZ8fiQlfH7WaST50Y+MTzESSJeaVnKI8DknJQeWoKtRV1aCkoIynZHf5mKSUJIweNRpn2NS19zOIYksKi5jyRju270BaetuJYj3xN/YQE3jPnl2oq61FRXk58vPyGYH/GWdnB/znt5/IwrcVuTndn9h0V1ZX00S/X3+Dtxfnay5zim8WB31vbRwc8O9//5Ns6fR2mftJTk7EkvkLoaSk9lUnVH9QWVFJnPIn8L8bgKdPQ4kfloDgYGKyPL6PR0GPcNvrFl4lJn3yPWg9qyWLFmO/xAHWCGfIzs1FFqu2VyPxPXR0jmHZsqXIzcvDjZu3sWmzMNavE2LCX8rKPg/Np8Wsab/C1avXkt2xLWmrq3hev41ffvkFOto6feZOoz2+WRwUegMrJSGBfxN7NfDhI9Yod0IzCc1OmBC7XwBBTz7tDttdaMV0WysLGOrrQUdXB8fUNXBMQxN6+segoakOQz19PH74+JMi2NRJlZY6hImTJ6CBgyWF/uAd2RqueFzFwiULEBnzBJeuXka/fgOYyi7hYU+hrKwIa2uLT2py/YG//33MmjkTi+cvwOOgtmanXyImKgpTJgtg4yYhlFX0zYOaP2CLOCgFuXmYO2c+pk+fjtRk7mg+0h7JKYlYSlZuadnDqK39thOjGvL3fXx8YXn2HK6RlTY6LgHPQsMQQ/wPml5Lu0DRE6M/Y2lhhZ9+/BmpPXA7TUNGaDTuXd+7yMvPw+p1q4lPIgM1NRU8fHAf9mTXp0fB1Q2NrL/xKTQXZN2alZgxbSo8PW+xRtuH9hih/TUmTpyISCKSvg7bxEGh7chGjRyGvXv3oIJLVw1LC0vMEJyG+6yeIN9CcUkJtGiVQxUVqKqp47aPHwIC/KCuoYrUpI4nPr3R/vXnX3DNo/uh9d2G7By0lzrl+YtIrFi5ijGtnjwJgxrxizasXQdjExPkEj/ljo8340PSKi8fExP7CqLbtmD0hHFwdLJrt9gzDa/X0lbH0OFDmOaf3wNsFQflgrMLhgwexIRx19Pe3FwEPa1ZtWYtpCQlUMOGtmIpqSkQ2ylG/IvHuE52DtolNy0jE3v27oaDoxPrVZ+TkZGBYSOGQ1VDnTXSM5S9LYfUoUOwtLLCy5fxcHNxhYGOPlMUwvy4GePAix+QgJvbxc+KUuTnFuCQpBSGDBoCQwMjVP/pqNfFzQWDyeeuQRaJxibu+ty/FraLg5oRmsQRGzN6NBxsnT7patTbONg5YhLfJPh4sSfkvrqmAiqq8pCXlYep6SksX7WK2PLqEBYWQUAn7apbWpoxe94crCLObns1sThJXOxLHDmsgD2798DM1ARFbwqZPHVRkS0wNzuOuOhYbBLajKCgz8uXVldWQ1/PCAMGDIDC4SMopmEyBJq2O3rUWIiJbms3r72vwnZxUErKKnDo4EGMGzUG16533jCypygvLcVKMnm3i2wjKyh7ChY3EDv9gpsrWUmPwdXOCdaWlnC2t8cjYjY1NHbeR0NWWhqT+CegIK/jjrScgha+iyYiSc5Iwx1/H/gH3sN5ewcIrSMmV2E+DIwN4efXvn/R0trM3KIPHzIC2rrquOt/B1Mn0wDGNWTX7FqSWF+BI+KgFBTkY8PG9Rg7bhwecEH8lceVa8QfGopbd9iXqNVMzIegoEe4fO0aPG7cxnk7W5w6dQJGZkZMjdzOuOh6ET/++BPCerH4QWvTe2hraEBHh4bdv8c2ka2QkZFFXX0d8Ts6Lwzn538f2lpamMjHj4XzFyCxh0LfexKOiYOSmZ2FpcuWYNIUfjzvxULBDXV1WCu0AUIbhVDBxlZuDQ3NuH7Dk5gaOjhpfgJuF11gbWeFGfPmwdXx88LRHxMTE8+0RHO7eIE10jvcIYsFzSD08bsLOSk5LFmyjPVM59CidmtWrCS73xSEhnJfEWh2wFFxUKIjozFt5gzMmTsLiTEJrNGeJcDHB/37/Qr3q+w9Rfn4dvmPnHU6pKaqChX1zsNS3pa8ZcrTKKmotntL3VM0NrbC67YvDh48wPgdXt5eX7wYLS4qxsbNm8hOPAJ3/ToufNfX4bg4KEGPn2PKxEmYM2c6oqN7dpWpb6rH0hXLsHDRYqZgGnt5j2ehT2F51pr4Gxbk6yxMjY0hfVAKXnc6r9JCL93Etoti1cpVqOWClOOy8rcoKf9ygTXabXibmBiTA3ONVQv4e6VHxEF5cP8+BKdNw9RpAnj0qOd8EF8fb/z4nx/gziHzJf5VHK5euQJ7R1sm4vak+Uk8Dv40nqojjI4bM004MzL7RtDm66TXWLtqNYaNHolLly51u8JLX6PHxEEJDQ/D3HlzwDdxAu7Q7ZjD9gQ9otwivAWz58xGTXX3i7x1BXp06UT8C3VNbezetRfiByWhoaWJsBAqkM5/v8vEX6Eh8w/JwsHthIY/x9LFv2PC2PG4TfyU710YlB4VByUxIQEr167E6JEj4UFWXFofllP4+Pngp59+hbMr5/JNLl1xh4LSUYQ8fQr5w3KwtbTBRffLkDhwAOVlnVcZiY6Jxfhx43Hewoo1wp0EPXyIWTMFyddssutzd+wcO+lxcVBoQ8hNm9ZjxLDhsLd34MhFWGVlHbZuEWVSNGk5U05hddYCsodlkZWdDyNjA9hanYOTqxMkJCTIz9D5blVWWoXZsxcQUcmjqZMC072Jr99dTBWYxLRji4qKYY3+NegVcVDy83OwQ1QMw4YOx1mLE0xVP3by6P5D5pbe0bnjMA52kELscJ1j2nB1vYzzNpbYJiKCoypqiI/rwslcyzsmzXjjZiEmaI+baGloZU73+Pn5sHbNSiQk9O3GnF9Dr4mDUlJUAlkZefTr9yvTLoDmNrOD2ro6yMpKY/GC+eR7fH02W1d586YIN27dxnlrexw3OclEwFZWd6W70nsmBm3GrFmIe8U9k6+k9A1zOTh42FDs3rsXKenfR0vn7tKr4qDQIDU7axuMGTUac4gJ5O/zbefm1AV+EPQYghP4cMb8DMed/oKiIlicPQFVNSWcOH0KZy3PQEnxCI5paxJz7su74c2bnphAVmcfX+6ogh4TE40NG4QwfOhQmBobobSd0qJ/FXpdHH8QEvoMq1ctx+Chg5jb5rqvLFZd21iHI0flMH/OXCS/buvMykn8iJhpz/Gcj9JJs7MzsXzZEmKjf7lY8ouoF5gjOBXn2FTL6mtpaWrFxYuXiB84EpMnCuCON3eItTfhGnFQ8osLoah6FIMHDWBaKSclxLGe6TovwsMxc/p0GB037ZGI4KiIKEhKysLByQWBgX5ELHdgYmpKxqRRXPxlky6b9sZbtRpH5A6322OjJ8jPz4WSkgr+0+8XiG0TQ1IS5xeVvgBXiYNSRSaIi6srJk6cwBStdnJwZUKlu0JDSyvTNHLB3IVIiOuZdl80DTX8eRQsrc7DgphV586chrOLK14lpqIrLZ+biVN+UFyCaZdM+4v0JE2Njbh+/SaWLF5EzNoxOHX6NFN8gUcbXCeOP4h++RJiO3egP7F9t2zdytSl/RIvIyMwb95MaKpp9OgqnJaZBjt7e2hrH4O6hiYT8m1kZMy0CegKJobGmD9vNqJ6MLQmPiEecpISGD5iBNMpKjCA1u/lrH/W1+BacVBoHjbdRaYKTmbK/5iYGCIvt4OcAfK5HtPWwbRpAnj+hXBxdkJ7EcrIykBJ4Qg8rl2B9x1f+N69h5cvo1FT27Udz8vzFqZPF4CnlxdrhHOUl1fAzs4ZAtOmgm/8GGICHkdhcQnrWR4fw9Xi+IPkpEQclpMhq9wwpg+Fx9XrqCj/NM01NTUNc+bNh+JRZTQ29lz9rPT0TBw6dAi+3p5oqKlBTWUVSt+Uoqy0EnVdDFmJjonGnDmzcObU2S6ZYl9DXW0dkze/TXQrhgwZwvgWNOefR8f0CXFQaAI/LQCwZv068I8ZB4kDh+BzxwellW2rnr2tDaZNEUB4+DPmcU9RVVULTU0t7NklBrPjx3H6lDlOmpjhuLEpIqKiWa/qnNyCPKxft5aVaNR5BmF3qa2pRUjQU8jJK2LMmDFYOHcuLl282OeKOvcGfUYcf1BQXMyEaNAi1iNHjsae3aLw9vSEu/slODs4flY5g9M0NrXgSUgYnJzdcdPHF0HBD+Hs7IIrVzzw5k3X0nFph17pQ5JYT53ywra87G+lsqoKDwLvQeKQBPgnTsb0ubNhSPygjIy+Vba1N+lz4viD7NwiONg4YMnSpYyZsH7DWrhfuYCSThrrcwJa0e/+PX+ya5xAWlYGrly9AsXD8jiqdAQPH3a9Sc2pM6cxm6zqkS+/zSmvIabdnYA72L1bDONGj8H8BbNgZHwcr1O/vzRWTtNnxfEH5aUluHzxMtau2YhBAwZh/sL5sLA6j7SUTNYrOEtpZSlTTMLd9SLS0pKwavkq+N/1g6GxASQkDnY5tPsG2f0EBQRw+/YN1kj3eEN2VHePK1i/di0G9/sNC+bOg6WFLVOjisfX0efF8QdV5VW4dcsLwluJwzl8GBOOsmvfXty8fgultFELh6DFCHQN9KGorAQZuUOQkJRESnoGJCUPwPXS5S6Hr8TExmLOrNk4bX6Sbkes0c6pIf7E/Xt3IX9YEuPHj8PAgQOxYtUKuBET820XTToeHfPdiOMP6psa8Oz5c7Jy60Fg+mT88ttPmDxpMpSVVZlkq5oa9ic95Rbkw9rODqdOnkRKUjIqqusQFxeLxnbqz3ZEcXERVq1ZjX17xVFd1XGZUtpmLib6JQwMDTGXmGH9+v+GCRPGQU1NA8FBIUwjHR7s4bsTx8eUlRbjtvcV7Cc7yDj+SRgxYhSEhNfB0FAf3rc8mT56VbVELL1Z4YBFc0sD1NWPQlREFGUV/02SqqltRGZWJnz9/WFqaswcxY4ZNQpjxozF1q0icHR2RW52NuvVPNjJdy2OD7S+Q3xcImxtHbBz907mPmTqVEEsmD8Pu/bswAkzM3h7++B1YiIqy8vR3Nz8SWX0noB2yop8EYWABwFITEolzvxDJkPw0AEJLFm8GFMFJmP6jOnYsH4DTpqaIzo65kOPPx6c4a8hjo+or29AUnIKvIgDbKCvj+07tjGh8rQl8dLflzENXlTUVHDG8izxV24i7EkoXiclIr+gEHX0xpsNuwwtBldcWEx+jiQ8e/Yc/t7esLezgb6eAaRlpbB+wzrMnjWT/FyzmKb+tL3B1aseiCGmWg0b627x6Jy/nDj+TFl5GRNndPXGNWhqa2LndjGsW7cOCxfMx8wZMzBnzhysWLkSW4RFcVhGErq6x2Bufgpnz56FhZUVc79y68ZNeBIz7XHwIzx78RzBT0Jw+7Ynbt26hSuXLxN/xBbnrCxw+vRp8vd1oCgvi+3btmP1mjXEb1jIiHPhgjlYu1YIO7bvhKaaKi5ecEdUVDQKi4rJxtd3G8D0Zf7y4viY98SBpq0TaDX2GDIx797zh4uzE4wNjSAjewibRdZj+aq1+P335Vg0j0zohfOxeMFCzJg+k6z0szF7xmwICAhiPjHb6OMZ02dgyfxFWEbMooXzZ2H1siVYsWI1hDZugLiEJPQNDOHq5Iy7dwPwIuI5UlPTUVpahXctPDFwAzxxdJGWd02orq1Afk4+MlPS8So2Fi9j4xFBdooHjx/hEdk1fH19cMHtKtkxvJnHDx7fR2gY7Qsej6iXSXidmo383HxUVlYQv6aFFwPL5fDEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHB/DEwYNHuwD/P1/LLZqwLe7kAAAAAElFTkSuQmCC)
maths-General
maths-
The mortality in a town during 4 quarters of a year due to various causes is given below : Based on this data, the percentage increase in mortality in the third quarter is
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)
The mortality in a town during 4 quarters of a year due to various causes is given below : Based on this data, the percentage increase in mortality in the third quarter is
![](data:image/png;base64,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)
maths-General
maths-
The mode of the distribution
![](data:image/png;base64,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)
The mode of the distribution
![](data:image/png;base64,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)
maths-General
maths-
If the mean of the distribution is 2.6, then the value of y is
![](data:image/png;base64,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)
If the mean of the distribution is 2.6, then the value of y is
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZkAAABwCAMAAAD7R/0CAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAMAUExURf////f39+Hh4fLy8vn5+ZycnBQUFJ2dnfv7+8TExKqqqq2tra+vr1dXVxsbGwQEBGpqarGxsa6ursfHx+vr63JycpmZmampqaioqKenp5+fn5ubm1paWl1dXYeHh3BwcGZmZqurq5aWllNTU4iIiGBgYJWVlXZ2du3t7eXl5YuLi/j4+Pb29o6OjvT09JGRkdbW1qCgoO7u7oKCgtjY2JeXl/Pz842Njefn5+bm5omJienp6YyMjM3NzZqamuPj435+fs/Pz/7+/ujo6KOjo2NjY+/v739/f9HR0erq6v39/dra2p6ennx8fGxsbIGBgW9vb4WFhdzc3Pr6+qSkpN7e3nd3d1tbW1xcXEtLS19fX9LS0ikpKQAAAIqKinNzcysrK/X19SUlJUFBQeTk5C8vL2VlZbu7uyAgIE1NTfDw8FFRUVBQULe3t7KyskJCQjMzM6WlpcPDwxoaGjQ0NEpKSkZGRgcHB7m5uaKiojc3N+zs7Gtra9fX16ampnFxceLi4nl5eTs7O+Dg4L29vWhoaMHBwba2tkRERBgYGGlpacDAwDIyMsnJyfz8/BYWFoSEhN/f31RUVN3d3Tg4OL6+vgUFBZSUlDY2NtXV1UdHR0NDQ4+Pj3h4eDAwMLS0tCYmJhMTE1VVVcXFxYODgx4eHkBAQEhISGJiYr+/v3t7eyEhIVlZWT8/Pw8PD6GhocrKyiMjIywsLLCwsExMTNTU1EVFRXp6emRkZIaGhrW1tRwcHGFhYZiYmLq6uh8fH7y8vMLCwrOzsy4uLjo6Om1tbSgoKMvLy9DQ0PHx8dnZ2dPT0zk5OSIiIgsLC4CAgD09PScnJ15eXjw8PDU1NXR0dFZWVklJSSoqKsbGxszMzJOTk6ysrBkZGcjIyG5ubggICA4ODn19fR0dHXV1dRAQEGdnZ05OThUVFdvb2z4+PlJSUlhYWJKSkpCQkC0tLc7OzgICAk9PTwwMDA0NDRcXFxEREQkJCbi4uCQkJAEBATExMQYGBhISEgMDAwAAAOnXIcIAAAEAdFJOU////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////wBT9wclAAAACXBIWXMAABcRAAAXEQHKJvM/AAAKoUlEQVR4Xu2dS2LrKgyGM2YBjBmwAhbDzGOmXgZzdsB+2AAL8fhKGMeQOrZwWh/flu+cNsTxE/FLwq3VR6fT6XR2cPm1czPYwHOrc57Ivh0/DcLkdqeRmO3yUILnRd/HB3vkvn1jL3ODjha5QYf73GhAnjiMUItlZG7chBOnw9ujGmO5QedMR7kTTl0ulnHP1i1QJ05HPh0AGdbeZUrnRgOx3ZprB5zpih/kvpZxZyxz4jDPDribZvRdLXOZZhbf3DVD5CLNrB1wuzjTHs7vqxnXNdPKVZppt0yPM7lB51TW3HOzVv6RZgieelXKOkiZF7DUaS++XGm77z9LHWcio9ipsIzjGi/ikMIyCmbqmnCBL3FGUmy7ZgDQrd5bf3ycrTgTw4AzYzl8cSg8tI/Kk5SaUTyMbZaJQRg+2eONVssoa42x4bjLas3wQeTWHqtmzDRaawnObe2AIs7wwcB39rU3Yqki9ryx8xMUmnFajyNhMJeW8XBuOl3GPqtlnIC1zXDcZ5VmnJ0ollnjTByJg3szN4sT7sjjGSgXYbFyDtybUvAdl0V8VTbMrzHvIa2konru5iOK01HxIRo1k5BNlkkYwk8tKs0IaRs1QxpjwFaceTzsiKMBx5DmwjL4bGQyeCfAmykppQe5mDB5b2ANLfKWMrAHJw0hAnWcOWUZH443qi2jBKHfSs1woWiWeR7GjIY2dtehWTp2De6We1hm/UONYCY2CaY1uLkITZa+nAfNgENnILH5uC7YB7dEsR5RJ/H+hGVYOJZMZRnHrSUM6EIzEa62UTMxaOmrUfeGtQPKrjDQ8x7P2cAu5IQL0q7ZZB4OrlcF+DCNY1BRdAFslz4OUn+TYaqBgsciXEttmTgWnf6W0jJR+rE66jarZpSAJuRZxyNgjTOKRccChsEDNuPMw406zomdYtyG2VQAn/DaI9f41qM9bJBc6nx5ipZCkahnmu3ezFHyn9oy2AdNcQZ6WIsQCEd6mc/I1I/7FN6s7Aoxgu8CuOfRJ8ukM06aEYKxp2bQ1T3hI8GzE/lQMyrlL8e8ZABqAh9+QKGZGKMZ7ZIC7fBiGZb9/x7bmoFNk5NOBhG1ZvBtRMsk3y8m2N7N8pLS4fLv4UPNSPQX/PgHlqtlHPaEm44NWs9niHHmeRiOLU2YF27HGQjmacoFE7Zo7OAebM7zcaIDnizCJBQlqXmMwXKWQpJCI3mCTGmUA0XFcaLcBFgtEycQvSC4psIyg4hOEGYb9T0ATHuOWTUjJubMeGz/ogMqzSg974pbARNjrqTFIez0KMGbeRk1RCGlcWH0FnJnwHlIVAzNuxMoNKOYsFYQ8pnVMsyOACFPXC0DRxGkuzO1ZvjoCYNx1Qx0HYSD/GaPVSm1+6iACST8yw38Pn+9MC/a+OAU5XwGJwCUSUCZARCp4gzt3GvN5J45oIozxMNsx5l/z5nT+dQyNF7iDImXDIDCmzjz79mR8FuusUytGRof/bS5a4bI5Zo5M0h/kPq+GY37auY3/R7AGefa48wV3NebXaaZpQN+QZw583vN11jmswxA8BvBpM8tOsxrlptUmPCtm3BuefNhdPth5PoswA88pfEBlz2l0fx8z1VPaTwzsl/wlMaJdO5/4c3+/3HmvhnAidxs7YDb5Wa/aT5zSjM3nc+c0swl3uyi+cx9NdPvm/0mzfR7ABfQ48zTHl0zRPrPZ+5qmR5n/rhmCm/Wfz5Do2vmj2um52a5Qeev52ZnBsov1czt4sxdLfPn48xts+bLc7PbxZmumWera4ZEjzN/XjNPy3TN0Oia6fcAcqtnAESu10z3ZjSujzM9A6DxLzXjYqLd0b9DGYlVXZ7g+4NefIkzinIyhWWciy4Sfpv2c82QBlCpGehdyjabcYZPoxaC8JgvEaW18cWziUpLMx6UN6jDHhbzOGa1jLJTmOangPf5VDMRizUcs2omQs/mJ1v32dSMCl4p5SkP7ZJAM8zFhGZcYNX7LWpvxgdCRazKMp4xTrj+zzSjmB8oQ6bQjIS+iJSKFmsHFINUjfiMu2v32m8QLzZmWETggCrsGT+2acZZYo9/phnDY6BZZtUMnmOqonDAtmaSZXCRdgZLlzipOX7quJYMxrsGHxhTTRMFSxyuGCM2AAPrRiagl4yeq9CYEOaGYuDW4EVPPh0M9qNg082hXcYZJbho1QzlwW5gtQzDSMi2T6aijjNEy9QDwFNKQm3FGRXAMtiZetJisA9juUFHb6yMchofyoPNU4kCZ3UU1mFlPOlTdTzpGR+kGbx6xFwqhE+wHe7WC8ODhEsbsqHF4B52u7hD6c2k+CK7TUrNCLP+MYodVssYrP9F+assdW7WqhlkKW61yxvNQAYwwejBs3UmFfBgA7ziWWDts1QZCDtLwBs3SfgCS4gJrJEq0siHh/cuF6RwuZxVqvWIQjZLcQ8VtCtTg4JCM1irCg52XBGg0IwQ2sMgOKTwZhhXWWN9s1OaoZVEexNnbGRYGgIrAKGJBWN64iqV0rJwARL9JF5JsIxzUFgaBTyoh8z5EFoBhnpuz8twS7Awlkdbrh9E+cZ9rCcG0dw5b9fnSd6yWiblsm3VGuF61Fw67IBKM5As5dYulWYEoYbWW81An2LSjRXmYJ1BRwNJ+CxCLJ6VLIPDePIGPkLHhZYBzcgsBxekWoqLoLAQi7EC6yGapwMDx5dbrxRu1gusVUUovlRYBolYHeeAwjJyhFQrt/f4VDOaUt6u6oDCMhhnkEUz835jmuGMpWaW2oxpFYmaSZ0OexJ+kYxa6t+gH0xekS3ejMu3qXl5OuDIWjMAvKrYVBHowS07mv4mPowzHA0zV7faZVMzjyVHnYtnYS1TSMUgWAenDGQAGCgVw3MS4JuchNnK4s3iICDdAnuauQ4XkD5DeKpXBytlzSiwXS7P9ZXydIDGDCDZXm/nFhWFZUygpdqfaSaO0kVDmGpuxhk+zL2qxFyy2YyjRQ/MwKdw1Iyzk+cWBAVGsx7W0ZCLKQ+uSckwprpOEKtwFwBbOkiBjiSc07JbDrM0FRb9vFDfxjOB0MuFZQxW66NkzoVlIJzm1j6FZnCmOWnCYVbNiGEK00C4O7Gpmbj8+TPDTFqocgrq4CUVaXQGdJKWzZ/girBS8n15m2epKCyXmoEdw2e4Iq7i8GXey1dqzbjiD7K9p8wA4BjHV19ZhhEKjyPlPQA4CsvXu0uhmfR4LGGTzTizS8qwjjFLAqJI0/cvXP5TgEi5mYXUcYZGPZ8hsR1ndgD/dbye8jL7bKVOVqwv5jNkzlsmgnNe1bNPHWdovNwDoLAZZ/ZgI1bYPkD5pSRv1NXtfzrEgVLxgWUC4aoyt9VMLkG/zzpfp6y9xbWaIdxgeHKZZlrjzEWcOZ2P4gyZu2rmKq7yZu1ddtc4cxX3/Q2Nrpm7Wuavx5mumftq5tLcrIE/H2dOnE7XzBV0zfT5TCtdM9dYps9nWum52V/XTI8zrXTN3FczfT6TW3fTzInT6Zq5gq6ZPp9ppWvmGsv0+UwrpyzT7gAv8maf/WUgzYzB35+6xT/D/Pxy+A//ZwTPjbSM8mW0xu/QbPjvcRPiVhkucuP18/f/2TptaP9zH52f5NzvHHU6nU6n0+l0Op1Op9PpdDp/gMfjP4P6hqWu0ck0AAAAAElFTkSuQmCC)
maths-General
maths-
The matrix
is a -
The matrix
is a -
maths-General
maths-
If A =
or
, then which of the following holds of all n ≥ 1,
If A =
or
, then which of the following holds of all n ≥ 1,
maths-General
maths-
If
is to be square root of two rowed unit matrix, then
and
should satisfy the relation
If
is to be square root of two rowed unit matrix, then
and
should satisfy the relation
maths-General