Chemistry-
General
Easy
Question
Accordingtoequation, CH(
)+15/2O(g)→6CO(g)+3HO(
) ΔH= –3264.4KJ mol the energy evolved when7.8g benzene is burn tin air will be-
- 163.22KJ
- 32.64KJ
- 3.264KJ
- 326.4KJ
The correct answer is: 32.64KJ
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chemistry-
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M is a metal that forms an oxide
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chemistry-General
physics
Circuit for the measurement of resistance by potentiometer is shown. The galvanometer is first connected at point-A and zero-deflection is observed at length PJ=10 cm. In the second case, it is connected at a point C and zero deflection is observed at a length 30 cm from . Then what is the unknown resistance X?
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)
Circuit for the measurement of resistance by potentiometer is shown. The galvanometer is first connected at point-A and zero-deflection is observed at length PJ=10 cm. In the second case, it is connected at a point C and zero deflection is observed at a length 30 cm from . Then what is the unknown resistance X?
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)
physicsGeneral
physics
A potentiometer is preferred over a voltmeter to measure the emf of a cell because....
A potentiometer is preferred over a voltmeter to measure the emf of a cell because....
physicsGeneral
physics
A 10 m wire potentiometer is connected to an accumulator of steady voltage. A 7.8 m length of it balances the emf of a cell on 'open-circuit'. When cell delivers current through a conductor of resistance
Ω it is balanced against 7.0 cm of the same poleutomelic. What is the internal resistance of the cell?
A 10 m wire potentiometer is connected to an accumulator of steady voltage. A 7.8 m length of it balances the emf of a cell on 'open-circuit'. When cell delivers current through a conductor of resistance
Ω it is balanced against 7.0 cm of the same poleutomelic. What is the internal resistance of the cell?
physicsGeneral
chemistry-
The structure of the following polymer is :
![](data:image/png;base64,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)
The structure of the following polymer is :
![](data:image/png;base64,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)
chemistry-General
physics
The reciprocal of resistivity is called…….
The reciprocal of resistivity is called…….
physicsGeneral
physics
If a copper wire is stretched to make it n=0.1% longer, then what is the percentage change in its resistance?
If a copper wire is stretched to make it n=0.1% longer, then what is the percentage change in its resistance?
physicsGeneral
chemistry-
The standard molar heat of formation of ethane, CO2,andwater(
) are respectively–21.1,–94.1and –68.3Kcal.Thestandardmolarheatofcombustion of ethane will be-
The standard molar heat of formation of ethane, CO2,andwater(
) are respectively–21.1,–94.1and –68.3Kcal.Thestandardmolarheatofcombustion of ethane will be-
chemistry-General
chemistry-
Given that standard heat enthalph of CH4,C2H4 andC3H8are–17.9,12.5,–24.8Kcal/mol. The ΔH for CH4+C2H4→C3H8 is-
Given that standard heat enthalph of CH4,C2H4 andC3H8are–17.9,12.5,–24.8Kcal/mol. The ΔH for CH4+C2H4→C3H8 is-
chemistry-General
chemistry-
The enthalpy of formation of ammonia is–46.0KJ mol–1.The enthalpy change for the reaction 2NH3(g)→N2(g)+3H2(g) is-
The enthalpy of formation of ammonia is–46.0KJ mol–1.The enthalpy change for the reaction 2NH3(g)→N2(g)+3H2(g) is-
chemistry-General
chemistry-
Since the enthalpy of the elements in their standard states is taken to be zero. The heat of formation (ΔHf) of compounds–
Since the enthalpy of the elements in their standard states is taken to be zero. The heat of formation (ΔHf) of compounds–
chemistry-General
chemistry-
Theenthalpyofareactionat273Kis–3.57KJ. whatwillbetheenthalpyofreactionat373Kif ΔCp=zero-
Theenthalpyofareactionat273Kis–3.57KJ. whatwillbetheenthalpyofreactionat373Kif ΔCp=zero-
chemistry-General
chemistry-
For the reaction; H(g)+½O (g)=H O(
), ΔC =7.63cal/deg;Δ=68.3Kcal, what will be the value (in Kcal) of ΔH at 100°C-
For the reaction; H(g)+½O (g)=H O(
), ΔC =7.63cal/deg;Δ=68.3Kcal, what will be the value (in Kcal) of ΔH at 100°C-
chemistry-General
chemistry-
From the reaction P(White) →P(Red); ΔH=–18.4KJ,iffollowsthat-
From the reaction P(White) →P(Red); ΔH=–18.4KJ,iffollowsthat-
chemistry-General
physics
The current taken from the 30V supply and the current through the 6Ω resistor are respectively.
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4mDs6Vwb5/MX4Tic022yx7FZLDzqlm51074rPiVVm0KBlPLJoJazC6GNdCwQBcf/316cQTT8w1/ypVhBmUQe644445SWlxEyNRD17I3//+93yBS+bpEdQsNu9icrxupWrRJUZHKwyiMJO4vASsMEoweHyOd955Zy4vVTU1UG+kHZGPsdZCUQPBMPka7ZOhoI9xKxSMP4/BbM7iKnXtat+Fjhhxm81wo3kAjS5ei8aEkiyuGoixJBRccuWW8hVq5kcrRNFnRly9nyCAgg0VcK6rE044IYdwx5KXOV4Zt0LByJvBiatKPIu1CwepeOH6n3XWWVlAtKBolJwzWyoWTwlZ3XrrrdV76kMohLnMHuUzGjWFa3dUcSkVVa3jc4rGcEEZFX4aK/LIhSRNyILRzbgVCmEjLr9qjfLKWBANzde0Z5Cgrbe6tsBsSQ8eHoheQc1KGsWdhbrkKPxsl1W3g4GIqujRtkK4Td4lCGoxIbKKXXLez0mTJo26vEvwHONWKOQSzPDLOYVixn/yySfnFbNKFSW4+4sbM5xmT1pOX3vttXnGzQUvx2f9H16MUlmVUFpxW3PhmGZ5jXbC5yOsINGvg6vw2WgUu6D1mECZhMn9GcK5jRYfBu3PuE5m12J2TBgYQvXg1j4o9+wvxqrmXvJOKwdhKKElbRnKLrfEuTp8ISqlpLwQouKYRouy2g3lw9aFWFvgp4od4hEE9bCvhvUgikWEcKPgYfQSQlGBEVf/rjcPkVDNoxFcoy6lEuFKQ1V12LzF5jRq4Ndcc83cfoFgaMWsqVwBo+piUQb5ute9Lvf2F96yIlc4p93hJcnp8JyKJGUQ9IeJBG/CeaN1u5xeMPoY10Ih5GNhlZm9Pj0bbLBBjqma+ZsNyTdIzPlZ/G72z2jKR1iJKzfhMRK7O+ywQxYMISu/q5gqEKOV+DUbF9bSC8jj7Ivgf7UzLnb5HN1MheWE58KTCAaKSZhw61577ZVXoke+YvQxroWCJ3Hdddfl6qZXvepVabnllst9eiTflHwy4uVtIP3tpCcWQlIeq4HcX/7yl/yTm+13PXx0/lQKW0BchJk8xgxLaEpuw05pjdZptAuqvnwGWmnzkqLcMRgMJlkmY9ZXKKcW0g3PYnQxroVCMtkCIVs96vhpXwG7nwmtWFlq9mxYWyHOKhHN2xhPs2miyDMyG1QbryJsoK1NgqDAtaYVisWpOgybVAWjh3EtFNxfuQPrGTT0sw7C7+LvhuR2MeQkeATyFqOlSunFIixHGFWtWKl+0UUXtb33E7Qvqp545jx4nrrOBOPlWhrtRDK7DjwGs2Y/i+FvY7yc2DwJjfDkboQLeFURLgheLNYsaY6pmwEvXb4iaH9CKIK6SFi7kImEVdijrZtp0J6YgOh3pommTaHk6aIfVPsTQhG8AMlqLRhsBSpHo+JpPOVlgtaiyk9uUNGIdUvNOh8E7UEIRfA85CWsIRFyUr5rdW2IRDDUqDi86qqrcjPNIl8RtC8hFMHzEHKygNCCQbXvkvhB0AoUkFiLpFuBdjDCmxGGak9CKIKl8Bys//j4xz+eV9JKXitrDIJWYAGrHf6UpMuF2dkvtlFtT0IoggyRUOWkZ9XHPvaxvCAwCFqNEnVdDlRBSXBLbgftx7gVCobRmoCBlLtK7g5m/YDn5EKPljYFPgsrxImEFiR6Xo2Vva+D9kdeTM+zosWH5pOxvqK9GLdCoZ7b7KW/Om4nrNXIjp08eXL11sYQFFUc9puo3eeiXdHV0wWqUaFZnb2PJRuDYLiwqFVDTr3QbCQ2kGstGD7GnVCY5VthLQYvLlokbBu1pWD4dX11AmthYeV2syqgIkHHldb6ot3bXRAErv9OO+2UPw8t0kMkguFGB2X5Mau2tfhwzUXZbPsw7oTCtp1WGa+//vpp+eWXT29961vz3hD1wkS8CSEZm/S87GUvS6997WuzWJiB13ONhaisOn31q1+dXv7yl+dQTjuX/RExe1/rgLvlllvmBXaNWqsHQStxPWkeqKGm9vsKKlRCjYYW/OOBcSUUxEDCVmOyt7/97bndN6EQk68Ho2lmo6PsS17yktxddptttsmdZWfPnl09qg9ehv5QZkSOM8T7zdbbdWcvngPhe9e73pU+97nP5b5OQTCSWIxXiAXP3DkZHu7IM66EwuxEV9iNNtoo7/dsfwjewsEHH5w9h9oa7rvuuis3xLPXhHYD9onWHO873/lOjqkWEAkhKesPHCfOL1T1gQ98IJ/wFrA1qw8fiaS3tufyKEJO73vf+3LIKbY1DdoBYiG57do58sgjY5OsNqBthILruSyDkS6GUAqja/i9uL04zn7PVhsLIclRWFymdTijzsjba6KMNgMExX0S08I0Tlyrlu0rUTB9+vTslWy44YbpG9/4Ro6tEhICJEFs1l4vsW2mpG7c8/pZ+94ajeJ9Fe+tfFu991/8XuB3r99r3XXXXdNxxx0XzdmCtkIeUejWxOzcc899gQcfDC8jKhQSxYw1gyycY1arx9Bgho10bF1qXHDBBbkdgHHeeeelX/7yl/l5r7jiinzcvvvum97whjfk/ITjGUxeg1DUm9/85mw4eRZut9BML5pNNtkk709RYAMfXoj2AwXaXPA2hLO0US6wTaoZO7Hwegp4F8pPhaUOOeSQLFQqPrwfj6l9j+XhM/Lai/d2+eWX59v97jYXlfevh4624G6z4ZL77e3tAhR+O/TQQ/Pe3QSOiBGTIGgXlMzav8KkTDjX9WNCFowMIyoUQkEMmAVejKmqGwZ3IKM41mOLTpROKmGhww47LBv9/fbbL7ei2HPPPbPB5kmsvPLKuWWAvScgAS25/cY3vjEbegk0OQWvzXO5nVEtED/1f5STSow7ThLY1qbCVOU4P8/Cc7vP6lMrna1GJRJ2+frgBz+Y1lhjjfTf//3faZ111snvh2iU32d5eM+MO6HyHgicsJjbPc5t4rre/0EHHZSF0W0uNJ+DJn9HH310vt1Wrf7mzQRBO+LaNJly/fAsTChdbzrQGjzy8TRqw9czZ87MxTJEtdWMqFBIFputr7nmmul1r3td2n777bNBd1L0N7bddtv8k9EzK2fMzZyteSjWSDDGQk3bbbddzhdsvPHG2ajyPMqzE16FGb2kru0ahY2EghhVO9/98Ic/rB6ZspFX57333nunM844I7cgIBCO401YLFTgRFd6KwTFoCvFNZt38nv9K664YlpttdWyQEl8Ew6j9r0Ww2OEioS/dHW1QMmufD43gkm87rjjjvz+r7766lyB5TavX7kuMX7HO96RBdP/83mFSx+0M6IBIgAiAYcffnjuGCBsaoc87crH01B6TyhhwilyIGw8HP3YRlQoGGuzduWkDF4RLmLI+xuO9VPttdyDhPGUKVOqz9wX3vEB8gCEYxzPMDKgRKCszn4nFl4L74RAyEvwAsy67YNdQNl5DWbzSkol3BhwgsRLqU1M+5toqQ0XxvIa/vSnP6Wdd945rbLKKvmxetzwrLwf95ffZ3l4D8JOThhiJvwlFOYxQlDCSgW8Iu/JbYYLjqASyxVWWCF7YJGXCNoVHoNJGG/4Fa94Ra4ifNOb3pQLL0yMTP5cO+NhqLQ0RAUIg/35fTZKiH0eRKTVjKhQmH2bya+66qp51s1gyw8MZpSTvPVwTG1iux5m/2YqxEG+wgzGLFxuQ4ipDFUX21dau9JKK+XwkZBP2ZsoY9Yueb7uuuvm90m4hIp4D5LpRcuC4jX2N4r34Pfye2uG+1WP8Go23XTT7DnJDw2mNUkQDAfO1UceeSS3IHdtiTast956+Xp729veNu6G922IeJigshnyj0TC52Li2WraQiiEX7iVI40Z9te+9rWcMxAOk8x2W22il6EW2xfuMdNxvLxAszCOhDevYoMNNsiutPCPxwxnqwLvwyZEPnN5G2E/Zb1B0E4o0xaelUfjAcsBun5EA37/+9/n8NN4G6IHoidCbsLrPovNNtssT2r93mpGXCiEQwgF41UbthlunKBm+xLHPIRm9dsSSFRdTkUYSfin2ToE79Vzy5V4v2uttVauFR9ueE7yJJLcEuPl6q0gaAfsS8ED53XLsUW3gBci/Cz0PW48inYSCqEv4RgL0ZTJNisZ9VrlOq699tocslLhVM571OI+7rTyVvkPscai8mq4EW6SExFm48Z6zwQkCEYauQkzZLmJY4899nl5x+A55GSFnoSzQyiGGSElr6GZwS9wLCFxrNFMVAoYY/kNMyZDb5uRQqmuyil5GMKlmqvIfQTBSOD6EFrSTkaxRXi79WFrrIkKoQhajpmbEJTSXmW24qDt2pMqGPs495yPREKRh5CTyUzwQiT7bQWgEkq+0/qSVhNCMY5Ri63UjmehRFeSLAhGAu1zdDFW+mqdkJLusAf14fkrfZdjVMHoGm41IRTjHDM5rRKUIv74xz+OtRXBsKMwRMsZXZoZP+uWBhL+Hc/IdxbeV7nvXKsIoQhydZd1IRYPamFi3UjkK4LhgvdgkatqQ96tthRx/jXGZyOnKOHPA1NQ02pCKIKcr+DKcv2t9tSYMFqOB8MBj1Y3Br3ZhD91HBhIYch4Ro5CxaR1JrZMKHeOaBUhFEHGxWmdh0WB2jvfdttt1XuCoDXYE8UCMk0u9WxTyRMi0T8+I22LYsFdMCJYO6KBIK9C48Np06ZlbyMIWoHiCR0ZTE6smYg9sgcGodBvbly18AihaB8kEHkSmiNqT6LFR+wuFrQCayY0uDQpUQpr0WdMSgZGIRSxMjsYMVSgSI4JBbiIxT/7azgYBIOBIOjdZL8YXZetMg4GzrgUCgJhMyFdVUMo2gOt1CUYJbftuaEqJWLHwVChBFseTN8ze8ZohRMMnHEnFJp9EQitutXxh1C0D8rvbHykMZu+VE888UT1niBYdvQZU/evdYxybHkKE5Ng4IwroVALLFkqifXud787zyxi1to+CEEJOwlBqdfWgydafAQvBjkwIiGBrZ2/hZ6xXmLwjCuhEPc2S1WS+c1vfjOfNEF7oYGhPjK2mdVWQZuFuLCDZUXCWvt+q4l1AbDnczB4ykIx5psCerNik5dddlk666yzYpP/NmXWrFl54xgXt58RTw6WBR6qa91e87YXtp9CsGwUQqE8dp111hnb6yi8WXXTVgHbJPyOO+6o3hO0E8oYdZZVofKJT3wit/hQhOD7C4KBwDNVSSfcZAW2JnYj2WJ/tFMIxfvf//709re/fWyvzC6EwpaHjE8IRfvioraBu42O7BNA3CNsEAwEeQnnDoGwNkfIKXase3GYvCkp/tCHPpS22mqrsd0UsCwU55xzTo5/B+3LokWLcsmsahVls/F9BQPBJMPe81ZfW8B57733Rp7rRaJyzH4UikysdRqOMF4IRTBgbEupxcdHPvKR9JOf/CTPDGMxXtAIIiHMZGIh7HT33XdX7wleDLw0QvHpT386C7AwVKsJoQgGDFG48cYbc5Xa/vvvnz0Mmx8FQS3WRGn4Z60Eg3bRRRdFXmKI8NkSBy3GN95447G9cVEIxehEYvKaa67JK+otyBuNC/G47jZ+Eee1licYeqy+1lhSXkK1nD3iXfPBi6fIUfDstRo3eWs1IRTBoLGSVkmeZm6XXnpp/h5HE5MnT85GzA5hFhIOJmZOZFR9zZ49O/8+mMfyyJz3Yz1cZ2HmVVddlY466qh0+umn571OgqHD9ScvYU2KXnn28Gg1IRTBMmE9hdX0YqSMrvUWowGGXZWIipE3vvGNeWe1OXPmVO/tH/sAWHxIJFXq2eBpIGKhEZ7zXd8sQmNWOBaxXoIRO+aYY3LrFyIRXWGHlkIonIfE+MEHH6ze0zpCKIJlgkEwG99rr73SnnvumX7605/mmXo7wwMw+zILW2WVVdJyyy2Xdtlll+y699dnjBfg4hRy22677dJHP/rRfN66SPsz+kWVyve+971sQG+44YZcRTbW8D6JsM9X8ppXESIx9BRCcdhhh+UxHFsBhFAEy4wdyuQrJCt33XXX/F0SkHZFPkXV1tve9rb0kpe8JA8LlnhE/W39ymOyT8fWW2+dvvjFL+bup0TjV7/6VVOB5G04z82u/V9Dmah9occaGkma5e64447Z2xyL77EdKLw2Ew/nlXxbqxlxobB4KxbcjV7MjAm9hXhO2nbe6MjqYKGy5ZdfPq244orZaK+//vrpS1/6UtPWJEU54s4775z76+hPdsEFF+TV6urYCWQjzLJ5Xla1r7nmmumlL31pfg5exViCV3XJJZfkajiCKtkapdOtQQ5IyyNbALCdytZbTVsIRbTwGN0wsmeffXZODkteTp06dVBJ3lbjXBNyOuigg/IewxtssEEOjfAu7NeseuS8887LuYN6eD/6kWmZoJvunXfembeN1QWV0Fh1LM9RzzDyusSRt9hiixyi48Fo5GbGPZoqrrw34TmfpZ9W5pvJCr1p9sdw+XwPPPDALILROrx1OKduvfXWfM4qJhmOle4jJhROPCVz6quVWQ7HMvSgNTAevr8DDjggr9w2426nslkCwE1fddVVsydhHQhxY+x+/etfZ6HgLbjo6mHTf+sBJMC1oBCmYixNcmy+s9tuu6U//vGPddcJEAN5nPe85z35sZLgwnRyHJdffnm/s273F8Z5oMOMU9iHmEmev9hBDDwXYXDNEgbv9/jjj8/i4PO0rwyv8gc/+EHb56pGO4VQuM6cv2NaKMw4ncxmVmqBXUT9XTRB+8LoCrHoByXMwktslxi1sJEEtOQ1j4KBLuDV2jTLLF/OobZ6S0jFzM3ipiOOOCIbzMJbYkQ9dptttsmt2MXoyzDYqqTkcISpeCL+nzg+D0OIpplXYS2CxVSSwldeeWW/w+fvWN4dA7777rvnfMGyDh2DDeLPK3KNMk7CHfIsvmeVY6961avyz+9+97tR5TQMFELhGpMja+QJDyUjJhTwBl2cr3nNa2Ir1DGA7+/CCy/Mws/AaPPBEEq+MR7CES9meA5DmGfChAk5XEkEJPaEPuoNnTWdY2uvvXbOEZj96jdUIMfCyDLmZsTi7IXxJgjTp0/PRtFOf7rolrH4kBfCqBIis+wyZt/iyMJVp512Wl57wTvQbpsnwpNRDFBbAOC9eo08ba/J6zdTP/nkk5sO3oqfriUekhzM//3f/72o4XPbfPPNsyB6D0RIhdv555+fPxcCSnwJX0QFhodxKRQu3P/93/+NrVDHCLa2NJs1Q9cv/8wzz8yhG7NveQL3L+sonsNiP6EkxlvegJFmsMqDWPn53ve+NwvE6quvvnTrzdoZL4Nvs3+JWHkEiWq3MdhKZ82mrbfgEZThAQvHEIINN9wwN78reyRETKK8aGHBwwAR0NBNBRUBqE2kMwKFl+P1y6WI+/NODK+p2dCtlagJSxC+ZR0XX3xxft02FeMp8HAkTnmKrl2vW5sO/4dIjpa1NKOdcSkUaq5XW221PGsKoRj9MIYMlWqg1772tdmAmgzoC2WYiS7r8HhG3KxZ4tys3Da6jOlmm21Wd+iFs8kmm+Q8gpl8I4gCUdt2221zSIXBLbwJf6vsqpd3ITpCWcTA4FGJGat24m34v2rdiYPqKbjQvQ+vn6CVe/XonaVc12z+DW94Qw5PKR33GN6P4TNuNngoQmaEjFe0rKPIj/SH67b4X0HrCaEIoRgTMFYSvYwgY2fGzTAWhr6eCAxkeGzx+F/84hc5dyBm3my4mBynhLW/Faw8AAn5jTbaKIfN5Bz0KhLC8TfhqIcLlwh5v5LUwl3+Fy+EiHkNtch1OJa343WCUebZCEm95S1vySEkHkvk7oIyIRQhFGMGlTGMq9m0BKuwhRm5ny92qKqRRzBzl0TvbwiJqFQyy2+G1yxhTSisCREyk2ux3WQzoQBhEE6S2BYW44FYs7HWWmvl32vx+i3ce9Ob3pTDT0JdwmqS3kpuhZ5uu+22mKUHLyCEIoRiTGAGzKtg1Bnfdl6tXYagiO0LazHiPAIeBeOtoqhZTyghI56LliDWSmy66aa5Eojo1Cu7VUorOSwJLNdy7LHH5rUdhMNjbZgfnkRQjxCKEIpgBDF7JwbCVHIsVlDr0CmHoIKpmUfiscJJFt+98pWvTK94xStyNZDzulxlVeB4ewp85StfyQsAJdtf//rXZ+/Fbf2FyYLxSyEU42LBHUIognZE6a3zcaeddspVPy5Miej+wkCOUf0j+a3iSiJaCW+jBoC8ENVMSmCFqORCylVXQVCPQijk6kxqhFdbTQhFENTAsKvcciHWLqLrD+EruQ2CoZy3P5zzPBYlsNqfSIrrlzVW25AHLx6hXGuE5NGstTGxaTUhFEFQB+WyZm7Lck4y8spmB1JaCsfKWRhEKkQiaIYQaFGht/fee+eih1YTQhEEQTCKKDwKC0GNwXq9y8KICoVyQ4uxVl555fwzhCIIgqA55WS2UOW4SGbzJHT1DI8iGOsIKZkcKRuWyI41EsGyUAiFRae6Aox5oRCTPfHEE3N5oM6TEZsN2g3rQLTzUJ1k6HnkwhzMpEbHWKu19U6ykE6Vk75Q1mxoaNioKioI6lEIxbhZR0EYNBSz4EifnaIXThAMJ5KDZvoMupYZBoHQY4lB1zpd0lDZqxbh1j/0t4jQc1p9TVi055aLE17V30n/K6u4tejwfKqelMPGArtgIIw7oYDZmgtIvXp/LRaCoBUQCQuXeLUW2DHqWo9YPGdPB6ur11hjjfTqV786txS3SruZF6DaSSWKklcrvImClddXXHFFHi5u5bPut9cDIdLqvLarbRDUY1wKhVmbC1RSJoQiGAmsfbBuQnJQTyd7SPAC/K6TK7HQCl97DQJy9913N/R+ldVqZa7fk/Yf2nLYv8HaCvtRFHi823gVxEcIVtuTIOiPcZfMhjfM/RaCCqEIRgJJZeee8I8WHsJKchB+atSn0MJWpvbZEEpqtj7CHg3ERYiJJyEHQRTqPcb/4knoJaWduQR3EPRHIRR2GrRvSLNmlUPFiAuFemAdO0MogpGEMVePri9TkSuwSY/Vr4y+luBnnXVW7ufUrOji5ptvzk0F7ZNx+OGH5661jSj6Q2n1waOot+d2ENQi7Mlu2pfFan59yFpNCEUQVBD24S2YqQlFab/BgK+44opp+eWXz00C5RkUXcgzFNul1mIXPPtn6yLLs+ivOko46phjjsmtxsOjCAYCO1mszP7sZz+bz9lWE0IRBBXM7nkKBqEwU7N50P/8z//ktuFf/vKXc95B4nmvvfbKsWH5iNpKJYJj8yFboBIWYQFi4Tijdu2EbUW1M5fYLnIUsb4iaIYwpso7e584N5Vet5oQiiCogVAQhc033zwLhN36XJgKL2xCtOuuu+aZnHUQ9UJLvATntIomlSnXX3999jQ0+/PcBc53s0EJbZ4K4ZGY1GJcHDoI6mHC4Xy0e6Kuw/Y0bzUhFEFQgSehXTNDLcl8zTXX5P2va/fJ5i1oP25vbVUnxWZGzl1dPJXFeqw8hbbhNiGyten++++fQ1kW7RV4btVVnu/AAw/MwmPdhkV5ynWnTp1aPTIInqPwKN73vvelddddN1199dXVe1pHCEUQVFDxxIVXl6681cyfCJSrlQiBcNLWW2+d1/7IYxQ5CAIjXPWpT30qL8yTo9h4443zZkTWYNjtzoXt+QvsVWHNBs9lu+22y3uLb7XVVllgCAtjEAS1OOcUTThn3vnOd+bJS6sJoQiCCkSBB6FU1eyet8BQW+sgdGS2bwHebrvtltdSSCaWE9Vm/3INPIgddtghV0vZz4KHcPzxx+e/eQ9CUAWqqmx5eu655+bheNujqoCyAHU49hkIRh/spPPPuSq8qQS71YRQBEEFayauvfbaPMOXgzCj5yGcffbZOS/BeAshyVnwBGqRq7BiWwVTUUYbBK2gEAqr/nmhY34/CoRQBO2ABKF1DBLOkoO6cprtC0dx7cWBlcW6QOu12uBdCF/xErRUaLYoLwheDEXoSW5LQltOrNWEUARBDYXRZ/CLIdHdXyPAIBgOimT2ZpttltZee+3cN6zVhFAEQRCMImqrnni+rSaEIgiCYBRRCMWWW26Z1ltvvRCKIAiC4PmEUIRQBEEQNCWEIoQiCIKgKSEUIRRBEARNCaEIoQiCIGhKCEUIRRAEQVNCKEIogiAImhJCEUIRBEHQlBCKEIogCIKmhFCEUARBEDQlhCKEIgiCoCkhFCEUQRAETQmhCKEIgiBoSghFCEUQBEFTQihCKIJxxKJFi9KTTz6ZJk6cmGbNmpV32QuC/gihCKEIxhGPPvpouuSSS9Jpp52W/v73v9fdYjUIaimEwsZF66yzTt6mt9WEUATBCGHf44MPPjjtueee6cc//nF6+umnq/cEQWMKobBfdmyFGgRjnGuvvTZ95jOfSe95z3vSMccckxYsWFC9JwgaY093k4xddtklbbHFFukf//hH9Z7WEUIRBCMEodh7773zxf79738/LVy4sHpPEDRGiPKWW25J3/rWt7JHeu+991bvaR1tIxSXXnpp6u7urt4aBGOfa665Jn3hC19In/rUp9IFF1yQFi9eXL0nCBojRHnrrbems88+O/3yl79M06ZNq97TOsKjGCRz585NkydPbvvZH9GdN29eeGltzN/+9rf0la98JX3ta1/Lceb4roKBQCjYTUUQxII9ajUjLhSU8fDDD88zKoatneHyXXbZZek73/lO+vOf/zxgD6ijoyN/uYMxBM8++2x+nM9E7Lqnp6d6z8B48MEHc0XNTTfdNOjHBsODSqcvfelL6XOf+1y6/PLLB1T15Bxy3jk/gvGJc+Df//53+vznP59zXGxoqxlxobj99tvTYYcdlk466aR0zz33tG34SY37I488kvbZZ5+0xhprpG9+85vpiSeeqN5bH9UJauQvvvjirPx//etfswEfSNJSGOKqq65K3/72t9Ohhx6afve736XZs2dX720OUTrvvPPS+9///rTXXnvlZJea/aC9IBRyFDvssEM644wzmn5HJg33339/nqjccMMNEaYdx0hm//Of/0xbbbVVeutb35onra1mxIXirrvuyjP0Aw88MP3mN7/JoZ12RKjJ69t6663TSiutlHbcccf0hz/8oekFSxDMFD/4wQ+mzTffPCeeTjzxxCwAjH6zBVYzZsxIBxxwQPp//+//pZe+9KVp9913zzHt/rwDM01i9I1vfCOtttpquXyOCM+cObN6RNAu3HjjjdmjcC6dcsopTctjxaEvuuii7H2ceeaZWTiC8Qsvwnnzzne+M084Ws2ICwUv4pBDDkkf/ehH0+mnn56mT59evae9mDBhQjrqqKPSTjvtlLbffvu02Wab5b8Z9EbwJlSzbLjhhrnmWeLyAx/4QNpjjz1yTLqZZ/HYY4+lj33sY2m55ZbLYrHuuuum4447run/A+H6y1/+koXXTFWNPm8mhKL9cO6feuqpeQIhR9csmW1x3jnnnJOPFVKMfMb45uGHH85VTyYOojKtZsSF4r777stvmPE98sgjhyUxM1jEjoV+KPj++++fL1ivlyG+7rrrGs7ylT/uu+++eam9EJI8DMPNu/jZz37W0Ojzqngv2223Xdp0003zrPPDH/5wFg5hrGZVDl6L8MT3vve99NOf/jSLxLnnnpuTX1F+2V6YDPzqV7/KSUmJ7WY5ikmTJqXf/va3eWHe9ddfX701GKuIOPjO2cMpU6Y8bwh5y1GYhJqsWlPRag9zxIVC3JVQqCUXLjELbzfM/LxGbt4JJ5yQ1VyO4t3vfnc2yP6uxYyPkd5mm23Spz/96Zwn4C0RC2Lzgx/8ID3wwAPVo5+P/yfBL8dgIZbZpPJhC2x4I1deeWX1yOcj7DR//vw8O5WjuPvuu3N4g2AQCzMPeZN6EBgnm9cdPYeGBzkv5Y0//OEPsxfYTCh4n2rnfY+OrTUMvnvf20gP8XOvTRiNh+S8Kt/vb+eY4wzv2fE8Yedm+XmKYz2P5xvskPPxWMP/8LO4zd/Fbe00vCYTSJNMkwiTPuHrYphAuu3nP/95tknskNunTp1aPRNaQ9sIhVm2MsF2Ewonq5CYUJMZPcPrNobf32b9Ll4nZhnN3rwfYadjjz12ae6FB/X1r389h7CcCPUwQ1AybPAE4HP54he/mJNX3/3ud1/w/0AkiAEx0v+FcZkzZ072esxa3U7Uag2SY1RHeT0e9/jjj0dVzRDi4vcZG84D35Nqtttuuy17p3JIEpLNwkmMqBmm401ATAIYFM/lOYUWTURGangtXoP8mHPo/PPPzx6Q18mIuc8x/nauEUkTJQUewrBi7q4ZM2nHmxxZSCZp63k832CGc533fcUVV+TPlsf2+9//PhtVOUJia7ivnYbXZCIoD8Vu8BrKw0TVTxNIdlMhEPvjc28lbSMUwjOqe1xMw4GLy4kome5nMczm/WRQvRbGVmXKCiuskMNHTz31VH68mYlYMbHgMZjxF+W9DIMve9ddd80hKidmgQuBAKy55prZg/I6ykaZQRDm8pnwDIrnNNswi9h4443TJz7xiXxhlb0DMzCv2wzVa3ERFve7QN128skn54vOhV3g+SXJeUbehxmK1+5CdcEOZrjQucpld7n4nbtMgAy/M3p+J4B+Os7j3ec2w23Fc5efo7i/3YfX6jzy+RJh36fZoFkhg/WTn/wkHX300dkgMGTNhAKMLQNiAuK79F17PsbQDNQkwXBuDPfwf++4445s+IXHhJF5Sgo+eELucwxj7brxmTCKvF3H+0xMkFyPjjcRIyAS+N6r5zOEWvobjvO5EmCeteuJePm/Z511Vrrwwgvz6zK8nnYaXpPX6/Nwzfp+Gw3nkGvVd+9aaSVtIRQSdJK9ErAMXOEW1htmwy6oFzMYeV8IQ22WboZfjK9+9av5p8SxMkTC4LbXv/71WcnLQsbo+0I/8pGP5OGLZpwZCe9Jd0fi8tBDD1Uf0ZdsdvLzRD75yU/mWQQRKPAef/SjH+Uwk5Pc3wVmoPvuu28OSZlZMKwFZpYuLBeni7DsNfjdhcrI8CzM6uCzMLtTiSUPoibbAjDP4TU6EY16J2mj4fjCEJaH2xg0QuV3P/1dDMd4fHFc+bby85Yf0+7DBU8cGCznlPONEBfjy1/+ch6MmsqV/kpetSJn6CQwXSue86CDDsphSkZQ3NrwnY7UkD8hFgyzc5s3yyso7ve389O15VgC6XjGznGa3fnp/uJYz+P5Bjpc21pv8/55LiZDrg/GlBDJDfl7NA8TWDnHIsQmytFKRlwoCAND/IY3vCGttdZaOQYvhl8e++23XzaQLg6zBaWEZiEG4zfYwVgqPWXIJYvlR4pR/K0Ky4yNUDihzf7qJY0IBzf34x//eB4MmhOfp8GgCxOY0ZchJIyf98Z1NLsu8MUzHPIfjELZeDg5XAC8FKE6F0XhjRAtRonAudDKOIaR8X54Dl4fkTHD81nw5HyWxMEMj3Acf/zxOY8ykMEQ+um5uP1FjoQH5H/6nZEvDAVBdfF7ncTP7Y6zloD3deedd+ZZpddTuNs+C8bXsUTP4+rNbNtp+HwZbp93WRgJiPepoEEIwXfmGMLdDN+xz8REwvP5HH2uDCMDWPa+RmIUHqBrxvnmvC9ej/v89DeP1vlXHGso0CgfV9xfhLU830AHz8tP10vZ64bPOMKqg2fEhYJ7zjAxfK973ety7b/Ze3lY4Lb66qvn+LyZtlkY42ZYgzHYYZavJFd4p3aY9fnJQHGNnWz9QdmFFoicvj28FIbe71zoes/hhPU/VDO5+ItjzIDMNnfbbbcsOhJ7ZXgfZv1EVQirECFhJ8aUEDK0tZhxmK2JcRexW4ZK2IMh5/UQPcJNgBj7Yhbf3yiOY7AYRuE7Bt2MjsH0uxiq12525ztnCMyEvD+3O44ICnmBQDK0PlcuuBm3z6bwvoqk52gYjQyTsJRJBpElnLW5o1p8dsTBOVWeQYbhC1rNiAuFk59BYcDMYiVqzXrLw21ij2rOixkng2IwHssyuJ9m8rWDEfOTIZM/qJ2RNIKRZSw/9KEPpRVXXDG94hWvyELGTWz0HAyghXTCVsJGZk/ip3Iiwgn1DD7M2rfddtv8vzzOa/X5EZjaHEQZYiQ5zmvgyfhszeSF/wrPxU/fiRmZGexghs+LR8Tr8pOAEgO/F7NlRo2Rk1Mp4zj/t+xBEYViluhz7G/GPdrgWfr8xeAHIhQmBQReOGag52UQDAUjLhQMBiPAuHE7JSz9rB1u56K2s7FgKC2qs0hu+eWXz6GYRjCYZt7Cbm9605uy98Ej+OxnP5vXZ/CyGJJaPE6OQQ6Eh8WLEb7ggRAYsd1mn5HPUDhM2EsYr7/jg9YxGI+CEIvjO9ZjhGp4K0EwHIy4UIwlXLhm+zvvvHOuTBKLboYZvtCK41VIyZtYd6HlB9HgKdSDsPJGlNja9EbOQhmuJmHKb5uFIszO5Q4IFCFzfDAyDEYoeLrCgcKVvBBeb3gVQathS4wQiiFGSEtoQKK2kaEv8AXwlITTxPkZcF6BPEmz1ZYeJ+EnzCTJzqMQvpIUJQTNcL/wljAfIeNhBCPDYD0KCWthWqFC4bxmE4IgGApCKFrEsly8DIQhxCbnoDJoIEl0QiLcJRFNbCSNa2P/tTAwKoYYHKGtZsYpaC2DEQrfq/t95+FJBMNFCEUb4gthEAZrCAbzOMc6zvER4x5ZCLxQZbEyO0Q7GA4K4z+QUVTuhVAEwQihZFhpcghFMJw0E4TaYVJphFAEwQghIS03JfRkDUoIRTAcDFwoiITmjT0hFEEwUqheswJdnsLK7BCKoBXUE4byKItDX1i6GL2pu6cndXZ3h1AEwUjholTNpERZtZwLMwiGmkbCUPyexaHiOfT09Kau7p7U0dWTFnf2pIUdPWneou405+kQiiAYcYo4cBC0gkZC0ScSfaElHRE6O7vToo6uNH9RV5q9oCtNn9eVpszuTpNmhVCMCny5DIkvNgiCYDDUikOfQPSFlrTTIRIdnV1p0eLONP/pjjRzfkd6cnZHmjijMz00rSvdNzWEoiXoWySUoNWGNh16S+mEqffRYGaO1jxosqd5nwVyuqtq2Oe5giAYv5Q9hGKUKd++VBgqo6e3MnqWpK6e3lKIqTvNW1jxIuZ3pafmdqTJszvThKc60wNPdqW7Jnen256IZPaQ4cuQnNTF1YpnZY9q5O0+ZX8Hxl43VCLSH57LCmqVMLrcWnWtxYcmgNp06PkTBMH4pSwE9UbhORSVSz29PX35h4owLKoIw/zFPWnu0z1p5oKeNH1ed8WD6E6TZnZXBKI7PTS9O937ZHe6syIQtz7ek/79eG8IxVChe6wW0Hoo2YtC075f/OIX2QvQuE//Jns+aNnRH9pq2K9COw9tyPX3IT7KKIkG8QmCYPzSXBz6PAgCkUVC5VJXd1pcEYiFi7rSnIWdaYb8w5zu9HhFHB59qic9OK23Ig696a4pven2J3rTrZN60y2PL0k3P7Yk3fRYLLgbMmymo0fTVlttlXeK4024Tc8nht4mRpr/abXhi2yE++zLoLvrPvvsk1uC6+3jRND/yXaldqOzt4RQVhAE448XikRlLCEQz6Te3mdyeKm74kF0VfMPTy/uqoaXOtL0uR0V76ErPVLxHu6reA53T+5Jt01aUvEclqR/TXwm3VQZ/6yIwz8fezbdOKFvhFAMAfZNUAtPDOyMJ49gb4VC3eUUbGZkUyYbBZU3nSkjuSSfYS8KbcN1lpVociJAvkPoaeutt87PozdUMDbwHWv37lzys/jOg/FDYfQHOgr7YhAI+Yeu7iUVYViSFnX0poWLe9J85a0VgZg5vytNn9OVnpzVmR6vJqnvebIn3ZHDS73Zc7ixIg7XV0Th+SPlEUIxBOgSa+c8u/HZ+L62oZ/GfXalW2WVVfImTI2EQl6CB2FLVfshE4Yy8h/2u9hss83y/9N6OhgduJgLISiGfJVFds4H+7FYfGfbXc0Cyxs4LQuFIfEzGB2URaDeKAvDs5XRF16qjFze2rf+gTjMXVjkHnrSk3N6cnnrxBlCTN0VgehJ91cE4q7sRQgv9YnEPycQiRCKlqLlt93lCIX9ncuoXNKmQSLaXhP2FGhU+cRDsJmQPIR9kWuFQJtpG+tvueWWWXAGku8I2gNdX32fKuGEJO1e6Hc/hSe1fnfumCgoeqjdTIpx8BwmIQNZwS0saaIxUNHxvBb/Ea9G52fQWuqJQ3mUhcLwPVkD0dvdVTknutKCRV1p1oKuNLXiOQgtEYYHK8Jwj9zD5N6K99CbQ0z/ebwaZqp4EPIPROLGyrghj2drRsojhGIIcFHaF4IBtzOdC9MXCcacF7DFFlvkElehpUbwKFRL2RPc9pjF/tEFDIvQUwjF6MM5Quj/9re/5RyU/di1k7/yyitzGHHffffN3qj9zOttSjRz5sylOS+l18X51QjbptrcSvhywoQJDb1Yz6MQwxa5PBo75zU6Nhga6olAo1GIgtGXfyAOfWWuSlw7KxOKjo7Oikh0plnzO9OTszvTY091pgendqW7p3TnxPQtEyWlC1HoyzlkEXi0zlgqEMUIoRgyXNT2d5CHkGiWoxBugg6he+21V97xzn4RzbYddR9joLrJfta1oSdJbcZku+22y0LBoASjA5MHxtseIAaRV91mnQwvUvGCXQ2FF2s3rOJB2LLW5MFEhNgoxW4GD+Ef//hHfk5ebKN8FpEgPirp7IVishIeRWupJwhGWRT6Rt9CW6LQTRS6e/O6h6c7etL8xb25vHV2zj90p6lz+1ZQPzq9O93/ZHdfaIlIVDyH53kNFTFYGlaqFQnjeSJhhFAMKS763/zmN+mwww7Le1KLObvAXawHHnhgDitw7fvDzFMYQk5DiaxYdoHnNEt0n+fzdzA6MSkwe1e9ds4552RPot4e6QocTAiUWh900EG50IHXyRuRG2s0+2dgCJNziMA0mqQIh9la9eijj87eTbOJTDA01BMJoywSchDPVL5D339nt4Vx3Tm0JDE9Y35XenJOnzBMmNGTHp7em+6f2rs0xHT7pN70n1zF9EwOL6lgkqjOoywCIRTDjy/XLM/Mz4I4VU88AIvtvvWtb+VtSwcSK3ahMgRKaffbb78cpiAenp9RYBxOOeWULEiaybnN8NxOKscF7Q2PQW5Cpdzpp5+ew0M8CZMCBqOMc4oonHnmmTlvdckll+SJBE/Bup1me2c7F3ioSrWtwyEK5fPD/5LDIELCojrYxvnTesriYPjMDd9jebieLZLLC+Seln/oTNPmdqbHZ3WmR6Z3VcSB52DNwzNZFG6eWBEG5a1VcSjCTM8Th0GPEIqWIHnNnWe4XdDKZYUL5BucFM1wcrjwDz300LTqqqumlVZaKVc4SZTfeuut2ZCII1unsfHGG+cwlEV8FvURDwbHrmkxK2xfnBu8CEafh0Dw7ZXO6MtbCAMpjijOFaXVZvwExf3yDSYgNjriiVxxxRU5jNXIsyA08g88Ft5tORHOEBEs4uN5muXPgoFTFoFi1N5eiINRtNYQXurq7k0dSly7etOizt68gnrWwu7coG/y7K40cUZXelBp65SudMcT3emWib3pprpJ6Gajz/gPZoRQtAAG38UrTGBltYu6gKchGen+clgJLmKGQp5j7bXXTiuvvHIWi4022ihXTnksg6KCap111sltPawAt9DvgAMOyElRuRIeSNCeEAEhHoswTSAYcH8TA94nwScIxXfoPDHjr01yOxeEOnmfkuS1eY0y8g4mEY6VMyMQ8NP/IlQ8j5hgDA1lQSiPsjj0eQ1F59a+0laew4LcWqO34j30punze9OUub0VD6InPTrD6umedN/S0tae9J/HeyseRG9f7qGuIDQa9cWg2QihaAES2XIJEpQMubACzPoYeh7CEUcckWeWZZQmMvQ8BPd/+9vfzi1BJDt5Eh4vF8KoHHfccVk8PLcZpvslRs04B9JPKhgZ5KkY5WuuuSaXwapmYsiJgCS1QgY5riJfQVicS44vew2MDYFg6HkFhKMRRMRz82IKwQFvQw8yhRO33XZbvi148TQTiSwQFYHurXyXPb3dFQ+i67mV00+rXOqqJqZ70iMVcXhgem+6Z+qSdOfzWmv0ppsnKm9dkkNM9cWg2agvBs1GCEULcJGb5a+//vrpve99b05mn3rqqbmyROmr29dbb72cu1DZVMzk/DSDZPiFkAy/CwkUVVRgWMSbaz0SM0RGoVEYIhh5fDcqkhj22u9J8vm0005LRx11VA41QrWSHIOktO+9jON5q4y/fFUjCg9XnozXwhMxSZG3MBnh+RKtYGgoC0NZIJaGmLqVtWqt0Z0FQmvvOQs60ox5HWnK7K7cmO+BqTyH3ly5lJPSS9tqPJeUXvb8Q30xaDZCKFqAGRsRWHfddXP4yEI8Ja1i0m4Xjtp8883zmggJxPAAxi6MhLyV2Xt/As5bNKHgTcorQI5CyIinobDBuUVk5DpMMuQphByFLPuDtymBftJJJ+WwlwS2MmuhrdrFnUH/1HoNxSiEoRjFmgd5h8WdvRVx6GutMXdhd19rjbl96x8mzexMjzzVlfsvWRyntPVfFc8hew2VUV4xXV8AGo36xn8wI4SiBZj9m625gLUJ127DxS48JFQkqSh8JGzAEBQx42DswcMTEjQh4Gk2qnxj+JWwEgqrs+WxwPsoqp54Awok5DSEHYWN3Obc4n32B8HiSVgc6v8IaXlueYuYrAyeQhRqR/YerJjO+Yfu7D3k/EPuu9QnDtPmdqfJs7vTxGpr74etf6h4EXdP6fMibimXtlYNfgjFGIPhL8JDLnizwNoL0UUbAjH2UaDAODPKwkRyUMqnTRZ4BMRDV2CVR7wDAiD34PwAo1MszHMfweARWEdjfURRWlsc3wxGzHkpH+F/Cms5L+M8XDZeIBSV78roa+3dXRGJzsr331HxIDrSPDvHzetM0+Z0pidmdaZHp3elB6Z2p3um9KQ7qyGmvPahKHGtGHhJ6jwerfxed43DQEd94z+YEUIRBC2EAZFLkANQyCBPJYykGIE4CCeZ3csVEArrGohDGQaJMed1WKcjJ2G1NeEZbDl08VyG34PG+HyaDd9tEV7KbTV6eqsrqC2Qs7VoR1r49OI0Z8HiNH3u4jR5Vkea+FRHenhaZ7p3cle6fVJPTkwvDS+VjLtV08VovBiudtQ38kMxQiiCoMUwJEJIPEuCoQJJ+Eglk9yCMKV1DKqhmpW5QljT8/AGVExFSWvrqBUFo1Yklq59qO4ct3Bxd8V76E6zF3SlGVUPYnLFg5gwo7MiEF3p/ie70t22FyUS1kAsrVx6pk8YKgY/j9Lv9UWh3qhv5IdihFAEwTBDDBh8noawknCQdRMRAmovaoVCW43KH+7Jv/MibAy0uKOvc2vfznHPJab1XVK9dK+1D1N60u32fih2jqvTXqO+8R/MqG/kh2KEUATBCFGepQbtRyEQtcPtOrkqcyUSyltnze+oeA92jutIj07rqAhEZ14YJ+9QtNYgCprz9TXoezHlrY1GfSM/FCOEIgiCcUPhIfQ3nqmMJc8827f2wehR4rokdRjdz6RFnUvS/EW9afaC7lzeOrna3vsh+YcpnenOJ7rzyml9l4qk9HXCSdXRDnmHwYwQiiAIxg31RKE8ssdQGUsqo2+BXNHeuzct6OhNcyriMHPBkjRt3pI0eU5vmjizJz0yva+9xr1Tyu01etLNj/Uube9tFCIRQhEEQdDG1IpC3VERiCwS1Qom+z/MW9S3veiUOT0VcehNDz/Vm+6f1pvumbIk3fHEkpqd45akmyb0bS/6PEEYsDiUR33DPdwjhCIIgjFDWQjqDUJQ/C7PUIzyznHFJkG6t2rSN3thT3pqXk96YnbFe3iqJ903tTevfbi11F6jCDH1bSdKICp/F8LQVBzqG+Z2GyEUQRCMGcqiUG+UPQfC0C33UGrrvbCjN81b3JvmPN2bZizoTdPm9aYn5vSmx2b2pIem9+0/3ddeo68xX1G1xOjXDS0V4wUCUYz6hrndRghFEARjhnriUB4Eom+BnMVxfe29F+bQUneataC74jl0pylze9KkWb1pQg4xLUkPTF+S7q14EXdNXpJue+KZpe01+ryI54z+UpEo3db/qG+Y222EUARBMGZ4vihUf/q78nveg7oiFKqY9GDq6OpKCxd35cVxeWOgWV3psRndfYnpiufQ11pjydJtRW+e+Gz6V2Xc9NizS3ePe57R79d7qDfqG+Z2GyEUQRCMCsoi0N/o8xz6Ro/R+0zFg3gmdXYvSYu7dHCtbi9q/4fZXenxmZ3p4eld6b6p3elOC+OqoaXncg/1jPxgRn0DPFpGCEUQBKOCemLQaKha6muvUeweJzHdV946q5qcfnJOd0UgutMjeQW1Bn3ae/e11nhOJCpGXkip8nPwLTXKo74BHi0jhCIIglFBf0Jh/YOhvLWntyd1dWmv0ZkWLOpMc/LCuO40Jbf27ql4Dz3p/qm9ua33HUJMk3Rv7U3/rgpEXkVdFYqhWT1d3wCPlhFCEQTBqKCRSBQdXHOSOotE3w5yixZ3pvkLO9KseR1p6uzONPGpzvTw1K50H88hN+Vbkm6uiEHuuTRhqEJMjUZ9AzxaRghFEARtQVkImo1CHFQuEYXuIrykvLUy5gsxLexOM2wQZP+HmZ1pwlP2f+hK90zuTrdP6k63PNaTbqqKQ7Fq+rqKQW+Xbq3tNkIogiBoC+qJgvGc97Akj6Ui0dO3e1xfYz47x/WkqdV1D4/P6kmPzuhb+2DnOBsE3TG52r1VDkJ775JQMPyDz0HUN6pjcYRQBEHQFtQXh+dCS8Sh8CJykrqzKz2dw0vae3elSbNsKVoVhlzeuqTiPSypiMOSvtbeE7XXsHvccx1c6wvAQEd9ozoWRwhFEATDQlkI6o1acVjaUqO7ujlQV09anENMPXn/6XkLu9Ls+Z1p+hz7P3SlB6d1V8ThuT0f+rYULecfqjmIRwe6tWh9ozkeRwhFEATDQj1xKI8+kegLL/WFlp7bPe7pyrCCev7injR3YU+aNb87PTW3bw3EpOruccpb8/oHTfkq3oPWGtc/Ws0/KHGtjoEvjKtvNMffSOn/AyL/CS/P6k67AAAAAElFTkSuQmCC)
The current taken from the 30V supply and the current through the 6Ω resistor are respectively.
![](data:image/png;base64,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)
physicsGeneral