{"id":5440,"date":"2024-12-27T11:05:54","date_gmt":"2024-12-27T11:05:54","guid":{"rendered":"https:\/\/vartmaaninstitutesirsa.com\/?page_id=5440"},"modified":"2024-12-30T09:13:34","modified_gmt":"2024-12-30T09:13:34","slug":"ncert-exercise-with-solution-chapter-3-current-electricity","status":"publish","type":"page","link":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/ncert-exercise-with-solution-chapter-3-current-electricity\/","title":{"rendered":"Ncert Exercise with Solution Chapter 3 Current Electricity"},"content":{"rendered":"<h1 style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt; text-align: center;\"><strong><span style=\"font-family: Arial;\"> Ncert Exercise with Solution Chapter 3 Current Electricity<\/span><\/strong><\/h1>\n<p>&nbsp;<\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.1. The storage battery of a car has an emf of 12 V. If the internal resistance of the battery is 0.4 \u03a9, what is the maximum current that can be drawn from the battery?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Here\u00a0<\/span><span style=\"font-family: 'Cambria Math';\">\u03b5\u00a0<\/span><span style=\"font-family: Arial;\">= 12 V, r = 0.4\u03a9<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">The current drawn from the battery will be maximum when the external resistance in the circuit is zero i.e., R = 0.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\">\u2234 <span style=\"font-family: Arial;\">I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>max<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"45\" height=\"29\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 30 A.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">3.2. A battery of emf 10 V and internal resistance 3\u03a9 is connected to a resistor. If the current in the circuit is 05 A, what is the resistance of the resistor ? What is the terminal voltage of the battery when the circuit is closed ?<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">As<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">I =\u00a0<\/span><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"28\" height=\"27\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">or R + r =\u00a0<\/span><img decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAYAAAAaCAYAAACU2C2oAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAC2SURBVChTzc+9CYQwGIDhYOEylrbuINg4hZ3gJm7gApbaWwg6g1gIdgr+oKDvYSJY6DVyxb0QSPJ8RSL40ksoyxLf9wmCAM\/z6LpOgRCCaZqOLVEU0batgjRNcV2XMAwZhkEOSDBNkzzP6fuebdsu0DSNqqrkRV3XNE2jYF1X+YCiKJjnmX3fFTz1Szg+97jOgVsvYRxHHMfBtm3iOL7gKEkSLMs6T\/8Ay7JgGAa6rpNl2QX34AN\/Sic+wwiW3AAAAABJRU5ErkJggg==\" alt=\"\" width=\"6\" height=\"26\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\">\u2234 <span style=\"font-family: Arial;\">R =\u00a0<\/span><img decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAYAAAAaCAYAAACU2C2oAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAC2SURBVChTzc+9CYQwGIDhYOEylrbuINg4hZ3gJm7gApbaWwg6g1gIdgr+oKDvYSJY6DVyxb0QSPJ8RSL40ksoyxLf9wmCAM\/z6LpOgRCCaZqOLVEU0batgjRNcV2XMAwZhkEOSDBNkzzP6fuebdsu0DSNqqrkRV3XNE2jYF1X+YCiKJjnmX3fFTz1Szg+97jOgVsvYRxHHMfBtm3iOL7gKEkSLMs6T\/8Ay7JgGAa6rpNl2QX34AN\/Sic+wwiW3AAAAABJRU5ErkJggg==\" alt=\"\" width=\"6\" height=\"26\" \/><span style=\"font-family: Arial;\">\u00a0\u2013 r =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"17\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0&#8211; 3 = 17 \u03a9<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Terminal voltage,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">V = IR = 0.5 \u00d7 17 = 8.5 V.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.3. (i) Three resistors of 1 \u03a9, 2 \u03a9 and 3 \u03a9 are combined in series. What is the total resistance of the combination ? (ii) If the combination is connected to a battery of emf 12 V and negligible internal resistance, obtain the potential drop across each resistor.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">(i) R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>S<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0+ R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2\u00a0<\/sub><\/span><span style=\"font-family: Arial;\">+ R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>3<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 6 \u03a9.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) Current in the circuit, I =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"45\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0= 2 A<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\">\u2234<span style=\"font-family: Arial;\">\u00a0Potential drops across different resistors are<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">V<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= I R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 2 \u00d7 1 = 2 V,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">V<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= I R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 2 \u00d7 2 = 4 V,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">V<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>3<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= I R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>3<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 2 \u00d7 3 = 6 V.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.4. (i) Three resistors 2 \u03a9, 4 \u03a9 and 5 \u03a9 are combined in parallel. What is the total resistance of the combination ? (ii) If the combination is connected to a battery of emf 20 V and negligible internal resistance, determine the current through each resistor, and the total current drawn from the battery.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. (i)\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" 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alt=\"\" width=\"234\" height=\"32\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\">\u2234 <span style=\"font-family: Arial;\">R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>p<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"15\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0\u03a9.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) Currents drawn through different resistors are<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"135\" height=\"31\" \/><span style=\"font-family: Arial;\">,\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" 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alt=\"\" width=\"126\" height=\"31\" \/><span style=\"font-family: Arial;\">,\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"126\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Total current drawn from the battery,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">I = I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0+ I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0+ I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>3<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 10 + 5 + 4 = 19 A.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.5. At room temperature (27\u00b0 C), the resistance of a heating element is 100 \u03a9. What is the temperature of the element if the resistance is found to be 117 \u03a9, given that temperature coefficient of the resistor material is 1.70 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-4<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">\u00b0C<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-1<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Here R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0=100\u03a9, R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 117\u03a9, t<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1\u00a0<\/sub><\/span><span style=\"font-family: Arial;\">= 27\u00b0C, \u03b1 = 1.70 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-4<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00b0C<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-1<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">As \u03b1 =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAADYAAAAfCAYAAACs5j4jAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAASaSURBVFhH7ZhZKHR\/GMeH5ArZEkJKQpZQolwociGkZMt2YU1uxIWQZS5kjQtLLmxljVBckBAXomQpa\/Z9DWVf53nf5ze\/M86Ymf+cmfH+\/\/\/X+37ql9\/znOOc8\/0tzzzPjwffEIFAwP+zhb2+vsLDw4OoPT8\/0yuq8\/j4KPbsr4CzsIODA9DR0QEvLy\/g8\/ng6ekJ8fHx8PLyQu9Qnvz8fODxeJCdnQ0ZGRlgaGgI\/f399KpyKLQUbWxsoLS0lPTf399BX18f6urqiK0qKOz29pb0Dw8PQVdXl\/SVRWlhP\/8RrKysoLOzk9iqwhZ2dXUFBgYGpK8sCgvD5bK\/vw\/V1dUQGRlJr6gOCltbW4OlpSVwc3OD3t5eekU5FBaWlJQEExMToKmpCVNTU\/SKkK2tLRgeHob7+3vqAbC1tQVzc3OpbXFxkd4lFDY0NAQVFRXg6+tLvR9ggDk7O6OWfJReiigK9xgDBoCOjg4y6mZmZuRDkJubG5nt7e2N3IOwl6KpqSlkZmaSPt5TVlYGfn5+MDAwQHxcUGmPubu7Q3h4OLFxltCH6OnpKfxzwBaGM6OhoSEanKenJygsLPw1wqanpyEwMBCCgoKoR\/gBAQEBIrEIjuzOzg61uIEh3t\/fH6KioqgHoLy8HIKDg+Hk5ITYv0yYPHC2PDw8YG9vj3q+lv9MGO6xxMREEi1RoCIbXR7t7e3g4OAA3t7eJMBw4cuE\/d\/43sLq6+vhGzY+D7OJb9j+7rHfCpEwTIWYtrm5SS4qwvn5OURERMDd3R31\/Htg7lpTU0MtISJh+PtgZGQER0dHsLq6CtbW1lBcXExuksfo6CjJ9JkUaHt7+0sKUOTi4oLklfLAbMfZ2ZlaLGH4g2piYkKcSFdXF9jb21NLNvhSS0tLUngy2NnZwenpKbVUIzY2FsbGxqj1z0xOTkJYWBjpyxRWUlIC0dHR1JJNX18fxMTEUAsgJycH1NTUSF6JCbIqZyNNTU2grq5OjiHwWTMzM\/SKdPC8REtLC0WJC8MyZGRkBPLy8khyy2U5JScnS1TROEBcZgzPUXAJSWsMmJ5xnTEEK46VlRXpM9bc3AwuLi4So43V7cbGBrWE4GhiccnmszD80La2NqisrITl5WXqBQgNDSUf\/rnhMxnQ\/ixsd3dX4p0MKGx8fFy6MCzunJycoKioiNgIBpK0tDSJlyQkJEBPTw+1hFhYWJAgxICDhGDk5LJv2fj4+Iglvo2NjSTRzsrKoh5xHB0dYWFh4UMYVsR4gMJEttnZWVL84bQytLa2SghraWkh4tjgqKFYjK7sKhlrOgwGipCbmwspKSlklo6Pj4lvfX1dqjDcY9ra2uQMVCQMy3ps7A\/H\/YY+ZklKE3Z9fQ3GxsZiAjBSdnd3i+0V3PghISHU4g6+G88Y5+bmqEe2MJzZuLg40hcJ40JDQwMMDg5S6wN8IB6essWxwSDBiLq8vCR\/VQH3enp6OrWE4Iy6urqSYwSEszCcudTUVLLPamtrqfcDPKHCfSgtkuL\/4L7AVlBQQL3KgUEDZwuL2qqqKuKbn58nGT072Ck0Y78TAoGA\/wPA3r2zrB9MpwAAAABJRU5ErkJggg==\" alt=\"\" width=\"54\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\">\u2234 <img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"272\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\">\u2234 <span style=\"font-family: Arial;\">t<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 1000 + t<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 1000 + 27 = 1027\u00b0 C.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.6. A negligibly small current is passed through a wire of length 15 m and uniform cross-section 6.0 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-7<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> m<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>2<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> and its resistance is measured to be 5.0 \u03a9. What is the resistivity of the material at the temperature of the experiment ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Here l = 15 m, A = 6.0 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-7<\/sup><\/span><span style=\"font-family: Arial;\">m<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">, R = 5.0\u03a9<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Resistivity,\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"147\" height=\"30\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 2.0 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-7<\/sup><\/span><span style=\"font-family: Arial;\">\u03a9 m.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.7. A silver wire has a resistance of 2.1 \u03a9 at 27.5\u00b0 C, and a resistance of 2.7 \u03a9 at 100\u00b0 C. Determine the temperature coefficient of resistivity of silver.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Here R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 2.1 \u03a9, t<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 27.5\u00b0C, R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 2.7 \u03a9, t<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 100\u00b0C Temperature coefficient of resistivity of silver,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">\u03b1 =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"54\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"153\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 0.00394\u00b0 C<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.8. A heating element using nichrome connected to a 230 V supply draws an initial current of 3.2 A which settles after a few seconds to a steady value of 2.8 A. What is the steady temperature of the heating element if the room temperature is 27\u00b0 C ? Temperature coefficient of resistance of nichrome averaged over the temperature range involved is 1.70 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-4<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> \u00b0C<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-1<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Here V = 230 V, I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 3.2 A,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 2.8 A, \u03b1 = 1.70 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-4<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00b0C<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-1<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Resistance at room temperature,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAIYAAAAfCAYAAAAiELUaAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAcHSURBVHhe7Zt5bA1fFMdbSkpDNPYmQgQpiahdUBKECH9IUGnE0nSJEiJBYk0sRSyRiETEvv2B+ocUtbboRhe1xNLa96W1tFoU7\/h9z9x5Zqb3Lb++pS+\/3\/0kJ73nzPTNdO733XvuudMgUigkKGEopChhKKSwMHbt2kVBQUE0cuRIDoJNmzZxbPXq1SLiWxYvXkwLFiygiRMn0tixY+n9+\/ccv3\/\/Pi1cuJCSkpJo+PDhfE5NTQ0fA2vWrKHJkyfThAkT6MKFCyKq8BT7iNGzZ08Wg867d+9o1KhRwvM9e\/bsES2imTNn0pAhQ7idl5dHN27c4Dbo3Lkz3b17l9snT56kGTNmcPvVq1fUvHlz+v79O\/sKz7AL4+LFi9S7d2\/hEa1fv57OnDkjPP8ybdo0mjdvnvD+8uzZM+ratStVVFSwHxwcTMXFxdwGEEZGRobwFJ5gF8bnz5+pUaNG9PXrV\/YxbP\/69Yvb\/qSkpITatGljunZWVhbfT5cuXfi4DoRhHCEGDBhAO3fuFJ7CE0zJ5+jRo2n\/\/v3cEcZpxV9UVVVR69at6cePHyJi5vXr1xQeHk5PnjxhH8J48eIFtwGEcfDgQeEpPMEkjPPnz9OwYcMoLi6ORxB\/AlE0btzY5SjVv39\/Onr0KLchjLNnz3IbNGzYkJNVhYbNZqMHDx4I799hEsanT594JRIbGysi\/qNVq1b05csXnsrevHlDvXr14viyZcs4yQQQTceOHen58+fsnzp1ilq2bMkP4OHDhywaX4M8B89IZqmpqeIsjd+\/f\/MIjJWUKwoKCqht27bUpEkTCgkJoZSUFNOXRHY9WExMjDhDS8ytx\/v16yeO\/iUnJ4ciIiK4n3G9HTt28L0aMQkDJCcn0+3bt4XnHy5fvkzdu3c3GZatANMGlquIYVlqnDrA6dOn+ZgsWfUFRUVFLFp05J07d9hu3brFo5WRR48eUZ8+fbhzXAkDgkIHlZWViQhRZGQkL9t1MDpmZmbarwnT70MHwsjNzTWdg9WakUWLFvFzNIIvG65npJYwFM7Bg75586bwNNauXUvLly8XHvFyOj4+nts9evRwKQyMluPGjROexqpVq1hU3759Yx+1JiNYwg8cOFB4GhCGsxSgtLSUP\/PevXsiooFrIG4UkRKGF8Ay2Vh0M+KOMPr27UtDhw4VnsacOXOoXbt2tYZ4HRT0rIm2K2GgGAgByJJ7xJcuXSo8LwgD+UBCQoJLw4oiEEhLS5Pen9UcdYiVrVu3mirGVtwRBqZudMyWLVv4W4tFAIb3wsJCcYYZfPORI1iBMLZv306JiYksLEw9RubPn8\/XkYH4rFmzhOcFYSBZvHTpkkvT6yP1zePHj6X3ZzUktO6ADtKTYRnuCAMixJYAOnblypU0aNAgGjx4sCnnMDJ9+nSevqwcPnyYpzn8HsSFzl63bp04SrRixQqOORoxNm\/eLLx\/\/BEjRpA7Zk36vInsep6aPzh06BBFRUU5HV3cEQaSa+QL+ufgJ8oGHTp0qCXQt2\/fUosWLai6ulpEHDN79myejnRQyYYAsIKzgjhWhTpBGJbcMUdzKLJv\/AGuDJ\/hCOu1vGGO2LZtm\/T+rObOVNKtWze6du2a8OS4EgYqt+iUSZMmiYiGvomJEoKRuXPn0pQpU4TnHCznISIdLH87depEe\/fuFRENPJOmTZsKT8PjqQSKhmhcmbtDs69Bh8vuz2quQK6CjnNVkJMJA9OqMX\/A54wfP154GrJhH7+HmGxaxmiAPSYjyBkgBFBeXk4fPnzg4qC1thEaGspJ68ePH+3Tl1qV1AGIHDWKI0eOiEhtUMl9+vSpvdMrKyvtS0\/kAYjr5Ofn8z4VpiZ0EEQD31oww6pBL\/xZSU9P51rHiRMneJRBfQefoW8yIhGNjo6mc+fO8Sro+vXrHEddZsyYMVxBxmfrlWO+O9wYDIlZfYNvIKqLuB88QFmihG\/9y5cv+RwUePyd2OLBo1CEzpaB6QHHrYYhG+De4RuBkLABiDh+wreCY876CPkHViU4zyoqHENcN72WganQGNdhYUA92LwKBBo0aEDHjx\/nzt+wYYO0zI13RzZu3MjtY8eOcYFI4V1YGHgpp3379hwIJKBq7KY6Q6\/aKbxLQAoDowXmPlT3srOzRVQO5mMUgxTeJSCFceXKFTpw4ADXI4xFFysYLcLCwgKmePZfwqEwMIc76xR\/gKIadi1l9X8UeJo1a2bP9BXeRSoMbNfi3cklS5aISP2gvx9irMjpIPf4+fMnt7E1L6vmKeoOC+Pq1av8wouxWIO3s+tDGBgh8HILlmv4lwG8lAx2795tTzJRNELbaHV9U0khR3vSEupLGIrAQCoMzOn79u2jqVOn+nTzTBG4SIWBYRnbtrop\/n8E2Wy2FGXKzGZL+QNYjMRpevakVwAAAABJRU5ErkJggg==\" alt=\"\" width=\"134\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Resistance at steady temperature,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"134\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Now \u03b1 =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"54\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\">\u2234 <img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"103\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAGsAAAAdCAYAAACtxJLQAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAf6SURBVGhD7Zp1qBVNGIevjQUqIor+YYtiISaKgYEFoqKYKLbiHyoGgoXdHVjY3Y0iGKBid2Fgd3e\/H897Z86ds2fP+e65F77PA+eB4czM3t2d3d\/UfX+bIHFihrhYMURcrP+Q379\/y5cvX0wpeqIW6+fPn7J69WqZO3euTJw4UY4cOWKOiBw7dkxWrlwpM2fOlAULFsivX7\/MkWB+\/Pgha9eulTdv3piaYA4dOiTLly83JZEnT57oPefNmycDBgyQCxcumCPJ5\/z589KzZ8+gNGjQIHM0kTNnzsjmzZtNKZRt27bpc48bN062b99uaiXkuqS3b9+GHGvfvr0sXrxY61NC1GJVqlRJdu\/erfmvX79Kvnz55PTp01pu3LixigmVK1eWBg0aaN5l69at0qdPH8mSJYs8fPjQ1Cbx7NkzvWaXLl1MjUjfvn3l4sWLmv\/48aNkypRJ89HAix46dKgcPnxYU69evWTNmjV67N69ezJq1CgpUqSI\/o0ftGf69Oma\/\/Pnj5QsWTJwfqFCheTgwYOBa9P+79+\/6zHaautJjx8\/1vqUELVYCQkJ8vnzZ1MSFcQ22mXy5MlSunRpU0ri3bt3+lusWLEQsRC6adOmOipdsVw+ffok2bNnN6XkY3u6pVy5coEp6fXr1\/qLYOHE4u8vX75sSiL9+\/eXrl27av7+\/fv6C7SdjmHJnDmzyaWeqMXauHGjjpp9+\/bJpEmTtIfaXuSSJk0aef78uSmF4ifWiBEjdCpdsmRJiFjXrl3T+zVp0iRVvROWLVumU7WXSGLRrlKlSsnOnTu1czZv3lw7jpcCBQoErUvp0qWT+fPnS79+\/WTIkCGBmSclRC3WrFmzVCB6E\/N2wYIFQ3otYt64ccOU\/PGKxZrSu3dvzVuxEIVpD169eqX3ZCqqVq2a1lkYGQ0bNvRNrBMuvCzabK\/rEkmsHTt2SLNmzXTKPHXqlOTMmTOks9EBEMblxYsX+svUyTMNHDhQyykhKrG4IT2FXY2lUaNGMmfOHFMSqV69uty+fduUwuMVa8yYMTJ79mxdwNu1aydVq1aVsWPHhvRe7s1U7N4DAVjT\/BIj0oXRyQbBj0hisZ4hlIWXXr9+fVNK3DRlzZo14m5v\/fr1Urt2bVOKnqjF4kXRyy21atWSvXv3ap4pym42oHDhwvrLHH706FHNW\/ymQYt3GuT8b9++ad6KFW6nGQlEzZgxo7x\/\/97UBOMV69atW9oWKFGihI4oS\/fu3WX06NGmJDJ8+HDfTtCiRQuTE\/37Hj16mFL0RD0NPn36VLJly6YbiDp16gRG1d27dyV9+vRBiV0R1KhRQ7p166Z5xBw5cqQeZ3PCVt+FHSYdgKnKrnmtWrWSDBky6L34ZeeVEhi53u26hWvTpjx58sjChQu1c2zYsEHrgBGTO3dufeGdOnXSpcDCqOLv3I2Xhc7BbhaReA+pIWqx4vx\/xMWKIeJixRBxsWKIhMGDB0s8xUZKWLVqlcRTbKT4NBhDxMWKIf4asR48eGBycSzEXF3PT8UifIPvYlPatGk1ug6EmIiJRQr142\/h6fCff\/78+QNhmEePHmn03V6X\/+YJM8HNmzc1zmiP5ciRQ+ujhbATRiYWhh9EVrxtIHRkweYgTFSmTJlAaClaCL8RvD5w4ICpSeTly5eSK1cujUcWLVo0qhAZgWaiIlu2bDE1Riy38cTPXB8KQ5EHDicWDUVsG7sD+7c4vK4HNGPGDA3hAGINGzZM835gu\/g5wgRmbSCZcFTr1q3V3Q0nFpH6q1evmlKiz4YBCnv27JHOnTtrnuf2PgdtIBjsxW3D+PHj1S2vWLFiiFiExiwEqt04YSQQldgjUfwQsVzwehYtWmRKSRAP9OPDhw8qDr0IiO3Rg71Q775QKxY2CO6wF14esUPsfUY3rFu3TipUqKB5F+KN4cRyoQ3ly5c3pUTX27XnGQXsuizE\/OrVq6fxS9sGvCzO84Id44plO7Hl+PHjUrZsWVNKLCOENzEwpkyZou+HEcm9CShDkFg8DJFyXpSXcGIBjcybN696Xfg87miy4PNw3MKoa9mypezfv18DteGcYfwoehjnYsf4kVyxuAbfcVg4x7Va6Bx+FkmbNm000MvMwEzjh1esS5cuBYnF6GaJ+Dd499yHhMHZtm1buXLlih4LEosXyrD2I5xY+E24o9bu4OFZi1xYKIsXLx52zrbWy9mzZ01NMDi0HHd9NJfkiMVCzXTvtoFzXOsGsejVftB+2mBHmJfkiIUnllwQjY7jugSBq7GgMQ2Ee6HhxOIFe9czTDiXCRMm6JdQLjwM04yFB+NTAS8dO3bU+Z7z6WV+JEcsNj1Tp041pUSqVKkSNNJoA461F8xQOjGpQ4cOpjYYr1h8a+KKha2DpZQaAldjmEda8L0C4OngS1mRrY2Pje2OLBqNR+QKAzimdqFndHJ9t6PQs\/h4hk\/QLIx8P6eVr4bcTRK46wqjimna24Zz587ptM2Ite10oQ1Me6yVFpzsunXrmlISNWvWDHz1ZWHnef36dR2NGLNeAzZaVCway3DzW6t27dql3z3wNQ82u\/2ejzmVLTOwmPI9HIKzQLtWPLspuwN0YVu\/YsUKPWfp0qVB7jPQCU6ePGlKSbAhcKdDBKTT0D7aZG1891sHRsumTZtMKRhG+LRp03TbzmbJhbLrDlvcNty5c0fXQu6PW0x7bKfAsMTwZPSeOHFC61JD0jiN85cj8g+Dt4\/BcsP11QAAAABJRU5ErkJggg==\" alt=\"\" width=\"107\" height=\"29\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"154\" height=\"30\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: 'Cambria Math';\">\u2234<\/span><span style=\"font-family: Arial;\">\u00a0Steady temperature of element,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">t<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 840.35 + 27 = 867.35\u00b0 C.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.9. Determine the current in each branch of the network shown in Fig<\/span><\/strong><span style=\"font-family: Arial;\">.\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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\" alt=\"C:\\Users\\NISHANT KUMAR\\AppData\\Local\\Packages\\Microsoft.MicrosoftEdge_8wekyb3d8bbwe\\TempState\\Downloads\\media\\image113.jpeg\" width=\"143\" height=\"146\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Let I, I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">, I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">, I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>3<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0be the currents as shown in Fig&#8230; We apply Kirchhoff\u2019s second rule to different loops.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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XxAtYL74bfEHwh\/wgHjLw4vhyw8WWfhWxGveECui32r2GjWmti2ht5odThurO0uYPyB+B3\/BSX\/ghrL8Nfi\/\/AME4\/DnxX0r9mmzRvjl8A\/G3wp\/aMl8deEmt9TvZdc8A+P7Bvi58VtX8QeDtcnmEj2+kWx+Keo3w0oaXa6fZWlpbQWdt+7nx\/wDj54D\/AGcfhL4q+LvxEuNUOheE9Jub86L4e0yfXvFvinUobWWay8KeDPDtqGvfEvi3XbmNdM0HRbMPLqGpTwQkpE0kifzF\/wDBKz4m\/sQ\/tm\/t4f8ABVj4B3\/wq8L\/ABT+Dnxb8S\/Dv9tfwJ8Lf2ifgNZ6d4m8FeNPHvhLS\/Af7UWka34J+Jvh77Xp2rR+N7PwTqU2o6I+o6LqdtrcV5aavPNI3mU41IpXjJRd2vddnyuzd7W0a3NpYbERoUsVKjUjhq06lOhXlCSpVp0eT2saM2uWp7P2kVUcHJQckpNOUU\/A\/wDglH\/wR1\/Yd\/bn\/wCCdlrq2leJPjH+zv8AtH+GPEXxl\/ZN\/aU+J\/7JHx68UeF9O+JF\/wDDPX9a8Drb+MfB+p6l41+EPivQPiB8Lb3wh4n8SW+neFbe28VDxPc6ib5xqd1LN\/WF+xh+ztf\/ALJX7L3wQ\/ZmvfiBqXxTg+Bnw80L4Y6L481nRbPw\/qut+FfCMcuk+EINQ0qwv9Stbe60XwpDo2gyTW92Yr5tLN+tvZm5NrHmfslfsP8A7MH7DXh3xx4O\/ZV+FGmfB3wX8QvGJ+IHiPwpoOteKNQ0GXxbJoumeHp9V07TPEOuaza6Ak+j6JpFo+n6Amm6Y\/2KOd7Nrpnnb60Pb6\/0NTfS1l92vTZ\/IxPxz\/4LTfCK98b\/ALM+nfEPQrG5vdc+FniW2eeGy8o3dz4c8azWfhq\/s0hnzb3Y\/t6fwvqBgnTy0jsJrgT28sUcg9B+GUXxD\/Zr8T\/sA\/sieAta8F6doWtfC34z\/Ef9oCTxJ4b1LW\/EWr6R8NLH4drrV94S1ix8RaNaaBrmtfF\/4v6T\/amqa7oeu2l9oUustbx2eq21pLcfUH7ae9\/2cviMiiRy1nov7uJIXkfb4s0E4RbgNESuMjcuMgZeP71cZ8d\/2VtI8f8AizXvjSmlaz8SfGTfA3xN8ArH4U+IPE\/hjTPhnqnw\/wDiD4r8NeIPiFFcaVr\/AIF8Sabd+INY\/wCEZ0e6QeI21Dw3rc3hnw9oGuWNro0l9dRenVxtaeVYXAyf7qliq9WFt7yjBOL8k22vM\/WM343zrH+DPBfA9ecHk+T8bcY4\/DJc3tnKWX8PVaNGd9PZYbEZvm1akk9ZY6d1+7hy\/Xms6PofirRNV0rVLKy1fSdW0280rULO7gjvLC+sL2Borq0uLeUSW13azxStFNBIkkEyl4X3KXFfyk6Z+xR+zT8EP+C7fwA0rRfiJ8VtT8Kfsy\/s3\/GL9sf4i6j+0L8a9T8W\/DH4Vy\/FTxRc\/Bj9nj4TfDDS\/Eeoad4e+H\/hf4d20HxJ8R+GbBrK91G00mDQ5L7xJqb6RaSab\/Rx+xp8IvGPwH\/Zk+FHwg8cXmlXfiHwHoN3oK\/2ObYWtjoNvrGpN4P0af8As3T9G0JtV0Lwg+h6Prj+FdA8M+DptasdQm8H+F\/DXhmTStFsPi742f8ABEj\/AIJ9ftKftN+M\/wBrT9pH4Wa98cfiT4vtvDNlJofjz4geLG+GOj6b4T8N2PhjRtL0\/wCHvh3UfD+gajpdvbWkuoSWvi228SqdX1PVr6LyvtsiHzeaXLycz5b35el9Nbd7dfkflqxFdYd4RVqqwjrrEvDKpJYd4mNOdKNd0b+zdaNKpOnGq486hOUU7Nmt8Q\/2tf2Uf274\/iD+yl+zB44\/ZS\/bW+IXhu18K+PviT8FfGGuat4o+Bms+C\/D3jnw5MdM8Y\/E3wZ4O+JHgvRNah19NI17w5pFxpPjK71jUtAltL3wqdDXWNb0TgfE\/wDwTr+K2k\/8E89Q\/ZQ+Et98KNE8e3v7QF78f\/C1g+o+IPC3wj+CWpP+0td\/tM+BfBfwum0\/wV4ku5PCXwT8UQ+F9H8KWGo\/D+y0PxlpHh26gv8Awv4PsvEDadof4k\/sQf8ABR\/\/AIJg\/sTftef8FS\/iG\/8AYvgnxN4g\/aN0T9mf9nr9lr9mH4J6n4k8UX\/we\/ZS8JWXgga94O8HfDDw0PDtnb\/E\/wCKOv8AjXXG1DxH4g0v+2b+xa+la00+OzuK\/o8\/4Jwf8FBvD\/8AwUc+GHxK+Mfg34OfFv4NeD\/A3xq8XfBTT9J+Nlho2h+Otb1rwHpuhy+KtQvPDGi6jrEPhxdL17Vr3wzNpt1q15fw6joWoR3sVlcpJbRzp\/V+y7+v33Mde39afMwPBH7Of7VOo\/t0+Af2n\/jZdfAPVvCngD9mS9+DOg\/8IPqXxAsvE+geJviLD8PfFHxxutL8M6n4ebS9S0rxZ8S\/h54ZHhjV9Y8aNP4c+H3hq00r\/hEp\/EviDWdftv0zoooAKKKKACiiigAooprNsUseg\/xxQA6vG\/j18bfBf7Pnwo8bfFvx22sSeH\/Bmlfa20rw3p76x4q8Uaze3EGmeHPBXgvRIZYrnX\/GvjHxBfaX4X8J6Daulzq\/iLWNL0+GSN7pHr1GXV9Ogk8mW6gjl6FHmhRh8u75ld1ZeOeQOCD0Ir4G\/aT\/AGdvEv7S3xT0VPHWoaDd\/s+fDvwLr\/ibwD4R8LfHX4o\/CDxt4m\/aT1QRaDoev+N9d+GOj6Vr2jeDPC\/gq48RaDoF1oXjjV4o73xr4i1bX\/h54o1DT\/Bl14Trkn\/JLXb3X\/kaqhWaTVGq09U1Tm013TS28z7R+HfjnQ\/if8OvAvxI8ONJc+GviH4O8M+NvD8lz5Bml0Hxbo9prukSXAgmntzK+nX9s032e4nhMhJhllj2u351\/t9ftLfsv+CLHRPC3xL1fxfr\/jX4ZePvA\/xj0XwN8OdSv9J1SDxV4Bu\/+Ej8G3HinV7bbYw6Fb6sun6jeadqE81rKv2GbU7OTThKR4H8Gf8AgoJ+zR+wV8Of2aP+Ce\/7U\/7QPw3uf2zvhj8Dvh\/8O7v4dfCq6+IfxOi8U3fhDwhaaN4EsrTxDP8AD3wxbad42+J3hjS9F1jw94O8V23h7xHret6wdK8M2GvWU+k6lqPovj79gu8\/bZ1XSfjF+0VMPB3iI+IfBereD\/hppFjHFZeFPhhpmtadqXiLwP8AEa9t3abxj448Waat9aajqJv00XwndLpcWgaWXsdZu9b9XK8PgZynWzPn+qQ5oJU5qM5V+VTpxcOVzdNK8qjhy2jb3tXF\/qnhbknAjzWOe+LNTM8NwLhpywkqeU4mFHNc0zeSpSoYDC4ZUa2Kr4SEKkamaV6csHHCYerTaxaxNbCYbFY+ofGi18G\/CrQP+Cgv7V+iaxr\/AIl8Rz+E\/Dv7JH7MfgvTP7Y11fFvxSuodF+GXgzwJo2rPYzeKfj18Xrm\/hSbxFqqaHb+BfCt5dw3UPh7R9F8Za5dV9U+Kf8AwVz+GMN1+0b8Vv2Zf2MPHfwt0jQrvW\/Ev7O37P3i74qa1+174P8ABIitdV1aw8MfFLxdpll8JPjX4w0Cys5dQuvBOl+Efhlp3jC\/0uDSfC3iKbUpdMa\/9d8eaFN8Uv8AgqR+z14EvVY+Cv2Sv2VfiR+0THo8d1dnSW+L3x08Y2\/wH+Feuz6V9jFk954P+GfhH9onS9HuZrq5mhj8eXotrOyMMtzP+mWt6Rp+vaPqWhavaQ32laxp17pOpWU67obvT9QtpLS8tJRxmK5t5ZIZVBG6NmXIzkcWLxDxFWUklCmnalSguWFOn9mKjdpNJK73b+Jtnw3EufVOIcyqYxUKeAy+m6lDJ8nwylHBZLlUa1SWEy3BwlKb9lRg+apWqSnicZiJVcZjKlXFV6tWXmvwJ+PHwj\/aS+GXhj4ufBDx54c+I3w98V6ZY6hpPiLwxqlnqVov2ywtNQ\/szUEtpXn0fXLK3vbcapoOqw2esaTNJ9m1Cytp1MY9gP0z6evTt71+PX\/BIjSv2Wfhr4C+MPwg\/Y++D\/7WHwx+Cx+J+s\/Gbw\/P+0H8PPEfhn4e3jfEqCxsbjTPgH4t8SQjUfFXw\/jbwqviOwiv77XL+zh8SR366xLo2raRbWv0Xpf\/AAUn\/Zk1i88N3Vpe\/EP\/AIVx40+L3\/ChvB3x2f4aeMF+BPij4ryeKp\/Adn4a0j4mLpraO9jq\/j63l8B+H\/G9wLb4d+JPGPleH\/D\/AIv1PULqyiueRNSV1drzTWvXdLZ6X2PAacXZron96ujjf+CtXxLb4X\/sIfHPxXpvxa+BPwX8T2ui6SPCXi39pDxJqvhj4Xvrtl4m0TXG0LUZvDpm8Uahr2u6RpWqab4V0Xw3YaprOp+I7nS7eLTLu3a4jPPf8Emv+Cgnj\/8A4KI\/s1WXxr+I37LXxW\/Zo1h7mys4B40s3\/4V\/wDEu3ubVpovGnwV1jV4tE8WeIPAt9CsNwmoa54S0qyhu7yTSdD1zxhHpt5rNflb\/wAFFv8Agmj8evh5+2FN\/wAFTdIuPAP\/AAUU+G\/wz0bW9f1T9i\/9tbxxY+FPD3wX0zdaXt94l\/Zf8Z366Z8FfCt\/4ei06yudP0\/4p+C7+RorXVby88S+IvF9\/pepad+v\/wDwTW\/4KVfAH\/gpr8D7j4x\/AnRviB4Yj8P6vD4V8aeEfiB4Rv8ARbjwh4q+zPI+i6d4ntorzwF41tVRGnTVPA3iHWobSCezt9fg0TU510pa5pOPK5Nxi24xvpFtK+nW++ptLE15Yalg5VZyw1DEYnFUaLfuU8RjKWEo4qrFfz16WAwcJtt6YeFra39V\/a1\/aq1L4CyfD34b\/Cv4dy\/HH9p345ahrWk\/BP4K23iS38JWWp2\/hixgv\/G3xH+Ivi+ax1f\/AIQL4P8Aw6sr7Sn8Y+Mv7E1q6Gq674W8KeH9H1jxT4p0XTbj5BuP2tv26P2UtU0PxX\/wUL+GH7Nk37NnifxDoXhrxH8e\/wBlrxl8Tbi0\/Zx1LxJqdnoWian8cfCHxW0DT7i5+Ft5repaZpOsfFfw1r0EXgiS6Ot+LPCNh4Y+163pnrf7NmkW3xP\/AG+\/2+fjvrAg1HUPg9ffBT9iz4cXEsReTw\/4R8O\/CfwX+0j8TBpzS26m2l8X\/EX47afp3iRra4lXUx8L\/CouTt0e0B+vv2i\/2dfhP+1V8G\/H3wC+N3ho+Lfhb8TdCfw74y8PRatrGhSanppubW9ijTVNBvdO1S0e3vLO2u4ZLa7jxNAiyLJbvcQTowPnXxNY\/s1\/sc\/sjfH39ov9lj4J\/B7QtK0j4PfEL426X\/wovwJ4S09PixrWneENV8U6Bd2974A0l5vGl\/4v1AWkWnajGdWudYfUoZLNroXUZf8AHr\/gh7+1drfwY\/Y0+APwM+JH7HX7afwf8KeGNFOufFL9pv4\/\/DK28B+AfFHxw+NXj3xZ4y8e3Wh2UmrXnjDUvBq+OPE1xaaZ461PRdN0yTRZLPU9eXRh5Zuf6Gf2dvgf4V\/Zo+BHwh\/Z68C3es6h4H+Cnw58H\/C3wbdeI7mzvvEEvhXwLoNh4b8PrrV\/YafpVpf6jDpWm2kFxexadafaTEskkRlMkj+leIPDuj+JtH1PQdd02w1XRtZsrjTtU0zUrSC+0\/ULG7jMFzaXlldRy2l1bXELNFNBcRSRSxuySKUYg6UpU4zTqwdSG0oqTjK3dPuuiej6nfldXLqGYYarm2Dq47LudxxmGoYh4XESpVISpuphq9pwp4ig5KvR9rSq0pVaUIVac6blF6VldxX1tDdwOskFwizQSoytHLFIN0UiMh2ssiEMpBZSpBBwa+U\/iv8AtQ33hX4i6j8GfhJ8HvGfx7+LegeENC+IHjDw14W8R+AfB2i+BfB\/irVte0bwhqPi3xV4+8T6BZQ3\/jO68IeNR4W0DQbXX9Zuk8J6reaxaaFpDWmq3Hzr4p+J2kf8E34rq5+L3iZtN\/YmhWzh0D4la7qmoX0\/wD1S\/uks7Hwb4se4F5f6l4D1i9uILHwXq0TXd9pF\/LF4cvIWim02d\/PfhP4j1f45\/FX4h\/to\/wDBP348\/s5\/Gn4OftF+Ffhh4J8Y6d44uPGsI8G+N\/gyfFOn2virwzqXhWybU557\/wANeM7Oy8SfCvxZpvhy8t7vRdM1a28YaPH4gvbKDTEYfknFUpupTqL2lKUN5U7r4lZuE4tqMk0rO7Teh6Gd5FLKqlOrg8RHN8nxdGOKy7NKEU\/bYaVSVPkx2GpznUy7MMPVhLD4zBV7ujiIS9nUr0J0K9b9Ufh34ovfG\/gHwV4z1Hwp4m8CX\/i3wp4e8S3ngjxpbWVn4x8H3Ou6RZ6nP4X8V2em6hq2n2fiXQZLptL1y1stT1C1t9UtbqK3vbqJUnfsqydNmkh0+zivbq1ur6O1gW8uLWN7W1uLpIo1uZ7e2nu76W2gkm3PDbyXl1JBE6RPcSspkbRR0ZiVOcjJIZWUFQPl4Y4OGBOBg9c1hZro\/Wx4TjJbxa+TS\/H\/ADJaKKKRIVDcK7wyKhCuV+ViCQp65wOTjsO54PFTUyTOxsfrwOv0P+evFNOzT7MP60PzJ8A\/spfBX45+LPj94r+Jvh\/X\/EXiE\/HzxtoaX0HxJ+JWhG30jQtM0C20uzgg8M+LNGtbSO2t7qaPZbRR+ZE0cc5l2Lj1aL\/gnX+ynE0cq+A\/EQminhuEl\/4W58ZXm324zCkk8nxAaWW3D4la0dmtXm3TvE0ztIe6\/ZokQ3nx8RSC0X7SHxLSTcVyrSWXhq4K4XuUmRl35YoyljkkV9U5\/r+nFeniMfjadRwhiq8YxUUoqpKyXKtEr6LTY\/T8+4\/46y3M6+X5dxlxVl+AwtDBYfDYHBcQZrhcJh6Ecvw0I0aGHo4qnSpU1HRQhCMUuh\/Nb8c\/+Dfaw174xeLvHXwJ\/ak134PfBfxv8SPg\/wDHLxh+zvq3ww0f4ip4h+L3wC0r7L8Mr+1+NeueIP8AhZPh3wlBe20VxrOgJ\/bVxcW99q1hZajZ2r6ImifqB4F\/bq8FxfE3wD8B\/iXpD+DPjh4gudX8N+KdA+1m40fSfEenWdreaXd6bq0sUceq+H\/Gcs08Xhy8gwWuVNlNbxXEE8cPnP7W3xR8DeH\/ANuT9kbw94u8VeIrGw+G3wb\/AGqP2jvEXhfwjeeONb1jxLB4fu\/gf8JvBOhSfCfwFb6nrnxPu9W8RfFTU9X8I+H7fw94iv7vxT4Nii0DRrzVo4zbeL+O\/wDgnd8GP2mbLQf2uP2Uvil4w+FfjLxxND8QNH1DVtD8S3PhvW9Uu9Ukv55fEPgLxzBonjvwH4ki1W0+wvaJNod54N1CySyvfCk0mnf2SuuWSy\/EOth8zqOl7V+0oYqMJylGtycjjWlG8nTkrJLkmlLW8buR6Xhvi\/DrPsVnWUeLua5nl1DG4fG4zIeKMNhKuOxOB4mxlCpRjiM9xVOpWxlfJ3XnRx+KprL8diKuJwtNRrUKdXFRr\/QHiDxB\/wAKy\/4K1\/Dm51iKC20T9q79iLxb8OtA1CT7Q5PxJ\/ZU+LjfESz8KJcrbCxhu\/EPw+\/aA8deJLK2e8kutQsvh7rdzFbW0OlStc\/pbqou3sZzYPCl55MhtWufO+zicr+488QFZTEZNqyLGyyMhZEO5q\/Cf9s39pX9mDxF8ENF8G\/tg\/tS\/DT9gH9sD4A+L\/DnxX+FnjXxf4m0n+2\/Cvxs8GWGpaXo3xM+G3gjWZ9Dvvjr8IvGeh6\/4i8M+NfDWg2l1BrngDxb4q8FatceHNcH27T9r4R\/tHf8FVf2xvhD8PZfhl8Lv2Rvgz4O+JPhvw9r9h+3h4f+Mvj\/AOKPhrW\/AHiOJVl+IfwR\/ZT8c\/A7wD4tTxRrGjTS6r4O0L4zeOIvCfh+7l0281u4+IWnbbG+8utSlRqSpy15XpJbSXSUXqmmtU0z8vzbKsZkuPxGW4+FOOIw8o+\/RqQr4evRqwhWw2KwuIpylSxGExVCpTr4XEU5OnXoThWg3CcT2D9jD9iPxL8BPi38TvjZZfCL4O\/s4P40+C3hj4aX3wb+CvxN8YeOvh98RviJ4d8T+KPEV78a\/HN9rnw98CT23iJotZs\/Cvhu9j0zxF4pk8K3Orw+IdcuhDoGl6T8R+Ff2Bv+CiuhfsIfAb9jhvCn7Kv\/AAjPwq\/ar8MeNpfC0vx3+KVybT9nL4UfELw\/8dPg74Qk+JsXwLt77xP4t034x6VFY+M3j8AeEG8QfCnw\/aeHrHxJovi7X77xva\/0iWkLw2ttFNNJdTRQRRyXMyxLNPIkao8sqwRwwiSUqXkWKKKLcSEjRAqicgY\/Pk8ge\/J9v88msvRWPOu3vqfyYf8ABVv9lL9srVP2rtG\/aC\/am8G\/Ez\/gpT\/wS78MXS6m37F\/7M+uap8K\/GfwjubO\/t7zT\/F3jz4P6XevdftWQaMY5ZW2eOdJvb1mc3eieFvDmnT22p\/uz\/wT5\/at\/Yl\/al+AHh7Wf2F\/E\/w\/ufhJ4Os9P8Op8PfBuj2PgnUfhLdNDLJF4Q8S\/DaGx0268D6hHsuRbWs2nQ2epiK5vdEudR01obyX8Rv+CjF7+3T8Qv22tH+BX7Y0\/wAf\/hT\/AMEofiDctonhfxf\/AME+9N1rVNQ+IF1cyLCfCv7anxYWQfEb4ReC9TtZNRg8SWfgbw7p\/gvUtJ1KHT\/+EjvRp2peJ9N\/ol\/Zg\/ZX\/Z4\/ZA+GNl8H\/wBmr4UeDvhJ8PdPuPtv9ieEtNNvJqmpywQxz654l1i6e51zxZ4jvEijF94j8R6jqmtXyxwi6vpREgWuWSipWajJtJ2dpNWvq7K8U0tL7730Wro1o0aeIlTmqFWrWoUq1n7OdbD08PVxFKMtnUo08XhalSN+aEMRRlJJVIt\/Ln7H2ow+D\/2x\/wDgpv8ACDU\/tUOuar8c\/gr+0r4fjuoYol1H4c\/GP9mn4W\/Da01KxcMJbi3s\/iR8Avifody7RBYH0qBGdnnUV+l2R6\/56\/yr8+\/2sP2XviP4i+KPw\/8A2uv2VdZ8H+Fv2r\/hT4a1H4fz6V4\/k1LT\/hd+0N8D9b1a21zXPgf8WdW0Gw1PXtDhsNftofF3wt+IOm6R4jvPhr4za\/uD4Z8Q+HvFPinRNR4P4Z+Of+Clvxv+JHgMfEX4A\/Cb9iX4T+EdftNa+J13J8Y9I\/ac+JfxdtbOFH\/4V94CsND8EeDfCXw98IaxqDtLrHxK8SajrXjQ6VaGw0f4f+GrzVf7f0yTI\/UGopJURSxOAOp9B9TjHrnkcc18Qf8ABRj9pj4gfsbfscfHj9qL4ZfDzRfiv4l+B3hKz+Id78P9e17U\/DFh4h8H6Nr+jHx9INf0rS9cuNIu9F8C\/wDCR+INPu20jUbY6hpFraXVqbe9mmj+PvgN+1R+3D+3F4LsvDHiH9kbxP8AsJQeKNN8N+I7342v8X\/hn8ePC2sfC3xNocOsWmqfBHxX4PgtLHVfF3iGz1LTo9Ivdd0CPTvDttLda7cQ6pLa2WmXu1Ci69WNPmjBaynObsowiryfXW2ySbbsluenlGW\/2rjqWDljcFltGSnVxOPx9VUsNhMLRhKriK0kuarXqQpxfscLh6dXE4mq4UaFKpUlYj\/4KTfBCD\/gpl4bX9jz4U+K4PC+qfDn4peA\/i\/4r+Oc+hweN\/Anwx8bfDWaLWvDXg\/VPB91LDoHxK1\/WP7Rt\/7W8A61f2OlWWj3B16+nN9p1pYzM\/Y1\/wCCN\/gH4GeDviHefHj4o+IP2gPjF8Y\/jD47+N3xF8c+Ff8AhLP2ePB0virx2mkpf2Hhv4WfC7x1Z+GtJ0y0k0a3nhnn+06hJPLKBLDaw2ltD+rHwh+E\/gr4N+BdD8B+BNLh0zQdGhYAtJLd6lql9Kxe+1zXdUuZJbzWvEWqXBa71jW76Wa91O+kmubiRmkwPUlXaoUZOO55rpeNdGS+oynQjCPs1OMmqlS7blOerUXJ\/Zi7KNlq+Y+gxHFEsnx9J8DYrM8hwmCw0sHSzGhi8Rhc4zOVWVKWMzHG1MPX5MJVxzo0af1PBuNHD4KhhcLOpiqtKpiq\/wAUXP8AwT+\/Zzu4raObTviQptkaNXt\/jh8aLaRoXhMLwNJD49WQwuNjshdt0sUcjEugapv2aPhz4b+Evjr4+\/DXwZN4hHhPw5rngS+0yw8SeLPF\/jS8s7jWvA9lcXwttX8Y6vrN\/HbzSwpI1tBdmFJQZCA8j19pmvl\/4Yyt\/wAL\/wD2oYGVR5d58JpEcNESyS+AVDKwCLLlXikb52kXDjYR86JaxuMxFKvTrYitWhyRfJUm5xuqlNXUXdJpX1SutddWdr4v4sz\/ACLifA53xLnub4KllOGxkMLmOaYzGUI4mlxBkkYYj2WIrTh7aMatRKfK5JTktm0fTy\/dX\/dHX6U6mp9xP91f5CnV5p+f7adgpknMbjJGUbkdRwenv6HtT6jl\/wBW\/GeMY6deDzkdqBrdeqPkr9lySF9T\/aMEeQ0X7TvxMiuFaTfic6J4Lk+T522o8TxSbFVAhkIZSxMkn1yOPzP6nNfIv7LkTR6p+0ZIeUuP2nviTLH8oUbP7E8GwEqQAGxLA4LEEltw3Egk\/XQ6CunF\/wAeXpH\/ANJR9JxfpxDjl15cFf1eX4V\/k0eK\/Fj4MWHxF0LxefDmsr8L\/ij4j8G6v4K0P45+FvDHha\/+KHgOw1e2u7b7b4U1jxBpeoxQ3ulNfXV\/o0V\/Be6Xa6rJ9ruNOvImmtZpvgJ8JZvgh8JPAnwpl8W3PjePwHoieHrHxJf+H\/D3hq\/vtMtJ5\/7KjvNL8LWWnaGk2nae9tpzXVtYxXOo\/ZP7S1SW71a7vr657fx94ttfAPgfxj45vrW5vrLwb4X1\/wAVXljZeQL29tPDuk3esXVrZ\/ap7a2+1z29nJHb\/aLiGASspmljjDOvxd+y9+3v4d\/aH+BPxG\/aH8UfDu6+BXw7+G0erX+r6l4q+LXwF+J1sdC8O+F18VeKNau9V+APxO+KuieHx4Zs\/Og1zRPEmo6V4n0+W1mkn0RImiL8x80fnB\/wcjaP8AfDP\/BPn4j\/ABK8feB\/gld\/G\/xynh39lH4IfFf4qeDfB+p6l8ND8f8Axfo2m+PNU0Hxh4m0vUJ\/BUek\/D7SfFniW412wudNl0ddElv7a7trks0vAaP\/AMHBP\/BOz4J+D\/gV8Af2RPAf7R37UnhnTPEHwi\/ZP+HHiX4U\/Bjxf4e+EGneJ7xNK+Hnw88J6h8TvihZeDtMu9S1P+zol0+18L2fim\/1WK1u7jTra98t8\/cOv\/tUfs1ftV2v7Idr+0r+xd40b4P\/ALSXj3SfEX7Kfjr9o34ffA3xv4DuviZd+APF3ib4YXupeD4\/H3jzxZ8LvHnjv4dJ4n1z4Z3nirwRp13FbXE+ha7eeEfGV2nhtvhL\/gsL8WPFfgn9sz\/glv8AC\/4afsofHn9prwV8DfH\/AMQ\/2v8Axp8I\/wBmT4ZS61MvjHwZ4P1f4cfsxxa3q002keAPBPh6D4g654s8RX2pa7fiexsfCO6x05ro2omd27fE3suyStbTfvorLd6sq\/dX6Xbey2Xoj+mSJi0aM6hGYKSoJIDFQcKxVd2PXavT7oINSV\/Oz+z9\/wAFKP8Agpr8Zf8Ago58Df2TfjT+xP8ACP8AY4+HPjP4MfFL9oXxtofiv4tx\/HL46w\/CrwTdp4J8OarDfeAZ9E8CeCtR8S\/E\/XvDGkDRdasdZ1IaXpniu4ZYWtdO+2f0SAj7oOcD6\/n7mkSfLH7aTMn7N3xNKo7f8SnT9wjcxOQ3iDR1IV1DMrbC3IUk425UEmvqK3IMSY5+Vf8A0Ef\/AF6+X\/20ZLhP2bPiebVQ8q6RYSop37XeHX9HlELbLe8IW42iEt9llKiQkAdR9PWoxDHyTlE5P+4uK3l\/u9PyqVPxUfu\/N+h9Riv+SMyJWX\/JS8VNPrf+zODl+S\/LyLNYXiO2uNR0DWtPsNSbSb680vUbSx1W3WCe40u+ltZorXULeC4jlt5bjTrnZdxQzxyQvLAI5o2Qsta05\/dygkD5G53BcZU9cg4+uCPXoa\/ke039jH41eLv+Cvf\/AAUa+EPws\/4KE\/tU\/sheJNV8O\/Az9s\/9nLRPh74osfHPwd8V+EfilP4p8N\/Gm98V\/A\/xut54X1y38N\/HPRfKtV0yfRGii8Stb3s1yRpzJjbu0l3b06f569up8wld63S0Tdtr7dltrvscx+zB8Zv+C7H7UP7GnxXsvFGg\/sdft0+DZ9W\/aX\/ZG\/aG+FHia7vf2bv2l7Dxb4I1zxX8LvFGh6V4w0XTf+FEaq2reGp9L8QaZdar4Z0GRo9ZsrW+SOSCe+n\/AHR\/4I26L+0f4P8A+Cbv7L3wx\/aw+G2r\/Cv43\/BrwTcfBnxH4X1q80nUbs6B8LNa1LwX8PNYTUND1TWtI1FNZ+Hmk+F72W+sNSuLa5vHupoRDG8cEXyn\/wAEu\/gV8Uf2C\/2hf2qvgV+03+2N8APjx8UP2tviPJ+1h4O8L+BfCsPws+KOo63F4Yt\/Dfxt8f8Air4P6UL3QvCel+In0vwHqjatpGpy6frOuDXLkmG5vfszfrt8JP2kPgx8dbrxHafCf4h+GvG8\/hNNIuddi0W5md7fSvEX9onwz4hshcQ2\/wDbHhTxL\/Y2sr4b8XaR9s8MeIn0rUxoOrakmm3cka+bfzdvktl8g9PyPc8Y9fzJ\/maWvmPQf2y\/2WvFHxHj+E3h\/wCPfwu1Xx9c+IdT8I6foFp4r0+R9Z8XaIt+db8I+HdRMq6P4l8X6E+l6kuveFNA1DUfEGif2ffHU9PtRZ3PlfTSsrqGVgykZDKcgj1BGaBDq+YPhnHj9oX9p+YE4Z\/hFGRvUrvj8E3blggcsjFJkVi6LvCLt4Xn6fr5j+Gsar+0B+08+RueX4SbgA4IA8D3AUMxcq38RGEQgbQS\/wDD0UPhrf8AXuP\/AKdp\/rY9zKpWy7ild8hpJ6dP9YMify6H00n3F\/3V6\/QU6mRnKIf9hf5Cn1znhhVPULiK0sbu7nkjhgtbeW4mmmkEUMMUKGSSWaVgViijRS8sjcIgZiQBkXK5jxr4YsPG3g\/xR4O1WfULXS\/FWgat4e1G50m7aw1OCx1mxn0+7l0++VJHs7xILiRre5RGeCUJIqllAqo8rlFTbUHJKTSu1G\/vNLq0rteZrQVGVejHEznTw7q01XqU4KrUhRc0qs6dNygqk4w5pRg5RU5JRcle6\/Lb\/gnB+0zYfGTxP+1ZpgSG2nX43eJfiZ4Vsk2B5\/Bni6ZdCsHBaRLq9mguvDZutVlNrBHYXWrjTwZTbRl\/uL9mL9o3TP2oPh3dfErQfh\/4\/wDh7o9r45+IXw\/j034iL4IOq6hq3wx8Xar4C8Valplz8PPG\/wAQfDl5oEPjDw\/4g0PTtRTX92rPo1zqthBLoV5o2p6n8MfsZ\/sjfDL4K6x8fPiB8EvCuo2Pjzwb8QPjJ8LPBehav8SvGtv4Q1zw\/DaeEdQ8P6F4jk1KPxi1hb2+uWMDjxPaaBq2tabDc6jNDa6okqWDfYP7Cfwb8c\/s+fsi\/Ab4MfE\/\/hHZviT8PvAllonxB1XwnrereIvD\/ijxwbq8vfF3jbT9U13QvDWrMPHPiK71LxfcWd7oto+l3WtT6XG11DZx3lx6WcSws8dUlgozjQcaaUZqzUo04Rnpd\/FJOS9T9R8aq\/CGK8Q82xHA2HzHB5DUwmTKnhM0pUqOKw+IpZRgsPXT9jisXCoq8qX1v2irNqdeVOUU4c0vdfir4e1zxb8NPiB4W8NP4Xi8ReJPBXijQdBk8b6BP4q8Fx6zq+h3+n6Y\/i\/wva3+l3HiTwuL64g\/t\/QotRspNW0n7ZYJdQNcCVfzp+Hf7CfiLRPhz+2dNqujfAXw78Rv2w\/hlp3w71n4beBPBPiaw\/Zt8Pf8Ij8LfEfwz0CXWtAF9oHiTxnJ4hXX7iHx54g02PwFqGqeC9L8I+E9LsrWXwta+INW\/VWj8K8s\/KT8QvCP7An7beneF\/8Agmn4P8d\/tD\/A34g+Hf2KvHN74t+J+l6v8J\/Gyjx++hzXXg\/4N33gO9sfG+l6hpPiT4RfBbWvEPg\/SdW8b3fiPTfEXjHUrb4keMtB8Ra1ounQD9s4oUVFYArhAfLPOwso3dRuB2jZyThRjGOBYcsFJVQzdlJwD2PPOOM\/yp1AH82njD4A\/wDBXm+\/4KzftM\/tTfBDwL+yr8P\/AIKeJPAPwI\/Zy8CfE39pbWPEvi3xiPgX8PJLnxt8Qn+FXgv4S67qUmnX\/i74qeKfFWoE\/Eq48N6c1npXhS5fR2u\/tE1n+iXwb\/4KHaZ42+NXgf8AZ58Z+Gk8M\/ETU9D8VWPivUbOca34Pj+IXhy4tjZaJ4e8RaVPe6Ze2PiLRbPxJrNhJdXcUySWtlo2bjVBewxfpddWcF2hScboijxvEQpjlSQbGSVWVg6FcqVI2lSwYEEivyY+OH\/BKX4Xal4rtfi9+zRrmofs9\/F\/SfEdj4zsP7IgXV\/hxrXiPTtbt\/EErax4Ru96aTL4gvba1tNS1jw+1vNb2qiUadeLDJbXHrZa8slDEUcxdSm6kJSw1aMW1TrRjaKqNPSm7q65Wub3m0lr+s+GdTwuxWH4jyTxKljsuqZhgJR4S4iwGDnXpZNn08LicNSrZ1LDYmOKq5RKrVw1aph6WBxso1aEa0Z4eEa8MV9hftgIzfsz\/FCGGWXzBpWkr5m8PKSfEejEtvcNnaBtDchYwoGQBX05HcJbwAyTRxxxxIxaRlVQAihmLMQAA3BPRT1xzX5q\/Fr45n4sfswfGrwl4n0ofD34y+C4PDmkeP8A4fXV1btcafd3PijQzp+u+Hr+dWt9c8HeJrdDc+HtbtkmSaFmtJFj1K2uIR8df8FNdR+PPxr1PXfB37LuqfETx54e+E+i2E\/xg8L+DJdN0zwvba3Pq0dva+F7PXEt31Hxd49vY75dQ1jwsrT6f4d0LSnn1GewuL+CK70w2XSrTp0K1SGFpqrUdWtNOUIwjTpSjK8VaXtYtOlqlO7elrH0HCfhbjeJ58PcIZ5nGA4Nw1HiXiivm3EuaR+s5NgMFUyrgtYTGLF4erHB1sNmdXEYWnleJeOo4PG\/WKHssY\/aQ5v0G+IPxb8UftC+L9Q+Bv7OfiCaw0Wziay+NX7QXhu7tbiy+HltcRS+T4O+HdxJb32n618VdWjkEq3MqT6V4L0o\/wBq6rb3d3d6VZT\/ACx+yn\/wRD\/Zh\/Ys\/av8PftV\/s8ePP2gvDWpaV8O\/FXwn1H4W+K\/ifefEn4aX\/gfxXfw+I73TbH\/AITew1XxvobQ+N7LT\/GMSWPjI6e2pw3vm6eV1O4Y\/QH7EMfhD4IajffsOeHfBXjBPFPwT+GvgP4n\/E34lz6f4Ss\/AnijXvjLfa9PbX2mXVn4ifxPd6xrniDwp8QbaCwvPCVimj6R4OaW\/nttP1Hwjc+If0TvdW0rSzZLqOo2OntqV7Hp+nre3UFo1\/qM8VxcRWNms8iG6vZYLW6njtYPMneG3mkVCkTkcWLqU+f2FBfuKLcac2o+0qa\/xJNN25klaKk4pbatn5txhi8khmFXI+Fo8\/DeS4vG4fAZnXowjmfEElUhQnnmZ1EuaM8bTw1F4bL6fLhMtoRhTo05YmpjMVivy\/8A2uPh38XPHf7aH7N9\/wCA\/hf491DwhpP7N37Yfw98SfGTRpvCdv4V+HvjP456d8LdI+H8mq\/bfFmmeMJ\/s0nw+1yXVbnw74d1b+yoLzQ50aSa5f7F5l+xF8HfjX4Y09\/E\/jH4JfEH4TXXgP8A4J0fsp\/shQ+DtS17wjH4p1\/4nfAP\/hdd54wk8Ea1ofibW9Hn8MW8njLw3Y+BPHGq6lpH9q3N\/Ldy2tra2t61t+jnxx\/aB0P4G3HwmttW8KeNfFtx8Y\/ix4Z+Dnha28FWXh6+ntfFXiqy1jUrG71uHXvE3huW20G103Qda1LVNQsE1ObTLPS7u7urNbZTJXvse5lzIoBzwNoyAQMZ5YZ9xjjGQCCK4j48\/mZ8A\/B39rKb9iD\/AIJs\/ssa9+wt8WtGg+Bf7VHwabxf4wh134B2XxH8F\/Dr9lL4h+FfHHw8+N+veHx8Zrzw7oXif4+yWM1j8VIfCnxE8f6p4OstS+Jt1p1j48vdb0LS9S\/plg3CJAwwcdMYPU49O2McD6Cpse36UUAFfNXw3lD\/AB5\/aYiBkzFcfCsENJvjHmeCJGBji8pBETg+YfMmaXEZOxURT7\/f3z2kNzLHHJcPBHI6woMGV1DlIlJ4yzAIDnALKSMA1+UP7MX7bHgv4pftRfFXwZofgvxza+KfiDfaBPe6fqFpp\/keErf4d+Av7P8AEQ1u7tp5YN0euxR6Rbtbz3D3c19aybYY42VO\/CYavVo4qrTpSnCnTipyXKlH34Tu22klaL1bSbXKrysj7zhLhbP+IMg8QMxyfK8Rj8DkHDlDEZziaPs\/Z5dhnnOVYv2+IcpxcKToYPEyU0mnKk6SvVlCEvvHRP2gdD1z9oXxt+zZp\/hbxs3i34e\/DLwX8VfEXimXStJTwBB4c+IOu+JvDvg6xg1oa9Jqdx4h1jUfA3juKPSxoqrax+ENQudSutPt7\/RH1T3vzX\/55N\/3y\/8AhXxj8APhf8YNA\/ad\/bI+MPxO0DwpYaB8V9X+DXh34OX+g+LJdc1g\/Cj4VeCNTsLfS\/FGkSeE9CXQ9SHxF8VfEjxdbxxav4iWSz8bRWH2yJtHd7z7WrgPgwqOU4jc5x8p54\/r3PQDv25qSmSjMbjn7p6ewz\/kd+nFCA+UP2Ycfavj9ghs\/tM\/FENj+BhBoICHnrsCkjrk5IHOPrEdB9BxXyT+zJNClz+0AWJRk\/aZ+KDSGUpz+48Oxh12M2E2NEEVtsmCrOnzBj9aKwfLKcjJXPP3kZlYc88EEeh6jIroxP8AGl5xh\/6RFfofUcZpriTME0\/gy7\/1V4IfRRRXOfLhRRRQAU113DGM8\/p7UMu9SpLAHjKsVYfRlIIP0NKOMD\/E\/mev4nqfegD+X\/8A4Lz\/APBPT9qX9qr4o\/s9\/FT4H\/Bm0\/aW8I+E\/hh8XPhlq3wjtPjRB+zz4l8BfFTxpJpV38M\/2iH8ZQ3Wjv470D4capZRXs\/gfUNZMWnTaZCNJ0y8tvF\/iueD9vf2Efgj4s\/Z+\/ZK+B\/wn+I+o6NrfxR8JfDzw9afFPxHoRee18S\/EqawS58Za\/PqU1vb32vX2pa3LcT3ev6lF\/aGsyg6jdhZLhok+Av+CjOu\/sL+Kv23v2H\/AIaftpXX7NV94J8LfCz9qH4uyaJ+0BD8PdRsb\/X9Uf4R\/Cj4d+G00nxtZ3p1FPFo8X\/EPXdG8PxKY9f174Yw61a6fqWqeB7OfSvqb\/gmb8OLz4c\/Br4qJpfhrxL4B+C\/i\/8AaL+KfjL9mT4Y+KtP1zQdQ+HH7P2ojQdP8L6JpvhDxAx1TwF4S8ReKNK8Z\/EXwP4Cmh01vCfg7xvoeky6B4ZuYZ\/DelautN0\/Z30dr6vW1rX1s7WSXZJI9Keb5jPLv7KliqrwPtsPXdDnmoynhI4uOG5oqSjJUVjcRyc0W4qSSdoxS+Uf2h\/H\/wAbf2QNR\/ak\/aN8bfE39mn4H618d\/2ifg74V\/Z81Txpr0vjTSfHPgXwT8M18JeHPhj8Qr\/xXB8GtH+EVjJ4jsfHPxY8Y+ItL8TeOz4P8L+JfGlnoFv4h1+z0n+3vs39qn9lH4h\/tHeL\/gb4p8I\/tC\/Fb4TWXw7+Img+JPEGk+BtZ8D6bpv9lab4T+JWnzeIvD9v4j+FnjuWfx9Lqfi\/RLNDql5FoA8NWdxEtstxLcrqn3nLb28rAypvbAAB3HAHfb29yRg\/xZxUyIkaiNAQByASWOCfUkk\/iSaxaurNaHnJtarQ\/On9pv4U\/Fh\/Hn7I3j\/Ste8Ep8Iv2Spvi58XPiP8TPi14w1ZfFlh4rh\/Zt+Jfwe8HeM7rwnoPg6HRPHVnpNn8SPFviXxtFd+M\/h1bEl5tLa1kSCS07r\/AIJ\/fHb4hftDfABvHfxJu9H1jX7L4p\/F\/wAIWXibw1F4Sbw54t8I+FviBrmm+B\/EWk6p4D8YeOvBWum88JLo8Os6r4T8QXOhy+JbTW7WzEa2hD\/bcipIjxyLuR1KspBwQeMUkUEUK7IkCLu3YBbrgLk5JzhQFAPAUADAAFNaJJaJbIRLRRRQBBJGjfeBIOc8nGCCSMDjkAgk5wOeuDX5q\/sy\/s7+FPh7+2N+2d480pLXff614Tk0i0Gnxxz6NJ8QtL\/4T\/xoIdSKeZNZ634kngvWtkl8u2ngm2hPPZa\/S2R1jXe2cLknALHG1uijLMfQKCT2Br5h+FqY+Pn7UUylDFPffCUqVUAmdPAIWUswiUv+7FoAfNlwqbQI+VbswtetSpYunTnKMK9KMKsVtJe1g0n53vrvqz7ThnPM0yrh7xFwOAxdbD4XO+FsJg8zo0rcmKoQ4p4dqQhVTUnZOMlzRtLknOHwzkpfT8f+rTGcbF68n7o6n19afTVG1VHooH5DFOrjPiwqKfPlPjggZ7dARnrx0z1qXNQ3BHkSg9CpB\/Hj+fFNbr1X5il8Mumj126dz+dz9vjQPjhrv7LXxEtvgT8ddQ+Afib\/AIez\/s96XqninTPCkPiy\/wBVsPGH7SPwQ8E6Pp3lXWv6Mlrp2h+L\/Fvhjx5qllm6h8W2Xg5\/AeorZ6J4n1a+g\/ofskljtYEnaJ5ljRZnhi8mJ5VGHeOLfL5cbMCyR+Y+xSF3vjcfxI\/ak0PxLqH7Jn7U3iXwl4e17xhffBv9vb4VftDax4W8M6dcav4n17wt+z3+0L+z98avHeneGdKtv9I1TXD4G8Fa5Lo2lWsU9zqN7bwWNtHNc3Mcbfqt8Hv2h\/gd8dvh94Z+J3wd+K\/gb4j+AfFljHf+HvFPhbxJpWp6bqFs6bypaC58y0vIDmG9068it9QsLpXtb21t7hHjXoxmlWUm1a0Ffp8Kt6eXy8j6vjTmfE2ZK20cvtbW6\/szBWfnv56HtdFUbXUbO9Li0uIbkRyeXI0E0Uyo\/lpNtZoncKwjlicq21gskbYw6k3q5U01dNNd1qfKnzp+1xf+OdH\/AGZvjj4g+G\/xB1T4WeM\/C3wz8YeL9E8daJovhHxBq2iXHhHQ73xI32HSvHeh+JPCVxJqEWlvpksms6FqcFpbXk15FbNdW8DL+LvjL9r39qHVvhnP4u8M\/HLWPDnif9m\/\/gnT+wT+1pHodn4Z8B3Nt+0v8Sf2gPGHxFtfH+jfEm11Xwze383hzWNF+DUHgjRtO+GV94GvdJ8TfFPW9Uhv7jVLPwZBon75fEXwF4L+LHg7xF8NfiFoUfiXwX4u0240nxLoM91eWlpq+lymMXOm3c2n3ljetb3SsEuYIZ1juLfzba53wTPFJ4Tb\/sSfsn6YPhR9i+BvguM\/BnTtC0D4aH7PfTHw3oHhPxLa+OvCWgSGfUmbW9A8HeMdM0\/xV4N0TX\/7Z03wj4msrLXfDljpupWsN1EwPlb45fE34v8Ajv8Abr8K\/sqQfHjxZ+zF8Lm\/Zl1b41aT4s+HcHwoTx58ZviUnxAv\/Dms+BtO1z4ueBviNpOlaD8H\/A+lWHjnxDpGheE4fEXiFPHWnatea1Z+G\/C+rafeevf8E2fjn8RP2gf2bH8YfE3xdovxH1rQfi\/8d\/hvoPxV0HRrLw9pvxh+HXw3+LvjDwf8Mvi3DoulFdEtW+IvgDSvDviqS78N29r4V106mPEXhS2h8NavpMa+yeN\/2Qv2X\/iF8YNE\/aE8e\/BPwH4m+NXh\/wAG6t8PdD+JWp6WJ\/FGmeCte0fxboGseHLW\/EsQTTtR0Tx14w0y5jMbM9n4h1KFXVJ8Dr\/gP+zp8Df2YPBL\/Dj9n34XeEPhH4Fl1e61+Xwv4K0qPSdKm1q9tbGxutTmgjZjLeTWWmadZmWRmZbSxtLZNsMEaKAew\/Zbfj9ygwMAAbRjG0fKMDhflBxkDgYHFPihihBEaBN2M4yScDAyTzwOAOw6YqWigD4Z\/wCCkviz4sfDv9hv9q34o\/BX4k3nwq+Ifwl\/Z9+MPxY8PeK7Dw94c8UXSah8OPhv4o8W2WnRaX4sstT0ONdQ1DSbGC5v7vTNQa3tDcLbW63UkN1afD\/7Rv7TH7Qvh744\/ELUvh\/8Uda0zSP2bPij\/wAEzvhjH8G9P0fwZeaJ8Y4f2wPjTo3gj4u6947l1LwtfeMWnn8IeMrDS\/hpF4Q1vw3b+HPFngbVNZng8Qrqt3o1p+vvxa+Efw9+Ofw+8U\/Cv4q+GbPxn8PfG2lXGheLPCupXOoQaX4g0a8RorzSdUTTrqzmutNvYXeC+sZJjbX1tJLa3UUtvLJG3x18afhl+yr8EviP+zF441\/4ODWPG\/jD4o\/Cv9mvwDr1rrGsTNY3OnQePPHHwxvfHVnqfiKHTvH9n8MNR0zxTq3gC+8X2ni7xF4B8Q+Ib3VvA50e+1XVrqcA+ff2y\/jx8Sv2Rv2qfBPxB8VfE\/4l6x+zz+0D8A\/jF8K\/BPwn0p\/CVto+j\/th+CPD0XxA+F+leF9Rfwq\/iA+KPjf4H0Dxx4W8I2Go+Ib\/AE7\/AIWPoGnW9nol5c+JorRP0x+AHhPx74F+C3w08JfFPx9q\/wAUfiZofhDRrT4hfEHXI9Lt7\/xZ41a0jn8Uautnoml6LpOn6fPrU16NH02x0y1g03SEsbEee1u1zNveOfhb4A+JaeFYfHng\/QPFkHgjxp4Y+IvhJNbsIrweHfHPgy+OpeFvFGlCRT9l1jQ70tcafdxlZIZHY5YE16AABwB+gH8sUALRRXJX\/jzwZpfirRPA2peKvD2n+MvE1jqup+G\/Ct7rWm2viLxDp+hCFtdvdE0Se5TUtUtNFS5tH1W6sraa309by0a7khFzCXAPif8A4KW3uoWH7Pvw+m0y8vbK4l\/bP\/YAspJLC5uLWeWz1D9tf4EWF9Zu9vJE8trfWdxNaXlszGG5tZpoJkkikZD7J8MJLc\/Hj9ppII5kMWpfCq2mZ\/N8hpv+EAguFa33RLHt+yzW6yeTLKPMQtIEc4b5c\/4KJfEfwn4pv\/2Yv2UvDeq2+ufHH4r\/ALWf7MPxD0jwNpN1Dda9pHws\/Z4+Ongb47fFj4oeIbCFpJtI8CeGvC\/w6u9Fl1\/UVtdOuvGHiHwt4XtbiXWdbsbOX6W+FEi\/8L\/\/AGpYvJjVl1v4Py+YiqJW834bWKETkHzcxbAsYmydu4KQFwOnDq6q3v8ADHb\/ABx1+X+Z9Fk0b5Xxe2n7nD+Hnp\/2U3D0Lvuve1+\/ofVqnIB9QP5UtNXhVHoAP0\/+tTq5j50+SP22PjZ4v+AvwI1Hxd8PLfw7P8SPFPj74M\/BT4c3Pi9b2TwhoPjv9oX4yeBPgb4U8W+LbTT7zTr\/AFPw14P134g6d4o1rRbDU9K1HXdN0m70ax1bSrjUE1G1+LviD8efF\/7Ly\/tgarbftQ\/Fj9rz4p\/s+\/sg+Nfjzefso+Mfhj8PPC99Nqem2t7rXgnxh4X8XfCz4PeA7qPwd4quNE1XwXHYpfeOYprq112Swvp\/EHg\/X7WT9OPjF8Hfh38fPh14r+EvxZ8K6X41+HvjTT4tO8Q+HNW+1LbXiW13BqVhdQXNhcWWo6Zqek6rZ2Or6NrGk31jrGj6vY2WqaTqFhf2lvcJ5\/8ABn9lX4PfAfWfFniTwHpXiu78T+OtN8LaD4r8WfEf4q\/Fb4z+L9W8N+CD4hfwl4bPiv4weM\/HHiG08PeHrnxX4mvdM0Kw1K10iG\/8Ra3qDWcmo6nfXt007NPs7\/cHqk12aun6rS68ro\/nR\/4I6f8ABVD46fG\/xP8AtEeDPHXgjwD+1K13afDr9pC68ffsT6V4rvvCXgrX\/jhp9w2s\/CHx3H8TtW08QeLvAsvhy0tVtNLuLp1MGrJHLrM+kajc2\/3B41\/Zc\/YU+LXiTVfHvxB\/4Iq2+u+Lde1Rtc1nxJqfwB+CltqviLVJYI4W1bWbrTdbgvdXu72IxLLJrMMl1LLGGvlEsBkX9nvAfwn+FvwsstV034ZfDfwH8O9O1zWb3xHrVh4G8I6B4TstX8QalJ5uoa5qdroNhYQX2r30v7y71K6SW8uHAaWZiAa7vyIQciKMEncSEAyeOeB14HNdscTh42csJ7SSVnOVaspPb+Wata2ltWm09ND7anxPkdSCnm3B2DzrHNRVfMMVnWeYatXjCMYUozp4HGYfDJ0qUIUYzhRjKcIRdROo5Tf5T\/AXW\/hv+yv4S17w3+zr\/wAEzPi98EPDOuauPFOs+E\/hj8PfhR4a0\/WdflsrLQ21W50\/RPG8VpJq39laTp1vPcyIri1s7dGkcofK9ll\/bH+JEAjA\/Yn\/AGqZ5JLwWwjg0fwHKWjLQK14WTxtJFFap54GZZI5D5U7+WqKjSfevlR8fIvHTKg\/zpPJi5\/dp82QRtGDnGeMd8DP0q\/rWC1vltNt2vL6zib7JXV5vXTq\/wBGtocS8IRTUvDjKp9r8RcUxSstrQzNabXvd2vZpu5\/Jh+1L8cf+CmXwa\/ap1H\/AIK1\/Er4feNvhb+w5+y\/470H9nPxF+yXd3Nh4n8d65+yD8S7PSdR+OX7YWq23hjxDrGi\/wDCS6D8Rl+HGpaJ4Y0qOTXIdC8D3Gn63qHh3Q9B8R6n4qx\/25P2xP2y\/wBrP9oXxr+0H\/wTQ8R23jX9lv8A4I8Jonxg8dT+GruTxB4T\/ba+M\/iTw\/Z3vxj+B3gnxLpN9daNr2lfDH9lzxF4zS8Fit7qVr468WNolnpDa1rngXxDpH9X\/jPwR4U+IPhHxR4D8Y+H9I8SeEPGugaz4V8WeHNZsob3R\/EPhvxFp1xpGvaLq1nKjR3mn6ppd5dWV7bSDZcQSvExAbcPmH9h39iD4N\/sBfs1eCf2WfgdYXkfw78EvrN4t\/4huINT8T+J9b8S6rda14g8QeLNTt7DTotW1e+vLtrSO4NrFHb6LaaZpEcK2mnxo\/BJxcm4x5Yt6Ru3Zdrtu\/8ATe+nxFepTq1qtSlRjh6c6tSdOhCVScKNOUm4UozqynVmqUWoKdSc6k1HmnJybZ+AX7aH7ZXx6\/4K23PwX\/Z4\/wCCQ\/xXHhw+B\/g54U\/4KFfGz4vCYSW2h+ItHSTxd+yf+yzrr2d5Pa2Pjbx78TdDg1nx54b1QPbaDpvhWw1u6i1\/QtK1zQ9W++v2a\/8Agub8APj54H\/Zy0bQPh58XvHX7Tnxa+FHjnx18Uv2efhB4LufGPi74Da18HdcsPA3xcsfiVZXV9p2oeF7C3+Is1\/oPgd9SthqXiyGCzljsbe51XTYbz7r\/Ym\/4J6\/s1fsAaP8Y9B\/Zz8IHw1p\/wAcfjH4s+NXjVbuS2u5F13xNdNJYeGNFaKytP7L8B+B9Oxovgjw0omi0eylvbiW4utS1LUL26X9nr\/gnx+zh+zN+0b+1f8AtR\/DPwoLD4q\/tgeKPD\/ij4malP8AZ5LWwl0XTQt\/p\/he3Fusmk2PizxZda78QvFq+fPLrfi\/Xp7u5c2mm6La6ek1zQcleCknON2nNJpuN18N1pdao0wdahQxNCtisJDHYenVhOtg6lath4YimmnKjKvh5QrUlNe7z05KUbtx1I7n9s\/VoLaGcfslftYzPJD5ptYPhtbPPHkuERwuviNWcoMgyYhV42mMauCaNv8Atv6zceUy\/sfftfRq8cUs3n\/CyztzaI7lHMwuPEMZleH78kFl9quSnzRwSV93mGFvvRRnHqin9CKURRjOI0GeuEUZ\/DFdyxGC\/wChdF66f7ViNvW\/TZabWu27t\/Yw4i4OUXGXh5hJS\/n\/ANZuIE\/uVblX3PTR9W\/hmf8AbX1eKOGaL9kb9re8jmiWYG2+FsCuiNJsxJFc69byxShcStBKqS7GACM3y18d\/tUftI3fxL+Ln\/BP\/wAHXnwE\/aD8AJ\/w3d8MtR\/4STxt4DfRvC8k0PwV+Od4lidTi1kLNcW7Sie4jKvDHFpupsVuPsrQv+1QjjXoijr2HVjuJ+pJJJr4S\/bU8H+JPFXjP9hK48PeGdb1+18J\/tv+CPFfim40fSrzUrfw54asvgr8fNNl8Ra89lDMNL0K01fWNIs5dUvDDZQX+o2EEs0UtxAwiVfCSp1IxwSpzkrQqLEVZundrVQl7smlde9deRy43O+Fq+Dr0MHwTQwOKqU+WjjVn+c4mWHm3F+0VCtU9jVaSaUZrld7tdD82\/8Agmh+3p8YdZ\/4b60H4qeC\/wBp39oFvh7\/AMFO\/wBsT4beBvF3h7wpJ440Hwd8NvB2veHLXwn8NNM1BL2C4trPwtbm7ks9JW3lWxh1a2hjnleZYl\/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alt=\"C:\\Users\\NISHANT KUMAR\\AppData\\Local\\Packages\\Microsoft.MicrosoftEdge_8wekyb3d8bbwe\\TempState\\Downloads\\media\\image114.jpeg\" width=\"169\" height=\"161\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">For loop ABDA,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">10I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0+ 5I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>3<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0\u2013 5I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">For loop BCDB,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">5(I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1\u00a0<\/sub><\/span><span style=\"font-family: Arial;\">&#8211; I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>3<\/sub><\/span><span style=\"font-family: Arial;\">) &#8211; 10(I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2\u00a0<\/sub><\/span><span style=\"font-family: Arial;\">+ I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>3<\/sub><\/span><span style=\"font-family: Arial;\">) \u2013 5I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>3\u00a0<\/sub><\/span><span style=\"font-family: Arial;\">= 0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">For loop ADCFGA,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: 'Cambria Math';\">5<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"240\" height=\"21\" \/><span style=\"font-family: 'Cambria Math';\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"103\" height=\"21\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: 'Cambria Math';\">or\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"141\" height=\"21\" \/><span style=\"font-family: 'Cambria Math';\">\u00a0\u2026(1)<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"150\" height=\"21\" \/><span style=\"font-family: 'Cambria Math';\">\u2026(2)<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"167\" height=\"21\" \/><span style=\"font-family: 'Cambria Math';\">\u00a0\u2026(3)<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Solving equations (1), (2) and (3), we get<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"223\" height=\"38\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Currents in different branches are<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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alt=\"\" width=\"253\" height=\"38\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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alt=\"\" width=\"145\" height=\"38\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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alt=\"\" width=\"235\" height=\"38\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Total Current,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"105\" height=\"29\" \/><span style=\"font-family: 'Cambria Math';\">\u00a0A.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.10. (i) In a metre bridge the balance point is found to be at 39.5 cm from the end A, when the resistor Y is of 12.5 \u03a9. Determine the resistance ofX. Why are the connections between resistors in a Wheatstone or metre bridge made of thick copper strips ? (ii) Determine the balance point of the bridge<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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alt=\"C:\\Users\\NISHANT KUMAR\\AppData\\Local\\Packages\\Microsoft.MicrosoftEdge_8wekyb3d8bbwe\\TempState\\Downloads\\media\\image115.jpeg\" width=\"199\" height=\"132\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">above if X and Y are interchanged, (iii) What happens if the galvanometer and cell are interchanged at the balance point of the bridge ? Would the galvanometer show any current ? [CBSE D 05]<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Here l = 35.9 cm, R = X = 7, S = Y = 12.5 \u03a9<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">As S =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"34\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0\u00d7 R\u00a0<\/span><span style=\"font-family: 'Cambria Math';\">\u2234<\/span><span style=\"font-family: Arial;\">\u00a012.5 =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"57\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0\u00d7 R<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">or R =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"62\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0= 8.16 \u03a9<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Connections are made by thick copper strips to minimize the resistances of connections which are not accounted for in the above formula.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) When X and Y are interchanged,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">R = Y = 12.5 \u03a9, S = X = 8.16 \u03a9, l =?<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">As\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"96\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0<\/span>\u2234 <img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"86\" height=\"29\" \/> <span style=\"font-family: Arial;\">\u00d7 12.5<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">or 8.16 l = 1250 &#8211; 12.5l<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">or l\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"119\" height=\"29\" \/><span style=\"font-family: Arial;\">, from the end\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAABAAAAAUCAYAAACEYr13AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADeSURBVDhP7Y69CYRAEEa3AQMTOzAUjUUwtQVbMDWwAVvQRDC0AVswNLAFGzA22jn2c2\/B2xtO7ie7B8N+M8w8VtAHSCnTv+AXgjiOUdM06QnPU4EQAjWOo57wWIJhGHBcFAXeV1gCdVRVlcnLsiBznATbtuGo73v0nudR0zTIHCdBWZbk+77uiNq2hXDfdz2xOQnUcp7nujtQM\/UzDiNY1xXLXHEYQRAEFEURzfNs1SWBWkqSBMNHLgs4XNclx3F0d+zWdY0MQRiGlGUZBhxq547KXdchmx+8yxcEMr0Bfyx19lJcRoYAAAAASUVORK5CYII=\" alt=\"\" width=\"16\" height=\"20\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(iii) When the galvanometer and cell are interchanged at the balance point, the conditions of the balanced bridge are still satisfied and so again the galvanometer will not show any current.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.11. A storage battery of emf 8.0 V and internal resistance 0.5 \u03a9 is being charged by a 120 V dc supply using a series resistor of 15.5 \u03a9. What is the terminal voltage of the battery during charging ? What is the purpose of having a series resistor in the charging circuit ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">When the storage battery of 8.0 volt is charged with a dc supply of 120 V, the net emf in the circuit will be<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: 'Cambria Math';\">\u03b5<\/span><span style=\"font-family: Arial;\">&#8216; = 120 &#8211; 8.0 = 112 V<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Current in the circuit during charging<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">I =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"105\" height=\"30\" \/><span style=\"font-family: Arial;\">\u00a0= 7 A<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">The terminal voltage of the battery during charging,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">V = \u03b5 + Ir = 8.0 + 7 \u00d7 0.5 = 11.5 V<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">The series resistor limits the current drawn from the external source. In its absence, the current will be dangerously high.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">3<\/span><strong><span style=\"font-family: Arial;\">.12. In a potentiometer arrangement, a cell of emf 1.25 V gives a balance point at 35.0 cm length of the wire. If the cell is replaced by another cell and the balance point shifts to 63.0 cm, what is the emf of the second cell ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Here \u03b5<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 1.25 V, l<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 35.0 cm, l<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 63.0 cm, \u03b5<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2\u00a0<\/sub><\/span><span style=\"font-family: Arial;\">= ?<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">As\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"44\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\">\u2234 <img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"214\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.13. The number density of free electrons in a copper conductor is 8.5 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>28<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> m<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-3<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">. How long does an electron take to drift from one end of a wire 3.0 m long to its other end ? The area of cross-section of the wire is 2.0 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>&#8211;<\/sup><\/span><\/strong> <strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>6<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> m<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>2<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> and it is carrying a current of 3.0 A.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Here n = 8.5 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>28<\/sup><\/span><span style=\"font-family: Arial;\">m<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-3<\/sup><\/span><span style=\"font-family: Arial;\">, l = 3 m,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">A = 2.0 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-6<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0m<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">, e = 1.6 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-19<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0C, I = 3.0 A<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Drift speed,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">v<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>d<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"22\" height=\"29\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"171\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0ms<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-1<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"93\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0ms<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0= 1.1 \u00d7 10\u00a0<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>4<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0ms<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-1<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Required time,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">t =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"88\" height=\"31\" \/><span style=\"font-family: Arial;\">\u00a0s = 2.73 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>4<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0s\u00a0<\/span><span style=\"font-family: 'Cambria Math';\">\u2243<\/span><span style=\"font-family: Arial;\">\u00a07.57 h.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.14. The earth&#8217;s surface has a negative surface charge density of 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-9<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> Cm<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-2<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">. The potential difference of 400 Kv between the top of the atmosphere and the surface results (due to the low conductivity of the lower atmosphere) in a current of only 1800 A over the entire globe. If there were no mechanism of sustaining atmospheric electric field, how much time (roughly) would be required to neutralize the earth&#8217;s surface? (Radius of the earth = 6.37 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>6<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> m).<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Surface charge density,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">\u03c3 = 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-9<\/sup><\/span><span style=\"font-family: Arial;\">Cm<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-2<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Radius of the earth,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">R = 6.37 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>6<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0m<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Current, I = 1800 A<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Total charge of the globe,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">q = surface area \u00d7 \u03c3 = 4\u03c0 R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">\u03c3<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 4 \u00d7 3.14 \u00d7 (6.37 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>6<\/sup><\/span><span style=\"font-family: Arial;\">)<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-9<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 509.65 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>3<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0C<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Required time,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">t =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAcAAAAaCAYAAAB7GkaWAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADESURBVChTxZCxDYMwEEU9gBmBEbwKEpswAg0NtVehoKF2Q4EQFaJgAQokGhD6yR1OYmKUJpHypLN096wvnwU+8KVclgV5niNJEqRpiiiKXlIphbqueVBVFYQ4AvkMgoAbYhiGs5RSckN4MgxDlGXJgyzLznKeZ2itURQFmqY5Sxcv1iWOY5Zt2\/py2zaufd996XJPEBxzWfbSJT+QtDx9AtWDp5ymiR9hjLGTt1iSfd\/b7s9yXVeWXdfZiSPHceRdqQ6AG80Wc4V1vEP0AAAAAElFTkSuQmCC\" alt=\"\" width=\"7\" height=\"26\" \/><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAEkAAAAeCAYAAABg+DOTAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAXUSURBVGhD7ZlZSBV\/FMdNS1LsoZLQCM2HIEgqS0VyTcUI00xByaWiXEgRWgW3ojRwiZ5CUSkqKnowLCHBNVwQzB4sssxcEJfSFkxzq\/T8\/Z47v3Hu\/XuvPjT6cj\/w857fb2Z+M\/Od8zsz52hCRgwyNzcXbBRpCYwiLQO9Ig0NDUnWyvHjxw\/JWh3+\/v1L586do6CgIPL09KT6+noel0Vqamqi3bt3y83JyYl3AOPj45SWlkY3btyghIQE+v37N4\/Pzs5SSUkJXb9+ndLT0+n27duYkLfpMjY2RgUFBZSbm0vfvn3jse7ubq1z2tvb8\/i\/AtdSXFxMN2\/elEY0TE5OUmZmJmVnZ1N8fDz3wZ8\/fygnJ4ftsrIyFgzIIlVWVlJhYSF9\/vyZ28jICO8AINinT5\/YvnbtGoWFhbF9584dOnXqFNvg4MGDVFtbK\/UW6OvrI29v7\/95yocPH+jy5cvyOb98+SJtWZxfv35J1gL9\/f2Spc2rV6\/o6tWrfF6cQ8mxY8eopqaGbTw4d3d3tgEe5tmzZ+nw4cPsHEBLpCdPnvCgkomJCTIzM5PVRn\/Tpk1swyVxEgE87fjx41JPA7zOwcGBhoeHpZEFIFJWVpbUM8zAwABt27ZNKww8fvyYnJ2d2aN1gVcAzK8UaWpqiszNzen79+\/cx34mJtoRBx4ILSIjI0VfI1JDQwMriI0BAQGyYD09PTyJuBBMamFhwTaWXnJyMtvg0qVL5OXlJfU09Pb20tatWykjI4NKS0vJxcWF6urqeBvmPnr0KD19+pS9E15qCNwYrmVwcJC9PiIigmZmZqSti6MrEkTGHIg\/grVr1\/Iv5oLn4RfL9Pz58zwui6QEF4EDETuESGJSpUjwDixFiAqB4caIXUqePXtGe\/bs4acDmpubydLSkm0l8Lg1a9bw+QwxPT3N+\/n6+spzGkKfSJhHIEQCX79+5dACDYRjLCoSwERtbW0cR2BjmQGobG1tzbZATIa13d7ezrYAIu3bt0\/qaR4A5oPb64JxBExD+Pn5UWpqKu3du5devnwpjepHVyTEHJxHGXPRN4QsEuKOuHAoiXUr2LVrF717945tvMHy8\/PZFuCJPnz4kAOlIDg4mH+xRGxtbeUY8fz5c37FAldXV+rq6mIbD8HU1JTtxcCDOHToEFVUVMh9HH\/37l3u6wPXdOHCBamnwd\/fn68DIK6lpKSwrQ9ZJMQLR0dHOn36NB05ckTrTQTXhJfExcXRxYsXpVEN+HQ4cOAAtbS0SCMadu7cKVlEb9++pf3793NQP3HihCxYY2MjB17Mi+3wMn20trZSdXW11NOAEID5xCeJLni979ixg1tSUhL9\/PmTx7EacI8nT57kfZZatnqXm5EFjCItA6NIy8Ao0jJgkfAJbmz62\/xbNdgEbx9j09\/evHljXG5LYYxJy2DFRMIHpEhtlOCjFfnU6OioNKJh\/sI4d0R+qExGAfo4RmTyaqO6SEgf8KW8efNmzqyVBAYGUl5eHn38+JGrAOHh4TwOgaKioujevXtcjUASLRJSCIQEeT5OUGJi4pIpxb9AdZFQBsFTR\/qgFAk5GxJLCAKQN65fv57t169fc8lC4ObmRuXl5WyjNFNUVMQ2vA9ziEqnWqgukiA2NlZLJBTxNmzYwBVJgNwPeRy4desWRUdHsw3OnDnDeRZAmeT9+\/dsAxsbG3rx4oXUU4dVEwmgcoDEGQU01HTgQQAVTlFfBqiho34EdMsaSIzv378v9dRh1UTq7OxkYURQRn3bysqKbYgUExPDNoBIqIICiNTR0cE2gEhVVVVSTx1WTSQsEWWFEoFZeAnimI+PD9sAXiTqP3Z2dvwfGoASCY5BNVFNVkwkDw8PunLlitTTfBJs2bJFji8PHjyg0NBQthHEt2\/fzssPFcR169bJbzd8EmzcuJHtR48eUUhICNtqorpIuDncrLIpi2S4aYwtBurd+C+JLvMXzceI\/+CoDYs0\/6ff2Ay1uYD\/AGN0GuMzgOUGAAAAAElFTkSuQmCC\" alt=\"\" width=\"73\" height=\"30\" \/><span style=\"font-family: Arial; font-size: 8pt;\"><sup>\u00a0<\/sup><\/span><span style=\"font-family: Arial;\">= 283.13 s\u00a0<\/span><span style=\"font-family: 'Cambria Math';\">\u2243\u00a0<\/span><span style=\"font-family: Arial;\">283 s.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.15. (a) Six lead-acid type of secondary cells each of emf 2.0 V and internal resistance 0.015 \u03a9 are joined in series to provide a supply to a resistance of 8.5 \u03a9. What are the current drawn from the supply and its terminal voltage?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(b) A secondary cell after long use has an emf of 1.9 V and a large internal resistance of 380 \u03a9. What maximum current can be drawn from the cell ? Could the cell drive the starting motor of a car?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">(a) Here\u00a0<\/span><span style=\"font-family: 'Cambria Math';\">\u03b5<\/span><span style=\"font-family: Arial;\">\u00a0= 2 V, r = 0.015 \u03a9, R = 8.5 \u03a9, n = 6<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">When the cells are joined in series, the current is<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">I =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAPMAAAAdCAYAAAB\/uFrNAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAA1XSURBVHhe7Zx1kFVVHMdhBhjiD2LIoZEGgRk6BKRbEFA6h+4OCUGQLgWkpFHp7u5SOhWkGwUEVPI4n9\/e8zjv7X2PffoWd9\/e78yZvbX33vO7v\/79zoumHDhwEOkRDVjbDhw4iMRwhDkc8Pr1a3Xnzh117tw59eLFC+vo28H\/\/f777+r06dPqxx9\/VLdu3bLOBC9evXqlLl++bO2FAJrduHFDHT16VB0\/flw9fvzYOuPAFxxhDjAePnyovvrqKzVjxgy1Z88e9fz5c+vM23Hw4EHVsGFDtWbNGjV\/\/nxVqFAhtX\/\/futscAHFdezYMdW9e3dVoEABEWqNYcOGqc8\/\/1xt3LhRffbZZ+rjjz8WJefANxxhDiD++usv1axZM7V8+XJhVhNYFxj0yZMn1hElgj579mx18uRJ2X\/06JG6fv26bIOaNWuq\/v37W3vBhd9++02tX79erVq1SuXMmdNNmK9cueKi08WLF1XKlCnVmTNnZN+Bd\/gtzGjT4sWLq\/Hjx6vvv\/9e1a5dW\/3www\/WWaUWL16sevfuLYzbtGlTdfXqVetM8GPFihWqVq1aat++fWrq1Klq9+7d6uXLl3IO13HatGmqYsWK6sGDB7I\/ePBg1bNnTzcB13j69KkwOfcKZpw4cULlypXLTZhNbNmyRRUrVsyxzGGA38IM0cuVK6cmT54s2zt27BA36e+\/\/5aRPXt2derUKbFMa9euVdeuXbP+M7gBLVBelSpVkpgXiwKdcLc1oMmSJUtEoLl2xIgRtjE192rVqpWaNGlSKAsfbPAlzPAONCR2dvB2\/CthhhnXrVsn+1hqPsYff\/wh+ytXrlQNGjRQX375ZZTSpljgTz75RH3zzTfWEaW+\/fZbVaFCBZd1BriXZcqUUVmzZlXnz5+3jr7Bs2fPxLOZOXNm0Asy8CbMJMXq1KkjivHfgvwFPEj4EwyAj5gPw84IBFSYYVSYd9euXVGCEU0w306dOqlevXpZR5Qkwho1auSiBRnaUqVKSUxNDFi1alW1c+dO13loO3z4cFECbBNTc20ww06Y7927p5o0aSIeHjhy5Ij65ZdfZNsfpEiRAgZXgwYNso54B2HNpUuXrL3\/D2fPnhWvzg54KMyHcejQIevoGyDLfgkz8V7+\/PnVkCFDhNmIm9OnTy\/MiTDDrDAjpZVNmzZJeSaq4Oeff1bVq1eXbDRzhyFhRIA2\/eijj9TWrVtlH0AbMrXa+nAuTZo0cg9yEeXLl1etW7eWc8EIEn+jR49WCRIkUNu2bZPkH0JNhjtHjhxCAwbb27dvt\/4rbOB+sWPHVjVq1FB58uSxjoYGzzt8+LC481QSTKXyrgE\/pEuXTrVr18464o4BAwaoLFmyCD369OljHX0Dv4X5\/v37avPmzWJRiJEhBPsXLlyQ83fv3hVCcgwB96c0EwyAPuQRoA+00MAtsqsbc42uo+JaQjdzBLMypHRnzhUewpXUPGUOjIg\/oAqQOnVqMSyxYsUKVcsG3JO8RZs2bVSyZMlUvXr1\/jdhJglKWJE8eXJbYcZzIPFMCEu+pWjRoqESp34LswMHkQEZM2ZU7du3l+0YMWKoUaNGybYJlOuBAwdEgWCZ\/RFmBOnPP\/+09v4bCLPGjBmjvvjiCwlh7YQZrw9RJamM18e2Zz4hUggzxMaFJ5byNQJFXAdvgEdhR2vPQeIuooAwJ2bMmK7adMeOHSUU9IWwCjOeJjE4lhGXuEOHDm7xPKXEZcuWWXthAwqFkiY8XqVKFVthJh9DpQgLDZ+TZ2jbtq11NgSRQpjRoEwyb968PseiRYus\/3AQKJCMwb2zo7c5SHpGFFAqrV+\/vkswyWpHjx5dXG5vCKswz5s3Tyo13BPXvW\/fvipJkiSS+6BhqHLlyn4l68illC1bVkIOYCfMN2\/elFBh7ty51hEluSqO0WCjIcKs090RYYQXKE\/YPc8ZIYP8R3gA4bB7XqAGQmUCa4xwvf\/++1JZYJBQw2aRTPOGsAoz5z0rNbzDhg0bRKH5UwbjXjQN8X5Ug8idUA1q2bKl5A0o8wIUCO9PAlXPCeXBMUqYGshytAwZMqiIMDJnzmy9ljtgNLLje\/fu9Tl8LUygTGT3TGeEDG9eDW4dbqAdvc2BYNkBF9zueYEaJUqUsJ4UAhg\/Xrx4oa7DJSa5pPshPBFWYaZ8ZTd\/c1CuNXsLvIFkKaXLxo0bS9WCgSKi848sPGVJ3oekF8c955Q0aVJJmulniTDLVgQGkyaZUbduXZ+DxICDwIIuLNxHO3qb46effrL+4\/9F4cKFpXnHEygbWH3OnDnWEXeEVZgXLFhgO39zYDm95W+4PwrSrukDeLrZZNx5b3r4PcG7cE5XTZBlJ5vtIChAU0X8+PGlR94TJK5o0qF27wkEq0iRIrKwJSwW9b+AtQrE9HbvCOjTMBNbtE0nTpxY4mZP4IlSUpswYYLsO8LsA2jRf9N5FFlg104aUYCAeeuE8gZ62en6sqspA0Itzuv1AoRvLDXF68MNp8W2X79+klwKL\/z666+yCgyr6gmahshYly5dWq6D\/6pVqybtv95AKYukG\/QSYb59+7a4GRxkLSmaAVeBeCeYQAsqCQeykV26dJFFEJ5u1ciRI10xCeUMkg7+ggQJJQqYB7fO3+QSiRTKHwMHDpTvYNd4gxXiGlandevWzS0RhItHYoT\/NUE21Iy5sBDvAli77777TjK\/dA5SZlm6dKlbIontrl27ut4N4dIWivlDS1aZMWcSRnY0xXr5yptoBaGbLXgmIRz8bw6OhRegBc+wc8NxqfU7cJ73431ZGusN5AC4hmtFmDlILY6VOoDJoh3ojvEF\/Hhz+WNEBjW8RIkSyS+AACwuGU\/d\/6vBIofVq1e7sqXefuWC4r0dfVAOLA+lAYD\/NRmWc3YrgCgv8H4AhqQUxF8+PK7h9OnT5ZwG74VG5t25J9lP3X+MVdIK2VMRTZw4UZZm6rn5YpJAgl8LyZYtmzwTevCDC9AeptXgeIsWLSSBpN+P2BIwf1otEWDmy9yYowN3uIS5c+fOLmGGsCQRaPr3BQiq\/XU7wGy01ZGJppCPRaSTBbDoAC1N6ye\/sIHW5gOGFxCWhAkTipAwP7QZcZKnG40wU2bgXTyF0QQWlzZAT5D5ZRmkZkhTA6N5idlY1wxTcm+8BcoRet031pMkiG7CoDOIMoQJ3DH647WFweqR1TUbN2hcsBNmLDbvgSB7m1uggTDTU4zF45mUXVijbHp+HEcpsYDAFGRAzRjlqEHmndjSgTvchJlMHMwNc3z66aduBWkNGFy7AjR7I5B63\/wAGrjvWH2Yh\/jkww8\/dCUZcJdIwY8dO1ZcfPNXNgINmAUNjwDzzgiMXdwyZcoUSTrg1tGVg3BppqeGqOfKeUoKeh93h+soLyBE0HDo0KEyf73YAmBdqHeywIAyCosxTKZG4PgO+pkLFy5U+fLlk20NShYlS5YUhQBYwE+sZSoOO2HmGAqaZZo8Y9y4ca7nhCdwk3GR8Sb4C03otzbBe2AcCH2gDQoM7wfwvaA1tONehB8FCxaUcw7ewE2Y6USBwT744ANxoe0+NMxNQM5Imzat1Ib1vi5ym0BIcVsBvaQwnXbviOkQ6HfBUMSUrJ6h0wYhgLGxbr5+PAGXmNqkFja8CD1XVq6kSpXKtU\/yBUYjYYFAasB4lHbMOaL0oHGmTJlCKTD+18yqkozxrKUizFg2bYkpydGFZTYs2AmzCTyjOHHiyN\/wBgaCkhEWmrgVWmFZ8RC8AV7KnTu38ArKEl4hOYVVRhE1b97cutKBhpswazebH1JDSHVvqwm0IwRmwKjEjXrfrj\/3bcKM6\/0ugPuG8GkgoMRtrHAygRXVFg+XnLKAXueKsOq5YsFhKL2PICGAWN2vv\/5argcIJ16Ovif3IPnGwDLS22taZnIQWF3t5WDdzVIFYEUWikknanCd8SK0AgB2wszaYf2NeI+4cePafuNAg19XwSPSIFPLiiYzWw19TA+G0AvX3Fx5BlCKhCXmUlIHIRBhhkAwDK4M4EOTjEAD2mXdNN4WMwNiRO3O0ljAB9LJnh49eoTKuIYXYPz33ntP1sXC9LimeCJkP4nridkBGWxifK5BYHH3TCHR8BYzw7isR2aODGjIMUCMiwJAQBEq7ku\/MM0Kmml5H1xIfj8MJYHVh25sExqgaIkpoSv3JeyhC0j\/WATge5LowqLzLTUQKHIXPBdhx7pjKcMbKHG6mqArz4MfoCuhCXEyIQtGAi+IZZBsk6UnPNNKEEBPVj+R7HsX3lxkgwgzbgzlDYZOCJEVRdhw6eyYGVBegDm8gXtQhoD4MB2MS3cLgoRwYdkpR9jF5uEBLCyWEiWENdMuJts6Y4ywE7MRWzI\/b64g1yEwnoBZccfxWEhemT\/qBw2IA016sk38aLq7MDRWm0HmF8bFUpOjIHkEcM+ZC8\/QCgrwfN6db4eCxvPRS+WwdmTamT8xvc7shzd4f5KhKH7eB2HWXgW01mUqeInSIALLNvTS4P9nzZoloY83fozqEGG2tv0GWtPUnFEJMF9UnbuDiAkRZgcOHAQDokX7BwFTX2A86+\/NAAAAAElFTkSuQmCC\" alt=\"\" width=\"243\" height=\"29\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Terminal voltage,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">V = IR = 1.4 \u00d7 8.5 = 11.9 V.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(b) Here\u00a0<\/span><span style=\"font-family: 'Cambria Math';\">\u03b5<\/span><span style=\"font-family: Arial;\">\u00a0= 1.9 V, r = 380\u03a9<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>max<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAYAAAAaCAYAAACU2C2oAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADQSURBVChTvdExCoNAEAXQxQPY2HsJryJY2ApWdoKtp\/AGnsIbCHoGERVsREUUFP1hZkMS0KQIIR8Ghnlb7M4KvMmXkOc5fN9HEATwPA9930sQQmCeZ2oRxzHatpWQJAksy0IURZimiQ8wGIaBNE0xDAP2fX+CoigoioIHZVmiaRoJ67ryBbIsw7IsOI5DwlV+CfS4y7ofOOVvQKuo6xrjOHK\/bZsE13XhOA5s24amaei6TkIYhjBNk1r+PVr9A6he8xlUVYWu66iqiocUhnOAG5ToK3nGTjInAAAAAElFTkSuQmCC\" alt=\"\" width=\"6\" height=\"26\" \/><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"22\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0A = 0.005 A<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">This secondary cell cannot drive the starting motor of a car because that requires a large current of about 100 A for a few seconds.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.16. Two wires of equal length, one of aluminum and the other of copper have the same resistance. Which of the two wires is lighter? Hence explain why aluminium wires are preferred for overhead power cables.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Given :\u00a0<\/span><span style=\"font-family: 'Cambria Math';\">\u03c1<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>Al<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 2.63 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-8<\/sup><\/span><span style=\"font-family: Arial;\">\u03a9m,\u00a0<\/span><span style=\"font-family: 'Cambria Math';\">\u03c1<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>Cu<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 1.72 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>-8<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u03a9m, relative density of Al = 2.7 and that of Cu = 8.9.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Mass = volume \u00d7 density = Al d<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"11\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0.ld =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"26\" height=\"30\" \/><span style=\"font-family: Arial;\">\u00a0[<\/span>\u2235 <span style=\"font-family: Arial;\">R =\u00a0<\/span><span style=\"font-family: 'Cambria Math';\">\u03c1<\/span><span style=\"font-family: Arial;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAgAAAAdCAYAAACXFC2jAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAD1SURBVDhP3ZKhioVAGIWni81n8AH0PWxGm9lqEa0Gi8UkNsWX0GyyGOxiMIjCNQnq2Z1xlquwe3fDsmE\/OGEO3\/D\/DEPwDT8X9n3HMAwYx5E3JzfB8zwoisKbk9uIuq7\/gWCaJkRRvL3FTfiMvxAMw8CrkLIs8Sq\/vCT9E+u68tPJTYjjGIQQbNvGm4twHAc0TYOqqmjblrcXoWka+L4P27bhOA5vL4JlWZimCX3fszF0HwoTlmWBLMsoioJFkiTM8\/wU8jxHmqbouo5F13W4rvsUBEFgS35QVRUbQyFRFCEIAmRZxgpKGIasS5IE5P3m4+scjzcaKDzIE\/8u\/QAAAABJRU5ErkJggg==\" alt=\"\" width=\"8\" height=\"29\" \/><span style=\"font-family: Arial;\">]<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">As the two wires are of equal length and have the same resistance, their mass ratio will be<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"355\" height=\"43\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">i.e., copper wire is 2.2 times heavier than aluminium wire. Since aluminum is lighter, it is preferred for long suspension of cables otherwise heavy cable may sag down due to its own weight.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.17. What conclusion can you draw from the following observations on a resistor made of alloy manganin:<\/span><\/strong><\/p>\n<table style=\"width: 100%; border: 0.75pt solid #000000; border-collapse: collapse;\" cellspacing=\"0\" cellpadding=\"0\">\n<tbody>\n<tr style=\"height: 1pt;\">\n<td style=\"width: 25.2%; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><strong><span style=\"font-family: Arial; font-size: 12pt;\">Current<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><strong><span style=\"font-family: Arial; font-size: 12pt;\">I(A)<\/span><\/strong><\/p>\n<\/td>\n<td style=\"width: 24.78%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><strong><span style=\"font-family: Arial; font-size: 12pt;\">Voltage<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><strong><span style=\"font-family: Arial; font-size: 12pt;\">V<\/span><\/strong><\/p>\n<\/td>\n<td style=\"width: 24.84%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><strong><span style=\"font-family: Arial; font-size: 12pt;\">Current<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><strong><span style=\"font-family: Arial; font-size: 12pt;\">I(A)<\/span><\/strong><\/p>\n<\/td>\n<td style=\"width: 25.18%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.12pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><strong><span style=\"font-family: Arial; font-size: 12pt;\">Voltage<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><strong><span style=\"font-family: Arial; font-size: 12pt;\">V<\/span><\/strong><\/p>\n<\/td>\n<\/tr>\n<tr style=\"height: 1pt;\">\n<td style=\"width: 25.2%; border-top-style: solid; border-top-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">0.2<\/span><\/p>\n<\/td>\n<td style=\"width: 24.78%; border-top-style: solid; border-top-width: 0.75pt; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">3.94<\/span><\/p>\n<\/td>\n<td style=\"width: 24.84%; border-top-style: solid; border-top-width: 0.75pt; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">3.0<\/span><\/p>\n<\/td>\n<td style=\"width: 25.18%; border-top-style: solid; border-top-width: 0.75pt; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.12pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">59.2<\/span><\/p>\n<\/td>\n<\/tr>\n<tr style=\"height: 1pt;\">\n<td style=\"width: 25.2%; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">0.4<\/span><\/p>\n<\/td>\n<td style=\"width: 24.78%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">7.87<\/span><\/p>\n<\/td>\n<td style=\"width: 24.84%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">4.0<\/span><\/p>\n<\/td>\n<td style=\"width: 25.18%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.12pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">78.8<\/span><\/p>\n<\/td>\n<\/tr>\n<tr style=\"height: 1pt;\">\n<td style=\"width: 25.2%; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">0.6<\/span><\/p>\n<\/td>\n<td style=\"width: 24.78%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">11.8<\/span><\/p>\n<\/td>\n<td style=\"width: 24.84%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">5.0<\/span><\/p>\n<\/td>\n<td style=\"width: 25.18%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.12pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">98.6<\/span><\/p>\n<\/td>\n<\/tr>\n<tr style=\"height: 1pt;\">\n<td style=\"width: 25.2%; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">0.8<\/span><\/p>\n<\/td>\n<td style=\"width: 24.78%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">15.7<\/span><\/p>\n<\/td>\n<td style=\"width: 24.84%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">6.0<\/span><\/p>\n<\/td>\n<td style=\"width: 25.18%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.12pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">118.5<\/span><\/p>\n<\/td>\n<\/tr>\n<tr style=\"height: 1pt;\">\n<td style=\"width: 25.2%; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">1.0<\/span><\/p>\n<\/td>\n<td style=\"width: 24.78%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">19.7<\/span><\/p>\n<\/td>\n<td style=\"width: 24.84%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">7.0<\/span><\/p>\n<\/td>\n<td style=\"width: 25.18%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.12pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">138.5<\/span><\/p>\n<\/td>\n<\/tr>\n<tr style=\"height: 1pt;\">\n<td style=\"width: 25.2%; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">2.0<\/span><\/p>\n<\/td>\n<td style=\"width: 24.78%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">39.4<\/span><\/p>\n<\/td>\n<td style=\"width: 24.84%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.5pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">8.0<\/span><\/p>\n<\/td>\n<td style=\"width: 25.18%; border-left-style: solid; border-left-width: 0.75pt; padding-right: 0.12pt; padding-left: 0.12pt; vertical-align: top;\">\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 12pt;\">158.0<\/span><\/p>\n<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">We plot a graph between current I (along y-axis) and voltage V (along x-axis) as shown in Fig.\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/jpeg;base64,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alt=\"C:\\Users\\NISHANT KUMAR\\AppData\\Local\\Packages\\Microsoft.MicrosoftEdge_8wekyb3d8bbwe\\TempState\\Downloads\\media\\image116.jpeg\" width=\"252\" height=\"183\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Since the V-I graph is almost a straight line, therefore, manganin resistor is an ohmic resistor for given ranges of voltage and current. As the current increases from 0 to 8 A, the temperature increases but the resistance of manganin does not change. This indicates that the temperature coefficient of resistivity of manganin alloy is negligibly small.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.18. Answer the following questions:<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(a) A steady current flows in a metallic conductor of non-uniform cross-section. Say which of these quantities is constant along the conductor: current, current density, electric field, drift speed? [CBSE D 15C, 17]<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(b) Is Ohm&#8217;s law universally applicable for all conducting elements ? If not, give examples of elements which do not obey Ohm&#8217;s law.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(c) A low voltage supply from which one needs high current must have very low internal resistance. Wiry ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(d) Why a high tension (H.T.) supply of say 6 kV must have a very large internal resistance ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">(a) Only current is constant because it is given to be steady. Other quantities : current density, electric field and drift speed vary inversely with area of cross-section.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(b) No, Ohm&#8217;s law is not universally applicable for all conducting elements. Examples of non-ohmic elements are vacuum diode, semiconductor diode, thyristor, gas discharge tube, electrolytic solution, etc.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(c) The maximum current that can be drawn from a voltage supply is given by<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>max<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAYAAAAaCAYAAACU2C2oAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADQSURBVChTvdExCoNAEAXQxQPY2HsJryJY2ApWdoKtp\/AGnsIbCHoGERVsREUUFP1hZkMS0KQIIR8Ghnlb7M4KvMmXkOc5fN9HEATwPA9930sQQmCeZ2oRxzHatpWQJAksy0IURZimiQ8wGIaBNE0xDAP2fX+CoigoioIHZVmiaRoJ67ryBbIsw7IsOI5DwlV+CfS4y7ofOOVvQKuo6xrjOHK\/bZsE13XhOA5s24amaei6TkIYhjBNk1r+PVr9A6he8xlUVYWu66iqiocUhnOAG5ToK3nGTjInAAAAAElFTkSuQmCC\" alt=\"\" width=\"6\" height=\"26\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Clearly, I<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>max<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0will be large if r is small.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(d) If the internal resistance is not very large, then the current will exceed the safety limits in case the circuit is short-circuited accidentally.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.19. Choose the correct alternative :<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(a) Alloys of metals usually have (greater\/ lesser) resistivity than that of their constituent metals.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(b) Alloys usually have much (lower\/higher) temperature coefficients of resistance than pure metals.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(c) The resistivity of the alloy manganin is nearly independent of\/increases rapidly with increase of temperature.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(d) The resistivity of a typical insulator (e.g., amber) is greater than that of a metal by a factor of the order of (10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>22<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">\/10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 8pt;\"><sup>3<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">).<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">(a) greater (b) lower (c) is nearly independent of (d) 10<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>22<\/sup><\/span><span style=\"font-family: Arial;\">.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">3.20. (a) Given n resistors each of resistance R, how will you combine them to get the (i) maximum, (ii) minimum effective resistance ? What is the ratio of the maximum to minimum resistance ?<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(b) Given the resistance of 1\u03a9, 2\u03a9, 3\u03a9, how will you combine them to get an equivalent resistance of:<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(i)\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"15\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0\u03a9 (ii)\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"15\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0\u03a9 (iii) 6 \u03a9 (iv)\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"15\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0\u03a9?<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">[CBSE F 15]<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(c) Determine the equivalent resistance of the following networks :<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"C:\\Users\\NISHANT KUMAR\\AppData\\Local\\Packages\\Microsoft.MicrosoftEdge_8wekyb3d8bbwe\\TempState\\Downloads\\media\\image118.jpeg\" width=\"59\" height=\"136\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">(a) For maximum effective resistance, all the n resistors must be connected in series.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\">\u2234<span style=\"font-family: Arial;\">\u00a0Maximum effective resistance,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>s<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= nR<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">For minimum effective resistance, all the n resistors must be connected in parallel. It is given by<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"15\" height=\"32\" \/><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAgAAAAdCAYAAACXFC2jAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADvSURBVDhPzZK\/zkRAFMWnFAWJeAhUCq8hJNp9Cp5Ao6EUHkCi9wRaCaXoVUqVqDi77q7dyP5rvmy+k9zkzJnf3JnJDMMX\/SGwLAvKsoRpmrfkKgLmeYbneXBdF4Zh0MSuwxZ1Xf9vQBRFcBwHxhgEQUDbtpQfOrzSL4AkSfCpmO\/7+FS\/ukWaptA0DX3foygKSJKEcRwfQNd10HWdgk2WZcG2bfIvgc1nWUb+DiiKQg8UxzGtXtf1COwdHMehv7nrCZimCTzPYxgGGhNQVRVUVaVgUxAEkGWZPAFhGFI1TUPhpiiKkOc52OUwp\/e1ns4qGiglaZGSCgAAAABJRU5ErkJggg==\" alt=\"\" width=\"8\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0+\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAgAAAAdCAYAAACXFC2jAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADvSURBVDhPzZK\/zkRAFMWnFAWJeAhUCq8hJNp9Cp5Ao6EUHkCi9wRaCaXoVUqVqDi77q7dyP5rvmy+k9zkzJnf3JnJDMMX\/SGwLAvKsoRpmrfkKgLmeYbneXBdF4Zh0MSuwxZ1Xf9vQBRFcBwHxhgEQUDbtpQfOrzSL4AkSfCpmO\/7+FS\/ukWaptA0DX3foygKSJKEcRwfQNd10HWdgk2WZcG2bfIvgc1nWUb+DiiKQg8UxzGtXtf1COwdHMehv7nrCZimCTzPYxgGGhNQVRVUVaVgUxAEkGWZPAFhGFI1TUPhpiiKkOc52OUwp\/e1ns4qGiglaZGSCgAAAABJRU5ErkJggg==\" alt=\"\" width=\"8\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0+\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAgAAAAdCAYAAACXFC2jAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADvSURBVDhPzZK\/zkRAFMWnFAWJeAhUCq8hJNp9Cp5Ao6EUHkCi9wRaCaXoVUqVqDi77q7dyP5rvmy+k9zkzJnf3JnJDMMX\/SGwLAvKsoRpmrfkKgLmeYbneXBdF4Zh0MSuwxZ1Xf9vQBRFcBwHxhgEQUDbtpQfOrzSL4AkSfCpmO\/7+FS\/ukWaptA0DX3foygKSJKEcRwfQNd10HWdgk2WZcG2bfIvgc1nWUb+DiiKQg8UxzGtXtf1COwdHMehv7nrCZimCTzPYxgGGhNQVRVUVaVgUxAEkGWZPAFhGFI1TUPhpiiKkOc52OUwp\/e1ns4qGiglaZGSCgAAAABJRU5ErkJggg==\" alt=\"\" width=\"8\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0+ \u2026.. n terms =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"8\" height=\"26\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\">\u2234<span style=\"font-family: Arial;\">\u00a0Minimum effective resistance,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>p<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAgAAAAdCAYAAACXFC2jAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAE0SURBVDhPzZK9ioNAFIXT5KdLIwTsLVIkiI29kMYqCmIdsMwjpLZJY691Ct8jnZDOJk3EUlAEDSQRz+69y7qEzWZTLXvgDGfufKMzzO3hF70G1HXd+Xw+88KnGFgul5hMJnBdF7ZtY7FYoKqqLyCOY8iyzAWSpmlYr9ecHwKGYfDXSB0wnU5xOp0QhiF0XUfTNPeAJEmIogiqqsL3fV4kfftFlmUYDAa4XC48f3gGOuB4PObMgGma7N1ux0WSZVlwHOcDeKa\/ADabDZ65FwQBnvlf3IIGepjr9cqF2+2Gtm05kxjYbrcQBIF7YbVaod\/v3\/dDnucYjUa8mzSfz\/mFSR0giiIXSIqiYL\/fc34NSNMUw+EQRVFwkdrP8zzODByPRxwOByRJgrIsOZMZeL\/S7Ge3szfEaB4Q96PBLgAAAABJRU5ErkJggg==\" alt=\"\" width=\"8\" height=\"29\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ratio of the maximum to minimum resistance is<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"159\" height=\"45\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(b) Here R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 1\u03a9, R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 2 \u03a9, R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>3<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 3 \u03a9<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(i) When parallel combination of 1\u03a9 and 2 \u03a9 resistors is connected in series with 3\u03a9 resistor [Fig. 3.318<\/span><span style=\"font-family: Arial; font-variant: small-caps;\">(<\/span><span style=\"font-family: Arial;\">a<\/span><span style=\"font-family: Arial; font-variant: small-caps;\">)],<\/span><span style=\"font-family: Arial;\">\u00a0the equivalent resistance is<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">R =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"148\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAB0AAAAdCAYAAABWk2cPAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAJSSURBVEhL7Za7aypBFMatLCyirYo2YiWmitgoAf0TrEWsfAQhiCIByxTBTmtBLWxMEUkjSJogKFiJCWihhSCKInmgJD6i32Um4+reaHBzb7xF7g8OzDmznG\/37MycEeEf8ANFn56ecH5+jlgsxiJ\/xmQyQSgUgsvlgtVqhcPhwHA4pHNUtFAoIBgMQq\/Xfyqay+XYaMXDwwO63S7zVry8vODy8pJ5gNlsxsXFBR3zyuv1ej8V9Xg8CAQCzANarRZ0Oh3u7+9ZZDvHx8dIp9N0LEiUcHZ2RktVq9VgNBrRbrfZzHaurq7ol87nc+oLFiVEo1FIpVL0+30W2c7d3R0sFgum0ymLfEG0VCpBq9Uim83CZDLxkv1Oo9GAwWDAbDZjkXcEid7c3EChUHBlur29hUaj2ShMhFQqFfdsvV6Hz+ejYyra6\/Ugk8l49vj4SB9Y5\/T0lI1WFItFlMtl5q1IJBIfcobDYTrH+9J98V\/0WxG53W7s20TX19fYt\/3QhbRYLLgT5G9A8r29vdHTaT0vFSUT+XweIpFopwOfJBsMBszbDDnRlEolOp0OPQLFYjEqlQqdo6KZTAavr687d5nRaAS5XM683bDZbF9r4kuEio7HY6jValSrVeoLEl0ueVKZg4MD3jbYBvkVTqcT8XicRQSKki5D7OTkBBKJhPM3dR8CEfT7\/UgmkyzyzreWNxKJIJVKMQ\/cRY0TJcv68PAQdrudRbaziyjp0WTFkrsRsaOjI34TJ1um2Wzy7LP9Sl5w03V0nefn5w85l9uMV979APwCO8j1q\/xKwCQAAAAASUVORK5CYII=\" alt=\"\" width=\"29\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0+ 3 =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"8\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0+ 3 =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"15\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0\u03a9.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) When parallel combination of 2 \u03a9 and 3 \u03a9 resistors is connected in series with 1 \u03a9 resistor [Fig. (b)], the equivalent resistance is<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">R =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"252\" height=\"31\" \/><span style=\"font-family: Arial;\">.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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\" alt=\"C:\\Users\\NISHANT KUMAR\\AppData\\Local\\Packages\\Microsoft.MicrosoftEdge_8wekyb3d8bbwe\\TempState\\Downloads\\media\\image119.jpeg\" width=\"255\" height=\"168\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">\u00a0<\/span><span style=\"font-family: Arial;\">(iii) When the three resistances are connected in series [Fig.(c)], the equivalent resistance is<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">R = R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0+ R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2\u00a0<\/sub><\/span><span style=\"font-family: Arial;\">+ R<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>3\u00a0<\/sub><\/span><span style=\"font-family: Arial;\">= (1 + 2 + 3)\u03a9 = 6\u03a9.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(iv) When all the resistances are connected in parallel [(d)],<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAgAAAAdCAYAAACXFC2jAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADvSURBVDhPzZK\/zkRAFMWnFAWJeAhUCq8hJNp9Cp5Ao6EUHkCi9wRaCaXoVUqVqDi77q7dyP5rvmy+k9zkzJnf3JnJDMMX\/SGwLAvKsoRpmrfkKgLmeYbneXBdF4Zh0MSuwxZ1Xf9vQBRFcBwHxhgEQUDbtpQfOrzSL4AkSfCpmO\/7+FS\/ukWaptA0DX3foygKSJKEcRwfQNd10HWdgk2WZcG2bfIvgc1nWUb+DiiKQg8UxzGtXtf1COwdHMehv7nrCZimCTzPYxgGGhNQVRVUVaVgUxAEkGWZPAFhGFI1TUPhpiiKkOc52OUwp\/e1ns4qGiglaZGSCgAAAABJRU5ErkJggg==\" alt=\"\" width=\"8\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"14\" height=\"31\" \/><span style=\"font-family: Arial;\">\u00a0+\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"165\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\">\u2234 <span style=\"font-family: Arial;\">Equivalent resistance, R =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"15\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0\u03a9.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(c) The network shown in Fig. (a) is a series combination of four identical units. One such unit is shown in Fig.(a) and it is equivalent to a parallel combination of two resistances of 2 \u03a9 and 4 \u03a9 as shown in Fig. (b).<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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alt=\"C:\\Users\\NISHANT KUMAR\\AppData\\Local\\Packages\\Microsoft.MicrosoftEdge_8wekyb3d8bbwe\\TempState\\Downloads\\media\\image120.jpeg\" width=\"243\" height=\"98\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Resistance R of one such unit is given by<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAgAAAAdCAYAAACXFC2jAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADvSURBVDhPzZK\/zkRAFMWnFAWJeAhUCq8hJNp9Cp5Ao6EUHkCi9wRaCaXoVUqVqDi77q7dyP5rvmy+k9zkzJnf3JnJDMMX\/SGwLAvKsoRpmrfkKgLmeYbneXBdF4Zh0MSuwxZ1Xf9vQBRFcBwHxhgEQUDbtpQfOrzSL4AkSfCpmO\/7+FS\/ukWaptA0DX3foygKSJKEcRwfQNd10HWdgk2WZcG2bfIvgc1nWUb+DiiKQg8UxzGtXtf1COwdHMehv7nrCZimCTzPYxgGGhNQVRVUVaVgUxAEkGWZPAFhGFI1TUPhpiiKkOc52OUwp\/e1ns4qGiglaZGSCgAAAABJRU5ErkJggg==\" alt=\"\" width=\"8\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAgAAAAdCAYAAACXFC2jAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADzSURBVDhPzZE7ioRAFEWVCexIEzNN3IEuwVUY2AswdQN+MkFjwcg1uAZNXIQmpoIoqCji7enS6Q89djQ0c+BC1a3DK4qi8J7THwpN08CyLCRJsjeETciyDKZpQpKk34UfNE37v0JZlmBZFjRNg2EYcByHaZruwhs+IoRhiKPEcXyiXNfFUWzb\/tgrBEGA4zgoigKqqsLzPHL6zSbM80x2V9I0BUXdBr9eEUUR+bSdZ6GqKvA8j77v9+ZBqOsaiqKg67q9IWzCOI6QZRlt25I2z3Msy3JdboKu6zAMA0EQkIiiiGEY7oLv+y+5TVjX9XwUAF8XOakbJmhiDRAAAAAASUVORK5CYII=\" alt=\"\" width=\"8\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0+\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAgAAAAdCAYAAACXFC2jAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADQSURBVDhPzdI9DkRAAAXgQUFF4wLiHq6hmUu4AFHrRUevEK0ouYZaJwoJjbfMjtisn2oj+5LXvHyZzCRDcB\/lh6DrOriuizzP+cLyBlVVwXEcGIZxDrbYtv2\/oGkaqKoKQRAgyzI0TcM0TTu4ySMgDENcNY5jhfi+j6t6nvf4K+q6hiiK7PPw7GAYBliWBdM0j2CeZ1BK0fc9CCFHUBQFkiRhyynQdR1lWbKuIE1TRFG0g8+cnrBlHEcG2rblyxdY7xIEAbIs48sClhfQqwKQXnP3HRt\/phL+AAAAAElFTkSuQmCC\" alt=\"\" width=\"8\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"29\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"8\" height=\"29\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">or R =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAgAAAAdCAYAAACXFC2jAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAE\/SURBVDhPvZO9ioNAFEYHtjAPkNYiT2DlG6RKIO8igo2CjU0630CSNlUam5Spgk1AUihoECysFE2RpEi+dcbJmhVdWFj2wEXmm8Od6x\/Bz4x+L1yvVzyfT77qCFEUgRCCoih48ibc73csFguMx+N+wTRNnE6n\/g6+70PXdZb0CqIoIo5jVlTwPA\/b7bYVjsfjV1Fhv9+\/urQzvBi8C4pt25jNZjAMgyc9HTr8i7BarTBUjuOMiKZpGKr68f\/lkI\/HA0EQ4HK58ITRCJPJBJvNBufzGfP5HKqqst2aRijLkq0o9EXR98H5PsPtdoMsy+zD4bSCZVmYTqeQJAlpmvK004Gy2+3YEXTomkaoqopeGEmSMIEeV9MIgiDgcDggyzIoioLlckljSiPkeQ7XdbFerxGGIdvhjEj9FylDBeDjE1sqF+0kjDJmAAAAAElFTkSuQmCC\" alt=\"\" width=\"8\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0\u03a9<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\">\u2234<span style=\"font-family: Arial;\">\u00a0Resistance of the total network (4 such units)<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 4 \u00d7\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"8\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAA8AAAAdCAYAAAB1yDbaAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAGISURBVDhP3ZS9isJAFEYjsVgQYqXYRCWdLyCIna2dgo1gqYWdT5BAisBCLGwE30AIgoVgZSHY2VopiAhqp0JQUfzWCXddwiyGTbW7Bwby3eFk\/pgR4J\/wL5D3+z00TUO\/36fKF8fjEZ1OB4VCAdvtlqokTyYT1Ot1xONxTt5sNkilUrBtmypP3NMulUqcrCgKdrsdJRev5cvlglAohHa7DV3XkU6nMRqNqNdDnk6niEajlIDxeIxIJELJQ57NZojFYpSA9XoNQRBwvV5Z9F4zm\/YnlmWhWCxSInm5XCKRSEAURUiShGQy6ayXsVgskMlknJNQVfVZf+Ae+Yf8WbnX68FP63a7YaFWq8FPq1ar\/2a3W60WKpWKc3sajQZyuRz1cPAyeylOpxMlIBAI0BfH62kPh0Pk83lKHN\/LhmEgGAwim83icDhQlcN7w9hPbrcbJRfeMrv88\/mckgteLpfLGAwGuN\/vWK1WkGWZejh4mT0Mpmk6x9VsNnE+n6mHIyw8Rnj30wC8fQDEuQaPfOb0ygAAAABJRU5ErkJggg==\" alt=\"\" width=\"15\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0\u03a9.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) The network shown in Fig.(b) is a series combination of 5 resistors, each of resistance R.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\">\u2234 <span style=\"font-family: Arial;\">Equivalent resistance = 5 R.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.21. Determine the current drawn from a 12 V supply with internal resistance 0.5 \u03a9 by the following infinite network. Each resistor has 1 \u03a9 resistance.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/jpeg;base64,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alt=\"C:\\Users\\NISHANT KUMAR\\AppData\\Local\\Packages\\Microsoft.MicrosoftEdge_8wekyb3d8bbwe\\TempState\\Downloads\\media\\image121.jpeg\" width=\"256\" height=\"76\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Let the equivalent resistance of the infinite network be X. This network consists of infinite units of three resistors of 1 \u03a9, 1 \u03a9, 1 \u03a9. The addition of one more such unit across AB will not affect the total resistance. The network obtained by adding one more unit would appear as shown in Fig. 3.321.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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\" alt=\"C:\\Users\\NISHANT KUMAR\\AppData\\Local\\Packages\\Microsoft.MicrosoftEdge_8wekyb3d8bbwe\\TempState\\Downloads\\media\\image122.jpeg\" width=\"136\" height=\"87\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><span style=\"font-family: Arial;\">Resistance between A and B<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">= Resistance equivalent to parallel combination of X and 1\u03a9<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"29\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"29\" height=\"29\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Resistance between P and Q<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 1 +\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"29\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0+ 1 = 2 +\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"29\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">This must be equal to the original resistance X.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\">\u2234 <span style=\"font-family: Arial;\">X = 2 +\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"29\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">or X<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0&#8211; 2X &#8211; 2 = 0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">or X = 1 \u00b1\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"20\" height=\"22\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">As the value of resistance cannot be negative, so<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">X = 1 +\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"20\" height=\"22\" \/><span style=\"font-family: Arial;\">\u00a0= 2.732 \u03a9<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Current, I =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"87\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"27\" height=\"27\" \/><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"62\" height=\"29\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 3.713 A<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.22. Figure shows a potentiometer with a cell of 2.0 V and internal resistance 0.40 \u03a9 maintaining a potential drop across the resistor wire AB. A standard cell which maintains a constant emfofl.02 V (for very moderate currents upto a few A) gives a balance point at 67.3 cm length of the wire. To ensure very low currents drawn from the standard cell, a very high resistance of 600 k \u03a9 is put in series with it, which is shorted close to the balance point. The standard cell is then replaced by a cell of unknown emf <\/span><\/strong><strong><span style=\"font-family: 'Cambria Math';\">\u03b5<\/span><\/strong><strong><span style=\"font-family: Arial;\"> and the balance point found similarly turns out to be at 82.3 cm length of the wire.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(a) What is the value of <\/span><\/strong><strong><span style=\"font-family: 'Cambria Math';\">\u03b5<\/span><\/strong><strong><span style=\"font-family: Arial;\"> ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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\" alt=\"C:\\Users\\NISHANT KUMAR\\AppData\\Local\\Packages\\Microsoft.MicrosoftEdge_8wekyb3d8bbwe\\TempState\\Downloads\\media\\image123.jpeg\" width=\"182\" height=\"121\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">\u00a0<\/span><\/strong><strong><span style=\"font-family: Arial;\">(b) What purpose does the high resistance of 600 A\u03a9 have ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(c) Is the balance point affected by this high resistance ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(d) Is the balance point affected by the internal resistance of the driver cell ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(e) Would the method work in the above situation if the driver cell of the potentiometer had an emf of 1.0 V instead of 2.0 V ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(f) Would the circuit work well for determining extremely small emf say of the order of a few mV (such as the typical emf of a thermocouple) ? If not, how will you modify the circuit ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">(a)\u00a0<\/span><span style=\"font-family: 'Cambria Math';\">\u03b5<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 1.02 V, l<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 67.3 cm, \u03b5<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= \u03b5 = ?, l<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 82.3 cm<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Formula for the comparison of emfs by potentiometer is<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"44\" height=\"31\" \/><span style=\"font-family: 'Cambria Math';\">\u00a0<\/span>\u2234<img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAEYAAAAdCAYAAAAXZxqwAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAASlSURBVGhD7ZlZKHVfGMaPcEWkKJlCKFyQobgw5caN4QbJUEiSITKERIQUmTJcyJCQoijzcGEqyhBCEaW4ILPM0\/v\/nmXt7xzD8Tnl8H39z6\/eznrXWvvsvZ+99t5rPVtECt5FIYwUFMJI4Z8W5uDggMLDw8nT05NFSUkJPTw8sLaKigqKjo4md3d38vLyYn1fU1dXRwkJCeTh4cH6bW5u8pZ\/XBiRSERbW1s8I7K2tqbu7m5Wzs7OZr8AJ6+urs4zMcnJybxE1NTURNra2jyTUZje3l4qKyuj\/v5+Oj8\/57U\/B4TZ2dnhGZGLiwv19fXxTExWVhZr+4iIiAgqLi7mmQzCYKh1dXXR09MTFRUVUUdHB2\/5OZaWlkhTU5NSU1MpMDCQ8vLyeIuY4+NjUlZWpru7O17zkvz8fHJycqK0tDR6fHzktTIIk5OTQ1VVVTz7O\/D29mYjGKyurpKGhgatr6+zHNze3pK5uTkdHh7ymvc5OTkhf39\/CgoK4jUyCIMhGhwcTD09PX\/FbQRUVFR46Rk\/Pz8qLCxkZYhiYWFBe3t7LP8Ta2tr7Na8v79n+aeFwYPp+vqaZ38HOJG5uTmeEZmamtL4+Dgr+\/j4vHjLaGlpsV+8qVJSUtgowXNFoLW1lRwdHXkmgzCjo6Oko6NDxsbGFBUVxRT+ac7Ozig0NJSMjIzIwcGB5ufnWT1+IZpkqKmpsTY3Nzfy9fWlm5sbys3NJVtbWzI0NGRl1Al8Wpj\/GwphpPBjwoyNjbHJ2EcxMzPDe38\/PyZMdXU1ZWRkfBjNzc289\/cjwqRNniFP3tvfV4UIry95hjRqa2spMzPzw2hpaeG934IZ+Hv7+6r4sVtpaGiI2traPoyJiQne+\/tRvJWkoBBGCr+Fga+BWWBpaSmveYuzszMNDAywlWhkZCSvJTbrrKyspOHhYbKxsfnWlTdWxJjiw5haXl7mtb9O7NXM9\/W6CuC46+vrfx93Z2cnb+HCNDY2siV8SEiIVGFqamooKSmJlS8vL9lS\/vT0lOWSZlF7ezs7kO8Abh3WR9vb27xGjKQTAPcuJiaGZ2IkjxsXU1VVlWevbqX4+HipwhgYGNDk5CTPiPT19V8oLABPRHL5Lk\/wgI6NjeWZdLCAlPRa3gOjZ3Z2lmcyCKOnp0cXFxc8e16MCUt8gd3dXTaSsOT\/DjAy7ezs2H6np6dJSUnpjfcC2wF2hDRgTeCY4fIJfjGQSZiFhQWeEbm6urLbS+Do6IhMTEzo6uqK18gfCIP9CmDVD0dOEl1d3U9dKFxk3BUCnxbGysqKGhoaWBmTKxyU4JbBPoQRLYwo+CDoI29wDHg2CsD0Ligo4BnR1NQUsy0\/A84F\/\/fGqMKJBAQEsBmnANYz6AwwWjBU4VmsrKyQvb09q8d2+DyBTxGDg4MsYGoJO5AncPbh9cLPxQMWb5aNjQ3eSmRmZkb7+\/s8e0bwY9Df0tKSvUCwfXp6OsXFxfFeXBgYPmFhYS8CVx\/mFMoCi4uLLJd003EPS24nxJ8edl8FZtDYH17Zkl8MMIoTExN5JgYjqry8nD1PRkZG2CjD9rigkqNc9CspVsTreCr+D7p7EZpS2D8EAAAAAElFTkSuQmCC\" alt=\"\" width=\"70\" height=\"29\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">or \u03b5 =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"24\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0\u00d7 1.02 = 1.25 V.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(b) High resistance of 600 k\u03a9 protects the galvanometer for positions far away from the balance point, by decreasing current through it.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(c) No, balance point is not affected by high resistance because no current flows through the standard cell at the balance point.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(d) Yes, the balance point is affected by the internal resistance of the driver cell. The internal resistance affects the current through the potentiometer wire, so changes the potential gradient and hence affects the balance point.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(e) No, the arrangement will not work. If \u03b5 is greater than the emf of the driver cell of the potentiometer, there will be no balance point on the wire AB.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">(f) The circuit as it is would be unsuitable, because the balance point (for \u03b5 of the order of a few mV) will be very close to the end A and the percentage error in measurement will be very large. The circuit is modified by putting a suitable resistor R in series with the wire AB so that potential drop across AB is only slightly greater than the emf to be measured. Then the balance point will be at larger length of the wire and the percentage error will be much smaller.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.23. Figure shows a potentiometer circuit for comparison of two resistances. The balance point with a standard resistor R = 10.0 \u03a9 is found to be 58.3 cm, while that with the unknown resistance X is 685 cm. Determine the value of X. What might you do if you failed to find a balance point with the given cell \u03b5 ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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alt=\"C:\\Users\\NISHANT KUMAR\\AppData\\Local\\Packages\\Microsoft.MicrosoftEdge_8wekyb3d8bbwe\\TempState\\Downloads\\media\\image124.jpeg\" width=\"176\" height=\"140\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Here R = 10.0\u03a9, l<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 58.3cm, X = ?, l<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 68.5cm<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Let \u03b5<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0and \u03b5<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0be the potential drops across R and X respectively and I be the current in potentiometer wire.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">Then\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"77\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">But\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAACwAAAAfCAYAAACcai8CAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAALiSURBVFhH7ZhNSCpRFMdNBdu1aR20aBNEy1qVu2rTOqhdC0EIpI2LoDYV9LWJJIggkIJC9+EmCqKN0diHYJ\/SB1QuLC0tzeb\/OqfrIGnTFM08H7wfHObO8cL9OZ47915N+IeQZVn6L\/xTUqkUYrEYnp+fRaaYshK+ublBdXU1VlZWRKaYsiuJrq4u7cLn5+cIBoOIx+MiYzyahdvb2zE6Oort7W20tray+N9As3BdXR0uLy85+fDwgKenJ24bjWbhs7Mz1NfXY2ZmBvf39\/zh+vo6uru7sby8jMbGRry+vnJeTwqFnU4nxsfHMTY2hqamJs4pwjabDS8vL5zME41GcXd3x+2amhpks1lu60mh8ObmpvKQKioq+KoIt7W1oba2FrOzs2hubkYgEOAOxMXFBXp7e8WdflxfX8NsNqOnp0dk3nG73djd3eW2IvwZVBZGyJbiTY5LcmtrS2S+ED46OkJHRwdPxoODg6KS0ZupqSnMz8\/z+B6Ph3Oqwre3tzg8PFSCvrEakUgEe3t7qkGrmVZoDhWOT3xZEt+BSod+EbVYXFwUvX8GC09MTEBr0GtPL46Pj0uO+SEk0+TkJLSGmrDf78fCwoJq7OzsiN7FkHCpMT\/E75UETYzh4WHV2NjYEL1\/xq\/WsBGUlXA4HMbS0hK\/HT6jrIRpGbbb7do2P+WC5t3a4+MjfD4fpqensba2hkwmwx2MRrOwyWRSamdkZASSJHHbaDQLu1wu3qmdnJwUbSNpLc\/lcuJOX0oJh0Ih0SoQHhoawsDAAL8n0+k0f5hMJuH1elFVVcVtIygUpi0lLRYWi4XvCUXYarUqT5ZmayKR4KdK7YaGBsOEOzs7FeH8Ma2yspKvhCK8urqKvr4+Lou5uTlcXV1xB8IoYTq10\/53cHBQZN4pKayGkU+4FN8SdjgcfN6jvwFOT09F1hj29\/fR0tLC57n+\/n7OfSlMdZ2Pt84iaww0fwrHJ2RZlv4ALvsPGjFuGHAAAAAASUVORK5CYII=\" alt=\"\" width=\"44\" height=\"31\" \/><span style=\"font-family: 'Cambria Math';\">\u00a0<\/span>\u2234 <img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"8\" height=\"29\" \/> <span style=\"font-family: Arial;\">=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"10\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">or X =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"10\" height=\"31\" \/><span style=\"font-family: Arial;\">\u00a0.R =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAABgAAAAdCAYAAACwuqxLAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAMcSURBVEhL7ZZLKG1hFMdPx9vEwEA4E5lQSvIoDJSciZGJDBgoeZVHIQZSDJTJ8T7CVIjyyiuKlIHCwIzyymPgmZIkr\/9t\/a1z9naue+9AZ3Bv91df+1trtc\/\/22udvda2wMv8fQJvb294fHxUy0Pg8vISQ0NDWFpaUg9wcHCAzs5OdHd3w+l04vr6WiMGFRUVKC0t5SooKMDg4KBGTAITExOorq7Gy8uLeoD7+3v4+fmpBSwuLiI5OVktg6CgIKytrbnX+fm5RlTg+PgYcXFxdJjZ39+HxWI85NHREUJDQ9UyEIFfwbtjYmLQ1taG3t5eFBcXo7W1lUEhJycHjY2NWF5e5n52dlYjBiLQ19eHuro6LnMWKCCnXFhYoOP5+ZmCKysrtNPS0rC+vs7TFxYWoqGhgX4zV1dXvL6\/v7MONTU1tAW3wN3dHR1CXl4eBgYGMDMzA5vNpt6PVPr6+qr1NdPT08jIyFBLBTIzMzE8PEyHIKfe3t7G6urqpxpITaKjo7kfHR11F9Nut\/MqSKqLiorUUoGnpyf4+\/ujubmZYh0dHQwKLS0t\/AM4HA5ERkbi4uKCfhGSugjBwcEoKytDZWUlUlJS6HNhHM9L\/Bf4I5b6+np4c1mkuXlz\/aNF3tzc1N33ocDc3Bz7fkBAAFdSUhKDgrz6iYmJHDiBgYGcCZ5Ic2xqakJtbS3Cw8Px8PCgEZOADBxPpLl59qKIiAi1DDY2NnQHlJSUoKqqSi2TwPj4OJuXuatK37FarWoBW1tbSEhIUOtnpG1HRUXh8PBQPSognbO8vJzDREaiDA8XkprY2Fg2u7CwMHfv90RSJM1wbGxMPR8Yz6\/c3t4yLTc3N1zmmTwyMvLlTHYhwyo+Pp6HckEBcw5fX18pcHZ2xtOEhIRoBDg9Pf1Uk69ob29Hbm6uWioged7d3aVjfn4eqampHH+SDh8fH\/oFSWFWVhb32dnZPJgUPj8\/nz65Jz09HVNTU7QFCsiP9\/f3o6enB5OTk58+nE5OTvhdJB8EIiBpEGQQ7e3tcVjJaO3q6uKg2tnZYdzF75\/32wA\/APmweEAjvQ\/sAAAAAElFTkSuQmCC\" alt=\"\" width=\"24\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0\u00d7 10 = 11.75 \u03a9<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">If there is no balance point, it means potential drops across R or X are greater than the potential drop across the potentiometer wire AB. We should reduce current in the outside circuit (and hence potential drops across R and X) suitably by putting a series resistor.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">3.24. Figure shows a 2.0 V potentiometer used for the determination of internal resistance of a 1.5 V cell. The balance point of the cell in open circuit is 76.3 cm. When a resistor of 9.5 \u03a9 is used in the external circuit of the cell, the balance point shifts to 64.8 cm length of the potentiometer wire. Determine the internal resistance of the cell.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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alt=\"C:\\Users\\NISHANT KUMAR\\AppData\\Local\\Packages\\Microsoft.MicrosoftEdge_8wekyb3d8bbwe\\TempState\\Downloads\\media\\image125.jpeg\" width=\"176\" height=\"140\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans. <\/span><\/strong><span style=\"font-family: Arial;\">Here l<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 76.3 cm, l<\/span><span style=\"font-family: Arial; font-size: 8pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 64.8 cm, R = 9.5 \u03a9<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">The formula for the internal resistance of a cell by potentiometer method is<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">r = R\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" 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alt=\"\" width=\"276\" height=\"34\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: justify; line-height: 12pt;\"><span style=\"font-family: Arial;\">\u00a0<\/span><\/p>\n<p style=\"bottom: 10px; right: 10px; position: absolute;\">\n","protected":false},"excerpt":{"rendered":"<p>Ncert Exercise with Solution Chapter 3 Current Electricity &nbsp; 3.1. The storage battery of a car has an emf of 12 V. If the internal resistance of the battery is 0.4 \u03a9, what is the maximum current that can be drawn from the battery? Ans. Here\u00a0\u03b5\u00a0= 12 V, r = 0.4\u03a9 The current drawn from [&hellip;]<\/p>\n","protected":false},"author":1,"featured_media":0,"parent":0,"menu_order":0,"comment_status":"closed","ping_status":"closed","template":"","meta":{"_uag_custom_page_level_css":"","site-sidebar-layout":"default","site-content-layout":"","ast-site-content-layout":"default","site-content-style":"default","site-sidebar-style":"default","ast-global-header-display":"","ast-banner-title-visibility":"","ast-main-header-display":"","ast-hfb-above-header-display":"","ast-hfb-below-header-display":"","ast-hfb-mobile-header-display":"","site-post-title":"","ast-breadcrumbs-content":"","ast-featured-img":"","footer-sml-layout":"","ast-disable-related-posts":"","theme-transparent-header-meta":"default","adv-header-id-meta":"","stick-header-meta":"","header-above-stick-meta":"","header-main-stick-meta":"","header-below-stick-meta":"","astra-migrate-meta-layouts":"set","ast-page-background-enabled":"default","ast-page-background-meta":{"desktop":{"background-color":"var(--ast-global-color-4)","background-image":"","background-repeat":"repeat","background-position":"center center","background-size":"auto","background-attachment":"scroll","background-type":"","background-media":"","overlay-type":"","overlay-color":"","overlay-opacity":"","overlay-gradient":""},"tablet":{"background-color":"","background-image":"","background-repeat":"repeat","background-position":"center center","background-size":"auto","background-attachment":"scroll","background-type":"","background-media":"","overlay-type":"","overlay-color":"","overlay-opacity":"","overlay-gradient":""},"mobile":{"background-color":"","background-image":"","background-repeat":"repeat","background-position":"center center","background-size":"auto","background-attachment":"scroll","background-type":"","background-media":"","overlay-type":"","overlay-color":"","overlay-opacity":"","overlay-gradient":""}},"ast-content-background-meta":{"desktop":{"background-color":"var(--ast-global-color-5)","background-image":"","background-repeat":"repeat","background-position":"center center","background-size":"auto","background-attachment":"scroll","background-type":"","background-media":"","overlay-type":"","overlay-color":"","overlay-opacity":"","overlay-gradient":""},"tablet":{"background-color":"var(--ast-global-color-5)","background-image":"","background-repeat":"repeat","background-position":"center center","background-size":"auto","background-attachment":"scroll","background-type":"","background-media":"","overlay-type":"","overlay-color":"","overlay-opacity":"","overlay-gradient":""},"mobile":{"background-color":"var(--ast-global-color-5)","background-image":"","background-repeat":"repeat","background-position":"center center","background-size":"auto","background-attachment":"scroll","background-type":"","background-media":"","overlay-type":"","overlay-color":"","overlay-opacity":"","overlay-gradient":""}},"footnotes":""},"class_list":["post-5440","page","type-page","status-publish","hentry"],"aioseo_notices":[],"_hostinger_reach_plugin_has_subscription_block":false,"_hostinger_reach_plugin_is_elementor":false,"uagb_featured_image_src":{"full":false,"thumbnail":false,"medium":false,"medium_large":false,"large":false,"1536x1536":false,"2048x2048":false},"uagb_author_info":{"display_name":"sandeep.soni484@gmail.com","author_link":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/author\/sandeep-soni484gmail-com\/"},"uagb_comment_info":0,"uagb_excerpt":"Ncert Exercise with Solution Chapter 3 Current Electricity &nbsp; 3.1. The storage battery of a car has an emf of 12 V. If the internal resistance of the battery is 0.4 \u03a9, what is the maximum current that can be drawn from the battery? Ans. Here\u00a0\u03b5\u00a0= 12 V, r = 0.4\u03a9 The current drawn from&hellip;","_links":{"self":[{"href":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/wp-json\/wp\/v2\/pages\/5440","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/wp-json\/wp\/v2\/pages"}],"about":[{"href":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/wp-json\/wp\/v2\/types\/page"}],"author":[{"embeddable":true,"href":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/wp-json\/wp\/v2\/comments?post=5440"}],"version-history":[{"count":6,"href":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/wp-json\/wp\/v2\/pages\/5440\/revisions"}],"predecessor-version":[{"id":5561,"href":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/wp-json\/wp\/v2\/pages\/5440\/revisions\/5561"}],"wp:attachment":[{"href":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/wp-json\/wp\/v2\/media?parent=5440"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}