{"id":5435,"date":"2024-12-27T11:04:36","date_gmt":"2024-12-27T11:04:36","guid":{"rendered":"https:\/\/vartmaaninstitutesirsa.com\/?page_id=5435"},"modified":"2024-12-27T11:57:47","modified_gmt":"2024-12-27T11:57:47","slug":"ncert-exercise-with-solution-chapter-1-electric-charge-and-fields-2","status":"publish","type":"page","link":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/ncert-exercise-with-solution-chapter-1-electric-charge-and-fields-2\/","title":{"rendered":"Ncert Exercise with Solution Chapter 1 Electric Charge and Fields"},"content":{"rendered":"<p>&nbsp;<\/p>\n<h1 style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 22pt;\"><strong><u><span style=\"font-family: Arial; font-size: 22pt; color: #c00000;\">NCERT EXERCISES WITH SOLUTION <\/span><\/u><\/strong><strong><u><span style=\"font-family: Arial; font-size: 14pt; color: #002060;\">CHAPTER-1 ELECTRIC CHARGES AND FIELDS<\/span><\/u><\/strong><\/h1>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 14pt;\"><strong><span style=\"font-family: Arial; font-size: 14pt; color: #002060;\">\u00a0<\/span><\/strong><\/p>\n<ol class=\"awlist1\" style=\"margin: 0pt; padding-left: 0pt;\" type=\"1\">\n<li style=\"margin-top: 6pt; margin-left: 36pt; margin-bottom: 6pt; text-indent: -36pt; line-height: 12pt; font-family: Arial; font-weight: bold; list-style-position: inside;\"><span style=\"width: 13.35pt; font: 7pt 'Times New Roman'; display: inline-block;\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0<\/span>What is the force between two small charged spheres having charges of 2 \u00d7 10<span style=\"font-size: 7.33pt;\"><sup>-7<\/sup><\/span> C and 3 \u00d710<span style=\"font-size: 7.33pt;\"><sup>-7<\/sup><\/span> C placed 30 cm apart in air?<\/li>\n<\/ol>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. Here q<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 2 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><span style=\"font-family: Arial;\">C,\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">q<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>2\u00a0<\/sub><\/span><span style=\"font-family: Arial;\">= 3 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><span style=\"font-family: Arial;\">C,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 36pt; margin-bottom: 6pt; text-indent: 36pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">r = 30 cm = 0.30 m<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">According to Coulomb&#8217;s law,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"90\" height=\"35\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"185\" height=\"37\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"width: 36pt; font-size: 10pt; display: inline-block;\">\u00a0<\/span><img decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"80\" height=\"19\" \/><span style=\"font-size: 10pt;\">\u00a0<\/span><span style=\"font-family: Arial;\">(Repulsive).<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.2. The electrostatic force on a small sphere of charge 0.4 \u03bcC due to another small sphere of charge -0.8\u03bcC in air is 0.2 N. (i) What is the distance between two spheres ? (ii) What is the force on the second sphere due to the first ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. (i) Here q<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 0.4 \u03bcC = 0.4 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-6<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0C<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">q<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= &#8211; 0.8 \u03bcC = &#8211; 0.8 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-6<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0C, F = 0.2 N, r = ?<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; 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=\"79\" height=\"27\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: 'MS Mincho';\">\u2234<\/span><span style=\"width: 25pt; font-family: 'Cambria Math'; display: inline-block;\">\u00a0<\/span><span style=\"font-family: 'MS Mincho';\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" 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BYoYtUheJQz8Ul4Cuj444+fzYETx7KQtNk\/WygUOpEiVh2CleqS71KejEdoyIuR62Iz+5eeGbT77rvHB\/CZhrZPMD7tKxQ6lSJWHQLR8QhmOSsWmnp8RvonCawrM4UsKXGqCSecMC6zIFqWXMh8ziURFgqdRBGrDoJVJeHPsgpJdkmAuH0yjwXSrcuyer66eQxyodDpDCoUCoV\/P4MG\/Qcpf6eosE+0+gAAAABJRU5ErkJggg==\" alt=\"\" width=\"299\" height=\"34\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">or<\/span><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"172\" height=\"19\" \/><span style=\"font-size: 10pt;\">\u00a0cm.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) The two charges mutually exert equal and opposite forces.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: 'MS Mincho';\">\u2234\u00a0<\/span><span style=\"font-family: Arial;\">Force on the second sphere due to the first = 0.2 N (attractive).<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.3. Check that the ratio ke<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">\/Gm<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>e<\/sub><\/span><\/strong><strong><span style=\"font-family: Arial;\">m<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>p<\/sub><\/span><\/strong><strong><span style=\"font-family: Arial;\"> is dimensionless. Look up a table of physical constants and determine the value of this ratio. What does this ratio signify?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans.\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"206\" height=\"32\" \/><span style=\"font-family: Arial; font-size: 10pt;\">\u00a0<\/span><span style=\"font-size: 10pt;\">unit<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">As the ratio k e<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\/ Gmm has no unit, so it is dimensionless.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Now k = 9 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>9<\/sup><\/span><span style=\"font-family: Arial;\">Nm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">C<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-2<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">G = 6.67 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-11<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0Nm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0kg<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-2<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>\u00a0<\/sup><\/span><span style=\"font-family: Arial;\">e = 1.6 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-19<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0kg<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">m<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>e<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 9.1 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-31<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0kg<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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\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alt=\"image136\" width=\"257\" height=\"56\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">and<\/span><span style=\"width: 35.1pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><span style=\"font-family: Arial;\">m<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>p<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 1.66 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-27<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0kg<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; line-height: 12pt;\"><span style=\"font-family: 'MS Mincho'; font-size: 10pt;\">\u2234\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"63\" height=\"28\" \/><span style=\"font-family: 'MS Mincho'; font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" 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alt=\"\" width=\"185\" height=\"27\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-left: 36pt; margin-bottom: 6pt; text-indent: 36pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 2.287 \u00d710<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>39<\/sup><\/span><span style=\"font-family: Arial;\">.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">The factor ke<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\/ Gm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>e<\/sub><\/span><span style=\"font-family: Arial;\">m<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>p<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0represents the ratio of electrostatic force to the gravitational force between an electron and a proton. Also, the large value of the ratio signifies that the electrostatic force is much stronger than the gravitational force.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.4. (i) Explain the meaning of the statement &#8216;electric charge of a body is quantized.&#8217;<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(ii) Why can one ignore quantization of electric charge when dealing with macroscopic i.e., large scale charges ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. (i) Quantization of electric charge means that the total charge (q) of a body is always an integral multiple of a basic charge (e) which is the charge on an electron. Thus q = ne, where n = 0, \u00b1 1, \u00b1 2, \u00b1 3, \u2026\u2026<\/span><span style=\"font-family: Arial;\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) While dealing with macroscopic charges (q = ne), we can ignore quantization of electric charge. This is because e is very small and n is very large and so q behaves as if it were continuous i.e., as if a large amount of charge is flowing continuously.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.5. When a glass rod is rubbed with a silk cloth, charges appear on both. A similar phenomenon is observed with many other pairs of bodies. Explain how this observation is consistent with the law of conservation of charge.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. It is observed that the positive charge developed on the glass rod has the same magnitude as the negative charge developed on silk cloth. So total charge after rubbing is zero as before rubbing. Hence the law of conservation of charge is being obeyed here.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.6. Four point charges q<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>A<\/sub><\/span><\/strong><strong><span style=\"font-family: Arial;\"> = 2 \u03bcC, q<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>B<\/sub><\/span><\/strong><strong><span style=\"font-family: Arial;\"> = -5 \u03bcC, q<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>C<\/sub><\/span><\/strong><strong><span style=\"font-family: Arial;\"> = 2 \u03bcC, q<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>D<\/sub><\/span><\/strong><strong><span style=\"font-family: Arial;\"> = -5 \u03bcC are located at the corners of a square ABCD of side<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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\" alt=\"image137\" width=\"168\" height=\"169\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Fig. 1.149<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">10 cm. What is the force on a charge of 1 \u03bcC placed at the centre of the square ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. Here\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"191\" height=\"27\" \/><\/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=\"41\" height=\"20\" \/><span style=\"font-size: 10pt;\">\u00a0cm\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"97\" height=\"21\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Forces exerted on the charge of 1 \u03bcC located at the centre are<\/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=\"213\" height=\"39\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"width: 36pt; font-size: 10pt; display: inline-block;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"48\" height=\"17\" \/><span style=\"font-size: 10pt;\">,\u00a0<\/span><span style=\"font-family: Arial;\">along<\/span><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"17\" height=\"18\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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alt=\"\" width=\"213\" height=\"39\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"width: 36pt; font-size: 10pt; display: inline-block;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" 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height=\"17\" \/><span style=\"font-size: 10pt;\">,\u00a0<\/span><span style=\"font-family: Arial;\">along<\/span><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"18\" height=\"18\" \/><\/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=\"214\" height=\"41\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"width: 36pt; font-size: 10pt; display: inline-block;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"35\" height=\"17\" \/><span style=\"font-size: 10pt;\">,\u00a0<\/span><span style=\"font-family: Arial;\">along<\/span><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"19\" height=\"18\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Clearly,<\/span><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"62\" height=\"20\" \/><span style=\"font-size: 10pt;\">\u00a0<\/span><span style=\"font-family: Arial;\">and<\/span><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"49\" height=\"17\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Hence total force on 1 \u03bcC charge is<\/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=\"138\" height=\"20\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"width: 36pt; font-size: 10pt; display: inline-block;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJAAAAARCAYAAAAyqiXFAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAVjSURBVGhD7ZlbSBVdFMetlPJJIyJFkMwLCCpKoT6EFIVRpi9iD6amWGa9FPogUSCl0eVBFDXvLxmIoKhICAoVeUMpQkojRVIor6ViXvKCK\/77W3OO52vP6XhmzvTSDxautWe715mZtdfea48T\/eMfGvirAfTt2zfWjOfnz5+s\/R02NzdZM56FhQXWtPNXA+jx48d0\/\/59toxlaGiIrly5wpbxREVF0dbWFlvGUlNTQxMTE2xpQ7cASk5OtkucnJxoeHiYR7EP2bi2CHxXVVXxKPaBSSAb+0\/i6upKSUlJPIp99Pf3S8e2RSIiIngUbeiagcbHxykhIYGuX79OJSUlQs6fP0+FhYXcw5LLly\/Tx48f2dLG8vIypaWlUWJiosk3xs\/OzuYelvT19VFtbS1b2nnw4IG4V8X3w4cPhb2xscE9LLl58yZr2mlpaRG+7t27Z\/IfGxtLa2tr3MOS3Nxc1rSj+xJ28uRJqqysZOu\/dPnixQu2dk57ezt9\/fqVLesUFRVRTEwMW0RdXV109+5dthwPMprCysoKBQQEsOV4\/p\/J9+\/fz5pj0T2AAgMDaWBggC3tm9WUlBQRCLaAJSE\/P58tErN\/dXWVLcfS2dlpEUBgenqaNccyOjoqfK+vr3ML2TzptKJrAC0uLtLu3btpbm5O2D4+PuKvFmwNIASLs7MzvX\/\/XtiZmZkiCxjFmTNn6Pbt20IfHByknp4eoRtBeXk5nT17VuiYMFr3dTtBGkAIAmuiRltbm5gJT548oUuXLtHFixf5iv3YGkCTk5Mm37du3aLw8HC+YgwHDx4U+63S0lLas2cPtxpDamoqnT59msrKyujw4cP04cMHvrIzZO96uzQ1NXFPM7pmIJTFWVlZQkeZrPbiUb6qbS6RhjGbFMGLOXr0qEWbjN7eXgoNDRU6lo6cnByhK+DcBWND1Hxj9iJ7WhO1JXnfvn2msx1fX1\/xVwZ8y8p3\/K\/M33b58eMH97bE39+fXr16JfRz587R\/Py80BWU+4bojTSAPn36ZFXUOH78OLW2trKlTn19vagSZODhojJTJC4ujp49e2bRJgMBc+HCBbZ+p6GhgXbt2iX6hYWFUV5eHl8xAz\/BwcFWpa6ujnubwW9C9vvTuQ6C58iRI\/T582duMYN9jMzfdrlx4wb3NjMzMyN8I8BkYFK4ubnR1atXRZUaGRkpKlYZsne9XWQBLA2g6OhoqyIDDwc3MjY2xi1yvn\/\/LsprW5cYW5YwvDj4RsWmBjKHl5eX0LE38vT0FLoeoCSPj49nS507d+6IMxjskfTi+fPnFBISwtbv4Nm4uLiwRXTt2jXV5yR719ulu7ube5rRbQnDWQ9eYkdHB7fIycjIoKmpKTp06BC3WMeWAMJ1+Mb5hxpPnz6lgoICcQKLMxtZBrIHzHwssydOnLCagUZGRsTyjjOY169fc6s2kF3g18\/PT+wBZSiTBddxnILNvp6fcXQLIFQ\/EDwoNbBOYwbgwNHDw4NbrWNLACm+se9SIygoiJqbm8WM9fb2Vt1P7BRMBsW\/tQA6duyY2NzirEq2DNrD0tKSyTcyu4wvX76IJRsFDiZvRUUFX9EHXTfR1sBswbL15s0bIdgLzM7O8lV1sF6rbXp3woEDB0zjpKen27RX0wtk5+rqanHfxcXFoko0ikePHplO3N+9e0enTp0Sul4YEkCoMFAd4DMDwFd4pNXGxkZhOxoc8mEDjQyAMhvBZNTXcOwb9u7da1pi8InD3d1dl0lhC\/jm9vbtW3Euhaz\/8uVLvqIPhgQQUjsykLL24uXBdkRZKQN+4Q+i9n3IUeAe4VcJWOW3WFvu9ES57+2\/QT+IfgGShYBOhXFHwAAAAABJRU5ErkJggg==\" alt=\"\" width=\"144\" height=\"17\" \/><span style=\"font-size: 10pt;\">\u00a0<\/span><span style=\"font-family: Arial;\">zero N.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.7. (al) An electrostatic field line is a continuous curve. That is, a field line cannot have sudden breaks. Why not ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(b) Explain why two field lines never cross each other at any point ? [Punjab 01, 02; CBSE D 05, 03 ; OD 14]<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. (a) Electric lines of force exist throughout the region of an electric field. The electric field of a charge decreases gradually with increasing distance from it and becomes zero at infinity i.e., electric field cannot vanish abruptly. So a line of force cannot have sudden breaks, it must be a continuous curve.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(b) If two lines of force intersect, then there would be two tangents and hence two directions of electric field at the point of intersection, which is not possible.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.8.<\/span><\/strong><strong><span style=\"width: 1.4pt; text-indent: 0pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><\/strong><strong><span style=\"font-family: Arial;\">Two point charges q<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>A<\/sub><\/span><\/strong><strong><span style=\"font-family: Arial;\"> = + 3 \u03bcC and q<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>B<\/sub><\/span><\/strong><strong><span style=\"font-family: Arial;\"> = -3 \u03bcC are located 20 cm apart in vacuum, (i) Find the electric field at the midpoint O of the line AB joining the two charges, (ii) If a negative test charge of magnitude 1.5 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-9<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> C is placed at the centre, find the force experienced by the test charge.<\/span><\/strong><span style=\"font-family: Arial;\">\u00a0<\/span><span style=\"font-family: Arial;\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0<\/span><span style=\"font-family: Arial;\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0<\/span><span style=\"font-family: Arial;\">\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0<\/span><span style=\"font-family: Arial;\">[CBSE OD 03]<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. The directions of the fields E<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>A<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0and E<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>B<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0due to the charges q<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>A<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0and q<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>B<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0at the midpoint P are as shown in Fig. 1.150.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Electric field at the midpoint O due to q<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>A<\/sub><\/span><span style=\"font-family: Arial;\">,<\/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=\"215\" height=\"40\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"width: 36pt; font-size: 10pt; display: inline-block;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"105\" height=\"19\" \/><span style=\"font-size: 10pt;\">,\u00a0<\/span><span style=\"font-family: Arial;\">along<\/span><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"18\" height=\"17\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Electric field at the midpoint O due to q<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>B<\/sub><\/span><span style=\"font-family: Arial;\">,<\/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=\"215\" height=\"40\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"width: 36pt; font-size: 10pt; display: inline-block;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"104\" height=\"19\" \/><span style=\"font-size: 10pt;\">,\u00a0<\/span><span style=\"font-family: Arial;\">along<\/span><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"18\" height=\"17\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Resultant field at the midpoint\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAoAAAATCAYAAACp65zuAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADeSURBVDhPzZAtEkVgFIYFxVCIRpVYg8oKrECl6rIZiiBJFmEVLANjJGaM8t75jr+vXe3eJ51z3uf7FfCSfxKXZcE4jmf3cIt938P3fWRZhrIs4TgOqqo601Pctg2apqFtWxoy2K6SJKFpGupJrOsahmHQgMfzPNi2TTWJiqLAsiwa8CRJAkEQsK7rIbLmWslTFAVl7P6vxGmaDlGWZZimSSFPHMcQRRH7vj+PUVWVQh7XdRFFEdUkXt+TpikNGV3XQdf1+\/NJZMzzjCAI6Lg8zxGGIYZhOFNO\/MbPROADQJee4ZDgZZUAAAAASUVORK5CYII=\" alt=\"\" width=\"10\" height=\"19\" \/><span style=\"font-family: Arial;\">\u00a0is<\/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=\"196\" height=\"19\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"width: 36pt; font-size: 10pt; display: inline-block;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"105\" height=\"19\" \/><span style=\"font-size: 10pt;\">,\u00a0<\/span><span style=\"font-family: Arial;\">along<\/span><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"21\" height=\"17\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) Force on a negative charge of 1.5 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-9<\/sup><\/span><span style=\"font-family: Arial;\">C placed at the midpoint O,<\/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=\"191\" height=\"19\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"width: 36pt; font-size: 10pt; display: inline-block;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"90\" height=\"19\" \/><span style=\"font-size: 10pt;\">,\u00a0<\/span><span style=\"font-family: Arial;\">along<\/span><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"18\" height=\"17\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">The force on a negative charge acts in a direction opposite to that of the electric field.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.9.<\/span><\/strong><strong><span style=\"width: 3.15pt; text-indent: 0pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><\/strong><strong><span style=\"font-family: Arial;\">A system has two charges q<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>A<\/sub><\/span><\/strong><strong><span style=\"font-family: Arial;\"> = 2.5 \u00d710<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> C and q<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>B<\/sub><\/span><\/strong><strong><span style=\"font-family: Arial;\"> = -2.5 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> C, located at points A (0,0, -15 cm) and B (0,0, +15 cm) respectively. What is the total charge and electric dipole moment of the system ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. Clearly, the two charges lie on Z-axis on either side of the origin and at 15 cm from it, as shown in Fig.\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; line-height: 12pt;\"><span style=\"font-family: 'MS Mincho';\">\u2234\u00a0<\/span><span style=\"font-family: Arial;\">2a = 30 cm = 0.30 m, q = 2.5 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0C<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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\" alt=\"image138\" width=\"229\" height=\"210\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Total charge = q<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>A\u00a0<\/sub><\/span><span style=\"font-family: Arial;\">+ q<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>B\u00a0<\/sub><\/span><span style=\"font-family: Arial;\">= 2.5 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0&#8211; 2.5 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0= 0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Dipole moment,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">p &#8211; q \u00d7 2a = 2.5 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00d7 0.30<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">\u00a0<\/span><span style=\"font-family: Arial;\">= 0.75 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0Cm<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">The dipole moment acts in the direction from B to A i.e., along negative Z-axis.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.10. An electric dipole with dipole moment 4 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-9<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> Cm is aligned at 30\u00b0 with the direction of a uniform electric field of magnitude 5 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>4<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> NC<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1\u00a0<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">Calculate the magnitude of the torque acting on the dipole.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. Here p = 4 \u00d7 10\u201c<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>9<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0Cm, \u03b8 = 30\u00b0, E = 5 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>4<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0NC<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: 'MS Mincho';\">\u2234\u00a0<\/span><span style=\"font-family: Arial;\">Torque,\u00a0<\/span><span style=\"font-family: Symbol; font-variant: small-caps;\">\uf074<\/span><span style=\"font-family: Arial;\">\u00a0= pE sin \u03b8<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 4 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-9<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00d7 5 \u00d710<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>4<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00d7 sin 30\u00b0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-4<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0Nm.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.11. A polythene piece rubbed with wool is found to have a negative charge of 3.2 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">C. (i) Estimate the number of electrons transferred, (ii) Is there a transfer of mass from wool to polythene ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. (i) Here q = 3.2 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0C, e = 1.6 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-19<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0C<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">As q = ne, therefore<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Number of electrons transferred,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAADcAAAAZCAYAAACVfbYAAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAIISURBVFhH7Ze\/y3FhGMdtLJTBZGNhYsBgZBODSRnEf2ChlGTD38BkYMEkT8pEESaTZPMjP5IYEOL7POfqfp54n\/PmHY5O9H7qW\/d13XdX9\/d03fc5R4I35r+5V0UUc8fjEclkEqFQCLFYDC6Xi80IiyjmvF4vcrkcjSeTCSSS52xDFHMajQbD4ZBFX5t4J3MWiwWdTofGXIu+lblarQaj0Ujnrlgsvpc5jsPhgNPpROOnmnO73ZDL5cjn82i321CpVFAqlWg2m7Tomez3++eZ4wytViuEw2H4\/X5EIhGcz2fYbDZqGz6m0ymkUulD\/Qvdbhf1ep1q8pHNZnlr38rn87HV9\/w8MoPBAKvVyiLAbDajUqmw6DUhc983Vr\/fp+R2u6V4uVxS\/CeXywWbzeah\/gZXm098cHvjq32r3W7HVt9DFdfrNRQKBSU4qtUq9Ho9i34zn8+h1WofSggKhQJv7VsFg0G2+h4yVyqVaNE38XgcgUAAo9EIjUaDZV8PMmcymeBwOCjBkclkqE2cTie1xatC5maz2a++XSwWbPS68J\/iN0FUc9wfwXg8ZpHwiGbObrej1WrRu1Sn07GssIhirlwuw+PxoNfrkWQyGZsRFlHMpdNpJBIJXK\/XHz0DUcxxZ02tVtMNzb1qBoMBmxEW0c4cd5FEo1GkUin6UH8Gkq+W+HhPXT8+AaMhXw8J1B7kAAAAAElFTkSuQmCC\" alt=\"\" width=\"55\" height=\"25\" \/><span style=\"font-family: Arial;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"129\" height=\"27\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Since polythene has negative charge, so electrons are transferred from wool to polythene during rubbing.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) Yes, there is a transfer of mass from wool to polythene because each electron has a finite mass of 9.1 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-31<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0kg.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Mass transferred<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 36pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= m<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>e<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0\u00d7 n = 9.1 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-31<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00d7 2 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>12<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 36pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 1.82 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-18<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0kg<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Clearly, the amount of mass transferred is negligibly small.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.12. (a) Two insulated charged copper spheres A and B have their centres separated by a distance of 50 cm. What is the mutual force of electrostatic repulsion if the charge on each is 6.5 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">C ? The radii of A and B are negligible compared to the distance of separation, (b) What is the force of repulsion if each sphere is charged double the above amount, and the distance between them is halved ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">Ans.\u00a0<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.13. Suppose the spheres A and B in Exercise 1.12 have identical sizes. A third sphere of the same size but uncharged is brought in contact with the first, then brought in contact with the second, and finally removed from both. What is the new force of repulsion between A and B ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans.\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.14. Figure 1.152 shows tracks of three charged particles in a uniform electrostatic field. Give the signs of the three charges. Which particle has the highest charge to mass ratio?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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\" alt=\"image139\" width=\"279\" height=\"80\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.15. Consider a uniform electric field :<\/span><\/strong><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAoAAAAUCAYAAAC07qxWAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAEASURBVDhPxZAxioRAEEU1FTTTc3gGQcEDiJibCMJ4EPEMBoZqZmKoJ\/AChoKCgWimWLv9p8fZYHdmN9oPRf\/qelRXtUC\/1EvQdV3uOFjX9Y8hCPdeLzuGYUhlWcL\/fcaqqsgwjG+j7\/sneJ4n5mHRdR2KeZ4j37btCc7zfIH7vuNuXVfyfR\/+Atu2BaTrOvJhGGiaJnimC4zjGKDjOJSmKYmiSMuy8OoX0LZtgFEUUZIkpCgKr9wF8DiOa77Hc0VR4HwI4DiOgFRVxfZMbJEgCOCZADZNA9DzPFwyWZZFpmnyjIOyLAOUJIk0TUNnlmdZBojpWuad\/hP8\/I7b+zhvHxc0oLWxBtLPAAAAAElFTkSuQmCC\" alt=\"\" width=\"10\" height=\"20\" \/><strong><span style=\"font-family: Arial;\"> = 3 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>3<\/sup><\/span><\/strong> <img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAYAAAATCAYAAACz13xgAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAC8SURBVChTrc6hCoUwFAbgPcXeZWCw2AditJp9A4PB4gv4AmaDwScwCopZtJplaNnv3Qkbu9x4fxjbzgc\/h+FHtNaPhaqqUNc1vS1c1wXOOcqyxDzPDqSU5qLkee5XmazrimVZfDB1jDEIIXw4jgNpmqLvewf7vqPrOhRFgfM8HSilqMYcD+77tvAZOti2jYZxHJuvg7ZtCZqm8SFJEoJpmmhtC2EYEgzDgCAIHIzjiCiKkGUZLWLhO38F\/bwfjoPiE+y9BAAAAABJRU5ErkJggg==\" alt=\"\" width=\"6\" height=\"19\" \/><strong><span style=\"font-family: Arial;\"> NC<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> (i) What is the flux of this field through a square of 10 cm on a side whose plane is parallel to the Y-Z-plane ? (ii) What is the flux through the same square if the normal to its plane makes a 60\u00b0 angle with the X-axis?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. (i) Normal to a plane parallel to Y-Z plane points in X-direction, so<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 36pt; line-height: 12pt;\"><span style=\"font-family: Symbol;\">\uf044<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAgAAAAUCAYAAACwG3xrAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADhSURBVChTvVA7CoRADB1BtLT1SB5BCwtbFe0FT+A1rKxtFDyDloKVnVgKgiD6difuuj9l2WYfhEySl+RlGL7glNC2LXki5Hn+YYxtvacTwjAk\/5uGNE1hGAYcx4Gu6yjL8kGIogie52FZFopN00SWZRthnmcIgoCqqqjIwXPrum4E3iWKIoIgoOQz9hVxHEOSJFiWta\/heBHJRSmKAk3TbpmDM5umIT3jOFJMhGEYKLhDlmV0XUdvVtc1XNelgGOaJppwB7Ntmy5IkgRFUUBVVfR9fysfaHjHPwjXr\/XPbfUvFZ46NGx+0ZsAAAAASUVORK5CYII=\" alt=\"\" width=\"8\" height=\"20\" \/><span style=\"font-family: Arial;\">\u00a0= 0.10 \u00d7 0.10\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAUAAAATCAYAAABY4MdjAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAC5SURBVChTpcwxCoQwEAXQ3MHae+QCVrmCrVVKBc\/iGdLY2IgnsBItbBUEIV1AVFD8kglsYNlufzGZeWGG4Uc+yBhDlmWut0UphTRNEYYhtNYOpZT2odR17dfv+0bf9ziOw+M0TXTXGONx33eM40g94TAMKMsSXdd53LaNVoui8HieJ+E8zx7XdUUQBAQ2hE3TgHNOYEOYJAniOMZ1XXiex2EURfSR5zmWZXFYVRWEEGjb1o4Ov\/MXAi8nfEv\/p85AVwAAAABJRU5ErkJggg==\" alt=\"\" width=\"5\" height=\"19\" \/><span style=\"font-family: Arial;\">\u00a0m<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0= 0.01\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAUAAAATCAYAAABY4MdjAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAC5SURBVChTpcwxCoQwEAXQ3MHae+QCVrmCrVVKBc\/iGdLY2IgnsBItbBUEIV1AVFD8kglsYNlufzGZeWGG4Uc+yBhDlmWut0UphTRNEYYhtNYOpZT2odR17dfv+0bf9ziOw+M0TXTXGONx33eM40g94TAMKMsSXdd53LaNVoui8HieJ+E8zx7XdUUQBAQ2hE3TgHNOYEOYJAniOMZ1XXiex2EURfSR5zmWZXFYVRWEEGjb1o4Ov\/MXAi8nfEv\/p85AVwAAAABJRU5ErkJggg==\" alt=\"\" width=\"5\" height=\"19\" \/><span style=\"font-family: Arial;\">\u00a0m<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Electric flux,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">\u03d5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>E<\/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=\"10\" height=\"20\" \/><span style=\"font-family: Arial;\">\u00a0.\u00a0<\/span><span style=\"font-family: Symbol;\">\uf044<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAgAAAAUCAYAAACwG3xrAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADhSURBVChTvVA7CoRADB1BtLT1SB5BCwtbFe0FT+A1rKxtFDyDloKVnVgKgiD6difuuj9l2WYfhEySl+RlGL7glNC2LXki5Hn+YYxtvacTwjAk\/5uGNE1hGAYcx4Gu6yjL8kGIogie52FZFopN00SWZRthnmcIgoCqqqjIwXPrum4E3iWKIoIgoOQz9hVxHEOSJFiWta\/heBHJRSmKAk3TbpmDM5umIT3jOFJMhGEYKLhDlmV0XUdvVtc1XNelgGOaJppwB7Ntmy5IkgRFUUBVVfR9fysfaHjHPwjXr\/XPbfUvFZ46NGx+0ZsAAAAASUVORK5CYII=\" alt=\"\" width=\"8\" height=\"20\" \/><span style=\"font-family: Arial;\">\u00a0= 3 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>3<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAUAAAATCAYAAABY4MdjAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAC5SURBVChTpcwxCoQwEAXQ3MHae+QCVrmCrVVKBc\/iGdLY2IgnsBItbBUEIV1AVFD8kglsYNlufzGZeWGG4Uc+yBhDlmWut0UphTRNEYYhtNYOpZT2odR17dfv+0bf9ziOw+M0TXTXGONx33eM40g94TAMKMsSXdd53LaNVoui8HieJ+E8zx7XdUUQBAQ2hE3TgHNOYEOYJAniOMZ1XXiex2EURfSR5zmWZXFYVRWEEGjb1o4Ov\/MXAi8nfEv\/p85AVwAAAABJRU5ErkJggg==\" alt=\"\" width=\"5\" height=\"19\" \/><span style=\"font-family: Arial;\">\u00a0. 0.01\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAUAAAATCAYAAABY4MdjAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAC5SURBVChTpcwxCoQwEAXQ3MHae+QCVrmCrVVKBc\/iGdLY2IgnsBItbBUEIV1AVFD8kglsYNlufzGZeWGG4Uc+yBhDlmWut0UphTRNEYYhtNYOpZT2odR17dfv+0bf9ziOw+M0TXTXGONx33eM40g94TAMKMsSXdd53LaNVoui8HieJ+E8zx7XdUUQBAQ2hE3TgHNOYEOYJAniOMZ1XXiex2EURfSR5zmWZXFYVRWEEGjb1o4Ov\/MXAi8nfEv\/p85AVwAAAABJRU5ErkJggg==\" alt=\"\" width=\"5\" height=\"19\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 36pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 30\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAUAAAATCAYAAABY4MdjAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAC5SURBVChTpcwxCoQwEAXQ3MHae+QCVrmCrVVKBc\/iGdLY2IgnsBItbBUEIV1AVFD8kglsYNlufzGZeWGG4Uc+yBhDlmWut0UphTRNEYYhtNYOpZT2odR17dfv+0bf9ziOw+M0TXTXGONx33eM40g94TAMKMsSXdd53LaNVoui8HieJ+E8zx7XdUUQBAQ2hE3TgHNOYEOYJAniOMZ1XXiex2EURfSR5zmWZXFYVRWEEGjb1o4Ov\/MXAi8nfEv\/p85AVwAAAABJRU5ErkJggg==\" alt=\"\" width=\"5\" height=\"19\" \/><span style=\"font-family: Arial;\">.\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAUAAAATCAYAAABY4MdjAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAC5SURBVChTpcwxCoQwEAXQ3MHae+QCVrmCrVVKBc\/iGdLY2IgnsBItbBUEIV1AVFD8kglsYNlufzGZeWGG4Uc+yBhDlmWut0UphTRNEYYhtNYOpZT2odR17dfv+0bf9ziOw+M0TXTXGONx33eM40g94TAMKMsSXdd53LaNVoui8HieJ+E8zx7XdUUQBAQ2hE3TgHNOYEOYJAniOMZ1XXiex2EURfSR5zmWZXFYVRWEEGjb1o4Ov\/MXAi8nfEv\/p85AVwAAAABJRU5ErkJggg==\" alt=\"\" width=\"5\" height=\"19\" \/><span style=\"font-family: Arial;\">\u00a0= 30 Nm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">C<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) Here \u03b8 = 60\u00b0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: 'MS Mincho';\">\u2234\u00a0<\/span><span style=\"font-family: Arial;\">\u03d5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>E<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= E\u2206S cos 60\u00b0 = 3 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>3<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00d7 0.01 cos 60\u00b0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 36pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 30 \u00d7\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAcAAAAbCAYAAACwRpUzAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADTSURBVDhPvZA9CoQwEIUDFrZ2FjYeRq+1V\/AEdha2XkCsZfGvsrASO8FCtFAhb8kgalaFBWEHHuTNl7xJwnBTnHP3d7gsy7r6gkmSwDAM0SS\/Qd\/3EQQBGNuDTrH\/hnEcE6yqivwGh2FA0zSb5nk+xx7rIcyyDFdK09RllmXhRk8vJN4VRRE8z0Nd1zI0TRNFUdDvqKoqw77vqSFK0zS0bXueKTYpikJrCYq5In4cR\/IStG0bXdet7gAdx0Ge53R6miaEYbhDXdcllWW5wfeVOOevD96WlnzBbeNLAAAAAElFTkSuQmCC\" alt=\"\" width=\"7\" height=\"27\" \/><span style=\"font-family: Arial;\">\u00a0= 15 Nm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">C<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.16.<\/span><\/strong><strong><span style=\"width: 0.83pt; text-indent: 0pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><\/strong><strong><span style=\"font-family: Arial;\">Consider a uniform electric field : <\/span><\/strong><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAoAAAAUCAYAAAC07qxWAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAEASURBVDhPxZAxioRAEEU1FTTTc3gGQcEDiJibCMJ4EPEMBoZqZmKoJ\/AChoKCgWimWLv9p8fZYHdmN9oPRf\/qelRXtUC\/1EvQdV3uOFjX9Y8hCPdeLzuGYUhlWcL\/fcaqqsgwjG+j7\/sneJ4n5mHRdR2KeZ4j37btCc7zfIH7vuNuXVfyfR\/+Atu2BaTrOvJhGGiaJnimC4zjGKDjOJSmKYmiSMuy8OoX0LZtgFEUUZIkpCgKr9wF8DiOa77Hc0VR4HwI4DiOgFRVxfZMbJEgCOCZADZNA9DzPFwyWZZFpmnyjIOyLAOUJIk0TUNnlmdZBojpWuad\/hP8\/I7b+zhvHxc0oLWxBtLPAAAAAElFTkSuQmCC\" alt=\"\" width=\"10\" height=\"20\" \/><strong><span style=\"font-family: Arial;\"> = 3 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>3<\/sup><\/span><\/strong> <img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAYAAAATCAYAAACz13xgAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAC8SURBVChTrc6hCoUwFAbgPcXeZWCw2AditJp9A4PB4gv4AmaDwScwCopZtJplaNnv3Qkbu9x4fxjbzgc\/h+FHtNaPhaqqUNc1vS1c1wXOOcqyxDzPDqSU5qLkee5XmazrimVZfDB1jDEIIXw4jgNpmqLvewf7vqPrOhRFgfM8HSilqMYcD+77tvAZOti2jYZxHJuvg7ZtCZqm8SFJEoJpmmhtC2EYEgzDgCAIHIzjiCiKkGUZLWLhO38F\/bwfjoPiE+y9BAAAAABJRU5ErkJggg==\" alt=\"\" width=\"6\" height=\"19\" \/><strong><span style=\"font-family: Arial;\"> NC<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">. What is the net flux of this field through a cube of side 20 cm oriented so that its faces are parallel to the coordinate planes?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. The flux entering one face parallel to Y-Z plane is equal to the flux leaving other face parallel to Y-Z plane. Flux through other faces is zero. Hence net flux through the cube is zero.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.17. Careful measurement of the electric field at the surface of a black box indicates that the net outward flux through the surface of the box is 8.0 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>3<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> Nm<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">C<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>1<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">. (i) What is the net charge inside the box ? (ii) If the net outward flux through the surface of the box were zero, could you conclude that there were no charges inside the box ? Why or why not ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. (i) \u03d5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>E<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 8.0 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>3<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0Nm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">C<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-2<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Using Gauss theorem,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"51\" height=\"35\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Charge, q = \u03b5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>0<\/sub><\/span><span style=\"font-family: Arial;\">. \u03d5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>E<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 8.0 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>3<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00d7\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"60\" height=\"27\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 0.07 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-6<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0= 0.07 \u03bcC<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) No, we cannot say that there are no charges at all inside the box. We can only say that the net charge inside the box is zero.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.18. A point charge +10 \u03bcC is a distance 5 cm directly above the centre of a square of side 10 cm as shown in Fig. 1.153(a). What is the magnitude of the electric flux through the square ? (Hint: Think of the square as one face of a cube with edge 10 cm)<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. We can imagine the square as face of a cube with edge 10 cm and with the charge of + 10 \u03bcC placed at its centre, as shown in\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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\" alt=\"image140\" width=\"260\" height=\"136\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Symmetry of six faces of a cube about its centre ensures that the flux \u03d5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>S<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0through each square face is same when the charge q is placed at the centre.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: 'MS Mincho';\">\u2234\u00a0<\/span><span style=\"font-family: Arial;\">Total flux,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">\u03d5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>E<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 6 \u00d7 \u03d5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>S<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAsAAAAbCAYAAACqenW9AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAFESURBVDhPzZOxqoJQGMfvA4T6ENLa1hIIivQMTg0NQUNLDoKv4Kqbk6sPkS53amyQGoqgpSVRgiL1fzsfJlzhdL3L5f7gyPf3+3GO4ucHOlJV1ecfybvdDpZl0fI8D6fTqe605Ov1CkEQkOc55dFohO12SzXjm7zZbDAcDusE6LrOlw+HA2RZrhOgaRpfLssS0+kUk8kEjuNgMBjw5RdZlrHG+8doo6oqVqtVnd7Il8uFxCiK6BTG253bkPwEHdcvd67rH\/mP8vl8pvng0cj9fh9xHGO9XsM0TWq2aeTZbIYgCGj4eTSyKIo4Ho+43W7UYCiKQp+81+tRbmRJkvB4PFAUBdI0pdlYLBYkGYZB49vI+\/0e8\/kctm0jSRJ60Zfsui7da+Q29\/sd4\/GYavbHMLgyw\/d9LJdLhGFImeTnxe22KvML6h0ksOaNIUwAAAAASUVORK5CYII=\" alt=\"\" width=\"11\" height=\"27\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">or \u03d5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>S<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAACwAAAAdCAYAAADRoo4JAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAKVSURBVFhH7ZfPSypRFMcnaSduWrgvECHwD2jhoqWbokW7SHfiIghaCQUFIgURKe6iRa6khBAUxEUkuFFIKgzNqEQQrAiRENHUb++crr1X+HoT\/ob3gYvnnjsyn7lzZuZeCUPGf+FOU6\/XuTUZaOGrqyvo9XpUKhWRGWDhUCiEQCAASfqs+K2w3W6HzWbD8vIyzGazyPYW2cIWiwUHBwccX15eQqVScdxrZAuPj48jm82KHgZfeHJyEjc3N6I3BMIejwc6nQ7RaJRruR\/CFxcXGBkZgdPpRKPR4Nxfhb\/Srxn+iizhYrEIpVIpev1FlrDD4cDOzg4SiYTI\/BsqJaq\/79r09LQ4Wj6yS2JQkJaWltBu6zRra2stz0NNOj4+RrutFe2URDAYbHkeasNXEuJ3aPgkXCgUYLVakU6nRab\/vLy8YH19ndczBAvTV2R1dRWHh4ecHBS2t7exv78veu+wsN\/vx9zcHCf+hFb69\/f3\/P7N5XIi2xtisRimpqZE7zcsTE8srR3oA7G4uIhIJMKDMzMzcLvduLu7w\/z8POd6hUKhYCeXywWj0cgLeoKFR0dHuX6JTCYDtVrN8e7uLte01+vlPkHlQ1uXh4cHkekOtOh5fn7mOJ\/PY2xsjOMP4Sa0f6IZL5fLMJlM8Pl8eHx8FKPAysoKwuEwZmdnkUqlRLbzkHCTarXKTqVS6V14Y2MDW1tbPLi3t4eFhQWOJyYmcHt7yzEt5uliNBoN909OTj7+0w2oPOnuEvTBMBgMHLMw3eZ4PM4P3\/n5OWq1Gg8+PT3h6OiIN4PJZJKvUKvV8tjZ2Rk2Nzc57hb0KiMnOtfr6yvnWPgnNGeYNqenp6cc95IfC1NZ0OaUZrwfSL\/K4Xp4WuP6DbaQrvB17wjPAAAAAElFTkSuQmCC\" alt=\"\" width=\"44\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0\u00d7 10 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-6<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00d7 4\u03c0 \u00d7 9 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>9<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 36pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 1.88 \u00d710<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>5<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0Nm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">C<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>_1<\/sup><\/span><span style=\"font-family: Arial;\">.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.19. A point charge of 2.0 \u03bcC is at the centre of a cubic Gaussian surface 9.0 cm on edge. What is the net electric flux through the surface ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. Here q = 2.0 \u03bc C = 2.0 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-6<\/sup><\/span><span style=\"font-family: Arial;\">C,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">\u03b5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>0<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 8.85 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-12<\/sup><\/span><span style=\"font-family: Arial;\">C<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">N<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">m<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-2<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">By Gauss&#8217;s theorem, electric flux is<\/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=\"132\" height=\"29\" \/><span style=\"font-family: Arial;\">\u00a0= 2.26 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>5<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0Nm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0C<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.20. A point charge causes an electric flux of -1.0 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>3\u00a0<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">Nm<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> C<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> to pass through a spherical Gaussian surface of 10.0 cm radius centred on the charge, (i) If the radius of the Gaussian surface were doubled, how much flux would pass through the surface ? (ii) What is the value of the point charge ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. (i) \u03d5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>E<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= -10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>3<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0Nm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">C<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">, because the charge enclosed is the same in both the cases.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) Charge,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">q = \u03b5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>0<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0\u03d5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>E<\/sub><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAADEAAAAbCAYAAADVq2dMAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAMoSURBVFhH7ZdLKLRRGMenRCl2omyxMIqFKJdmylIpjYWyUGTnsqDYiJQNFlZ2FDs1liKXCLlGKZeIyDW5JvfLzP\/7\/s+cM\/OO4fvUZ2S+5ldn3ud53jPnvP9znufMvCYEOE6n0xoU8RleX185kfK+Hr+LmJ+fR0pKCl5eXlTk6\/GriL6+PoyMjMBk8u9mf0s6BUV8gqCIzxLQIni0TkxMICQkBD09PX47ob5lJ\/xNUMRP4f8RUVJSggBvVtPo6CgCuQ0PDwdr4kfgI2Jvbw\/V1dXK+zfu7+\/R1taGoqIi9Pf3czJ15++w79bWFtbW1lTExfHxMSorK1FTU4OrqyuJeYl4fHxEamoqsrKyVOTP3N3dKcvD9fW1XPnrHBoaKmOSxsZGNDc3i+1wOOTX3Aj7Pz8\/i80xCgoKEBERge3tbYkRxuPi4sRmPD4+Xr9wuURQeXl5OZaWlrxEsPPc3JxPI3V1dWhvb5eHIkdHR\/ICRJ8TxsbGSpwsLi4iOztb7LGxMeTm5rof+unpCaWlpbJbRC8O+xtFDA4OIj8\/X3lAYmKi7JRbBAew2+3Y3d11i9jY2MDs7CwSEhLE3t\/fR1RUlFw1LS0tqKqqwurqKtLS0iSFyMPDg6yk3vKOjg4RqFlYWJBVZX+r1Yrp6Wl1x8NbEfX19WhoaFAekJOTg6mpKY+IyMhIdHd3o7W1VQavqKjA6empdDabzbi5uRE7JiZGrkbKysrkn+rFxYWKuFhZWZGJOzs7RQRrw8j6+rp8b2hoSEW8eU9EbW2t8t4RcXl5KW15eRnp6eli6zThtn0kYmBgAHl5eejt7UVGRoZPrmuKi4t5nivPld8ci0K4Y28XgLwVwe9bLBblQRb78PDQI0LDtKAII8xtLSI6Oho7Oztid3V1wWazuf9iT05OIikpSerLCAu6qalJecDJyQnCwsJwe3sr\/tnZGZKTk7G5uSm+JjMz00s4+4eHh+P8\/FzSr7CwUOI+IsbHx2V1OZGGBWV8UH0CcXK9W5qDgwNluQ6LmZkZd11oWLisGSOsDWM9MU34HGwcQ0MhfEdhQetdFxG\/PxyB3ZyWX6qvCTuE5lf1AAAAAElFTkSuQmCC\" alt=\"\" width=\"49\" height=\"27\" \/><span style=\"font-family: Arial;\">\u00a0\u00d7(- 1.0 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>3<\/sup><\/span><span style=\"font-family: Arial;\">)<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= &#8211; 8.84 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-9<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0C = &#8211; 8.84 nC.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.21. A conducting sphere of radius 10 cm has an unknown charge. If the electric field 20 cm from the centre of the sphere is 1.5 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>3<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> NC<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> and points radially inward, what is the net charge on the sphere ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. Electric field at the outside points of a conducting sphere is<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">E =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAC8AAAAdCAYAAAA6lTUKAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAMkSURBVFhH5ZddKHtxGMfnWozMBVIuyIWtdkNyIVIu3LpwodxIuVFYu9ilJLuQkJTEhfJS8hpXwuYtpdVqbFYIi0Lz\/i77+j+P3w77e2kH+2\/r\/6lf53merXM+5\/f7ne05CoQx\/5f87e2tiIKPLPmuri5kZGSILPj4LV9bW4uZmRloNBpRCT6yZv74+Pifyzc1NaGxsRFGoxF1dXWi+kJIyxcVFWFxcZHj6upq9Pf3c+wlZOUPDw+RkJAAj8fDuVKpxP39PcdeQlZ+YmICer2e4\/Pzc8TExHD8Fr\/ln56eeN\/Fx8djb29PVAOH2+1GREQE5ubm4HA4kJycLD55RdbMB4u+vr53+50IC3mF4mPNsJBvbm7GyMiIyF4JC\/nPUFRVVSFQo7W1VVzGP8xm84fn+WwoRkdHEaixsLAgtPxja2vrw\/N8NoK2bXJzc2EwGET2PYImHxUVhZKSEpF9Dx\/5g4MD6V8t1KioqEB+fj5SU1OllkGSp75Bq9UiJydHVEKL9vZ2PjY0NGB9fZ1jlqc70el0WF1d9ZF3uVxYW1t7N4ibmxtsbGzAbrfj5OSEa7\/B5eUlTk9POaZeioYXulZpaanIhPz09DR6e3uxs7MjyZOkyWRCeno6bDYbtre3ERsby8e7uzskJibyzS4tLfGLym9A5+7p6UFkZCSGhobQ3d2NsbEx\/ozEy8rKeKIfHh64xvLR0dEYHh5GR0cH0tLS+Ffg6OiIv6BWq3FxccGxSqXi4+PjI8rLy9HS0oLl5WWuebFYLLi6uhKZfOhaJO+dfYKEqZtta2tDfX09VlZWuM7yJEqDLpyZmckxdZEEvbP+LU\/bJC8vj1fn7OyMa0R2djasViuvynehVrimpkZkXyM9sAQ9CFlZWSJ7ISkpSZKPi4vD7u4uNjc3kZKSwitAeN92CgoK+Dg4OCjV5FJZWYnJyUmRfY2P\/NTUFLef+\/v7ogIMDAxIe2x8fJx\/TmkZnU4nb7XZ2Vnu76lWWFjI36O\/+fn5eY7lQi3F29X8Ch\/5n0IrQzdRXFwsbbtA8qvy19fX6Ozs\/NEDKwfFn5lyhufwOJ8BRW3\/F8lQs2kAAAAASUVORK5CYII=\" alt=\"\" width=\"47\" height=\"29\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; line-height: 12pt;\"><span style=\"font-family: 'MS Mincho';\">\u2234\u00a0<\/span><span style=\"font-family: Arial;\">q = 4\u03c0\u03b5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>0<\/sub><\/span><span style=\"font-family: Arial;\">Er<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2\u00a0<\/sup><\/span><span style=\"font-family: Arial;\">=\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"33\" height=\"27\" \/><span style=\"font-family: Arial;\">\u00a0\u00d7 1.5 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>3<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00d7 (0.20)<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0C<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 36pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 6.67 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-9<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0C = 6.67 nC<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">As the field acts inwards, the charge q must be negative.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: 'MS Mincho';\">\u2234\u00a0<\/span><span style=\"width: 19.5pt; font-family: 'Cambria Math'; display: inline-block;\">\u00a0<\/span><span style=\"font-family: Arial;\">q = &#8211; 6.67 nC.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.22. A uniformly charged conducting sphere of 2.4 m diameter has a surface charge density of 80.0 \u03bcC\/m<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">. (i) Find the charge on the sphere, (ii) What is the total electric flux leaving the surface of the sphere ? [CBSE D 09C]<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. Here R =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"35\" height=\"27\" \/><span style=\"font-family: Arial;\">\u00a01.2 m<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">\u03c3 = 80.0\u03bcCm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0= 80 \u00d7 10-6 Cm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-2<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(i) Charge on the sphere is<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">q = 4\u03c0 R<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u03c3 = 4 \u00d7 3.14 \u00d7(1.2)<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00d7 80 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-6<\/sup><\/span><span style=\"font-family: Arial;\">C<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 1.45 \u00d710<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-3<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0C.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) Flux,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">\u03d5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>E<\/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=\"11\" height=\"27\" \/><span style=\"font-family: Arial;\">\u00a0= 1.45 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-3<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00d7 4\u03c0 \u00d7 9 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>9<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 36pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 1.6 \u00d710<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>8<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0Nm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0C<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.23. An infinite line charge produces a field of 9 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>4<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> NC<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> at a distance of 2 cm. Calculate the linear charge density.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. E = 9 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>4<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0NC<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">, r = 2cm = 0.02 m<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Electric field of a line charge, E =<\/span><span style=\"width: 1.5pt; text-indent: 0pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"29\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: 'MS Mincho';\">\u2234\u00a0<\/span><span style=\"font-family: Arial;\">Linear charge density,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 2\u03c0\u03b5<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>0<\/sub><\/span><span style=\"font-family: Arial;\">Er = 2\u03c0 \u00d7<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"54\" height=\"27\" \/><span style=\"font-family: Arial;\">\u00a0\u00d7 9 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>4<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00d7 0.02<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 0.01 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-5<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0Cm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0= 0.1 \u03bcCm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.24. Two large, thin metal plates are parallel and close to each other. On their inner faces, the plates have surface charge densities of opposite signs and of magnitude 17.0 \u00d710<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-22<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> Cm<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-2<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">. What is E (a) to the left of the plates, (b) to the right of the plates, and (c) between the plates ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. Here \u03c3 = 17.0 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-22<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0Cm<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-2<\/sup><\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(a) On the left, the fields of the two plates are equal and opposite, so E = Zero.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(b)<\/span><span style=\"width: 4.56pt; text-indent: 0pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><span style=\"font-family: Arial;\">On the right, the fields of the two plates are equal and opposite, so E = Zero.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(c)<\/span><span style=\"width: 5.17pt; text-indent: 0pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><span style=\"font-family: Arial;\">Between the plates, the fields due to both plates are in same direction. So the resultant field is<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; line-height: 12pt;\"><span style=\"font-family: 'Cambria Math';\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"269\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 19.2 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-10<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0NC<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.25. An oil drop of 12 excess electrons is held stationary under a constant electric field of 2.55 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>4<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> Vm<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> in Millikan&#8217;s oil drop experiment. The density of the oil is 1.26 g cm<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-3<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">. Estimate the radius of the drop. (g = 9.81 ms<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-2<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">; e = 1.60 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-19<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> C)<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. Force on the oil drop due to electric field = qE = neE<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Weight of oil drop<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= mg = volume \u00d7 density \u00d7 g =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAcAAAAbCAYAAACwRpUzAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADySURBVDhPtZGhioVQEIZvFMVm8jWs4gNo0260+QgGo2DTerNPYNSuTVAwGG8wmEwK6r\/rLBdXzllYWPaHOWfOfMPMMOeBH3Qcx\/P3cF1XzPNMPgMty0IUReTfYJZlCIKAheM4wvd95HnOQl3Xqd8btm17wTAMkaYpPM+jvnEcswNxy75lGAYkSSKfgd\/1n9BxHPDMtu3no65r8Kyqqr8O1HUdrdB1XZRleYemaVLglCzLdHPLcteXJAk0TUPTNPS+wWmazvEhCAL9LbesoigoiuKCqqpS9rIsEEUR27ZdcN939H2PYRjO4Bn6gp\/Hi29H\/AFKGpRT6gDKSgAAAABJRU5ErkJggg==\" alt=\"\" width=\"7\" height=\"27\" \/><span style=\"font-family: Arial;\">\u00a0\u03c0 r<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>3<\/sup><\/span><span style=\"font-family: Symbol;\">\uf072<\/span><span style=\"font-family: Arial;\">g<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"image141\" width=\"44\" height=\"83\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">The field E must act vertically downward so that the negatively charged oil drop experiences an upward force and balances the weight of the drop.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">When the drop is held stationary,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Weight of oil drop<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 36pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= Force on the oil drop due to electric field<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">or<\/span><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"86\" height=\"25\" \/><span style=\"width: 23.96pt; font-size: 10pt; display: inline-block;\">\u00a0<\/span><span style=\"font-size: 10pt;\">\u00a0\u00a0<\/span><span style=\"font-size: 10pt;\">\u2234\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"85\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Now,<\/span><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" 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alt=\"\" width=\"103\" height=\"19\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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alt=\"\" width=\"125\" height=\"19\" \/><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" 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alt=\"\" width=\"85\" height=\"18\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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alt=\"\" width=\"200\" height=\"19\" \/><span style=\"font-size: 10pt;\">\u00a0mm.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.26. Which among the curves shown in Fig. 1.155, cannot possibly represent electrostatic field lines ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. Only Fig. (c) is right and the remaining figures cannot represent the electrostatic field lines.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Figure\u00a0<\/span><span style=\"font-family: Arial; font-variant: small-caps;\">(a)<\/span><span style=\"font-family: Arial;\">\u00a0is wrong because field lines must be normal to a conductor.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Figure (b) is wrong because lines of force cannot start from a negative charge.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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ksdza+EPE3xet1l0P4JaTqiRLF468bapLc+JdO8O3Fxo\/w+8NeJ\/Guow2+meqfsRf8EubX4K+GvhLrf7UXju4\/aJ+J3wh0XRrP4VeF7+fU7r4Efs8Pp+kWWmlfg34I165upb\/xRi0aS8+K3jf+0\/G1zdXupjw6PBehahL4fTKDWHXNJRnKcW6bTv7Nq1puLVnJ3Tim7xtdq60zwyXCao4\/EUKFfP8AF4KnispoVJqpHJIV5T9jmWNw\/K4PMZ04qtlmGqzf1WM6WYV6Lm8JF\/L3iv8AYfvP+CnfjPwN8RL\/AOE+t\/sd\/sueA\/CV74F+HOsh9d8I\/tXfFXwJqVvNp0jaP4ZTVYvDf7PXw51DS7m+Gn2\/iLw\/rnxT8S2GprcatpfggxWkVfpN4D\/4Jf8A7Cfgk21\/L+zj4D8feKIEhW48dfGexf41\/EDU5YrcwG61Lxl8UpfFuuTzTK7vJHDeQWau7eTaQglK++1VUyFGATnAz1p1c7nOS96Tle179Wla7\/rRaHzNbGYvEprEYrEV06k6rVatVqJ1an8SpacpLnqNtzlvNuTlfmd\/zq+Iv\/BLf9j3xLeS+MPhj8N4v2ZfjBbW7xaD8aP2YJYPgt8QNGlZ\/PT7RJ4TtrTw54s0v7UEubvw1420DxH4c1F4wt5pchwy+Vj42f8ABQL9k7SNQtPj1+z7J+2L8MfC8U8tr8ev2Yr3Q9M+Mt\/otvZ3Miah8Qf2ZPEk+kQXevwtDFFrNx8IfGniG31GSU32jeCrBD\/ZkX601HLEkyNHIoZWBBU9CDU\/rv8An+evqc71tdt22TbaV+iTdktNtj85\/wDgnh+2l4n\/AG2vBfjn4j3Xw+m8MeCNP+J3j7wx4K8QPqvheU6jpfhvxBc6VD4d1fRNK8Saxr+leMfDkUMMXisazp2j2\/8AaE7W9raxSwTwRfffiLxR4d8JaTe654m13SfDuj6dE82oavrV7baZptlFGm95bq9vZIbaGNV+YtJIBjvX5s+EfCGjfAz\/AIKleKdG+Hwm0nwp+1Z+zB4m+NXxO8HWRlPh2H4x\/Bfx\/wDDX4e2XxJsrBrg2mi69468E\/EC38P+KprGzt08QS+B9Dv75p9ShuriTpv2qfD3hv8AbMGs\/sseHtE07xLZ6VqFhffFH4hX0FzLpPwrdFZ7bTfDlxBcWkGp\/FO5gkkax00XEtl4dtZv7T8QxlZrHTdR6MNRVaolOThTTXtamjVOF0nJ82lkr2V9bH03CeSYXPM5wtDNMTicuyChVpV+Ic4w9CnXeUZRGrThicbyV62Ho1KqU1TwmHlWjPF4qdHC0Y1K1anTnzkn7b3hn9q74kaz+zT+yD4vk17XNLspNR+Jvxx0nSZ5vB\/w08KGc2Fwvhm\/v0gtPE\/jzWZC9h4ZNvDdaDZSm61m4l1GPSJbCf8AQXwX4Xs\/BHhjRPCtrPql3pvh\/SrTTba+1u\/n1TWL37PCqyXWo6lcyyXV7eTsDLc3EzFpJi7cDgfFv\/BOr9iHT\/2K\/hn4m8O3T2mq+MfGHirUtU17xFAkQmu9E065m07wdp0kkQUMLLRIo72aP5hHqOqagquwGT9HftR+NvGHw7+B3xA8V\/Dzwxq\/jDx7ZaDdWvgrw7oenz6nf6h4p1Tbp2isbaBHY2dnfXMV7fyy7IIbKCeSaWONSa6qyprEfU8LUVSi60FGrbl9pJ8q511XZdOvK9D7PjzB8H4zjXD8DeFWJrYrhGhm2By3K8+zipQw+N4jzLFOhhMTn2aYmVHDwwuClXnKOBwrjRw2BwFGNSUVXr4utV5r9m3UdO1\/X\/2jfFWnXlrfR6p8e9f0d7i1dZVDeBfC3hHwPJaSOqhRJbXegXiPGJH8uQsThnYD6or8KP8Agh5L8X\/Dfw5+Nvw9+MOg+K9O1ST4gv8AFTRda8Rab9ms9fj8fzala+IpdLv45bi11A2\/iLw7czagyTM8dzqB6xMjH91xXNjKcqWIqU5pqUeXRpXtyq22lv5e6s7WOHxg4U\/1H8R+J+FY4\/C5rSyXE4TB4bMcFVp1sLjMJTy7B\/Va1GpSnUg4+wcINKb5JwlBpONkUUUVzH5oFFFFABRRRQAhAIxgfl6dPyr4E\/a4\/bK\/Zj\/Z+1rQfhz+0gtxp\/gfx1pmrHxf4p8UeAvF2pfDDQNCh0u9nt28QeKE8Lan4Pupb+9tUsLnSf7XGp6VDcwaxqVnbaWyXZ+3\/E2uab4b8P614i1jULfStH0DS73WtX1O6lS3tdO0rS7aS+1G+ubiUrFBb2tnBNPNPKyxxRo0jsqqTX5V\/swfBuH9t7X\/AAb\/AMFAP2nfDTa\/p2pzS+J\/2L\/gf4st4rjwp8EPhNeiT\/hDPivrXhW4+0afqvx\/+KejSQ+LNV8SaoLmf4f+HtV0PwX4Xh0y603X9U11qUotOMnGSaaa8mn+hpSq1KFWnWoznSrUZxq0qtOUoVKVSDUoVKc4tShOEkpRlFpppNM88+GH7TnxcsL94\/2LP2bv2jP2jf2f7lLyPw1J8VLHSvgR4d01k+3Cxb4W\/EL4263oHivxF8PjJbxR2MV34F1Kwj027t5vDGuXVrbR6c3O+FfFn\/BWPR\/2ovEPxq8Z\/sneIb34Va34I0PwtZ\/CfwR+0b+zPr\/2A6HrXjbWEju7\/wAT6T8PbgEHxZYhNUsdUk1K5\/sX7PqU91aG1ij\/AHPW2hVtyxqGwBuHBwNmBx2+ROPRQOgAqUqpAUjgYwPTHTB6gj1q51JVGnUtKSVrpct33ly2u+99X1Z25nmmKzfERxeO9jPFulCniMTToU6NXG1Ic3+1Yx0oxjXxk1K1bEuKq1+VTryqVXKpL80E\/au\/bf8AENpNaeGf+CYvxO0rXQUjtp\/ij+0f+zf4V8IpI84he51DVvBnjH4k+IVsbeJjcuNN8IanduqmOKykkK18pfBL\/glx+0YPil8Tfip8UP2o\/HfwF8MfFzxBp\/ivxB+z1+y78WfidrdhYXjWFu2taDN8b\/iRcWuqnQr\/AMQPq2sxQ+Bfhd8Ptc0ZtZvNL0rxadJ\/cv8Au4qqv3QB16e\/X\/H65Pc06pjJxTStZ9OnrZf1qcca9aFKrRhVnGlXdN1aafuzlScnTk1\/NT56ihLeKqT7ni3wX\/Z2+Cv7PHg6PwH8Gfh34d8AeGvt13rF\/a6JbOL7Xtf1F\/N1XxL4p1q6luda8V+J9XnJuNX8SeI9Q1TW9UuSbi+vp5Tur2jAAxjjp+FLRSbb3bZk222225PeT1k3pq3u3otX2CiiikAUjHANLRRv5AfzjfFH4F\/tN\/tGf8Fcvi7r\/wALvjff\/Bz\/AIUpYfBTwNrl7bafoOqX+i\/s2+MPgZ8Qtam1Dwfpms2zPfeI\/iR8YvGnjLRv7RR5NL0K4+G+na3fxT6v4Z8OwN++Hwz+GXhT4U+GNJ8IeD9Li0vR9KhlRUWWS6u7+7uZGnv9W1a\/n3Xeqa1qt28t9quqX01xe397NNc3M0ksjOfj79q\/9nn4vP8AErwj+17+yleeH7P9ov4a+GbrwPr\/AIE8W382k+Av2kPg7d6iutXXwq8aaza21zc+Gdf0HWGvvEXws8eJa6hD4T8RahqVrqun3\/h7xDrNvH8YftF\/8FD\/ANrG48FeF9H+Dn7En7YPg34t2XjjwXJ8QfCuvfs+a\/4\/sI9F0nxv4b1LxJB4S+Kfw08cv8MfEOg3uhWXiDSb64j8Stf6xp15FFaWek3Ek89vqqslSdKOkG7ys37zWzeutvu8julmOKlgY5bGo6WCVWOIq4em5RhicVBShTxOJTbVWrRpzlToXShQjKo6UYTq1Zz\/AHZ98c1zPi\/UItI8Oa1q87KkGk6TqWpTSNjEcdlY3Fy7nPGFWLPbODg5r82fCv8AwVU+EOgeHNIuP2mvhb+1B+y9fR2tla+IvFnxp\/Zi+KfhL4VwawIoYtQvD4\/0S08eeD\/DPh5r9phaXvjDxXpgt7VVe\/uYwrzH1L9oz9sT9nuD4L3yeH\/i14M8ST\/GL4bfEYfDDUfCXijQddsPEL2fgPxJq8N3YajpuoXUDW14mmXNrpd0vmw32qxpp1t5t2wiKpW9pTvtzxT6Wu1rfy3Jy6jHE5hgcPP4K+Mw1Gf+GpWhCW918Le6fo9j3P8AZV0+Ww\/Z6+DSXgRtQufhn4N1HUZUjWJZr7V9FtdUvp9gJ2tPd3c878nmTls19D1wnw90yLw74K8K6EilE0Hwt4e0ly+QwGnaRa2vPAyAsPXaOh+UV3SkFQQcjAwfWnXblWqS\/mk39+q202NM2xP1zNczxXM5\/WMxx1bmk23L2mKqyu222273d3uLRRRWR54UUUUAFITxz07\/AI8UZ9j39P8AH+deS\/F\/4maT8K\/CGpeKtWjvb2RWs9L0HQtNBk1bxN4m1S4Wz0Hw3o0AKNPqWsajLDaxKGCxI0lzcFLSGeRLpwdWcYR3k7L+vx+RvhcLiMbisPg8JRnXxOKrQoUKNO3NUq1HaMU5NRjd7yk1CK96UlFNr8dP+C3fxM\/aC0b4YaR8MPgb4i8IX9j8T5rL4a\/EzwDd+HvElx4hg8B\/HS38Qfs\/XPia71vRvGmlWM9nL4o+J3hC08F+F77w1dSX3jWyt9YbUX07RdQtoP278C+HNN8H+DvC\/hLRkMej+F9A0jw7pKGaS4ZNL0Swg0zT42mlZ5JHSztYVZnkkckfNJI2XP5Hftc\/DXW\/C3wX+FWu+Mb1NW+KHxw\/bt\/YXf4ianFI\/k2On6f+0d4D1\/RPBGhTGVTD4c8H2+kpY2aB2jvrr7fq88D3eqXEi\/spaoscKKihVGeBjAJYlsYAH3snjjJOK0rRpQko05Sk1GKk2rLn5Vz28lK6XlZ+R35xTwOFxCwGXVfrdLCRVPFY9STpY3HWTxFbCR5ITjgoVHLD4R1F7StRoRxc1D6yqFGxRRRWB5IUUUUAFFFFABRRRQAUUUUAIyhhhgCPQjNNWONPuoq8Y4UDI9\/Xv+JJ7mn0UAVbmxsry3ms7u1t7q0uEkiuLa4hSa3njlUrLHNDIrRypIpIdHVlYE5BzX4fftdf8Eq\/AeheIm\/ag\/ZD+FXg+z+JPhfU9U8UePv2bIgmh\/CP9orS77S9U0\/xHZafo0EcWkfDX40z6Rq2qN4L+Inh23021vdckgsPHFnrFhdJe6b+5dNKIc5VcnknaM56Zzjr70F06lSjUhVpTlTqU5RnTnBtShOLvGUWtU01dM8K\/Zw+O3w+\/aV+EnhH4y\/DS6vZ\/DPi3T5GNlqtubHXfD2t6XeXOj+JfCPifS3Z5tH8VeEPEFjqfhvxJpNwfO0\/WNMvLY71jWR\/dx7dK\/nS+MvxS+N\/7Cf7e3xG8F\/BbQ\/DGsfA79ozxV8IP2pvG9nr\/ivxD4esPhjd6ynxC+FHx1125s9D+F\/xIudO+GnifxR4b+Dnifx34psbbT08GeKfEseqX0M1j4p1bUrH+hHQNTXVtNtdRSW0njvbW2ukm0+7+36fL58CSs9he+VALu0O7\/R7oQRC4jCzeXGXMa21Jrna0fXpppbyfk9bGksLXhh6WLdCpHC16tWhSr8j9jOvSjCpWpKoly+1hGpCpKm2p8k4zs4yTe5RSZ\/P04z9etLUGAUUUUAfM\/7XHxzt\/wBm79nr4tfGue1t7+bwB4K1XWtM065lkSLVde2i18P6QVheORv7T1maysysTrKwm2xneRXxL+xP+1N4B\/4KBeKp\/istxLpdz8M9Ks7Twp8KL+G8kvPC+r6vYwx+JfH2vXBtW0G+1DUbt7rQ\/CX2HUb6XTfDsdzdTx2uoaxcRWvpn7ZHw1s\/2yte8O\/sp22u3+leDNH1LQ\/iL8e9V0eKGSW38P2D3svgnwPbXk8csFp4i8T+IIYdaJCSXGmaNorXkiRNf6ebj67+BfwK+Fn7PngHSPh98JvBmk+DfDWmRYS0sLcfarmc5Et9qeoSL9s1G9uG+ee5vJJJGLEKRGAo9NTo0MJd831qpZU7K3s4396UnfRyUbRVrtO90tH+yYevwFw14WVKOJwuaVvFniPMMRiMBi8NUjQwWQ8GV6GEwypZh7enVdXF5w6OLnQo4anSrPLMfKdTF0qVdUsR+V3\/AAU38D\/Gyy+Kv7HHxTtviBaN8CfCf7VH7Pmj+I\/A8fhWOE2Gt+L\/ANo79nXSfDFxf6umvqNUjmurDxFcQ6jNoYbQZZ49NimK60zR\/txFny1yoU87gOmc4JHscZH1r81\/+CtmsWfh79gj48eMG1ey0fWfhhaeCfjN4QmvJ5bZrvxp8FfiD4X+LXhbSbT7NZ6hcXOo6xqvguDTrC3hsboS3Fwqzxra\/aJY\/vX4beLrbx94A8F+ObFYUsPGXhXQPFVgtvdJewCy8Q6Xa6taGK7jSOO5jNvdxlZkREkB3KoBxXnNS+J9X163u7+a89j8gdCtGhDEOnONCrOdKlVkmoVJ0oxdSNOT0n7NShzuN1BzipWckn29FFFSZBRRRQAUUUUAFFFFABRRRQAUUUUAFFIWC9SB9eK\/NT9o79uPUU8dat+yx+x74X0748\/tbIlvB4hslu51+EX7N2natAZLTx9+0Z41s4JrHw\/b2tq8eo6F8MtPuLj4jePLlYbHRtHt9Mlu9esD+v0\/UPv+5mDoNnY\/Gn\/gqZ8ZNRs0t9W8F\/s7\/sb+E\/gh41jktbW80m6+Inx4+JN38UNR8LXc7PJ5t\/o\/w98C+DtT1LTJIXSGx8b6e0xX7WqS6PxA+IVv\/wAE6dOvfEHie+fUf2Rpopl06F7p7vxN8GfEcrt\/Z3h3SrWV3vNe+HOu3ckOn6TaWMVzqfgzULiK3Mdx4dkaXSOI\/wCCbf7Ff7Qf7Iviv9pG3+KHxi0T4raJ8VPiVb\/FDU\/Gc3gm90bxh8TviP4m8DeC4vGfju9vJPiZ4mtfDthBr2manoNr4WtvDWnWKWFnp\/8AYg0vRrS001fsr9qT9j74Fftf+EbHwh8bfCQ8RWeizXF54f1O0vLrTNa8O6hOIRJeaTfWcsflyyLBEssU8c9rOqCKaCRDtHVhakI1FCs\/9nm\/3q5ebZaSiuaDUunMpaJvSWz+34DzbIMFneFy\/jV5jV4FzLE0YcTYXLKFLFY9Yalz+zx2VU62JwsMPmuElOX1XGQrKVKnVrwnRxmHrV8FiNf9lH9oXwp+1J8DPAvxu8HhoNM8Z6WlxdabLJvudD1q0kksda0K7yEYz6XqNvPa+YYoxdRLFeRAwTxMfo+vx3\/Za\/Z21z\/gmTrOseA08Xa18QP2XPid4l0240HVb62efXfg\/wCObsxaVAPEkVvugm8I+LALCxl12zhgj0bW7ex+2WVvp169za\/r1ZXHnq33SUkKNg98Z+nAwO+eOaMTQjSlzUpKdCetKUXdON7W1Sd07pppNW1S0NfEjJeH8n4pzGpwdmDzfgrM8TiMbwpmTjVhVnlk588cBjaWIhTxFDMsqdSOCxtHEU4VZSp08VFTw+Jo1Z3qKKK5T4M8w+HHwu8P\/DKy16DRpbu9v\/FPijWPGHiXW9Vm+16zrmtaxceY82oXgVGljsLNLXSNKhCiKx0ewsrG2RIoBXbapq9npFrdX19cWtrZ2dtPd3Vxc3CQxwW9vG0t1cTSSFVihgiRpJJGOFQFmwAcW7iTYXBwMp1bjqCAueAD1xk8da\/l5+Jf7S\/7VP7Qn\/BSX4wfBb4IeENX+Lv7O2l3fhH4f\/EfwfBe\/wBi+Db6x8DtM2vnVPHDpe2\/hm01PxPqOsaT4mto7G6uPEWi6b\/Za2s6yRMe\/DYWrjZzldSUIKpUk5Rgow0ipOUnGKVly3u7e6rNNW\/VPDrw6zvxZzLiev8A2xgMtwvC+Qz4lz7OM8xdPCYaOBw+KweEWChjMTKGGhmGLhWlTyujXq0MPUrYeNGdWjRUqlP9Dv2j\/wBnrxp\/wUf+GPjrWrDxhqngvwFd+HfEHhn4HeGJrLw2NE8bx6zaXmga78SvG0firwZ40mGm69pdxPb+BhpulWWpWOhvLqaXiHxCywepf8Exda1\/wN8JvFn7Gfj29ubv4ifsR+Nr34Hpe6mbdNR8V\/BFIRr37N3xBRLeC1guLXxD8I77QdAv763t0t38Z+D\/ABnYKEuNMuIo\/wBFfDVr9i0bTrMWcOnra2UFsLC2Ie1sVhiSIWdqwigDW1vsMUBEMSmJVKooOxfyy\/4KBa\/bfsi\/Ef4cf8FDfDbb7rwXHoPwV\/aL8A6YDNr3xg\/Z48Y+L7Ozsbzw3okAe98ReP8A4GeNvE6ePPClnYW897eeHdT8d+G43jHiGJ4uavUVSo3GKjCKUKcYu6UIpJXd2nKT95tO127JLRfCZ3msszxMY06aw2W4Cn9SyrAwlGpDB4KlJuMXUjpWr1qkquKxmI0eKxuIxGI92M4U4frZRXIeBPHPhL4keDPCvj\/wP4g0rxN4O8a6BpPijwr4h0e8jvdL1zQNds4dQ0nVLC5QlZrW+s7iGeBx1VwMAggdduXAORg9DkYP0PQ1ieMLRTfMT++vHJ+YcDnnr7H8jXivxm\/aQ+An7PWir4g+OPxn+F3wk0eQsIb74ieOfDfhGO6Zc5isI9b1Kyn1G4OG221hHc3L4PlwuQRQB7ZRX5Y+Iv8Agrh+zhZaa2teCPAP7UPxd8PItrLJ4x8B\/s1fFbSfh2tteNHHb3SfEn4qaJ8NfAU9vK1xb+VLa+Ip4rwypHYNeTSRRv0ll\/wUX1GLTrfXPEv7C37e+heGry+uYbPxFp\/wO0Tx1bS6RGJpbHxFL4d+HXxA8W+PbXTdUtIku4Yp\/CAv7UTR295aw3BKU3GSXM4yUW7J8srN9r2tfyOl4PFLCrGuhUjhJV5YaGIlFqlPEQh7SdGE3pOpThadSMbuCcea3NG\/6VUV8ifBP9uj9lv9oPXLjwf8NPi94cn+IdhEk2rfCfxjb6z8NfjDokeSJm1j4T\/ETTvDHxB05LcgiW4n8O\/ZN2zbOVljdvrdZonwVljYMcLtdTk+gwTk\/SkcxJRRRQAUUUUAfn\/\/AMFRPi\/40+Bn7Dfxu8f\/AA81XUfD3jM23gvwPoHinR9LuNb1jwbd\/FP4h+E\/hi\/jXR9Is7a+u9T1rwdbeL5\/Emi2FrYX1zd6tpllbw2d1JItvJ8VfsI+FYPDfwWsfjH+wtoXjPTPCPiC8fUvif8AAD426N440GT4geLYVNlrPxD8LfE34h+GNJ8QX3xD8WpYRav4k8Q3Emu+DvEXiK6vF1STTdYN7qVfUP8AwWE1C2h\/4J3\/ALQekx3GzxH4tt\/h94G+H1rCEkvdR+KXi\/4p+CdC+Gmm2EJjmaW8ufG95oaokUTTJGss8YBiyP0J8LeGNK8L6BpOiaPptjo2n2FlDFDpWk2sNhpto7BprhLW0tUitoUe5lmnby4k3SOzsCzsa2oVfZVOblhJNcsozipRlFtNx11je3xQaku9ro9TKc2rZRiJ1oYXBY6jiKf1fGYDMcNHE4PG4ac4OdGrG9OrSlHlU6WJwtfDYzDVFz4bFUJ++fJUf7e3wB0jS9HufHGvXXw38Rah468K\/DXWPA\/juz\/4R\/xd4Q8XeMLi7s9Gg8Q6ZO+E0S8v7OW1tPFNhLfeHLsbZ7fU5YCXX7Vt5vtClwYyp+6Y23oxK5zuAwQCDg98Z9h+M\/8AwUk\/4JS6t+3Zren+L9P+O2qeDNX8OaQ2meGfDOpeEdF1PwlYu6K95cy3dktj4ka51G4jgkknuL6+NmsHlWUcMbzJL65+zX46+Of7I\/w68G\/B39sl4vEthoNrb6D4c\/aQ8NnUNW8HXWmW6pb6VpnxLuL5U1rwxrNuu21i8R6pazaJqlstq+o6pZ6kboSd9TC0K1P2mDq06lTlUqmGcmq9N2i5KMZKHtLK+sFJvXdn6znvA\/AGa8G5Bn\/h3xS8dxjiK2JlxR4b4pYuWZZXRlS9phnkOMxWBwMM\/p4eUalPEUcKquNSqUVTjio4evi6v6cXUAnZI5IoJrZ1IuIp08wPhkaMqhBQ7SpLBxjGCnziroVV6DFZ2malb6raw39jc297ZXUcU1rdWkyXFtcQyguk0E8TPFLC6FXjkRmV1YFSRg1p15bUotxd01uu225+JvmV4yUk4yknGSacZJ8srxdmmmrPToFFFFIR89ftBfEzUfAWgabo3hO2Gr\/Ez4iaing\/4b6AQWjuNev4pWutc1MhSbbw74R0xbrxH4hvC0fl6dp728Je7uraGSX9nn4D+DfgL8OdK8E+F4Yp7oPeap4r8SvaWkOreMvFusXMup+JPE+tz20Sm5v9Y1i7vL2TexEAmW2g2QRRoPaLvQ9MvNRsdWu7G1uNR0yO4i0+9mt4ZLqyivFjF6lrcOjTQLeCKJLhYmUSrDGHyFFX3KQg4IQYLcAAk8emMnp1x\/Wun27+rxoQ5k3rVttNp6J9eWKs0u716W9uWdVaWRLIcEqmGwuJxccxzqftX\/wqYvDqvSy6E4xUIxwmWYetVeHpTVSTxeNx2InJ\/wCyqhMihBgHjnAwO\/PGOwHAHpXy9+1P4e\/Zx1jwHaX37SMXhb\/hE9B8YeBdd0278SWem3MsfiXQPG\/hnxN4c07SxeWl3cXL6z4h0DRrS+0mxikl1qwE2nTI9vKyrn+KP2m7iXXdS8HfB74aeNPjB4p0u+m0vUrjT9Obwt4F0S+hle3uE1nx74nNhpLGznhljurfQItevVYBfsmeD+Sv7X3\/AATf\/b7\/AG6fHuieK\/ij8cPhX8N\/B3hm+S58IfDPwVeeNtU0zww0LRyx61JePpenLq\/jEXESvDrskNu9lEBb2IgiUiTfD4FznD6xVo4WnJNuVeooSSS0fs9ZtNtJaas\/QuAfDjJ83zrAx8SOMcq8N+G54d43EYzM5vE51iaHJzUKGX5Hg6eKzCM8Y3D2WMxuGw+DVBzr0p4iUYUanuPxA8Bah+yP4mvrL9jP9qOw8DxeKtU1HWo\/2NfGHwn1D9pLwDFrery3F9dTfCzwn4J8XfD34j\/B3T9TvpLi4uNFt\/HKfC7Tp5Jbiy8N6MzTSS+Q\/D79p\/8A4LT+O\/jxpPwG8XfBH9mb4Kwaj4T1fxmnxHu\/h34p+JOnjwvZavY6FZ6zc+GNN\/am8OXeiiW\/1KCK60yXUNb1a1lRlTTby1Mt1D+uX7MnwA074GfCzwp4W1HTvCk\/j220exh8c+M\/DekS2Fz4z1+0jMVzr+rXt9Lc6zqOoX4CzXtzqd7O813JPIgiSTyl+iClhaO17L5KSxW7RNcypEJY7bcZWQz7PMEOYvMZTJ5eUDkAgEY1pYdN06FOUrae2nJ+9srwhTlyxjeygpud1ZuMZaL4zPJcMYGWJynIMNXzR0MVVoPibH4iUZY6FGq6dOvlmU4aNHD4HDYpJTUMdUzPEuLpuNTDylOivzptv2Lf2hPiQsLftHft7fHfXtOzHJd+Bf2c9D8G\/sueCbsZSR7WXXvDFl4q+Ogjd9yym2+NFiChxDHExd2ev7M\/7C37F2nH4haZ8GvDV\/461K4XSdM8Q+I7fUvjF8e\/H\/iG4VzaaHpHjL4h6h4o+IXiDW9SuBu8ltf+zQoZbq7a2tI5p4\/Xtd\/bG+HN54e0m7+Ec6fF\/wAY+NNX8R+Hvh94K8L3EJvde1PwvrF7oGvajqV5Kfs+geEtD1KwuTq\/ibUAtlDarG9oLue6s4J9r4WfATVLfxBH8W\/jLrEHjj4zXUNwlnfQwlfCnw50e+O9\/Cnw70q4Qx6Zbqnlwar4iZB4g8RyQCTUboWq21lbunRjTUK2JuqUo80IK6nW7cu1oPaU7+70TehtQ4bWVUpZjxfSxuV4enUq0sLkrpyw2c5zicPVlTqUoU60VPL8tpYmjPD43Na1GajOFXD4KlicVTrQoch4M+Dfi74r6\/o\/xV\/aMsUguNIng1L4a\/BKCRdQ8J\/DiVJGkt9d8SyQCWx8YfEYoIC2pS+Zo\/hd0Nt4ZjWb7Tq179qxxBMgZwVx2wB6D0xknp\/hUgXGPYAZ5yRjHP6dSadWVavKtK7ioQXwUofBTVlot29tW223uzxc3znGZzXpzrqlQwuFp+wy7LcJB0cBluF5pTWHwlDmlZOUnOtXqSqYnF1nLEYutXxE51ZfHH7Y\/wCyH8MP2q\/hR4q8IeJ\/h54H8ReNH0G+X4eeMvEEV9o3iHwJ4qWNpNF8Q+GvH\/hmJfG\/g\/UNL1FLe+h1Dw1e29yJIVV47iEyQP8AjH+wv8Zf+Co37KOg6j8NP2lvBfiD9r3SPADz3Gq+C9N1HTJf2v8Awt4Bjmez0L4g+Dr\/AF+Tw54X\/aL8B6nNZ3IutDvNb074u+ELpjpdzq\/j24OnWkn9MEmdp47HOSQOh645x3OOfavjD9sHTvDHhjwC\/wAdm8Xab8OfG3wWiuvEnhXx3qNre3WmhJAo1Lwd4ot9LtrjUNR8HeMVgj0vWrC3hlmgkWy1awVNR021kXTDpVP3D911JLlkkm1LRJSSXM43srJpXbk72O7hrD4fNsZDh6vQnKtnVWjhMpxGHpTrV8NnNScaeBU6NKnUr4rCYqU5YbEYenepTlUpYuhCpVw6o1vLdM\/4KzfsLpewaX8RfjHP+z7rkkZNx4e\/ac+HfxL\/AGcNUsrhbNLyW1mm+MnhLwfpE8sCMyvJYand2kjIDa3NyskbP9T+F\/2rP2X\/ABvHby+Dv2jPgX4pS7j822Ph\/wCLHgTVjPHjdvjWx16dmULyWAwBya\/KT4PftA\/DL\/gsP4G+PvwV8T6V4p+HNv4YbwjqXhiHRvFfjnwr4guNE8R+GmsNR1PVv+EO8TeF5tesbTxJFr9gdH1C+l0qS0k0S8vLGO9W2ki\/QiD\/AIJ4\/sM3Gi6Po2v\/ALJnwD8apoUM9tYap8Sfhd4S+JXiYx3ErTTPf+LPH+leI\/FGrTTM+JbjVtXvbiSNYoXlaGGJEyr0amHqSpVVacei13fX+k+9i+MODuI+AuIcbwtxXllbKM9y+GDqYvA1nCc6UMfgsPmGGfPTcqc+fD4mm24SfLLmhK0otL2\/xR+0L8A\/BMBufGXxu+EfhSAAt53iT4j+ENEiwsZlJD6jrFuDiIGTjOUG4cc18V+Ov+CtH7Hui3Muh\/CXxfr37VPjZ9S0vQ9N8Efst+E9Y+MVxqGv65ew6Xo2jXnjfQ4U+FfhafUNRube1Fz4v8eaDZ2oaW4up4oIJXTlf2k\/+CQP7FHxd8JaPYeBPgV8I\/gV4l0Hxh4I8RQeKPhF8MvBfw+v7zT\/AA\/458KeJNY0rVLjwfoGk39+t7pGgXmn6S0t2I9I1DUf7SWOUxNG3uPgrwRouqfGrwb8NtAt7ofDj9lvwVpc8i30pvrrU\/ib4o0htM8MPql7dL9qv9X8N+Bl1TWr+\/nTz5tQ8aWlxJKZ42xVKkpqUpNqEIuU2kr+UYpvVu\/4nl5VgI46pi51pypYTL8DiMfjKkFFuFOm6dGhCDk0nUxWOxGEwcE1pPEQk\/dUnH8q\/jP4d\/4Kj\/FX9q79lv4+fE39mf4Z6x8Dvhv4q8TeP\/C37J+lfF681K+8G6xp3gzXRZ\/ED4r+JLPwJP4N8T\/HjQ3v4X+FtjY+I5fhjoWqte6fZXN14lmsPHln+8nwn+MXg34r+Gf7f8O6l5a2Ekmna7pGrQS6P4h8L61Zon9oaF4l0XUPKv8AR9V08t+\/guo1R4miubaW4tJoriT1Ca3DoFIY5OOApxkck4XgcemB7HBr8Yf+Cqnwn\/aWbwrfeL\/2QPhlqWo+M\/EvhjVvC3xU8U+GfFqaZqmseBr2H7NcaFc+A1hRPF+qpBI0mi68lzb634ejins9Luoob6cDbB0aOJkqEpOnVm1yVG0oczS9x3tdOzs1qm1dWufWeH3DuV8b51gOD8dj8v4ax2Z4vlwHFOZY3D4TKcInGLqYbOY4qpQjOjU5ZPCV8JUeMhXlHD\/V8bCpBYb9p454ZRmKWOQYDZR1YbW+6eD0ODg96pappVhrNnPp+p2sF7ZXKPDdWlzBHPb3EEiFJIZoZleKWORDtZGUqQTkV+W\/\/BLH9q\/WfjZ8GB8N\/jIt94d\/aG+DEdn4P8e+HPE9reaX4j1awsrVF0fxc1nqdvZXV5FeWgWz1S\/gt5bY6paXEpm\/0mNa\/VWOWNwNjhugOOx\/\/WCKyr0amFrypyUoTpSVm00009JJ6W1Wj0PK4z4TzjgDivOeFc5UIZjkmYVcPHE4Wpz4XG0KdRSwWaZfXi7VsHjsPKhi8JXhJqVOtTd1K6XL+CfBHhf4d+H7Lwn4L0Wy8O+GtMNwNN0XToRBYael1d3F7NFaQqSsMJubqZ0gQLFCriOFEiRVHW0UVg25Nyk3KUndttttvrdnzNWtVr1alevUqVq1acqtWtVnKpUq1JtynUqTk3Kc5yblKcm5Sk2222wooopGYVE8SOSSOTjnjt06g9M1LRRdoCollboSVjUEsX4AHzNyx4HG4gbsfewM\/dFWgAOB6YA+me34\/wCe60e\/pRe++oETTImd2RgZPGe+Oo757da\/O79t\/wCInxa8X+CvFX7Ov7K9ouvfHHxpYQabrWsRXsdho3wq8E6zMtvq\/iPxHrskc1tpetX2km+t\/CmlgS6pd3Up1GO0FpatOv3l4o0nUNX0PV9P0rVLrQtTv9PvLOy1uxhtLm80i5ubaaGDUrW21CKexmuLKWVbqKG6hmt5ZI1SaN0JU8Z8L\/g94Q+Ffhr+wNCgvbu4vbmbU\/EXiDWryTUvEninXbzm+1zxFq0p87UdRum4LuFht4VitbSG3t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\" 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5jJCdahUt7TAqldK88NKorf3uSq6sXp0Uoevf5elnvCWbU5\/2v4fU8FThFyrZrwXmWb4DEUIKUaUsRXwmeYniLKa0YVatPmp06OXRk5QpLE4dzhM9F0\/VLDVLS2vdPu7e+tbqGKe3ubWWOe3nikRZElhliZo5EdTuR0YqeoOK83+LHwU+Fvxv8K3\/AIM+KPgnQ\/Gnh7UIyk9lrFok7wNg+XcafdDbdadeQljJDeWM1vcW8gDxyAjNfGt3+xx43+BM9\/4r\/Yn+Il38P0Fwb2f4DeO7zUPFfwK8QICDcWOk2NxO+v8Aw7u7hAqWt\/4X1NNNtZQhn0W4gBiPSaL+1z408YWWqeBPCvww0XRf2m\/DU1lJrnwS+MPxDu\/hpaXugu7JqPirwf4403wN46TxfoMDIBY3WleHnWSSQQas2isEeWHQlSf1nB15ShSkmpx56WIpKyd6kIvmhr9qEpwaT97e2f8AYOKy+C4t4Bz7E5thMplTxdXGYGNfJ+JuHJRlGVPEZll9GvVrYehCaTWbZVjMflsZOlGtisNXqRom\/wDs3wWnwU1XUf2UE22mmeAtO\/4SL4Q3UrNI2tfCXUb8xLp7SOzPdaz4G1+abw\/rUjsJZbC88OarM8kuqyRR\/bayKeFBOOOBxnvg55wev61\/Jz+2T\/wVR+M3xcb4W6J+xT8EtZ+JPx+8BeOfHcHjP4k\/A638bePfhb4DbTbjVPBl94T0j4z+P\/hx8J\/hT45i8TQsIdZil1CXTtI8R2On29st5qWmaffDpfCn7f8A\/wAFdfBvwx+GGh2v7I2pT3nhbwyul\/FPxL4xuPg78ZPHnirxSt7d3lzruh6RpP7XPwfFlbtaSLZ2+i3jXtzcm0bUIr22tZorFXiFGrGFZThzyUXUgmnPnn8U5W0V2r2vp03bHxVl+Gx2T4HjqpxBk2IzviPFVFm\/D1HGSxOd08dTeJ+vZ9jadKM8Pg8LmdelHE+yr1\/rtTGY2vOGFjhVTqP+qRiArE8jBPrkY9q\/MD\/gq9+0N8Qv2bv2Ubzxv8J9WutJ+JWofEP4c+H\/AArLZWaahczz3evxX2pWv9myQTx6jDfaPpd\/Y3Vm6KLiC5khR0kdGr3X9lb9tn4LftX\/AAn174jeCNX1rRrnwLqd\/wCFfiz4N+Iegz+AfH\/wp8ZaNpsN\/rOg+PvCOq3c1z4cnSylTWbC5F7qGkalotzb6jpWr6lZMs5p\/CzTJPj341tfj94x0xx4N09r3S\/gD4W1a25h0R2MeofFnUrC5VWg1zxlEqjwz5kZutG8IG3lBt7zWtRhhnBwhGar1oc9Gk7zp6fvens\/evHX7SlF2S17PLw9xGW5HxBlvGfEGU4fO+G+FczwGPxuTY3lWG4ixca8Z4Th395SrU5RzHkqPGylSq06OWUsXVnCcvZUa3k3\/BNjxB8WPiH8JdS+KPx1+FfiT4efFvx34kOseJtX8TGxt5vGWmrE8fh6bRNJFta6noHhjRNKNvp+laDqVpDPbu092013Pe3d1N+mA9ent\/X8fXuMVXEMcJ3KmFXJ6k4J5yMsemDjoB0AHWqEuvaXBNPbSXlsLi1t4ru4txPEZ4LWdpkguZod\/mx28zW86xzugidoZQrEowGeIqvE1pVY0+RSfuwj73KraRVktrdEkuiPH4tz6nxVxNnWf4bJ8JkOHzPFSxOHyPLquJr4DKcJFU6NDBYSeKnUrQwmGpqnRo03KNKjDkpUIUqUYU47FFeR\/D340+C\/ilq\/iWw8Dzajrel+F7qHTrrxbb2Eo8Ianqkgna803w\/rshW216fSfIVdTn0sXNjay3ENv9refzY4vXKxnTnTfLOLhKydpKzs9tOh4uMwWMy7EzwePw1bB4ukqbq4bEU5Uq9L2tKFamqtKaU6cpUqkJ8s4xklK0kmml+WH7cfwd\/4KCeIfh5461r9mv8Aadg0PU7CHVtX0LwBYeANB0nWdWsmUGPw5a+OGuLm5hvra2SX+zL02lvJcX0ircSIPKlh+fP+Cbvi39sH4M\/s2aN4w\/aL+GnxQ+L8vj7XvEXjTWfEq+ND4q+K\/hiykvJNLtdJ1r4feJ30+7S2sLPRo7iOz8L6zqt3Kboyx6WZ5niH7oMiupR1DKeqtyD9c9fxqBrWDYVWGMAkZARcH5gTxjBzjnjmu2njoxw8sPUwuHqe0lG9S0oTUVayTg42aevPZ9nFo\/U8N4t11wHPgDM+DeDMyy6ecYTNJZpRyXD5Fn8qOFw2IpLA1M2yGOXYnFRderDFU62Pli3GrFqtTxFNqC8d+Gn7Qfwq+Llrfy+BPE8Or6ho0Svr3hqe1u9I8YeH5Xh85LTXvCWrxWXiDR7qRQRFHf6dAszAiF3Ck18YXv8AwU2+Evhfwv8AG\/xf8W\/Afxm+G+jfCz4p2Xwr8N6Zf\/DHxZqPi74m+Kda8M+CtX8OeDvBnhXTbC51PWfiPruoeK57e08HafFczWuj6a3iTU72x0Zb66svqz4t\/s2eAfihc2fiNv7S8DfETRgH8O\/FPwFfHw5460OVSrCMapbwtb6zpbsq\/atB8RWuraHeoNt1p0uA1fi\/8ePiXf3f7ev7JP7JXxTsfDfxO8c\/CMfGT9prXPFHhGybTIrrRbj4Y3nw18BePPiD4RtrmH+xfFMt74o1fSbHUc6l4f1Z7LUjpMtjd2i6Ra4ypUZJToVHpbnhUtGcXprF\/DOKb11UkteVnxWYZdw\/jMJWzHIcdWwypwUsXw\/nVWi8yw0ZyjD2mX5hRp4bC5zhlKSUksPl+Y07ybwNSjSninyrXP7Yf7RGpfGYX3i3Wv2JP2bfiL4xTxP4Z+EV74K+DvxO\/aA1b+1bTS7zxLrHi7xH4htPit8Kvhut94n00+JtG8G6ZofirxBo13e6jeeINc0+\/NvY2S6z+yx4i1y8tNa8S\/tn\/t7eJNX03VItT0fXLn9oiHTrCw1eCRobLVbPw1o\/gPRvAyXMFtqc3kzR+FJreISIJYpYSouPuXXbe5mheLS4JmuUdYnvCGdrsRWsBjSUMLrHlAvcQHdaLOZViHkFFQcS39qi6lkdb6OC01KEWm6O5maWFmMv72xS2eMzRYaRp7Z5QY7BVjEbPvOcua\/tF776z\/y2aSPDqY\/F1q7xU60vrLjCLxEXy1WoUo0k3Uioyc3Tjyzm7ynu3du\/yJq2p\/Eu\/wDGvwh\/ZL\/a5+Nfjj40fBT4w\/Erw9oXwY\/aAtZNf+FXxf8AAXxi8Ia\/pnxK0b4T\/GeP4P3ngTwH8RdA+I+kfD7V9I8EfESPRvDmq+H\/ABNCIL3SrrVtS0XVE\/X74uftD+H\/AIEp4T+BHwk8P6\/8Y\/jjqWiiDwV8J9L8SXura1a6HYwtHF4s+JfjbxHqOqXfhzwpaOqQ3nifxJf3upandyCCyj1C8lfZ+Tv7TXwR+IXxn8GeHtH+HHjfTfAHj74bfGT4TfG7wZ4q8TaLqniXw5Y+JfhR450vxPplrqPh7QdY8P6hdW+qPZ3WnXPlajI9vbzSStJFEJGK\/ssfG\/4rfsX+Mo\/A37Ufw78BeIr79oLxhYaBD+3f4N1zxLqGma98Z\/GD3Nv8P\/Cn7RnhrxebzxV8OdH8T6mtn4X8C6p4V17xD4Dt757Lw5bWWgT3dq9XRVGPNUrQqTUVzQgtIVKmmlSV3JU0ukdZX3Vrr2Mgnw3hFicwz+jVzOphVD+zeH6XtcPhcyxEnJKWaY6lKnUw2WYXlhLEYfBzhjsc6kMPQr4ODqYuj+snwu\/Ze1rWvEdh8Xf2n\/EVl8Wfi1bSNeaDpEFvLa\/C34VCZWC6V8PfC935wmvLSMmG58Za5Je6\/qUxlnil06B47RPtm3to4U2qgXnOFAA46YCgDH4V+bvwU+Nnxf8Ag3onxI8Qft6eOvg\/8M9G1P45\/ELw\/wDCvUbrW77Qob7w9H4h1Obw7ZWl3rtvpthN4fk8P20EvhJrgya7d2a3M2sSefhT7Jrv7bvwCmhjs\/hj4vg+Ovi7UI2XSvBXwRuLD4ga5dO3yq9\/PpF2+i+G7FWZTLqniPVNMsoU3N5kjJtOs1jMY4tQnKHw04Qg40qcVbSKiuSKu223a+8m3qenjMPxzxvUoZm8ozXHYGHPhMu+oZZUwvDmU4alLmng8v8AZUqOUZZgsI53r8tSlCm5OvjKkqs51ZfYwGP8\/wCf889TXgvx4+PHh74HaJptxfaV4g8W+LPFeox6B4A+H\/hK1S98UeNPEUsbSrp+lwyyQWtra20SG51fWdSubXS9Isg1ze3MYMaydT8I9b+JPiDwzNqnxP8ACOkeBtaudTuH0\/w1pfiKTxRPp+iGOE2Ka3q32Gxs31xiZWvodNW5sIDsjgvLkAyn5u8V3ukaZ+3d4Q\/4TKSMf27+z7qOnfCH7WWFt\/wkWn+NvtnxNsrKSZRbRa5faHN4JuYlgk+23OkaZqoMf2e3ctnQpL27hO0lCMpOMJKSny2fLGcW07\/zRfTRnPkGS4aWdY6hmlFZrQyTAZhmmJwOV42nVjmbyyj7Z4SjmGDdeDwvN7+NxWElNwwNHF1MPVU4wqx\/JT4yf8FF\/wBvLwR+2fovhvRf2aNcu\/DPh3wVoVt8Qvgl4b14\/ES61K21+6v9ZsdftPEmiWOmWGg+L7XSZbaOW1RdT09YYYYbue6S4jksv3s+CHxp8IfHb4c+HfiL4MuLs6Zrds32rTtUt\/sOueHdWtmeHVfDviLTXcz6Zrmi3sc1hqVjKC8E8LEF4nikf0K3sNIt\/PvksLOO5u9jXd2LWFbm58tRFGbiYIJZvLhCxxmRm2xoETCgAfF\/7O0mlan+0J+11rHgZw3w+uPFvw9sIJrPf\/YN58TdH8KTw\/Em60kRp9kkULL4a0\/WpbUlX12w1NLgfa4blj2V54XE0F7LByws8NTgpzjUcoVWnCErqUVZ80udPmel+ZNPT7zizibgzjzhPCyyLw4y7gTNeBcgyqljc2yfMcwxeF4jeIzPC4GtQzShj5VpUcZ7fH18VlOJljMRjJUMNiMFi62Lpwo1ML9U\/EX4e+FPiV4avfDPjLw\/pniXRLmSGd9M1KPzUa6tW8y1uoH+V7S7tpgJLa8gkjuLVwJY5EZRX4OfA39gb9vr4I\/tXa\/+034e8beBbzTvEVzd6N4i+G\/iL4j+M9e\/4SD4d2Fxf23hvwq+sanpWosLvR9G\/sWPSNTvZXm0+\/04OWeyur+2u\/3E+MHxBl+F\/wAO\/F\/xAi8M6r4rj8IabLreoaJpGo6Xp97JpVk4m1e8t59bvbDTlXTdNW61GaOe7he5it5ILctOyLX4SfsR\/wDBUj4i\/to694k8La58X\/CP7OHiTw1e39zpVrr\/AML9M8V+HvGfhq88QXU2kSf8JLqXjLQ49C8TaZo9xYaPqGkTWzW+oywx61psztNeWNrpg5Yyhh6zo4aGKpScFU9rCdTkVl8MY1INaO17+h7PhJivFzK\/DvxLzjgrh7KeI+CJYbBZLxpg8zwkc6eHwuYVKtSc8DlUcRDE4SM3Rw9fHZlh8PCvRVHB1aVeMsLKVL9Ndf8Ajx4n8San4a8D614x8Ufsh\/EKS4NlLp3jDwJ4Y8ceFvGdxctDBa2nhXxzqUh8KX0qvHO1lBa3+ma5erOPtWjJJD5UfxL\/AMFavHHgI\/CXwF+zhpHjOHVv25viTr3gXwj8E\/EWiSjw98Rvh8fEU96PHv7QMVr4c1PS7+08L+BPAvh7xx4s1PQrHUY9M1K\/stI8N3Fu66xaJcfI+v8AwW+DX7Y\/7Z\/7d3hn9p2SX4xfE\/4T\/Fjw5Z\/DXwdqXjLxzpuhfD\/9n7U\/gr8MfEHgLWfh94f0PXtL0XQ11zxJ4i8Q3+v+MtHH9s6h4mjvHnvkg023jtPZfg7+xT+zl8HvFOq\/EXw14J8Van8Rb\/Sk8Jw+O\/iP8RPH3xs8ZaT4P02eSW08IaFrvxY8ceK9R8KeDku02S2GktpsDIsEV6bm2t1hThU7zl7KDw7cOWUYznJK9lKK5ve5Wr3U5SfRt6NflFTM8DgMZSzLJsFnPDOPWDqRUMJmc5UY4qpKFGp9WrVqEMwpZdWwksTSrYLEYrGVJznyfXJUueJ678Hvhv8ADn4GfCbwP8J\/h1HDcaB8M\/DGk+F9HazkaW41C20q0t\/KnupUuo1k1xZvL1DU7lLRpbm+u7q+jaS5uysXo0FzaatbrHc2lzaBYoEimtYpmkhhvWVrqWW1nu7kT2NvvmiWe5tGKIiMgQssL4+meHre6urK6ii+zXdlFfTSQXdlpyQTlzs8+aGF5IZpJoontFDC48sS2t9GyThivb3OiB7kpcahYpqEQCQ2kkt5GY4Lo7I1gLN8sMUu2WMLh4FZVmgRZImjqzVuXljZJfDfRWS6rZf0nqfM2VRLlSjyLa3azumndWttf1vpb8If27fhH+1N4A\/aE8Q\/ED9nL4V\/EPxr4W+KXw5+FEPxS1L4V698M1vP+Ey+EfjP4ixwXXiLwR4p8feCr7xpY6v8KPGM2h31smnS6PrVlBpWjXzQw6asB\/dn9gf9rTxh+1ViLRPjj8MHvfhQPDmkfHH4CeJv2X\/iV8IP2gfAepz6LCrWWs2\/iT42T6TZWd9qUEzaV4p8P+CfEHgjUrO2urLRL66aJ7qGhZ20zNfRLI17LHbSz3cEYjZZYrZ3TT\/s9zGqulyYJJIUupfOaa2hT7Ynmrbyx\/nz8cNQ1n9nD9rL9h\/9p3wxc6VonifxL8WfEf7NHxO1G\/uW03QPEfwu+KHw4+JHiC00Xxtqtk9xLqmg+BfHvgvwx8QtJ1C4aWfQj\/b0VmFkvLq2uYnKooUqN04qpKUeWNpXnyxknNvVNWSbW\/VXPoK3EeaZrw5knBlWOBeXZTmmPxuWzWCoRx6xOcwwlDE0q2YxpyxVXDN4TDyhh5SdKFSLqqm5PT+kH4lfFXwP8LvDNz4i8b62miacZI7S2AWS51PUtRumMdnpmh6TaLPqWr6reS4itLDT7a5uZ3wBHtyR+Bs\/wI\/4KI\/GH9trxF8bda8DT6L+zt43v\/D3hvUfBWqfEu28Mzav8HNFuZTp2j6npmlXsmr2uqyGafXtR0+SNYbi7v73Tp5TFIYI\/wBmfhj8BoF16z+K3xR8SxfFz4nyRrNpev3tpBB4V8EWd3HvfS\/hn4dUSW+iWEiOiyazczX3iTVYlQ6hqskQjtovqXyYsg+WuR0OBx9PT+lddLGU8u9rChRp16tSHLKtV53Gi9H+4gnH31dpzqaaL921Zn3PCHiFhvCuWcrhjLcj4pzrO8kxOQZlnuf4DFzweXUMTWpVq3+rGFhiMFi8PiqVfD0JxzbG8uJ56MPYYPCSp+3rc74a8O6R4Z0nS9D0LS9P0bR9JtIrLT9M0y1hsrKytoI\/Ligtra3RIo441BUKoAwc53ZrpqQKB0AH0GP5UteVKTk22229292+t31\/rbY\/IJTqVJzqValStVqSlOpVqzlUqVJyd5znOTcpSlK8pSk25SbbbbbCijOOTwKrXMxiido1WWQAFYt4UuNwB5PoCevHb2oWv9aL17Et2\/q707Jav5HyD+0D8eviz8L\/AIt\/AbwX4G+BviX4k+GPiT4yv\/D3ijxHpGseBrSDT4rf4fePvE5sIYPEnjTw3eWF7YXPhrStTutWnsL\/AE2402abR7BZNbvLaMfBfx9soLH\/AIKpjVpIvsi+Kf8Agn3ptpE8V+1q2pXng39oTxDKkjoJEjn\/ALFHjVBFI0O+Ma2UbEbAJ+hvxI+Ofim58WT\/AAk+BvhCw8f\/ABNtLa2uvFGp6vfzad8Pfhha3sBmsZvGmsWsc15c6tqURE+leE9EiuNavLVWvLw6Vp7xXkn4767pfxzk\/wCCpXjOP9ojxboniS68EfsTeEE+C8PhXwTN4K8P6tp3xD+MGq3fxhl8P3l74l1q91d\/DGp+Cvh1oviMzyfbzDreg3UtnZ2ogk1DaVCcKfPJxi21anduo09eblSsorq5NeSdnb3MTkOKwWW0cyx1fBYOWKhRrYLLa9af9rYrC10pU8ZHB0qVR4bCzpyVWlVx9TB\/WaMlUwixEJJv7sSGKFI7q4FncvbN9ihtr1Es3uIluIJDfXFwv+i3ayfdDypJIgCTJ57MjVla+saGSZrmCK5v4p5bG1+Z5QWWORoDBLDBFn7S2Fa1tka3e4EVoJ2ZoxsXNqZYkMrzQ2nnw3Jntp2lhJme1ebb8roFl81oCsjGONLcK\/lmJ3l5aIfaA8YguGjminhaWIzWSz2fnQw+dJcqFCyS+UojWURxBY5UTYSY5coqT0V9fWx4qbTv1vfXUq23lKjyJHP5tw8PkXSxWrzM6o6tvuPIAkilsWbJKybDcGUKrnNfPH7YfgOL4lfsqftHeBdVnn02w1z4L\/EqK1vYYBjSNU0nwtqmq+HtbgsYW81LrRdb0bTtY0vU5RGlhdQWd3bBp4fNr6Uk0S7ieyjsnntW8i6t0Dpdq2yAq21DKpWFsQxRI1wVSRBNEINm1j8bft9+JdU0n9mvxp4F8JFJPiV8f73Rf2YvhZp32r+zr3U\/iJ8ern\/hCrK5t7V0gN\/b+EtJ1LXfHmrv5Ki10rw5qd7cxLbQzPHbpzirv4V0v3a6GkZc0o+5zSumlG+rTTiuVJt2aWnZWVj1++\/Z++Of\/BTD9hL4Xaj8TfHXhPwx4W+Jn7PfwZ+Kfw88MaR4dk1HXtR8c698MPDfivT\/ABD8SPFOutPPYlPEOo3CTaN4UstPkitnZbrWtQ8yWJvvH9gT9irwL+xN8C9F+HGh22nap4y1AJrfxH8aR2MMN34n8VXsKG9kEm0zJpdiVFlpdq0jLDaxByBLLLnlY\/Cv7SPwn+Jv7J3wk+DmheCLr9mj4efCbU\/BPiq+1XW9esr1LfwZovwy8OeGW1OGw8G3+n2+pQabaa9J4StLLV4LXWLhL9NUNhDZxMn3zpGuaRrcVxPpOpadqUNreXNhcSafeW93HBfWUrW95aTPbySLHdWlyj29xAxEsMqNHIquCo6J47FTw\/1WL5MOmr04RaTaskpSWru9WpXu36H3uJ8SuM8VwMvDuGOhg+CqOaUs4qZNl2Bw+Cw1TMY4eOGjXxtahSjXxUqvs1WqLF1qrrYqMKsm3RoxpawAHQAfQY\/lXj\/xk+B\/gP46eHo\/DfjzTpLm3s7uHU9F1bTry60jxH4a1e3DiDWPDev6fLDqOjanCGKrdWc0RaNmjlEsRMZ9hznpzRnHWuSE505RnCThOLvGSdmnt6P0d0+qPiMDj8blmMw+YZdisRgsdhKsa2GxWGqzo16NWO04VINST1aavaUW4yTi2j4LH7F\/i\/ULWbw54l\/a5\/aL13wLNmL\/AIRtNa8NaLqk1g7MZdPvPGuj+H7TxbeQzRsIZp5NTF5JGv8Ax8iQ5H1v8Ofhv4O+FPg7RfAngXQ7LQPDOgW5t9P0+zjYAF3aW4ubieRpZ7u+vLiSW5vr65kmuby6lmnuJXldmruzIi9XUfVgOnXqe1KCD0IP0ratiq9e3tJqyt7sIQpxbW0pKnGKlO1\/eleWurZ7ec8YcRcQYeng8zx8KmDpV3ifqeDwOXZVg54tw5Hi6+FynCYLD4nGOEmni8RTq4lxnL97acr834l8K6F4v0HWPDPiPTLDWNB16xu9L1nSdRtkuLHUdMv4Htr2xvYHys1vdwSSQzRt8skcjA5zz4\/e\/CP9nH4e+GP7M1PwR8I\/CHha5ZNNK6vofhTRNKuJJI2kjs\/Nv4YYZZnSB3ih8xpCImkUEREj0X4ifEPw\/wDDnw1q3iPXdZ8PaTHY2F7NZ\/8ACRa9YeH7O8vLe1lmgs2v7+RIojczrHBv2uYxJv2MQEb8Vfg9\/wAFZ\/gH+2prN78F\/GX7HnxC8d+M9Cm1DV4fBFz4L8HfFXwlNrWhLNbG8tL7W5bWw0uZIruWG21nVdPsbWOO7kjj1ArcMH6cLQzKrTnPCvEezg06ns6rpK6tZv347dXqrfEfScHcEeJvEnD+e5vwbl+dYnh7IKuFxOe18BmMcDhMFKpGq6GNrUqmMw3tYUY0aqniqcKkcLb99UoqUW\/kLxD+zbZfAf8A4LNaN8S\/h5q3gjQ\/gP8AtafsqfELQ\/BPh7wbd3t7oWv+LfgHqXgOfW9GvbpL1tMTVn0\/XrjXdMsdBkuYBpnhrUoXtLOaC5uF\/UG2tYpbV5szyXEbP5DSGRXhtthfz1nN3KLdUkWQRvG2dUlmuYJXA81H\/Mn\/AIK9+BP2r7r4Cfs+fGz9nD9lx\/hJP+yP8fvDvxH8IfDb4ba5pd98R\/Evhrxzaa14X8d+D9J8A\/DjQZ\/D9rpuvxeI1uPEVjaa9eyX8H9pLNZTvMC32p8JvibofxP8BfD74i+C9Tg1jw7468H6B4psLuzvxfHT49btbK7mS113+zoYxfWUk72bmU2\/9najaXsUlmtxY3ghc41Y1H7aUHJpO8JQmm3ZO84SlFyvvZtN3d3c8jiqnnSeCxmdZjgMfiqkKmC5sHmOBza0MJ7KopVsfgcVjKOKrTeIlLESeIq1adWfLWkpTin7RHeW90\/yKkLSpLaAW9xE81xIVmeK2mTFpLLcTo4jjVTE0rqbiUATeXAxUjisZS+pxG7kkhNykiqJmjjkcxh0W62lbiFnt4oEtDbqpS8iE2AV4zUbzUGv7dtAuLeCytJk26jd3FnLclbtTbRRQfbvNup3luHaKa+W2jmkBm+0XIkDmuA+J3xV0D4RfCbxx8VfGupX0fg\/4e+H\/EHjvWZL2MNO2j+GrTUL\/XFjtZ7qG3urma3t\/s1lp0dwVmnuLGKO1tmeALze3s2uXZ9\/P0PkVVnpqltfRf19x7vukhMt\/dWlpNbnyIpQkdyttGlyqXMcsTC2Fl5jRRRoyTmeDJMaTGUqo+O9N8LXH7Vf7fXwh+GfhAaXceB\/2JrDxV+0D8WtQ1LSRrHhGb4zfEfwL4t+HnwA+F+stpt\/bx3dzbeHvG3jT4s+LtGbUp7q60FfCZla1Hia2uk8U+Ft3\/wUL\/at8c6Z8OvEvh3wJ\/wTf8O+NvDVh4s8HeIfFlxL8bP2h\/F3gG\/tdP1EXPw90e1s9K+A3hjxhYWN1bQa1pfia88b+IPAk13K0\/hW\/SG1ubX9Bfhr+xf+wv8AsxXlt8Gfht+0b4n+Enxi1nWrfWvEMsP7T9zbfF\/4o\/EPxTFZyXPjTx34X8T+JtQtvGHjHxeywzrcXPhRop7M2Wm6RYw6Va2NnA6cXFpV5vDxnHmjOVOdS6aVn7utn3TbWj5We7Qy3DU8XhqOeYrE5JRxOCWNweOjl88bTqwq64Wuo0q9CUsLUlCcZ4nDPEyo1Iun7GdSNSFP9BvgxoX7Sek3Grr8dvFXwJ8QacsFjH4Wg+Dnw98e+B5bN45bv7b\/AGyfGPxK8fQXlu9sbFbCHTYtN+ySrd+Y88T26Q\/QWa+HpPhP+1z4JBPgf9ozw58SbON0aHTfjf8ADaxN6saBMxf8JL8Mbrwa7O5Qj7TdaLdyJ5hLpNgKZn+NP7UHgXK+PP2Xv+E0soBG9xr3wQ8f6Nrpl+UpI0XhXxqPCmtmQyYbyIJ7pI435uX2M1aPBOX8LE4au2\/dUKqhKS\/wV\/ZTUtduX0b3O\/8A1PqYpt5NxFwtnKd3yRziOTYp94\/VeJaOS1KlW+ns8M8Q5v8AhyqXTPtuivl\/wD+1f8OfHXi\/Tvh9LpPxD8D+OtUW6a08MePvh74t8NXMsllaz3l5BBqtxpcvhi8ltoLaWRhZa7coUTMTyZXd9M+d7D8z\/wDEVy1aNWhPkrU50pNJpThKN09nG6Skr6XV15ng5rk2bZHiI4TOMvxWXYipSjXpU8VSlTdbDzlKEMRRk1yVqE5QmoVqUp0p8suWbs7Omx5T5XdhenqOD\/SvyK\/4Ky\/Gj44\/CH4c\/BE\/s163fWXxY8UfG7TbGz0PTLS31S48SaDbeFPE51bS7nR5obptT0v7VdaVNdqtsY4JIoJGlhkVJB+vJGQQe9cjeeBfC2o+J9L8Zaho1heeJdEsL\/TNG1e5to5rzSrLVJbWbUYbCWQObYXj2NobhogryCBFZtgKnTD1KVOopVoznTXM5QhLllN29xc32Upaykvettd2R7vAHEeW8I8YZJxLm+Q4XifL8oq4jE1eH8eqUsvzWo8LWpYfDZhCtTrQng3WnCVePsqknTi\/ZpVOWcfz8\/Zm+IXiz4A\/shv8Uf2nvAcfwq8Y28eu+KvGtn\/ad14n1jxj4ivoLjVJfEmuXlnYzS6dr\/im6UwvpDrcWmhIltZRXMNhBHBbfKX7bPxL8A\/Grxh\/wS5+KXwzVYfFnj\/9ovxBY6L448vVdMvtE+H8PwA+IXjb4qfDy8mvP7LhvrDxgnhzw9pl3pmp2V1pN1daXHq9pELrS7e5H7laro+nazpd9o2q28d5pmp2d1p+oWkyBobqyvYWt7q1mXoYbiB3hkT+JJGQYB4+Cf8AgoZ8FvAnxE\/ZT1fwfClz4c8Z+Fbrwqn7OvibwnM+neLvhp8Z5ru28I\/C\/wAQeDbu1BubWaw1HWLew1SxCTWOseFLjWtE1e1u9IvryFnKbxGI5lCynJJQu3ZbJN7vTRt7nDm+PxHF\/FOYZjRy\/DYLE8Q5xUxFLLcBOv8AU8HLG1vdwuFljsRXrRw2H5lGkq+Jap0YKLnGEVy8fcblRoYBmJ5pJ7uJIzCLS2kxdREbsQXe4\/v1JeaO5EhjW0WMNEa8FhaXFrGJDPYQtcJ5ayER3aPBlDKLmWdZLiHzvKa3ZJncSB\/KTYspr49+A\/x31D+0X\/Za\/aVu9B+Gv7XXwz0q20TxV4Y1PV74af8AFzw9o1jLp2nfHj4K6l4lEE3inwP48sBb61qkek3Wqaz4E8UXN\/4V8XRQX2nw3upfR3iPxj4F8IWeqeIPFvxF8LaLo+lae994i8R6r4i0Tw34b0C2huIRbahr2pa1eQRadbRR2832m9eRIr2SCeBFlA2LfPSh7qkk19ltXbsr2V7\/ANXPn3B3ly+\/FNtTitOTncYyerUeZW3drvRvQ+f\/AIu\/tsfAr4KfE3SPghLbfET4r\/HrXoNO1HRPgZ8EvAXjHxz4uvjrkOsvoiS30MFp8PPB+p6vb+G9Q1S1ufHXi3RrltP0i51FZ7XTFkuU6\/4Lfsm6\/wDGz4ueGvjR\/wAFAtE8L6P4i1jQPGGmfss\/sez67F4w0\/4UaG9ppreO\/iJ418QaYItK8S\/HnUtEn0nS7jUNAnk0T4deF7mTw94Z1PVb7UNX1275\/wDYn+Avg79tXT\/2qP2jPHnhGe0+Fvxz+Inw2039m3xKF1fQfHt34P8A2e\/C1\/4V0b49eG9Wkni1bQU8YeNNc8Zap4B1CzkgbUvB9tpeqyxvZa81oe1+Inwpg+D3xk+F\/wAVf2sfDHiT4r+EvhTba3pvhD9ojwtb61d39na61badZ2Q+OPhHQGe4hPh0WMaWXi\/w\/aPY3TTS3niS2Ekk15HpGnLERj9Xq3rc2uHa5ZyWjUqL153H7S0aavG61Pscj4f\/ALawlCtw1mdV8W4OtOtLIptYLF4ynRlGrhsVw1jYVl9exsGlGpla9jmjqqnPLYY69SOH+3dV\/Y98L+HbW7vfhV8Q\/jh8M7iGzuntNF8H\/EvWr\/w\/JcrGzxJD4X8ZSeJPDkTu6JCipZQweWRG4CruH5V\/sNfsnf8ABT74K+M\/GfxH1bxt4A0nQfHniLxB4k8SfDH4navq\/iE+I9T1vVLrVIdblHhGyhtvBuvpLOpvZtNlvbaVHe1a0lt47ZYP348I+N\/CnjfQrHxP4U8R6H4i8O6taw3mmazoupWuo6de2kyhklgvLaSSJ1YFSQrFlJ2sAwwerimhkz5UqSYYqQjA7W4ypwThh1x+ArT+0cTCnUo1oQr8zipSrRk3eGylKLg5W2\/eSk09rM+uynxj414eybi3hbMsBkuew4mjhMDnX+uORUs0zOhTy2tXq\/V6dbE+zxVKq8RVdSVSvKrXoVKcJUJUasFJfNXw\/wDF\/wC0y\/iOy0T4n\/CT4d6boM32lbrxn4L+JV\/q0MHl2zSWz\/8ACO634W0nUW+1XCrb+Wl7L5AdZmeQBgMj4u\/te\/D\/AOFni2D4baZoXjb4r\/FK4tIb4fDn4V+HZPE2v2FhcpK0F94huzPZ6F4as7jyW8iTW9WsZJ1\/eQQzIrMPqqWIS5JLccYA9OuOCefUcjA4r8\/PE\/gz9oT4AfFX4mfE34NeAPDvx08H\/F3XdJ8U+K\/BN1rdr4L+I3h3XbHQ9H8N3UvhnxPqFrPouvaE+m6NbXMOgazPYz2d610LG9VJ3RpoKjiqz5qVKEuS8KEa31enVqJpKMq1dzUE1rbnXM3ZNaHicMU+HuI88xUszyrJsvdHLObK8joZ3U4YyjOc1jiaEFSxudZ1isfSy6LoVcRiJ01i8uo4p4eGFoYrA1KkJz\/P\/wD4KHftv\/ttfDTwV8I\/GPw4+APi74NanqfxY07RbK017XPCXj3UPHK3vh\/XCvhDUfA\/hxtRuRDfeVBdpPb6l59vfWcSxNICrN9Y\/Bf\/AIKCfEbR\/A3he\/8A2zv2aPiR+ztf6nbWrXnjiDTD4p+GECXbYtr3Xb\/SLm+1jwQrCSA3dtr9ibexaVzNqCRW9w0PYax+2jrMd3pcfi39hL9rR9d065kubX7D8NvB3iy00y98m5hFzY61Y+M7m2ike3DQrdxTQOVuBG2xZGw7XfjD+1f8cLG78H\/DP9lLUfhhoevWU9hf\/EX9ozWvD1pbaNZ3f+jTTWPw08KXPiPU\/E10LOWa4hsNT1bR7CR1S3vJGV3jr0nRpzhRp1stjh4NNSrvFexUVH3+eM6spxk2laUal018Eebka\/bMXh8pxfCeRcNZz4McBcN4fBYzMsTj+OMN4iYfLMzWFxlZOmsHjcbn+dyx0cLFe0WHxGGz361UapZbl+Fbl7X7A1r4UfCD4vXPhrx94k8H+CfHl1aactz4S13VtH0vxHDZ2GpNDfJd6LcXSXVtGLxVgnS8tMNIvlskpCg1yXwN\/ZN+C37POp+Pdc+GnhKx0nXviR4m1XxN4o1t4Ld9TupdS1C41GLSoblIkNtommSXEiabpsKpFCC0shluZGmPonwU+G9v8IPhL8PPhha6ldaxB4E8J6L4ZXVryNYrrUjpNnHbSX0sCHyrY3UiPKtrCBDaq6wQqscaKPTTNGGKlgCM5yQDwcHg\/wD6\/avEliayU6NOvUdC7UYpzUXCMrxfLfROyfnvY\/nHE5\/m2CoZvw7lfEecV+GMVX+q\/U5Y3F0sFmOBweNnXy+VfL5VfYxi58uKWHdNRhWndw54q3hfxIt\/2hJtasV+FWo\/Bm08NpawjULf4h6B431DWpL9LmQXLWV34a8R6bp8dobLyhBFcWUsyXIdy8qFET8OdCbwn+yH+3v8Yv2LZClh4Q\/aIhuf2uP2a9JspYFstETW7jW2\/aT+HlvAfs0GjabpvxA0h\/iJ4ftXkMIsviD4ggsy8GmNFa\/q38Yf2qNSXxZefBH9nPw9a\/Fr46yCWLUI4LiUfD74SwOAya\/8WfE9pHcW2kOkcgm07wlambxNrzhIre2tbaR72P401r\/glrrvxS1a8f8AaE8afCr4r\/2\/4osfFmrfFtfh98SvB37UXhjVrKwuFsp\/hH8aPDfxqtLX4WjQry5ng0Cw8L+ELbQYNCMml6to2qm8vJ53LDulT56snBuzhBK8pp2d7NxcY\/3n5csZatdNThqWVZOs14gqPLsRjKcamRZJOm5ZnmNKpKClmeKoOcZ5ZlCp8zwuKxMHVzKcYwwGHrUFXxNDvXhlufs24yxRXkqTxx20MkcSedK00drG1xHP56hnfzI2jkzELgCK4Cr5Xw\/\/AMFHTZXP7FXx30+\/n0+W1n0rwXoWo6THNC41Mal8SvCFq\/hW6t1bybd9e+3tpiWflwfaJ7yKAtE\/7mRL39lK58CfEfxbpfjj\/go5\/wAFDn+DPhLWIPA3hCx8IeD\/AAj458Sax8Q10b\/hJvFo1HxV8Mv2avE\/iLUdH8JaPdeH9NXUPEkf2jUddt\/EFnfatdyWkloPQ\/Ff\/BPfw3H4Z+Gv7RPi39q39rr9o74TeBPiJ8L\/AIyn4NfGq28F+FvC+uaPoXiey1BNW8beH9F+Dnwy8e63P4Slkt\/HGm6D43uRa2+r+Hra4vdJkJaNs1Rm6kaNoqc2re+2rNX\/AOfW\/T1t8\/HhlOKeZ4XKXFRx2L+p+xpucOXnx1GjXwtOpJSbhUqQrU1yuPuzbhNxaly\/sl8XfhBpvxQ8GJYw3a6J4s8NzweIvhz4mto0i1LwZ4w0mMPpF\/ZTqwb7OXUafrNgWNrq2kXN9pl4ktvdyKea+DNz4Z+L2g6f4y8WeBfBcPxO0HVZPD3jq2uNI0jU9Y8MePfCcgsdWtbbVLmy\/tAQwXEKX3h+9Jhe50O\/03UbcJBcwsb0H7Kv7N7\/ABNX47WPwr8Hj4svfvr8PxDis3fXzqlzYPYtfi6E5UyyWUjwyMIx5kTuMEsSeX014fhx+09daZLNFa6F8evCp8TWnmN9lgb4lfDyPTdH1uKBWVfNv\/EPgi70GVYPMMzW\/gu7uRHJ++kTanedGdKensbzpKUXeL2nC3RS0dtNUejgqk80ybG5FV554jKoYjOMnu5OpRVJxWd4GF2+ShVwjnmbpu0aeIy2UoRjKvW5\/rmNDGNvUDocAduenv8A5PWnMu78P8+hoV1bof8AOSP6dDzTq4z5krfZ18xZCqlx0JHKcYwp7ZBYHAyQeTjAEvl+\/wCn\/wBepKKd2O7e+ttr6222+auFFGaKQiC4DGP5SQdy9Op56dD\/APW61\/PR+258OP21PGH\/AAUN8AeFf2Y\/GOvaXoGr+GvAHxT1iTxM51\/4W+DtV8Ja1rnh+58Uar4cvYprUXcVhBbm006wNtc6zqctvJDiW0e4j\/oXuF3xlcsMkcrw2c8YOR\/j\/X55+Guhapd\/Gf42ePNWtbu1WS48G\/Dvw79tt5ojd+HvCOgya\/calZNIqo1nfeJPG+tQKbfKM2loXbzF2p34KssP7Sq1CbUJqMJq6cnyqL+Wvbt1uv0vwt42r+H2cZ\/xJQy3Jc3qrhXMsqoYDP8AB0cwy+riM3r4TBU6zwVeMqdatgVOeOpxkkprDzpykozPj\/4i2n7N\/wC0x8cbH9kT9pX9mey+O2oeDvhtovitvGfxC\/Z18T6v4QXxFqer63oGsz6JrGveCLvw94d0O\/fw0bm28Uaf4nGj3tzcDQ4NQubiBkPmvxd\/4JtfsD\/Bf4i\/Db9oPSv2Mf2cLfwt4Zebwj8RrSL4NeCZ9N0DQ9Yaw\/sL4kR6W2jPare+C9Y021ttR1T7M01v4b1rVr+bzpLGKWD9gE0HRo9al8RpplkuvT6dFpEuri2h\/tGTSoLma8g01rzZ9oNjDd3FxdRWpk8hLieaZUEkrs0HiHTLLV9MutO1G0jv7C8gntbywnjWW2vba6hkgntbqJ0kWW3nileOaNlIeNihBDYPPSqv2icoqUZ+7KDStyvR2T2aV7Waa7nw+W4+hg8xji8XhY4rCVZV6eOwdNQpe1wuN5oYqGG5YcmHrxhUlPCVKdNKhXjTqRpys4S+R\/hH4J\/aX0T9oD4l+JvFXxL+H+ufAbV\/CngK08B+FfD\/AMMdZ0Ke1\/s+68fySWelapJ8Z\/Eum6VcaPaal4dj13WI\/BsNp41hfTI9OsdBGhyLL9j3en29\/H5d0nmRsjJJC+HikSTbvjljcMkiMBtZWBDKSGzk5\/D39pj9u\/8A4dkQRfCW7+x\/E+21VdN134TadqGuD\/hJfBHgqbxCll4h0HxwhjWeTQ9AsBeN8P8AWFmN3q0Ft\/Yt7EBpDXtz+0\/g7xTp3jPw3ofinR7uC+0jxHo+la7pd1AQ0dxp2sWcN9Zyoy5RlkgnVgVZl6jcSpzdfDVMPy1LP2UuV0qj0500mpLpd6uy2fyPp+J+AOIeF8n4f4rxOHqVOFOLK2OlwjxDHlpU84pZYsFOtXhQU3iMJVovGUqc41YwX1mjioYepWp4d1pfFnxI\/ZI0\/wADXfiT4p\/s4+PvEXwC8V\/YtS1vXdC0Cwg8R\/CnxXc2sZv57nxD8L7mNLF9QuPLlRtQ8NXOharI08rLcNO4kX8uP2JP22P219F+J3xV1z9oX4A\/G\/xR8G\/H2qXPirTtd0H4ZeIFk8D6vD5VrKnh\/QtQuX1JvBuo6THYXMemwz6hcWN9DezQy3EzzQ3H9IDRI5ywzxj8P84P+TUAsrdTkJzjbnOTgdB747DGPY10Uswj7GpRxOHWJ5+RRqufJUgou\/LdQvJPpzyfK7OzaufW8P8Ai7Rw3DvEnD\/GvBuUeIE88weX5fg8+zfETwXEeRYPA1I1lHA53hMLLM69f2tPDvDTx2LxNHB0qEsPTw8qGIrUpfKfgP8Abj\/Za8d3S6XZ\/GXwlofiF858MeN5rj4f+JomX78T6D4zh0XUTJGxKyBIXAIyDsINfTOneJvDmtQJdaPr2j6pbSAFJ9O1GyvYZFOMNHLbzSJIuehRmB7GuN8Y\/Bn4S\/EiCaHxz8PPB\/i6GZHt5V1\/w9pmpFkxJG6rJd2skqZEkgJjddwPJOK+b7z\/AIJx\/sb3Hm\/Yfg5YeGzNIsrnwj4i8XeEwXRt6EJ4f17TowFb5tuzbu5Izis+XLp\/8vcXRdlo6NLEJPraSq0HZf4Lu9vX5f2fhfjffWK454dk7fuHgci4rpJ2V+XExx3CFRR5ublTwlSSiknKUtX9q\/a7bGTcRhV+8SyqoxzyWxtx\/nFcd4n+KHw28EW\/2rxh4+8H+FrckgTa\/wCI9H0iNiDwqtfXcAdjwAq5J6ACvjyD\/gmV+yVBex3reGfH915TbhZ3fxk+K89g\/GNs1q3i8LMmS7GOUujGSRWVkbaPS\/CX7C37Jvgq7i1HRfgl4Rn1GCRZYtQ8QRXviy+WZc7ZvtXii71efzQWYiTfuDEsDnml7LARd3i8RUj\/ACxwcIN66Lmnipctt78kvJNkrAeGVC06nEvGmPtZ+wocIZPl\/PteH1uvxjj\/AGLf86wWIS\/lk7nn2s\/8FAvhLqF5d6H8E9G8d\/tH+Jkk8i10r4QeEtT1XRDOSEVb3x7qkel+B7SFWO6WYa5N5cSs7R4wGxpvh9+1t+0XI3\/C2PENt+zV8MbsTR3Pw7+E+qjWfir4isJHlAt\/EfxT8uOy8MxXMGwXVn4O003yb5Ik15SoZvvPSfDehaDaQ2GiaVYaRY26lILLTbWCxtIVPJWK3to4okHsEGO1bIUAADPHTPOPz\/zx9c19aoUU1hsMlJ\/8vq8\/a1EtPhilGnF6P7EvKxf+t2SZNFLg7hahgcZH4M\/4kxNLiXOqMmkpTwNCeCwPD+An9qjWWS4nH4WcYTw+YU6sFUfk3wo+Cnw5+C3hSy8I\/Dbw7D4Z0S3VpJIYXlub6+u7hllub\/WNTv2udT1fU7mXMlzf6ldXN3NI7l5Pm4\/Pb\/gpp+2f8dP2VfAuiS\/Bv4XQa7J4tlu9If4matOl7ovgvU0jnlSEeHbUve6jqRtYbi9hmuvL0mJIWacXISS3r9PPFnizQfBegav4m8T6vZ6JoWh2c+oapqd\/KlvaWVnbRvLJNNLIQqgKhC8ku+I0VpGVT8sfDLwn4h+M\/jK4+OvxO0O60fQl0\/UNA+D3w31yCGRtF8Kam3l6j428VaXLG8MXjPxpaLHGlk\/mHw94WNtpbyfb73V4heFqL2zxWMj7emrc3tJtOct1GPWXTZtRVuaysdvAmcZfguKoeIHH+TUuOsky3FVcTmuV57jMbKpxNm1WjJ4PBPEwrxrVq\/tpQxWJqYh4jC0sLTlLFUK7qYfD1z9hqa71v9k\/4H+J9cka78Q+N\/BWn+N\/F+oyRoLjV\/FXjMy+Ide1e42wxobjU9T1CW5cCJI0DrFEiIiqsv7cOveK\/Dv7K3xmHgXwzqfi7xnr\/g7UPB\/hrw9penPqt5e6t4t2+HoCLQRvG0FqmoyXlxJcBbeOK2PnSKvT6s0Lw3onhvSrDRNBsLfStI0q2gstO0yxjW1sbG0tk2W9raW0SpFBbwIdsMUahEXCqMAAaklvCytvXrnJwM\/Lk5yQTztBPr9KyVeH1qNdxc4xrc8YSf2eaLUHvput9krNW1+fnxLhXx1V4weVUq2C\/wBaZ8Q08iq1HDD1MLDNv7Sw+V1qtKN6eHjSjTwlT2NO3s\/aKnGKkrfkr\/wSd+IP7U3iH4H3Hgz9pTwRq+mP4EmfQfB\/jvWLm1fUPEltpt9f6Rf+HtYgS+uruTWPDN5p72r6lLsNxbvFbXY+32lxLJ45\/wAFY\/hV+1X8T\/GXwK174JLL4W8M\/Bu9g8Vz\/ENtcg0aLRvHXiTxDpfhjR7xrdWuL69t9CtQ11eKtjLZ\/YdSme5MkAeJv0\/\/AGc2Vrf4xadllj0X4\/8AxIt4IxIzBI9SurHxFtII+XfLrssrRcqrSEjGcV2X7QnhmTxX8EPizodrGZL\/AFD4feKYtOXt\/aMWkXc+nsF4G5byOFwexAI5Ax2xxtOlmbrQw1KEakuWVOTk4x9raM5O7vqm38UdFpy7n6jhvE95F48YzxEyrhThTLnjcyxcFkTwWKxvDmEhxHgVl+ZYijl1fFxcpTwmNxU\/YSrLCe2rzcKFOnyU43\/g6PiNF8PPCEPxan0C4+I0OkW0Hi658LNcnQLzV4Y1juLvT0vVS5hS7CLcSW5DRwTvLFHJLGiu3q9cH8O9bt\/E3grwf4mt5ROniHw3oWtwyKmwSQarplrexOFLHCskylQOQMZyc13YP8z+hxXlV\/4s9Evelok1Hd25b3drbO70PwzMJTnmOYzqYfD4WpPH4uc8NhKXsMLQnKtNzo4ahd+xoU5uUaNK79nTUYX0FooorI5AooooAQgN1Gec\/jTRGgbeFG4AgH0z1\/Pv60+igApCoPUUtFAHzR8bv2Qv2cf2hxNL8XvhB4L8a6hNZDTm1zU9IhHiCOxTzBFbQa7bG31eGOHzXMKxXapFvcxhSxz03wK+C+n\/AAI8LN4C8Pa94g1bwZps8UfgzSfEF4NUk8G6BBBHDb+F9O1SXfql9pNi6O9kdWubu5tYpVtY7g20MSL7jR745roeKxEqH1aVWc6CacaU3zRg4vRwUr8rW3u2002PercU8R4nJKXDeKzvM8XkGHqwr4TJ8Xi62Ky\/A16aajWy\/DV5VKeAquDlTnUwioyqUpSpTcqbcQooornPBCiivnb9p346p+z98M4\/FlrozeJfFXijxv8AD\/4V\/Dzw0bqSwttd+IvxT8XaT4I8IWWpalHaXzaVolvqmsR6r4g1NbO5ay0LT9SuY4J5oooJAD6Jor87tG\/4KF\/CLxP8XvBfw78DamfHOhar8WJ\/gb4u8b6ZHqVtoPh34lat4a8eeIfBdnpV5d6ZDpPijRdXv\/hZ4\/8ACGp3um6q17o\/iO38NKdPu9L8RWWoH9EFYMAwzg+vWgBaOvFFFAGPqugaRrlrLY6xYW+p2M7RtNZX0a3VnKYpBNF5ttOHhk8uZVljDIQsiRuBlFI01hjRdqrgYA4J6AYHfjA4GOgA9KkJx16evAA+uaWm5SejbaWybbsO7cVBtuEZSmoa8qnNRU5KOylNQgpSSvJRim3yqwBj\/JpGUMMH0I7jgjBpaKQjlvDfg7QfCkmvy6LZC0fxP4gu\/FGsnzppftmuX1tZ2tzeESuwiMkFhap5Ue2IeXuChmYno7iCG6gmtrhBLBcRSQzRt92SKVSjo3sykg+xqaim5ScuZtuWj5m3zaba76dDSpVq1ajq1Kk51Hy3qSk5T91KMfebv7sYpR7JJLYy9I0XS9B07T9I0eyg0\/TNKsrbTdNsbZPLtrKwsoUt7S0t4h8kUFtBGkMMaAKkaKoGAK1KKKG222223u3dt+rIlKUpSlJuUpNylKTblKUneUpN6ttttt6tu7CiiikIKKKKACiiigAooooAKKKKACiiigAr54\/aZ+Bs\/wAfPh3aeGNL8Qr4S8V+FvHPw++KfgHxNNZyanZaL49+F\/i\/SvGXhifVdKhurCbVNCvbzS20jxDpsF\/ZT32h6jf29veW1w0FxD9D0UAfn14Z\/YF8F+BtQ+BGieDNc1TTPhT8G\/i34l+Ok3grWdS1bxVeat49ufDfibQPB1hpGp6zeTW\/hvwr4auPG\/iXxBd21lYPrGuaza+H7jUdWnmh1K4v\/wBBAAoAAwB0FLRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB\/\/Z\" alt=\"image146\" width=\"201\" height=\"121\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Figure (c) is right because it satisfies all the properties of lines of force.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Figure (d) is wrong because lines of force cannot intersect each other.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Figure (c) is wrong because electrostatic field lines cannot form closed loops.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.27. In a certain region of space, electric field is along the Z-direction throughout. The magnitude of electric field is, however, not constant but increases uniformly along the positive Z-direction at the rate of 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>5<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> NC<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">m<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">. What are the force and torque experienced by a system having a total dipole moment equal to 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> C m in the negative Z-direction ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. As the electric field changes uniformly in the positive Z-direction, so<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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\" alt=\"\" width=\"260\" height=\"46\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">As the system has a total dipole moment in the negative Z-direction, so<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">P<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>z<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= &#8211; 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0Cm, p<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>x<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 0, p<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>y<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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\" alt=\"image147\" width=\"224\" height=\"197\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">In a non-uniform electric field, the force on the dipole will be<\/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=\"187\" height=\"46\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 36pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">= 0 + 0 \u2013 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-7<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0\u00d710<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>5\u00a0<\/sup><\/span><span style=\"font-family: Arial;\">= -10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0N<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">The negative sign shows that the force on the dipole acts in the negative Z-direction.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">As the dipole moment p acts in the negative Z-direction while the electric field E acts in the positive Z-direction, so \u03b8 = 180\u00b0.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Torque,\u00a0<\/span><span style=\"font-family: Symbol;\">\uf074<\/span><span style=\"font-family: Arial;\">\u00a0= pE sin 180\u00b0 = pE \u00d7 0 = 0.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">1.28. (i) A conductor A with a cavity [Fig. (a)] is given a charge Q. Show that the entire charge must appear on the outer surface of the conductor.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) Another conductor B with charge q is inserted into the cavity keeping B insulated from A. Show that the total charge on the outside surface of A is Q+ q [Fig. (b)],<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(iii) A sensitive instrument is to be shielded from the strong electrostatic fields in its environment. Suggest a possible way.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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\" alt=\"image148\" width=\"236\" height=\"128\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. (i).<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(ii) Consider a Gaussian surface inside the conductor but quite close to the cavity.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Inside the conductor, E = 0.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" 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\" alt=\"image149\" width=\"160\" height=\"133\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">By Gauss&#8217;s theorem,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAANEAAAAmCAYAAABarX5OAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAy4SURBVHhe7Z0FjBNrF4ZJIDgEy4Xg7u4a3N3d3Qnu7hDcLVzc3R2Cu7u7u9v35zn06z\/0Tru7sO12d+dNJu10ZEfO+533yMyGUBYsWPhjhAC27xYsWPgDWCTyYnz+\/Fm9evXK6fTlyxfbmv6DDx8+qHXr1qm1a9fKd9+CY1m9erXatGmT+vr1q+3X4INASaInT56oGjVqqEqVKqnu3bvbfg16WLBggcqTJ4+aOXOmmjhxosqZM6eaOnWqGj9+vMqdO7favn27bU3n+P79u3rx4oV8+oRv376pGTNmqKRJk6qHDx\/afvUZkHnQoEEqS5Ys6s2bN7Zfgw8CJYly5cqlunXrpvr06aOWLVtm+zXoYezYsapt27by\/cyZMypatGjqypUrYuyNGjVSK1askGWucPPmTVWuXDn1+PFj2y+ucezYMT+TCODBLBIFEnCzUqRIoT5+\/Gj7Jeji9OnT6saNG\/LdSCJw4cIFde3aNfkO8Aa3bt0SL23EmjVrVNy4cdXBgweFUPq64ZkePHig7ty585uX8g2J3r9\/L\/tiHb2tkUTIu7t376ofP37IMg3mnz9\/LsdpvH8cB\/tjvwwQHNPr169tS5V6+fKlLDdOP3\/+lGWsf+\/ePfXo0aP\/\/D1PIdCRqEOHDvbROTjBkURGbNmyRdWsWVOtX79erk+bNm0kpsEYy5Qpo8KFC6eKFi0qHunUqVMiDVu1aiXb1a1bVzVs2FCMEfhEolWrVql27doJOYsXL26X05pE\/\/77r6pWrZrso0WLFrIMEC\/hPYmdevfurYoVKyaGD\/bt26fix48v8rV9+\/YqZcqUavr06XJMY8aMUV27dpX9ly5dWmXKlEl17NhRCAOZOA88cs+ePWVbiOhpBDoSJU6c2CKRAYzqyZIlUydOnJB5jAgjHDVqlAT5GG2CBAlku3fv3onnwMj1+nizSJEiqcuXL8u8KxKdP39evNrTp09lHmIMHjxYvmPkESJEULNnzxYvwmf48OElHgOsN3fuXPnOco5xyZIlMo9XgegQmn3PmTNHlnHOqVKlUtevX5f1iAFjxYplP4+yZcvaJe2zZ89UhgwZAkTeWyQKJHBGIgwuXbp0dvmDQeIBSpQoIfN4m0SJEqn79+\/LPED6aTmErIoYMaIQBLgiEXFoqVKlbHO\/5Jn2YJAoffr0IuUAci5s2LD2WIz1jLIRr4Xn0YBEmgCsxwRJkydPbvdYFy9eVJEjRxbJyG8c98aNG9XJkyfV8ePHJfGCN\/I0AhWJzp49q6JGjSoa+k\/grvSrJ+IzZySaMGGCypEjx28yBvlTsGBB+W5Gordv36p58+apgQMHqtGjR\/uaRC1btlRVq1a1zf0OY0wEMHIjiUjXb926VfXv318kmpZvGpBo5cqVtrlfQI4yQGzevFnuHTIUScd3Yjw837Zt2+SYmY4cOSKe2dMIVCRavHgxB2wfmfyK\/fv3qz179tjm\/A+1atWSGMGdcEaiadOmSaJFewA8DHEC6X\/gSCLkFSP2pEmTxLCJnXxLImKh\/Pnz2+Z+QXsXVyTC8zVv3lw1btxY\/j7HaOaJHEmE94LoxHjESJCPJANA4kEi4\/VgvwGRXAiSJCKjNXTo0P9M6PLs2bNL1ssMGKrZdr6Z4sWLZ9uLe0AMEyVKFPHGRpw7d079888\/9sHh06dPKlu2bBLgA0bn6NGjy4hNFovkA2RkxIYAeAdiItYDhw8fFsls9FwabEucs2vXLjFmtmG\/gIQDQb+WlagFSMTfgTgQnfuHkZNZTJIkiZoyZYqsi\/Eb5ZwG96lAgQKScWS\/TJwfwBulTZtWpCvLiYnYnsSJpxEkSeQM8+fPV3379rXN+R8OHDigLl26ZJvzf2A4ZMFIEDAyE1gbwYhO5o0kAkVPJi1d8QyVK1dWmTNnFg\/FyF29enVVsWJF2SfGT+F2yJAh4pUYEPBEBOyOozqkI7OG8RLUd+nSRfbPdp06dVKpU6cWMkOKyZMni2SjMKw9SqFChVTnzp0l6VC\/fn1Vp04d2R5phrfE4xilMdk3fmc7zg8pV6RIEXX06FFZThyUL18+8Y4sh5TukuyuYEoicvmMfNpVewv8QiIMgDgBg9MTIxufejTzCRgD5Ni7d+8fx2H+AQyD+ICJgB0Z5gjOy7G+ooGc4vj5BBg1+2EbzhGvw8RyvBX74RqzzBH8xsiP3NP2wXbsj+3IrrGOnmd\/gPvBPrWcw3OwnHPR39lGHyNYvny5SOWrV6\/KchRGvXr1VIUKFezHxr1kOy3zAgKmJNL6lovsLSCeIWDmcPEoOivkDIxwzZo1E\/lGKwvyhhGQkYw2Gt+AG0XmhxQyQa0G6WDmhw8fLqMnAXdAkiyogrhu2LBhtrlfIBFSpUoVO4k8BQYyvDbHQ02KAV3boNeTCK+IdChfvrzEBBwusqFJkyY+Xshx48aJTtfNlKxPmhZN71swUpYsWdJOIkZgiEg8wP4I6OlvQ1pY8F8sWrRIpBr1IbzRhg0bpMZF8sPT4FiwQTw9npO4kwwn8HoSoXNbt24txky6k8NF1+fNm1fSu66Al6CSb5SlnJNPXswI5AVaXJOIG0pMALk1uKhmEsvC34H7RlyEnN69e7fETlxrT4M4jZIBikajV69eEo\/hoewkQrOS3SBAJOCLEyeOpDSbNm0qGZuAAm0rO3fulO+QqHbt2nKsnFiMGDHkdzOwDgMBATNAq1O88w24WRCXmgbFu9ixY9tJdOjQISn4Ecx7WlJYCBhAZDKg2g4B3RehQoWSuFtIhDGQg4dtBH7GnD+FLowIw\/IrqJ2QPnU1Ebe4giOJqDVoUCdwBgJajnvhwoUSePJ30LE+gdgmZsyY9lYTrgfyUZMIL0Z\/GqlepIWxGdIRpHLJUJmdt56QmxbcD+zA7PobJxyIGUib42vwhhqk9sOECSPJDiERozTxBoETcJRzpBjpa2J0RwfOmjVLLV26VPqbCNbJnLgLVMjRwsBIIohFrOQMkB8ycLw8ZEZflc4UucKIESOkA4BzBY5yToO\/z3XhulEIdAdIx9NsaU1+mxg0\/RO+IhFBMlVrRk7gSCJ61TAYDAojY\/REm5LqHDBggNqxY4es5whcHSO1q0k3MzoD2TEKc3xqEkFaDNtVME\/mjKBU1x18W4Qj80LHs08kAnilfv36qZAhQ9ofWTCCbTlWs\/PWkytiMwCgw63Jb5OZTWHLZtffOBnjXCMownOPjQkpQgMKxLRQCYlo7KO6TAAHjCRCquANiJMwLCQRaWOAgZKdclbgIginKdHVRIDmE2iyJAPGqE81ncKhLriZgWOm+EbrvVFqcTF8KsZRTGSQ0CQiYUDbviYR9QhjLQYiIe0odDqCDmmCT7Pz1pMrb2rB\/4AaMbv+xolCsxmQ+NidsaOChFfGjBlloBQSYSgYKf1NGIWRRBgelXLaQwAkSpMmjXTUjhw5Ug7OE6AHK2HChGLQPmXCiGOo7VBP0sBrcqHMSER\/GRV0CIJEZUCBpBCQ0Yf2e50JJKCkfUiTk4EEPe3Y02Yh6ABO4EjgBxlD7j0JLpJWfBcSsaJuB2Ekph0EI4RteCAyUewIQCLaQpBw1GqIjTwFx8SCGThJDJ3nXmiyxO3S88U7GUh5mwEJwPpU1KmAE\/+REKA1hudyChcuLFVyRiT2hSeEVAw2xC2MYEaPZyHogc4V3VqEvdCzp5t+7SQCuCa0IUVKHoYiVtIrahjlHKM71XvfPr\/\/N6AnCw3qE4mQYbSwOOpdJjyUGdDCNHJqL0VxlkZPMnSQkk9iMrZnHfZPCxG\/EdNo6WchaINsNXZB7sDYOvYbiTQcEwtGIJE0iRh9aTRkfXcD2cihWp0BFrwNfiYRufQGDRqIW8NjEbwzIrsbmkRmWTAL7gMjLqUP4l+kLe0vuo3Kwi+Ykgj9B0mQd45AujhOnogHLBIFDChvUPAmlYvsJV60kii\/w5RE3ghIFDp06AB5\/Dc4g+QR\/YdkIY09iBb+j0BDImIxMmwWPIvbt29L0ZoOZuMLYlAfxKfIPOp4Zs8xBRcEGhLRiuMsRW3BPYAopPB5MA4JZ8xu8mgCaX\/IQ98l9wZpHxwRKEjEjaLA6\/h+AQvuBSldCtz6\/XCAgjQlDZJKtHwB7gvvQnBWQgjq8GoS8Vw+3eM8icp7AMyyhRbcBxJLkCNr1qzyViHel0BigcQTXfG8KxxQK+P+uLMR2Zvh1SSig4LOCRpQdV+fBc+CJ3n5TxQ9evSQ2Ec\/Bs+zZjQjA+ImmnYpvgdHeDWJuGF0RPh3a7uFvwdvA+KlIYD3X5D0MSuJBAd4NYkseC+Il3hBC0\/\/8iou\/d664AiLRBb+GPQRUoT17SvIgiqERBYsWPgbhAjxP3CZEPTlG9fTAAAAAElFTkSuQmCC\" alt=\"\" width=\"209\" height=\"38\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">i.e., the total charge enclosed by the Gaussian surface must be zero. This requires a charge of -q units to be induced on inner surface of conductor A. But an equal and opposite charge of +q units must appear on outer surface A so that charge on the surface of A is Q + q.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Hence the total charge on the surface of A is Q + q.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(iii)<\/span><span style=\"width: 3.19pt; text-indent: 0pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><span style=\"font-family: Arial;\">The instrument should be enclosed in a metallic case. This will provide an electrostatic shielding to the instrument.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.29. A hollow charged conductor has a tiny hole cut into its surface. Show that the electric field in the hole is\u00a0<\/span><\/strong><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"18\" height=\"31\" \/><strong><span style=\"font-family: Arial;\">\u00a0<\/span><\/strong><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAoAAAATCAYAAACp65zuAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAEFSURBVDhPzY+9qYVAEEYNzGzAxEAjazAwUwPBWMQa7MRAsABLEE1FULEAQVDQAsRMMBD8mceMm1xecrP3BnbZ78xZdoeDL+s\/iVEUAcf9vv9B+r4HTdOgLEtwHIfRtz7EJEnYCaCua1iWhSUm3vcNVVXBOI4EsYqigGEYWGKiLMsgiiLwPA9d14FlWSBJEv21aZpXPM8TrusC3\/ep4bouPM8DnudRTtP0FXHDpxHiWteVGrquU57nmTKJ27YRVBSFIF4UBIHYvu\/ESMQhEJqmSRD\/iVlVVcpYJAZBQI0wDAm2bUsZh4rjGLIse0XDMGhN00TicRw0jG3bkOc5MRK\/qT8TAX4AlfGNetKKt6sAAAAASUVORK5CYII=\" alt=\"\" width=\"10\" height=\"19\" \/><strong><span style=\"font-family: Arial;\">, where\u00a0<\/span><\/strong><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAoAAAATCAYAAACp65zuAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAEFSURBVDhPzY+9qYVAEEYNzGzAxEAjazAwUwPBWMQa7MRAsABLEE1FULEAQVDQAsRMMBD8mceMm1xecrP3BnbZ78xZdoeDL+s\/iVEUAcf9vv9B+r4HTdOgLEtwHIfRtz7EJEnYCaCua1iWhSUm3vcNVVXBOI4EsYqigGEYWGKiLMsgiiLwPA9d14FlWSBJEv21aZpXPM8TrusC3\/ep4bouPM8DnudRTtP0FXHDpxHiWteVGrquU57nmTKJ27YRVBSFIF4UBIHYvu\/ESMQhEJqmSRD\/iVlVVcpYJAZBQI0wDAm2bUsZh4rjGLIse0XDMGhN00TicRw0jG3bkOc5MRK\/qT8TAX4AlfGNetKKt6sAAAAASUVORK5CYII=\" alt=\"\" width=\"10\" height=\"19\" \/><strong><span style=\"font-family: Arial;\">\u00a0is the unit vector in the outward normal direction, and \u03c3 is the surface charge density near the hole.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. Consider the charged conductor with the hole filled up, as shown by shaded portion in Fig. 1.159. Applying Gauss&#8217;s theorem, we find that field just outside is\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAsAAAAfCAYAAAAx6zerAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAEFSURBVDhP7ZGxjkRQFIZ1WjWJVxDhAUTpIXR0Gl5CVBKVR1BRik4zDyDRiEKpUSi0\/sk9g92xM7Oz3WazX3Jy7n\/Pl3uv4PAm67pe\/uWdPyE3TQOO474U406epgmSJG0JSNMUy7Js6STXdQ3btrd0Yz+VcScPwwBFUbZ046nM6LoOqqrCcRx60jzP2+SB\/AqS9y9+o3548rb+lt8mF0WBMAypoiii4ZlD5nmeNhjsTz7ikKuqgmmayLKMBow8z+H7Pt3GOGRBEGjjM5ZlUdc0jfohy7KMIAgQxzF0XUff9\/A8j6QkSdC27Yd8ZhzHQ3Zdl\/pTmWEYBsqyhCiKlF\/KZ9Z1vVwBhbHTMqBsFHUAAAAASUVORK5CYII=\" alt=\"\" width=\"11\" height=\"31\" \/><span style=\"font-family: Arial;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAkAAAATCAYAAABC3CftAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAADnSURBVChTxZAxDkRQFEVFotRrJRqrIBqNWq+mswAN+9BZgMQaEJ1eIZHodBKEO3lvxGQmM5lu5jb\/35fz7795Ar7oOI7+35AgCOi67nRvINu2UVUVdF0\/Jy\/QMAwoy\/J0wDRNfF7Quq4oioKHpLqu0bYt3y9IVVXukqYpHMeB7\/vsl2W5QxS77zs8z4NlWRjHkRMURcE8z8+d6GUcx6cDZFnGtm0PiNJEUeR4UtM0kCSJgAdEJTVNY4AUBAH3Il1QkiQwTZOHJMMwEEURwjCkxd4h13WRZRkDpDzPebH0w1PxT\/o5dPQ3eTNhpKLTGeIAAAAASUVORK5CYII=\" alt=\"\" width=\"9\" height=\"19\" \/><span style=\"font-family: Arial;\">\u00a0and is zero inside. This field can be viewed as the superposition of the field E<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0due to the filled up hole plus<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/jpeg;base64,\/9j\/4AAQSkZJRgABAQEAYABgAAD\/2wBDAAEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQH\/2wBDAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQH\/wAARCAC5ALIDASIAAhEBAxEB\/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL\/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6\/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL\/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6\/9oADAMBAAIRAxEAPwD+\/bncD2xzTqKKACiiigAooooAKQZ5zjrxjPT396WigArxz9oX4k3Pwa+B3xb+LtrbaVfS\/C\/4b+NviALHXdQvNI0e9Xwh4c1HxA9rqWqafp+rX2n2k6ac0U13a6XqM0COZI7OdwqH2Ovnj9q34Gah+0t+z78T\/gVp\/jib4dH4neG7jwrfeLbfQrfxLPp2kajJEmrxRaNeX+m2l22oacLnTj9oufLiS7eQxSlQhAPmf\/gn\/wDto+Lf2yvDXxKv9d8LfDPR7vwE\/gS0j8RfB74pXnxZ+Heoav418EWPjDU\/CyeJbzwn4Ok\/4S\/4fy6hb6R4ysLSxv8ATrW8ubaO11SVzcQ2\/wDF\/wD8E1v2aP8Agq\/ov\/BwJ4qk+JGs\/Etdd+GXxM1jx\/8AtUeLNa8azah4O1f4I+PbjxS\/hK1kQapLp+taL45tLWGD4c6FZ2bppstp58dhpX\/CO3Jsv7tP2aP2YLT9n\/UPip4t1HxWnjb4h\/GfXvDmueOfEFh4U0XwH4e2eD\/DFl4Q8L6R4c8GaA09no9hpmjWW64uLvUNX1fVNRu7u5vNTe2WwsbD8rP2V\/i98PtQ\/wCC+3\/BTv4eWniHS7rxbP8Asy\/shqmjxzpJO9x4Ct\/EzeLoYyu9DdaGvxF8JG\/tQRNENUBZMwzBQD9\/R0FLRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFITjHBOSBx2znk+g460tABRRRQAUincoPqM9\/6gH9KWigCGaRkQ7FDSFW2KxKguBlQSFbAz1OPQAEkV\/E3+w\/\/AME6\/j74J\/4OIf2p\/jDfftK+Htc8dfCm18H\/AB3+MFing7VLPRviT4Q\/a5Xx5HrPw20idfFV\/e6RB8NrPTtHTw3qOr6fPDrU2h6UZdP0GOOKV\/7aGJA4Gegx9SB\/WvxI\/ZbjaP8A4Ll\/8FTSWJWX9mr9hF0HRVxpXxMVsLk87urdSee9AH33+1t+1Dq37M9n8HP7C+HWnfEjWPjJ8U4fhXpGn6r8RdK+GenaVfyeDfFfjeXW9T8Qazous6fHpVjo\/g3V5L9pBbyRYg+zrdSSCKvevhT4u8SeOfh\/4Y8VeMfB0fw\/8S61pqXuq+D4\/Eum+L49FmeWZY4oPE2kQ22m63a3NukN7aahZ28MNxbXMTiNDlR8bftnfsrfE39pXxz+z\/4h8O3nwG1Hwf8ABfVvHvibU\/h18efhz4h+I3hfxf4p8WeEbjwRouqz6ZpniHQ7OFvCuiax4lNl9sh1AyXusrMghFqm\/wAy+CmufFjQv21V+E2u\/Ej4pa\/ovhD9n7S7bx\/4eb4Ma14Z\/Z1n+IUlt4Ck0U\/BXxFaeBIdG0eDw9YWHiu612z1b4ka3PdJ4x0Hw5Y2U134V1Sa2AP1aooooAKKKKACiiigAopOcnjjAx9ec\/0\/OloAKKKKACiiigAooooAKKKKACikIzwRQoYDDHceecY\/QZ6dKAFooooAK\/Ff9miAR\/8ABb\/\/AIKbXO\/as\/7L\/wCwyNjFfmYRfFmPdkncSotyCMbQCvOTX7O3lyLWIzNgRplpTySsaqSzADklR82BknGAMmv4c\/8Agn1+1B+1v4l\/4OO\/2rPiP4x+Bnx20T4M\/He3\/wCFT62dc+Hni20tPh18Moob+T9k\/wAd+KbG50uKbwtoPjaHwBqo0nVdXitNOmufGGsP9p3TkuAf3L0f5\/z+dfIP7Z\/7T2ofsofDPwp8QNP8K+FfFj+KPi38MvhOlp4x+IUfwz0LTrj4m+JbTwrY67f+Krjw54ltLTT9Evb2HUtY+12kCLoltqVzBNNe29tYXvrfwO+IPiv4jfDnRPFvjzw34Y8HeIdXn1h10nwf46tfiR4Vu9Httb1Gz8O+IfDvja00rQode0jxVoNvpviWwm\/sjT57e21WOzuLcXFtKzAHsdFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRTWdFOGYKcE8nHA6nn0pBIhzh1O07Tgjhv7p9G5HB55HqKdn2f3APoqMyxgbi67RyTngD3qhNrOkW7iKfVNPhkOf3ct5bxvxycq0gYY75FINXsjTorFPiTw8uC2u6Quc43ajaL0wD1mGMEgHPcj1qFvFnhdMh\/EWiKQGJDapZAgKQGODNnAJAJ9SB1NFw13tobrxrIMMMjnj1yMHP4V+Kn7LMVnf\/APBa3\/gqgVeYyaP+z5+wJp0iNISnmT6R8ZtQDqhZkXbE9vtIRXVjI6lPNff+ycXiXw7Osbw69o8yykiIxalZyCQjOVTbMd7DByq5IwcjivxS\/ZH1O3i\/4La\/8FbWmvrcWcvwS\/YENtI00aRF4\/B3xO85VYsAzLvBJ6jODjpRcdn2f3H3V+2d+zR8Sv2jG+A0ngDxz8MvCsPwa+K0\/wAV9S0P4qfCvVfit4Z8b6jbeA\/F3gjQtI1PSNP8feBVh0zTf+E01LXpfOuLySbV9O0OaA2wspxc+bfDjS\/jf4A\/au+DXgTxl408V+LfC5\/Zb+LEnjaLwV8MrrwT+zrp3j6y+K3w\/ufh9\/YNra2Gs2nhjWbbwRe+L\/D2k6DqnxA1q+k8P6HBcvbpd3Ul7ffoudV0scHUrEcFubuAHaOp5kzj3\/KqP9reHVJLatpisBkl7+2yA2CM7pOnQ579STQFmuj+43qKxf8AhI\/D44OuaQDjODqVmOOMHHndCCCPYj1q7a6jY3qh7S6huELMoeFxKhKnBw6Fk4PvSum7Jq+9r699vTULPezt3sXaKKKYgooooAKKKKACiiigAoorE8SeJNB8IaFq\/ibxPq+n6B4e0DS7\/Wtb1vVrmKy0vSdJ0u1kvdR1HULydo4LSysrWKW4ubiaRI4oo2ZmAFADte8Q6J4Y0nUtd8Raxpeg6PpFhdanqmr61fW2maVpmn2cTTXV\/qOoXksFpZWVtGjSXF1czRQwxqzySKoJr8bNb\/4K2+JvjprmqeB\/+CZH7Lnjj9tzU9MvJ9I1X45XepRfB39kXw5qtvIkVxFJ8Z\/F1oJfHjWZZ3mtfhpofiXzQipBekM0q+TeF\/BXjz\/gtT4uh+K\/xabxB4K\/4JZ+E\/EF4nwZ+BkF1qHh7XP237nRr6S2h+Mnxoezms9Us\/gRJeWrXXw2+HBmiXxtYbfEfimBtPvNNtT+7vhTwV4T8C6DpXhXwX4e0jwp4Y0Kzg07RPDvh7T7TR9E0jT7VQltYaZpenw29lY2kCKFit7aGONFyFUZOT5X8tf0swPxrk\/Z6\/4Ld\/HMRah8Tv27P2bP2RNNvGV5vBP7MH7OU3xW17SrSQIXsR8SfjZ4kSKfUoQ0sR1Gz8IQ2zSgTQw+U4jVbb\/gkf8AHbxFbxRfFj\/gsB\/wUs8Vzwv5jN4C8c\/Cr4N6dNITuYpY+E\/hrdXkUPJVYX1WYDGQ2AAP27ookoyabjFOO1k\/Xq3f5jTaTXRn4kj\/AIIUfs16xNZXPxK\/aS\/4KHfF2e0kSW4\/4Tv9tr4xm21LGQY7208M6l4bgEbbmLpZi14O0bVytfjd8bf+CU37CPhL\/gqrqXwFk+Eer618LB+wd4W+K40LxL8UPit4m1TU\/iPqnx18Z+GtT8Q3Gvar45k8Q3uoXWg2FlaPBLqT2vl2uYIra4keaX+0V\/un8P51+AP7Q1kZf+CyuqzmEzD\/AIdy\/DxPlU7ht\/aQ+I7FdwJYJIm9HEQ+0OpKW5WVlI1w1niIRkouKadmlLdxvunbTse\/wtTo1c\/y2niKca1Cdaaq0Zq8KsFQqtxlF6SV0nZ6Xs+h8Yp\/wRr\/AOCarFRH+y1ojsUhM\/n\/ABA+KiyRZXzJI44pvH6XDxNIREUt3UvMgRAkm8PaH\/BGv\/gm9c2sUD\/s0aRudEVZLfx18VluCsW1GR7hfHiSxrPK6R3LoZfMkHl28T3FsSf08lubRJ2G9hC0eIo1iSNwiBFmmmESSqxfKKoRoj5KRWln9ovWeYr9otYlDq0xlmVAkUzwsvmvO6KBtMaKVEvBiiWW2jbyrZ5rp5ce1KlScly0qXS1qcN9ElrHy9dX8v3j+wcjnCm4ZLg1KbTjy4eDa2SbtFaPVbW8+35hJ\/wRy\/4J028kcMP7N6W0e6cp\/wAXK+KjlV2xSMgiHxGItEI3IGFuivLvgtXe5jkr4E+D3\/BM\/wDYp8Vf8FCv25PhZ4l+CFvqXgH4a\/DL9lzV\/CGgp408fg+H7\/xr4e8bN4ou31Oy8YRX\/m6rJo9gUgvtQ1KCykBfT4laVlH9GZ\/eoYl+SVSWNwkcFvLARcNAk8Ec0jYkAkj5iVjEV+0RJPLmJ\/5TP2D\/AI6ftueLv+CzP7Snwk8cN4SjubJk0X9oXxZZ+CZLObWfhv8As62+r+G\/h1qfhy0XUI9P0Gb4nT+MfDOoajf22nIt1ZambjRNO0uRYw2dSMIeyTorWf2KcVdaJ82i2d3ZeZ4md4DJsFisloVcrw8frGMjFLD4WKjUio8rjUtLlTcpKT591FtaXP07+IH\/AATK\/wCCRHw2sdG1L4ofDD4dfDux1y9utN0m\/wDG3xo+IPhGHV72G1Zri30691z4p2sNxd2cMLM0GmXU7WjZuZo5L\/cId\/w3\/wAEiv8Agll410fTfFvhb4FeG\/EvhnWrFtT0TXtA+LHxPvtO1nS7uIxm9sdS03x\/d6fdQvGVkguIJLmKyZTKJZrmUQr0\/wC3Qdek+J37Ken29h8SrDQvB\/i74k\/FHW\/Hvw3+B+ufHW28Oaronw81rwP4V0u70rSvDfiK3iudYuPiHrc+ny3WnsIG0v7SGiuFVl9s+FHxeOueP9I+FI+E+vfD3w7\/AMKst\/HPhXxZqL+GPD07WAbw3ZS6f4h+HekPNqvw\/vTqnii807R4NatbVNU1Hwx4utIbSNNHWU04whUlD2NOULRcZeyV7ys3d25W76W3\/At4DIf7SxWE\/snL\/ZUakKFOSw6lOpUqRhN3kqUo8yk3BNNRaas2zweH\/gjV\/wAE3reOO4tf2bLbc6RfNL8T\/jUgnjdQFZ2\/4WF5oDjaI4nxJDgtMjxTJDDy\/wDwTE\/4J8fF7Vfhd8evib+xH+2v8Z\/2SfFXgv8AbP8A2mfhlYfDjVWt\/jt+zjrXhb4e+N1svCuk618LfH91Jf6feQWkn2K+8RaB4p0\/WLi22\/avtVzAsx\/VS3W2jt0jIDnG6QPO0JXygGDSRbNyJKZywXLGM+VFIkqNvSv\/AMEOLdYP2ev2nyrGTzf+CiP7ZshkYvuk2fEkQK5VncIWSNcom1FAC4LBnfmx1OlGnTcKcIO2rjFLt83pv6+Z8fx7gsuwmAyuWCwNDCupiKyc6MJRcoezUowbcne2sk7a82jskjFj\/aT\/AOCzH7OTPZfH79iD4T\/ti+FNO3PP8T\/2LPitaeDvGl9ZgNL9ok+BfxqfTp5r2FMRT2OgeN71riQB7KJg7LH2vhD\/AILifsQpqSeGf2grr40\/sZ+NDcW9pL4c\/a5+CXj74QWiXtx5S\/ZIPG93pOofDu6CSTIv2iLxa0DIfPSRrciWv2JKKTuKqWAIDEDIB6gHqAa5vxT4K8HeONJutB8aeFPDni7Q76NorzRvE2iabrulXcTAq0dxp+qW11aTIQSCskTLz0ryz8wvpay9banNfDr4y\/Cf4v8Ah+DxV8KPiP4I+Jfhq55t9d8BeKdD8XaTLwCQmoaBf39oXGeU80OOpUDmvSUcOu4AgZIwwweCR098ZHqCK\/IX4p\/8EQ\/2DvGOuz+OPhJ4F8Vfsi\/FHzXvNO+Jv7Inj\/xT8Btc0\/U23MuoS+H\/AAjfxeAtYkSU75Idb8I6hFcL+5mUxqoXya58M\/8ABYr9hsf2h4b8feEf+Cp3wJ0mXde+DvG+n6D8Df2w9E0GIqf+Kb8aaNHB8K\/itqVrbGSaS38Tab4Y1rV5Y0tLS6E0oIaTbSWv3LX72vxBfd95+6tFfFP7Hf7efwD\/AGz9E11Phrquv+HfiV4DuItM+LPwM+JmiT+CfjT8JdekDB9I8deBtSc39ovmxyxWOt6e+peHdXWIz6Tq15CQ9fa1DTTs1qhBRRRSAK\/Fr\/govqut\/tcfG\/4M\/wDBLPwVfX9n4b+J+mn47\/tseINJvHtLrQP2TPButrYWvw2F5aGO5s9U\/aI8dQ2\/gtVgnjuk8GaZ4yn8ua3Y7v2Q13XNJ8NaNqviDXr+20rRdE0691bV9TvZVgstO0zTraS8vr67nchIbW0tYZZ7iVyEjiR3YhVJH5F\/8Em9GvPjJD+0r\/wUV8V2F0muftv\/ABevtW+FUmpwJb6lo\/7KXwlFx8PfgDpMQjc+VYeINN07XPiRsAQ3MvjYXM3mvtlYA\/Wzw14Z0HwdoGjeFvC+lWOheHPDuladoWg6JplvFZ6Zo+jaRaRWGmaZp1nAqQWljYWUEFra20KJFDBDHGihVArdoooAKKKKAGv90\/h\/OvwD\/aXjV\/8AgsJcg+Z83\/BObwZjy9gBki\/aV8ZmNJCy+YyOJG+W3LOSuNu7aD+\/jfdP+fp+tfgZ+0Xdo3\/BYbVLdIJXMP8AwTk8HhmSCKQbpP2lPE0yqzTRklmjSTZHbmWRvL8ySPy4WNdGF0rJqLbdlp\/X9eh9FwnJx4iyqVua2Il7uzlzUasLX\/7ev6J2PUWi2MksjXBdbw2scEUkZJgnTMRZ4YvLXzolJRkaBXYM1sdwZCsEInRng80j7UYXeWRRsbeSEwHG7zPvQYkSJ4WbyVa5jlLb8tvHcXG8jJlRt8sjQzieKWEptZleOSVsRbJCkERu0Ym1hSKCR18L+OPxSg+DvgxtR0fTj4j+IfiO\/g8I\/CvwMNS06wuviF8SNaimg0Lwzbz39zp9oLKSaCbVPEWrvPBb2Hh3SdX1NJIraxnmr2Vp710mv81\/n+B\/QkJyoUp1Klb4OarJKbskrNRgo9eVK28pPRX0PXreWa4vJUCCNooJJUuFdQX8uXyikMkSp8schSSPy2aR5IpY7dGaeSVfyp\/Zv0TQbX\/gqx\/wUc1g6dFJql18Mf2M7JLuCBY7sRah4P8AF91dI5it1aYXZ0HTHulR5RfPpdqyZKL5Hs\/7APjT4gav8OPjL4P+J+ta1q\/xc+Gn7QnxQ8O+J4\/Geu+GNb1KxufE8Wj\/ABH0C2vZvA2s61osHh2x0\/xxbafpWn6VfXEei6XaQ6HaM8mnXsp\/mn\/4Jw\/D7\/gpFY\/8FhPG118TD8Q4fEOg+ItX1X9rTWfEmqyy+Fb74f8AiGw8QP4Ms7q6iuLrR9U0fXJ4rOX4V22kJK1rp1sLvw5bW2nadeGDOrXu8OlFzftHsrp6aLXffuj5nMs3VWpw7KWEr1Vi8e3Sk6ac6KjRdCcZKUeaM6cpe0lHeMYS5lzJtf2jzTyToJW01biQRsyPMreahMzFVB24WCTeEdvLMjP5sdmzOlxNB41pvwM+HuifGHxN8ctM0DxcnxJ8V6PbaH4qvb\/xj44v9Au9J0y00vS7CBfBlzrc\/gvTXsY9Ogjtrqx8P293aXNxfpZzPLq2qzy+qwXtxHCryiZSIvMlZwhGRK6vmaG4W1KRs75iEOYzIsFo1zLLOw1ke6WN7iQSSuZJJPNcFHaO3kRI1VVhtbeLyzE8JZFPl7BFF58ztJF0N2ajO0lfms1s7fOzTVr2Z9I\/q\/tIe0o05ujOc05w5mqqi405wnzSik43doxjG8rvmsyqQwuZJlgmhQo+ZkiiGfKjdAtwy7vs6q7iOK1klUWDsbOJHnK4n\/4IlIkfwG\/alMcYiST\/AIKJftmuIhGsIiz8SyvliJRlAnl7djksuOpXaa0be9t5I7ubzmQqJoYGMEaQfaLUSRgRxSOz2j7nnWMP5whKz28wluSrrk\/8ERX3fAP9qI7VAb\/god+2QyFUZFZf+Fj4yFfLLhgyBSTtChNzbcnzswqNqEbaJN+Wlr9NdWfnfiXKFTB5TKLilCtUjFRsuZOjH3ml7vu6w0tblXQ\/ZyiiivLPx8KayI2dyK2cE7lBzjpnI5x2p1FAH5qftwf8E\/NN\/aF1LR\/j38C\/HV9+zV+2v8NLJo\/hX+0T4Ns1W5vbNZ4bqT4d\/F7RYDBbfEv4U69LbxWur+G9fF22nRs2oaFJZ3iSLcan7Bf7bOr\/ALRUPj\/4H\/HPwja\/CT9sv9nTULPw18fvhRDdzXOlXS3kTSeGfi18NL68htrnxH8J\/iPZRHVPDerpEz6Zcvc+HtUYahY+Zc\/osQCMEAj0IyK\/F7\/gqd4A1P4C678J\/wDgqb8KrZ7b4hfsl6rYaN8ebGw3RD4nfsZ+MtYtNN+L3hnW4YpYk1Kf4cR3afFjwlJcR3Mumaj4f1NLRB\/aU6SAH7RUVzOieItL8Q6LpGv6Lew6no+uaXYavpOpWkzSWuoaZqVpFe2F9bSAYkt7u1minhccNHIrd6KAPxW\/bG8T\/Er\/AIKI\/tA+Jf8Agmz8ENY1Dwr+zz8Nx4dv\/wDgon8a9KmltL+70HX1g1rR\/wBkb4ealC0b2\/jH4k+HjFefEnXIXP8Awi3gTUBbRl9S1RbZ\/wBq\/B\/hLw34D8K+HPBfg7RrDw74V8KaFpPhzw5oWlwLbado+h6LZQ6fpWmWNunyw2tjZQRW8EYyVjRQSTzX5Wf8ER9Ms9W\/YQ8LfHCeCN\/Fn7VHxQ+N\/wC0p421neZbnxBrHxN+K\/iu70i+uZ2JeRbLwdZeGNHsoGknisrDT7a0t5DbxR1+u9ABRRRQAUUUUAMf7jfSv56fjxE91\/wWl8aM5tZY7f8A4JwfDCKGOfzEI+3\/ALQ3xCM5jdFVm8xrSGN\/LmWZN0YSNopJWj\/oYY4U59DX8\/PxxEg\/4LL+PysohK\/8E7fgtiSWIOkYl\/aA+M6\/umwzxI5iY3cieW6hIVUyiYhOvBK9eL7f1+n3XPo+E\/8Akocrto1iG0+qtQrN2e6fmup9ISZQtChM8ccfmMJZot4P2dVY7lCSpOy7xKsMi+Yn7vT3SGKR043xL4Y8K+JLrQ9Z1jw14c1668M6o+oeGr7VNLstU1Tw3qLqIH1jQbm8sTNoWoPaT7X1DRbmKWaHFtYTR75nPVtLBc+Yqw2yyQ7U2uGlY7jlZNqRM7OpWTHybvLRVgnEbFHz5NkLp5aeRG5MguoyUCAGJm2T+dJkzBysscUasql\/JSKGQl\/ch726S1tt\/ht+n6ef9FUaaah7enbnSc6clGpCSTTjKSUoty6qXs+ZaXWhhaN4K8I+GpvEOp+GvDvh\/RNT8T3f2\/xJd6PoenaRqniXUA7v\/aPiC+060gudS1II0qi7upp7u3iZ4Y\/kluDX4kfsm\/tQfDrxl\/wWW\/4KL\/DGw1CSbVNR8GfBzSfD128lna2t3q\/7PGl3nhX4g6RawY8lmsNQ8aXkUBtTM1tDoGqvFG9rCzL+7Uix3Ec8SXEkYeAqk0ccchhnaOYCYQSgxP5MSZVHR4JWYHy1tJJDX8337G3\/AATu+Dnw6\/4KrftY+JvC+ufE8eJP2cj8A\/HXhDxVceK3vNU8VeIfjz4A8d3\/AMYF8cKukW+l6zp3jC7uTqLWulx6f\/ZVysA02eOyVmfOtCfPRULPlndq1mtFr3ttt830Pn87+s0sw4fo4KjCcHm851JNxpRUK+Fq80FGajHmapVqjqWvKUZc2slf+j+SxtIoEjeb95IigbJfOlt41dygQFWggKAKFjiaXycMsOyObzajdomSJUnLRl4\/9TKVZo4kja3kmWCQYZlcorO7qyyS28yLt3n4Z\/bj8cfEHwV4S+CmifD3XPiZZ+OviD+0F4F8K2+lfCF\/AEXjbXvCY0\/xJ4q+I2k6f\/wsuP8A4Q9WXwP4d8QT2c+p3llbW+oW9rcWk1zHG9td+9fA65tdK0DQfBeufEjUPF\/jsaVqPi3UNO8b6p4HvvihY6Bq3ifVYrCx8UaX4Duo9DuH8IzTR+BrjXdGiksNV1jRJba1uhLbzkCn70o1FypcqTdlzOWqjG73tdnpwxGHnjq2Fcav7m1SrVlGKoynVV1Tp+9z8zTUlBQ0jzM93jtIjDMsQDzzwndFalnecXJCOX2ybPMb91H5YbzOPIdiZ3aSv\/wRSC\/8M+\/tIujo6v8A8FAv2y1Iik82GI23xXv7MxxMUjfarWxDCRdyuGUFk2O10WqKmJFtmUQTrDO3nFFDI8aFtjRb33ARK33LqTFrALRSLiqv\/BFC1itP2bvj8kRbaf2\/f238bkWM4X47+Jo1AUFnA2RqwEju67tm9kVTXDmEk400n392223Xr\/wLX7\/nHiSrUMusp2VarZuKULOCfuuLa1bbs93d3P2Ioooryj8mCiiigArzH41+AtH+Knwg+KHwy8Q2ttfaJ8Q\/h\/4x8E6raXkIuLW50\/xR4e1DRbyG4gbiWJ7e8kDoQdy5GM16dUUwBjYEZGOh6H2OQevT36d6AP4gvgD\/AMFmvij8H\/gT8FfhLqk9lfan8LvhL8OPh1qN7eawyXl5feCfB2jeGru6u0liEiXNxcaZJNOkgDrK7BwGBor+Pb9rzWdSsP2sf2oLG0Z47Wy\/aI+NdpbRpNMiJb23xJ8SwwoiKwVVWNFVVUBVAAAwKKAP9Tv\/AIIiqqf8Emf2BVX+H9m\/wMhwABuWK5EhwO5k3ZPfHrkV+qFfkt\/wQ21CS4\/4Jc\/spaFcxGDUfh54X8XfCjWIW3BodZ+F3xH8XeBNUiZGAMbJe6DOGjPKHg81+tNABRRRQAUUUHkEetADG5RueucEdueP89q\/n3\/aCLp\/wWK+IMiSmD\/jXP8ABeUoH2NdR2v7RfxmMkIHG8qZYmyJI\/LJR2by1fP9AkcMcEPlRIFQEkKucDJycZJ75PWv59vjli4\/4LNfEKOeaNoYv+CeXwVtRaSrG6yNP+0J8XbxiEmChmjWMyx\/vVRZFEtyDAj12YJXrx8tfu7+Xye59Jwg7cS5S\/8AqIkun\/Pmrteyv13Xqe62k32UQosfmjeIAsTRT2kCjjZMSEEzSAIPlDnzBLM0jafkMJqsdzceVCXVlT54g6YnCEJJnEZmKs5WZY1khV2xdwMLEzzPsm3DM62cFsgIB2SrAwG+YSm3EpjUSsW+RyqytI2fLRrDca52bTWSXY0aOEV44pWy\/nZaNgoIdRMqHL7xEDDMyJb40\/zDXsycoyTveyT0SS6fj3+4\/oanVk5Qd5Sn8MbU3KdOMlFOT5Lp26+87de5pWV09ysoCBXDuytcIsYkKuREv2sSuhjkhjjjd4EE9zJGyI39nRySt8d\/CX4C+M\/B\/wC2N+17+0Je6v4cu\/Bnx68Nfs66X4Qgtr7UJ\/E1hcfCnwhrvh3Xf7etTp9vZ6ekup6haJpp065vWuYUlWXyrWRfM+xbJFistshWMiMkqj\/uZw5likfZGZnSKVFdmQSKsjIqRqlrhglpp3lfumitHVkgjeZJG3RecpjupIykiLCiueUkByhFggWzDS1Sm5WaWq2lzdL9V19N3uKtSp1Z4WtUpzVTC1FWpte7+99lVpSlNTaunTrz5eVprnejtc8T+KXwE+FfxoufC7\/E3QZdev8AwRe63qnhCe08ReJ\/DV1oeq61pX9jaheWs\/hPXtGu7u7k06W80uWSQzSQ2d9f6TZSRWupXMkvFeEfgm3w6+M3g\/xF4K03wj4Z+F\/h34JeIvh1FpovNen8ayatrHjXRfGEk\/2u+tbs6npou9NvY7u6v9ZfU7rUb67FrLIjXU139Y+XCrhZ3gkklDeVBKsoVUbYsewC18jzX3mDyG8mSFCYQ0dvJHKc+7sQ0JZAVuFj\/co1vs\/cBS+Y2ZwryRRlYEt9oSFEKO6LtnOLavqocy1vZKbfm42b0+7yZx1aFCVX601QhUVSOIrTjBRlOUOXki5WcrQimnZWSbSbWirSamwNvN++8mQXDfZjFui2KkKWyum6FbdQVgjVAzIyI9tZyld0ja3\/AARUl839nD4\/HnC\/t9\/tr8MCrL5vxs1+XDKyqwY+YCQ3zDPNEUIY2xFukUUyxssskTb\/AC5WjAWJA582UxKEhjidbi4HmrG+fMkeh\/wRLlSf9nf9ot43Z1P\/AAUB\/bOc5SZQHPxc1MNzMAzbiN24YUk46g1w4+Tcad7by29EfAeJMozwmXypvmhKtKcbNOKUqaas4xTejXxOXkfspRSEkFeOpwfbgn+lLXmH5CFFFFABVPUJVgsrmZ3WNIoZZXdvuqsaM7M2eMALk+3cVcrxz9ojxbD4B+AXxt8dXKeZB4M+EvxF8Vyx+cLbzE8P+ENY1Yp9obiAuLTYJjxGxDnpQB\/lkeNPhjd+O\/GPizxwfAt7qx8ZeJte8VnVY9KE0epnxDql1q51COYwsZUvDefaVlJJkWQMSc5or+079i\/\/AIJxeENf\/Y7\/AGT9d1ez0xtW1r9mn4E6tqjXugSy3h1HUvhd4WvL03cjvukuTczSmd2+Z5d7HkmigD64\/wCCWPiK0+GHxS\/4KBfsR69cw6d4t+Bv7W\/xH+L3gbw64e2a++Av7UN9H8X\/AAX4g0a3mIS50iy8Va5418MXUunB7ex1LSngu\/KubhUb9lM1+an7bP7BWqfHXxf4L\/aW\/Z2+J837On7a\/wAItPudI+HXxostHj13w\/4p8HXlwb3VPg98avCLzQW\/jv4Xa9eF52t5Gj1vwvqMh1zwze2l6ssV18+\/Cr\/gqT4r+CvjPQPgJ\/wVH+Dw\/ZK+K2s6hb+HfBfx10a5vPEX7HPxs1GVlt7J\/BnxVmgVfh\/r2qS7Cvgb4l\/2PqVs0qRRales6AgH7W0VXtbq2vbeC7tJ4bm2uYYri3nt5EmhmgmRZIpYpEJWSOSNleN1JV1YMCQRVigAooooAQjII5GfSvw3\/bR\/YX\/bx8f\/ALaN3+1F+yF8Vf2Y\/B2m+Iv2fPA3wT8SaH8d\/C\/xI8R37SeD\/HnjLxmuqaQPBV5pdpBDOfFCWpS5vJ5X8mQNCiKvmfuTSE4x7kD86qM5Qd4txe10dGFxWIwWIpYrC1HRr0Zc1OpFJuMrON0pJraTWqe5\/O9H+xr\/AMFtxGkb\/tD\/APBOP5N6kt8H\/wBoK4YxPgHDDx3CFJAO4KpySUBEQEQln\/Y+\/wCC163K+X8fP+Cc8ttJv81\/+FPftARzLIVjZkWKbx5KrxXBiRZC0nybv3SnaqN\/Q7RVe2rf8\/avp7SaX3J2PZ\/1r4htb+1K7V76xpb+T9ndaab\/AIn84X\/DIP8AwXMaeHPxk\/4Jt+VA\/Q\/Dr4+v5yAzDcqtr4NsTCYoxFFNtTY\/zNu2iVf2Q\/8Agud5Yi\/4W\/8A8E0m2xqqmT4e\/tBlSy7vM3KmvoqpN5siyqFZfKxEVYKuP6OKKPbVulasvSrUXnspW6Fw4v4jgnFZpXabu1ONGetkr+\/TlZ6brbofzqn9kr\/guX+4lX4wf8E0o5o\/JBD\/AA\/\/AGi7teFijm+eTxBG5O1ZBARsZEcRszRrEsaTfsj\/APBcR9wX4u\/8E1nYFWA\/4QL9o9N6KEV45Hm8T3KOsoXa+YfMOQwl\/doo\/oropqtWTuq1ZPv7Wd\/v5vIzlxVxBJ3\/ALUxEW1Z8nJC6tazUYJbH86qfsk\/8Fww0DN8Vf8Agmso+zLFdqvgb9ohhPMHBkuUJ19HgkmjJVgpITaFg8mP93X6Qf8ABM79l74r\/sk\/s56j8OPjd4j8E+Kfif4n+Mnxn+L3ivVfhvBrtt4IGofFfx\/rHjE2Og2\/iSNNYhtrJNRWJorsyskgZfOnKmU\/oVRSnVqVLc8nO2zlq9fPc4cdm+ZZlCjTx2LqYmFBt0lUjTvBtWdpRhGTukl7zYUUUVmeaFFFFABX54f8FavE48I\/8Ez\/ANuDVt08b3H7OXxI8ORS2zbbiG48ZaJP4QtZ4T1MkFzrkUwQfNJ5ZRfmYV+h9flR\/wAFrbpov+CcnxoskAdNd8afs4+GL2Mk\/Ppvin9pf4Q+HtSXaGXzN1jqVwPKZgkn3H+UmgD73+EXgyx8E\/Cf4YeDLMl7Pwj8PPBXhi1fyY4d9toPhvTdKgbyQSIt0Vop8rJ8vO3JxRXpsEKQwQxRxARxRRxoB5WAiIFUDA6YAooA0681+Lnwg+G3x3+H\/iP4W\/FzwZ4d+IHw\/wDFunz6X4i8KeKdKs9Z0bVLK4jaN457O+hmjWaMsJrS7iEd3ZXKRXVnPBcxRyr6VRQB+G37DfiPxf8AsG\/tP6x\/wS8+KvifV\/E\/wh8QeGtX+KX\/AATz+JHi6+uL3WNQ+F2jXar46\/Zp1vXL52l1jxZ8EJLy0vPC0k1xLqGp\/DW7spJIk\/sgg\/uSM96\/Lv8A4Ku\/s3eNvjN+zbH8SvgZEV\/am\/ZT8Xad+0p+zZqEY23lx44+HsU99rPgJpYgLiTRvij4QOt+BdYsFcJfjVrTzTuhiZPr79lH9ovwZ+1n+zv8If2ivAE2\/wALfFnwNofi+ytXwLrR7rULVf7X8PajH96DVfDurx32iapbuFeC\/sJ0KjGAAfQ1FFFABRRRQAUUUUAFFFFACEZ\/z19j7UtFFABRRRQAUUUUAFFFFABX5H\/8FYbiLxnYfsUfs1W08UuqftFft3fs821\/oxZGlv8A4f8AwP126\/aD8f3clrMGgutNsrD4bafb3yzjyP8AiZQxndPLAjfrezBVLHOFBJx149Pevx4+H88v7Wv\/AAVf+IfxQgQ3vwY\/4J3fDa++AXgnUElim07Wv2n\/AI3Wmj+J\/jLqFsmwyG4+Hfw1svBfgqe4jkxb6j4n1yy3CRLqOMA\/XPySefnGecbunt9ztRV8wRHnZ1\/2m\/xooAlOcHHXBx9fx4\/PikUkqCwIJHIOMj2OCR+RNOooAjkjWTAbPGfoQRgg+o74yOQK\/EP9iS\/j\/Yq\/bs\/ak\/4J762Ro\/w3+Mmpa3+2v+xokzCPTW8NeNtRWL9ob4U6Cm0RW8ngH4lyf8JZY6Ms3mpoHjN7uGCO1gIX9wK\/Mj\/gpr+yx45+NPw58BfHD9ntrbT\/ANrr9kTxofjl+z5ezfIni2+03T5bXxz8FdYuQyMnhf4z+D2v\/Bupo7\/ZrfUJ9H1SRQdOVgAfpsCSAT1wM4pa+S\/2Nf2v\/hd+2l8DvDXxo+G1\/Lbi9afQvHHgfV0Fn40+FnxG0SVrHxh8OPHehuqX2heKPC+rRy2d3a30MRubf7NqVqJLG8tZ5vrSgAooooAQkAZJAA7ngUuaQgMMEAg9QRkH6iloAKKKKACiiigAooooAKKKKACkJ2gk9BQzbVZj0UEn8BmvxN+Lv7Tf7S37dHxn8b\/srf8ABPHxppnwl+FHwp1lfCn7Tf7eVxotp4wi8O+L0EUmr\/BX9m3Qr1ZPDfjD4naTbSG18a+MNWkufDnw+vJvsP2a+16FLYAHvn\/BQb9uTUfgNpvhv9nz9nfTbL4mftz\/ALQhm8L\/ALP3wohY3iaI92GtdU+NHxKjti8nh34T\/Di3aTXNd1jURbw6pNaw6Hp0k13dOIvfP2Hf2V9I\/Y8\/Z18HfBu21268aeKoLjWvF3xR+JGpZ\/tn4n\/FrxvqU3iT4i\/EDWC3zC78ReJb69ngt2JFhpkdhp0R8m0jFcF+xz\/wTs+BX7Gt34s8ZeGJ\/GvxT+OnxJW2\/wCFqftI\/G3xPP8AEH42\/EMWzI8Vjqviq+ggj0nw9ayIraf4V8N2WkaBaeXEVsWkhjlH3wBjoMfQUAFFFFABRRRQAVHJEkoAcEgZxyR1GO3X29+akooA\/H39pb\/gnb8VNB+Mes\/ti\/8ABOT4n+H\/ANnb9prxE1vN8Xfh\/wCM9OvNY\/Zq\/ait7GMpbRfFzwfpbR3vh\/xxbwhbbTPip4QMHiK2Q+Vqdvq0BOzzS0\/4K3\/Gb4FxzaP+3\/8A8E8P2qfgZqekLEmofEz4CeEZ\/wBq34BaugSctq2meLvhjHN4q0Wzna3Z003X\/CMWoWUUirfOHBI\/cw9D9D\/KsJut1\/17xf8AoVxR1S7u1+w07a2XzPyCH\/Bfb\/gmdHaQ3V98Tvi7pbSmINa6l+yz+0vbXcJl+75yf8KqeNcHcrFZXAZXGTtNIv8AwcA\/8EsXSVx8dvHH7h5Y50\/4Zu\/aTMkEkQUmOZF+E5MUjZOxH2s21yBhc1+qWtf6uX\/rpb\/1rkLfpef9fp\/m1bKhdfG+nRdk\/wBWZ+0X8i+9\/wBf18z80l\/4OCv+CWL7\/L+N3xEl2q7jyv2Zf2l5PMVCVzEE+ExMm7GV2jlcHgVLD\/wcBf8ABL6ctt+L\/wAUFCxrJul\/Zf8A2l4VYMM7UMvwoXc4\/iUdMiv1Etvur9P\/AGZK0JOqfU\/yqHHlW7b+S6pdvPuhxnzq9rdLXb6J9fU\/LBf+C\/X\/AATFZpFHxa+KGIwhMn\/DMf7SIiKyKGDLIfhbtIAYB8kbTkHoanH\/AAX0\/wCCYBdYpfjb46sXcB0+3\/s5ftGwK8fnmHepHwscuh2+aDGGzAyy\/dOK\/U1Puv8A9s\/\/AEWlZmpdR\/1yP8qUVzO3zKvb71+LsfmQ\/wDwXz\/4JY2sJmvf2j9WiHnyRGI\/Ab9opbqLaqtvltX+FPnpCQx2zbBCSrKjEqwDbL\/g4E\/4JG3uQv7Xei2rKrM8ep\/Df4w6VMhUEmN4dR+H9tKsxCnbCyCQkYC54r9APEXW5\/4H\/wCgGvJX\/wCP+4\/67D\/2WlbW17a2vbzA8Cs\/+C7H\/BJS82g\/tu\/CawLKjBNYXxVorgOqsoZNV8O2hVvmAZGwyEMGAKNjvtF\/4LJf8ErvECK+nft8\/svruZUEepfFbw1os29sAKYdZvLCUHLAfcwOpOASPmL9pH\/kNRf9c3\/9HXNfzuf8FBP+RR8Yf9gy9\/8ATVe1KT11vbXbzS7lXjb4Xfo1LT5pxd\/k0f2O6b\/wUb\/YE1e1+26d+2f+y\/dWvlrIZovjl8NigRywBOfEYIBKkAkAHoMkHHiHxL\/4LN\/8Ex\/hct5b6t+2B8KPFOu2pMaeEfhXql18XPGd9cEPsttO8L\/Daz8T6teTyNG6L5dt5QcAPKoINf5afjv\/AJGrwh\/1wn\/9GxV\/aP8A8G8v\/IT8df8AYW0f\/wBNUtXGDk78yS105ddFffmtr\/hBctno+Zdb6brpy32\/vH6ceI\/jB+3H\/wAFRFPw5+AHw\/8Ait+wR+xzrflW\/wARf2m\/i9pZ8GftMfFLwldn\/iYeGP2fvhTNJNq\/w5g8RWTPYz\/FLxwbTUNOtbqSbw7oh1CBZE\/YH9nr9nz4U\/su\/CLwZ8Dvgv4UsPB\/w68B6YmmaFo9nvmlZi73N\/quqX9wXvdX17WtRmudV1zWdQmnv9V1S7ur+7mknndj6zB\/rI\/+uaf1rSpPRtdnYkKKKKQBRRRQB\/\/Z\" alt=\"image150\" width=\"178\" height=\"185\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">the field due to the rest of the charged conductor. Since inside the conductor the field vanishes, the two fields must be equal and opposite, i.e.,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">E<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>1<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0&#8211; E<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>2<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 0<\/span><span style=\"width: 16.66pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><span style=\"width: 36pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><span style=\"width: 36pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><span style=\"font-family: Arial;\">\u00a0&#8230;(1)<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">And outside the conductor, the fields are added up :<\/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=\"80\" height=\"31\" \/><span style=\"font-family: Arial;\">\u00a0\u00a0<\/span><span style=\"width: 146.89pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><span style=\"font-family: Arial;\">&#8230;(2)<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Adding equations (1) and (2), we get<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"55\" height=\"31\" \/><span style=\"font-family: Arial;\">\u00a0<\/span><span style=\"width: 14.94pt; text-indent: 0pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><span style=\"font-family: Arial;\">or<\/span><span style=\"width: 26.22pt; text-indent: 0pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><span style=\"font-family: Arial;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"53\" height=\"31\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Hence the field due to the rest of the conductor or the field in the hole is<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAD0AAAApCAYAAACGJSFkAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAPtSURBVGhD7ZhLKLRhFMddEymF3DbKwm3DAkWSslFSLrHDwsLGQgqlZGkhZYGUBeWWUlJyyyUbC+QShZDc77lfw\/n6nznzGj7fNGa+mXc086vTPOd5nved+b\/v85znnHEgG8Qu2lawi7YV7KJtBbtoW8Eu2lawi7YV7KKtiZ6enm\/t5eVFZhiP1Yk+PDwkBweHf9rl5aXMNB6rE52Xl8fihoaGpIeoqqqKtre3xTMdRTSe8NjY2Lf28PAgs8wPBGdkZIinYXJykvuNIT8\/n0pKSsTToNzp+vqafH19KT09nXZ2dtjm5ub4y25ubmSW+flONED\/+vq6eIaRk5NDIyMj1NnZKT0aPj0+3Li1tVU8DQ0NDdKyDNPT0+Tl5SXeB8aIXllZ4U8EP91rFdEXFxd8483NTelRj7a2NnJ3dxePyM3Njfr7+8UzjK6uLiXS7+7uUnd3N7eBInptbY08PDzE0+yFo6Mj8f7m\/v6eZmZm9Nr8\/LzMtizBwcEUFBREaWlpVFpaShUVFeTo6Eipqak8rohubm4mf39\/Xs5lZWUUEBAgI9+zt7dHhYWFeq24uFhmW46npycOvI2NjZSSkkJbW1vcX15ezg8BKKJjY2OVAHJ6espPyFwUFRXxVvrfpktERAQlJiaKRxQTE0MdHR3c5pnPz8980ejoKHcawtnZGdXX1+u1pqYmmW15\/Pz86ODggNuPj4\/k5OSknEIsGlmOs7Mz3d3dcSdAX0tLi3h\/c35+zktIn+m73pxAB16iNr84Pj7mPQ4gnEUPDAzwk9EFgay9vV2830VfXx+Lfn9\/Z398fJxFI6LX1tZqROfm5lJBQQEHMVh1dTX37e\/v80Xm4Orqin8Agia+E0FmeHhYRk2jrq6OampqxCN+40hvtTnI591vQQYHBzm4vL6+so8jDlsMscLcqCYaweX29lY8TdaEJYmlaW5UE\/0VLEGI1s3zcdYjocA2CAkJUY4cU7Ea0UlJSZSVlSUe8fGpG4zwMKamprhtKlYhGrWzt7e3eBqQL7u6unIqiyzr7e1NRkxHddEocHx8fMT7AG8YtTxS47CwMJqdnZURTe2fkJBAkZGRtLy8LL2Go6poHFuenp78Jr+CGjg6Olq8z7i4uPAnKkPkFz9dBaqKRn6M+lnLycmJ8jdRZWUlxcXFKYJQ1aEoQtRHqakFf3ysrq6KZxiqicbSRaDKzMyk7OxsNuzr3t5eHl9aWmI\/NDSUx6KioljcwsLCJ9Hx8fGccf0E1USj5EOQ+mpYslpwjC0uLtLGxoYSxVET6IoODw\/\/8R8fqgcyY9DuaRQWgYGB3P4Jv1L0xMQEL\/fk5OTfF73VgegPQkYgiHMyFO0AAAAASUVORK5CYII=\" alt=\"\" width=\"61\" height=\"41\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">where n is a unit vector in the outward normal direction.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.30. Obtain the formula for the electric field due to a long thin wire of uniform linear charge density <\/span><\/strong><strong><span style=\"font-family: Symbol;\">\uf06c<\/span><\/strong><strong><span style=\"font-family: Arial;\"> without using Gauss&#8217;s law.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">[Hint. Use Coulomb&#8217;s law directly and evaluate the necessary integral.]<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans.\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.31. It is now believed that protons and neutrons are themselves built out of more elementary units called quarks. A proton and a neutron consists of three quarks each. Two types of quarks, the so called &#8216;up&#8217; quark (denoted by u) of charge + (2\/3) e, and the &#8216;down&#8217; quark (denoted by d) of charge (-1\/3) e, together with electrons build up ordinary matter. Suggest a possible quark composition of a proton and neutron.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. Charge on &#8216;up<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>\u2019\u00a0<\/sup><\/span><span style=\"font-family: Arial;\">quark (u) = +\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAcAAAAbCAYAAACwRpUzAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAD6SURBVDhPtZE9aoRQFIUHLAQVbNyBO7AV92Gngti6BFs7FxCms7f3rxUFO5egIGinjUo8iS+TzMi8wEDIgfPuz8e778K74Bft+359DW7bhmmabtUDdF0Xtm3DcRwoinKGURSRxiFRFNF1Hf1NjuNIfIKmaaKqKpKfoO\/7SJLkVj3AoigQBAFpHhqG4Q4Zhjm5aRr6Qt\/6T2hZFmg2DON6SdMUNMdx\/NeF2raF53nQdR11XZ+hpmmkcUgQBBKpY6kwDEOoqvo89lDf98jzHCzLYlkW+lhJkpBl2R3Ksox1XckNnudJ\/gPHcSQfXpYl5nk+Wl\/w83ine3\/7APkIktPgL6vDAAAAAElFTkSuQmCC\" alt=\"\" width=\"7\" height=\"27\" \/><span style=\"font-family: Arial;\">\u00a0e<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Charge on &#8216;down<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>\u2019<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0quark (d) =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAABgAAAAbCAYAAABm409WAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAEHSURBVEhL7ZY9ioRAEIUF7+EBFAw9gpFmJoYewdjcW5iIkYGhiSaKBnoRTcRU0fbN2MiyPwPCUh3sMg8KqqvBj3pVNEoQrL8H2Pcdx3FcJ2JA13XQdR3btl0VQkCWZSiKApL09ZPkFr0BtxIGYIyhqirIsowkST42ibyD73oDbvUDoKoq34S7+Kx1XeF53ssg6eDcoLIsX8Y\/nMFvNQwDwjCE67r8ZT1tO0U2A8MwrhNg2zbiOOa5EIssy0Ke5zwnBaRpCsdxEEXRVSEGjOOIvu+haRrquuY1IRYFQQDf93lONmRFUbAsC3+mTdNE0zT8jqyDaZq4PW3bYp7nq\/oEPP9hmLg42AP5N7AISi8yfAAAAABJRU5ErkJggg==\" alt=\"\" width=\"24\" height=\"27\" \/><span style=\"font-family: Arial;\">\u00a0e<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Charge on a proton = e<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Charge on a neutron = 0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Let a proton contain x &#8216;up&#8217; quarks and (3 &#8211; x) &#8216;down&#8217; quarks. Then total charge on a proton is<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">ux + d (3 &#8211; x) = e<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">or\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"128\" height=\"27\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">or<\/span><span style=\"width: 44.92pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"95\" height=\"27\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">or<\/span><span style=\"font-family: Arial;\">\u00a0\u00a0\u00a0\u00a0<\/span><span style=\"font-family: Arial;\">x = 2 and 3 \u2013 x = 3 &#8211; 2 = 1<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Thus a proton contains 2 &#8216;up&#8217; quarks and 1 &#8216;down&#8217; quark. Its quark composition should be Let a neutron contain y &#8216;up&#8217; quarks and (3 &#8211; y) &#8216;down&#8217; quarks. Then total charge on a neutron must be<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">uy + d (3 &#8211; y) = 0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">or\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"129\" height=\"27\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">or<\/span><span style=\"width: 26.22pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><span style=\"font-family: Arial;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"95\" height=\"27\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">or<\/span><span style=\"width: 86.17pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><span style=\"font-family: Arial;\">y = 1 and 3 &#8211; y = 3 &#8211; 1 = 2<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Thus a neutron contains 1 &#8216;up&#8217; quark and 2 &#8216;down&#8217; quarks. Its composition should be :\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.32. (a) Consider an arbitrary electrostatic field configuration. A small test charge is placed at a null point (i.e., where\u00a0<\/span><\/strong><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAoAAAAUCAYAAAC07qxWAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAEASURBVDhPxZAxioRAEEU1FTTTc3gGQcEDiJibCMJ4EPEMBoZqZmKoJ\/AChoKCgWimWLv9p8fZYHdmN9oPRf\/qelRXtUC\/1EvQdV3uOFjX9Y8hCPdeLzuGYUhlWcL\/fcaqqsgwjG+j7\/sneJ4n5mHRdR2KeZ4j37btCc7zfIH7vuNuXVfyfR\/+Atu2BaTrOvJhGGiaJnimC4zjGKDjOJSmKYmiSMuy8OoX0LZtgFEUUZIkpCgKr9wF8DiOa77Hc0VR4HwI4DiOgFRVxfZMbJEgCOCZADZNA9DzPFwyWZZFpmnyjIOyLAOUJIk0TUNnlmdZBojpWuad\/hP8\/I7b+zhvHxc0oLWxBtLPAAAAAElFTkSuQmCC\" alt=\"\" width=\"10\" height=\"20\" \/><strong><span style=\"font-family: Arial;\">\u00a0= 0) of the configuration. Show that the equilibrium of the test charge is necessarily unstable.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(b) Verify this result for the simple configuration of two charges of the same magnitude and sign placed a certain distance apart.<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. (a) We can prove it by contradiction. Suppose the test charge placed at null point be in stable equilibrium. Since the stable equilibrium requires restoring force in all directions, therefore, the test charge displaced slightly in any direction will experience a restoring force towards the null point. That is, all field lines near the null point should be directed towards the null point. This indicates that there is a net inward flux of electric field through a closed surface around the null point. But, by Gauss&#8217;s law, the flux of electric field through a surface enclosing no charge must be zero. This contradicts our assumption. Hence the test charge placed at the centre must be necessarily in unstable equilibrium.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">(b)<\/span><span style=\"width: 1.56pt; text-indent: 0pt; font-family: Arial; display: inline-block;\">\u00a0<\/span><span style=\"font-family: Arial;\">The null point lies on the midpoint of the line joining the two charges. If the test charge is displaced slightly on either side of the null point along this line, it will experience a restoring force. But if it is displaced normal to this line, the net force takes it away from the null point. That is, no restoring force acts in the normal direction. But stable equilibrium demands restoring force in all directions, hence test charge placed at null point will not be in stable equilibrium.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.33. A particle of mass mand charge (- q) enters the region between the two charged plates initially moving along x-axis with speed v<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>x<\/sub><\/span><\/strong><strong><span style=\"font-family: Arial;\"> (like particle 1 in Fig. 1.152). The length of plate is Land a uniform electric field E is maintained between the plates. Show that the vertical deflection of the particle at the far edge of the plate is qEL<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">\/(2m <\/span><\/strong><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"16\" height=\"20\" \/><strong><span style=\"font-family: Arial;\">).<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Compare this motion with motion of a projectile in gravitational field.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. The motion of the charge &#8211; q in the region of the electric field E between the two charged plates is shown in\u00a0<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/jpeg;base64,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\" alt=\"image151\" width=\"271\" height=\"102\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-left: 18pt; margin-bottom: 6pt; text-indent: -18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Force on the charge &#8211; q in the upward direction is<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-left: 54pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">\u00a0<\/span><span style=\"font-family: Arial;\">ma = qE<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: 'MS Mincho';\">\u2234\u00a0<\/span><span style=\"font-family: Arial;\">Acceleration,\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAACkAAAAbCAYAAADh0qZQAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAJRSURBVFhH7ZfPi2lxFMBlJZSslLUNFopSZKNZSNlY2vgPZsuCWGgWk7EiRVKKpCyww3aSrEQpIRbGwphS8mOIM87p8sybGaX3Xtcrnzo533Nv936+9\/qeey8H\/gNukpcynU5hMpl8isVicV2SmUwGOBwO5PN5CqPRCOFw+LokX15eSPKUfr\/PjuR6vQaHwwHBYBBcLhcEAgGqn0puNhuo1+uUsyKpVCqh2+1Sns1mwWq1Un6QDIVCYLFYoFwuU50VSR6Px2QA1Wr1iySyWq2g2WxSzookn89nsp8lD6RSKXYko9EoyOVySCQS4Pf7j5LpdJok8RdDoVBAsVhkRxLB\/ocL6PRK4i3G+mlst9tfksvlEnQ6HTidTri7uwORSASRSITZ+u9ASbPZzIy+hyRxRlwul3oSgjPCy95oNGj8O7VajbafC61Wy+z9M3jeeDxOMRwOmepXSDIWi4FGo6ECMhgM6ESz2YypsAtJolAymaQCgn9og8HAjP4ulUqFFsMlcZRstVp0kPf3d1CpVOD1emn8HX9yu91uN9jt9oviKJnL5WgleTweUKvVNC6VSvD6+koHZxOSvL+\/B4FAQG8dz8\/PYLPZQCaTgc\/ng91uRzuyCUmiSLvdhvl8TkXsT4eVfg2Q5LVzkzzHeDwGoVAIDw8P1C2kUik8PT1Br9cDiUQCb29vzJ4sSmInEYvFzGgvsu8wo9GIcr1e\/2lN3CTPcSqJ3QUl8X0SwRedTqdDOcKaJH7XmEwmemgUCgXKHx8f6bMCcwycCMLZzyJx3bFLfADYfAyvJyKR7wAAAABJRU5ErkJggg==\" alt=\"\" width=\"41\" height=\"27\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Time taken to cross the field, t =\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"11\" height=\"29\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Vertical deflection at the far edge of the plate will be<\/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=\"250\" height=\"40\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Like the motion of a projectile in gravitational field, the path of a charged particle in an electric field is parabolic.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">1.34. Suppose that the particle in Exercise 1.33 is an electron projected with velocity v<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>x<\/sub><\/span><\/strong><strong><span style=\"font-family: Arial;\"> = 2.0 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>6<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> ms<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\">. If E between the plates separated by 0.5 cm is 9.1 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> N\/C, where will the electron strike the upper plate ?<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><strong><span style=\"font-family: Arial;\">(| e | = 1.6 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-19<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> C, m<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>e<\/sub><\/span><\/strong><strong><span style=\"font-family: Arial;\"> = 9.1 \u00d7 10<\/span><\/strong><strong><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-31<\/sup><\/span><\/strong><strong><span style=\"font-family: Arial;\"> kg).<\/span><\/strong><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-indent: 18pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">Ans. Here y = 0.5 cm = 0.5 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0m,<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">v<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sub>\u00d7<\/sub><\/span><span style=\"font-family: Arial;\">\u00a0= 2.0 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>6<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0ms<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">, E = 9.1 \u00d7 10<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>2<\/sup><\/span><span style=\"font-family: Arial;\">\u00a0NC<\/span><span style=\"font-family: Arial; font-size: 7.33pt;\"><sup>-1<\/sup><\/span><span style=\"font-family: Arial;\">, L = ?<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">From the above exercise, the vertical deflection of an electron 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=\"64\" height=\"39\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\">\u2234<span style=\"width: 30.42pt; display: inline-block;\">\u00a0<\/span> <img loading=\"lazy\" decoding=\"async\" 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alt=\"\" width=\"76\" height=\"19\" \/><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; line-height: 12pt;\"><span style=\"font-family: Arial;\">or<\/span><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAGoAAAATCAYAAAB4DJieAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAS1SURBVGhD7ZdZKLVdFMd5Q8ZwgUIUdygX5EbIUFLmzEq4MYUbROJCMoTiQiRuDBcylcgQSeYyJEQhZIjM83zW+6119nOc2fz1njq\/2rXXs57D3vu\/1\/CogJJ\/Hh6P56gUSgFQCqUgKIX6H7i6uoLm5maoqqqC8vJyeHh4YJ6PoxBCPT8\/w93dHbMUj7m5OWhra6N5aGgo9PT00PwziAhVW1sLKioqEBUVxZ78DgMDAzA6OsosSTY3NyEuLk4wfHx8oLe3l3kBVldXITMzEwoKCiAnJwceHx+Z52c4PDyEsrIyZr2B68rKyqKxvLzMnn6OoKAgEu6ziAh1fHwMGhoav3Z7T09Pwdvbmy5DfX09eyrJzMwMuLu7w8jIiGCcn5+Tb3BwEGxsbARrbG9vB1NTU5p\/F4zcvLw80NLSAjc3N\/aUD\/5\/c3NzSltHR0egra0N29vbzAswNDQkdaDoHN3d3VBXV8eszyEi1NraGlhZWTHrZ3l9fYWioiK4ubn5kFDx8fHMEiUkJASKi4uZxQf\/njh46IWFhcwSBS+BNDo7O2F3dxd8fX0lhMrOzqYo5oiNjYX8\/HxmAf1O2ri9vSV\/f38\/1amvIiJURUUFuLq6Mks2GPbyxuXlJXtTOt8RKiYmRsL3588fNnvj5eUFwsPDITo6mj3hg9GHhyYPPz8\/CaHU1dWhtbWVWQClpaUQGBjILPlgpvL09ISWlhZoaGgQ7B2FHBsbA1VVVbi\/vwdLS0s6m+TkZOjo6AAdHR3Q1NSklCsiFEZTdXU1s2SDN07emJiYYG9K5yNCYfqJiIgAXV1dKCkpYR5+pOA6MVoWFhbAwMAA5ufnmVeU\/zZHh4l\/BzExMZFbGznEhcJsgGvGS8iB3ZudnR2z5IPnge9zY319nZ5ztVVNTQ3CwsJob5geDQ0Noauri9bv5ORENU0gFP4IF7O3t0c\/\/k3eE0ocrA1cbsdbiOLgLUXwUF1cXGguC64uDg8PsyfykSWUcEODBy4edV8BxRDOCDU1NRAQEEBz9BkZGVFNFAiFxVJfX59e4Njf32czUTAs5Y33xP6sUBg9kZGRNMcOsLKykuYcmDpkgd8wFhYWFOlY33Dz7yEr9TU1NTGLn\/p+ojuenJykxoTD2dkZ+vr6aI4ZA9MhIhAKuynhRgIbi4SEBGaJgkVU3lhZWWFvSkeaUNfX1\/D09ERzvFXCpKenQ2JiIs09PDwkmglZQp2cnICtrS01CQimQWyP30OaULm5uRSZHHhxvtrBCePl5UWfGAjWKTwbPAskIyMDUlNTqcPd2dlxVMGJsbEx2NvbQ2NjIxU8vIXCof4TXFxcwOzsLC0mJSWFWlfMy4i1tTVFI6KnpwdJSUl00FhssbZwbS7WGDMzM1hcXCR\/WloaBAcHk08Y3DTuZ3p6mj3hg\/XK39+fWaJg640tt4ODA+1\/a2tL0LVxkYn\/d2pqii4At\/bvgM0Ct7eNjQ2RYMELi5kAM8rBwcFbM\/Hb4Icupg\/hcXZ2Rj4snsLfJePj4+THbxHxA8GuEr\/00c8VZmlwdUwc\/GCWBnZXwmvDsbS0xLx88bHzw338hEifQZD6lPzbKIVSEJRCKQhKoRQEHo\/n+BeMxUjtMiIoWAAAAABJRU5ErkJggg==\" alt=\"\" width=\"106\" height=\"19\" \/><span style=\"font-size: 10pt;\">\u00a0<\/span><img loading=\"lazy\" decoding=\"async\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"35\" height=\"17\" \/><span style=\"font-size: 10pt;\">\u00a0cm.<\/span><\/p>\n<p style=\"margin-top: 6pt; margin-bottom: 6pt; text-align: center; line-height: 22pt;\"><strong><span style=\"font-family: Arial; font-size: 22pt; color: #c00000;\">\u00a0<\/span><\/strong><\/p>\n<p style=\"bottom: 10px; right: 10px; position: absolute;\">\n","protected":false},"excerpt":{"rendered":"<p>&nbsp; NCERT EXERCISES WITH SOLUTION CHAPTER-1 ELECTRIC CHARGES AND FIELDS \u00a0 \u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0What is the force between two small charged spheres having charges of 2 \u00d7 10-7 C and 3 \u00d710-7 C placed 30 cm apart in air? Ans. Here q1\u00a0= 2 \u00d7 10-7C,\u00a0 q2\u00a0= 3 \u00d7 10-7C, r = 30 cm = 0.30 m According [&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-5435","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":"&nbsp; NCERT EXERCISES WITH SOLUTION CHAPTER-1 ELECTRIC CHARGES AND FIELDS \u00a0 \u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0\u00a0What is the force between two small charged spheres having charges of 2 \u00d7 10-7 C and 3 \u00d710-7 C placed 30 cm apart in air? Ans. Here q1\u00a0= 2 \u00d7 10-7C,\u00a0 q2\u00a0= 3 \u00d7 10-7C, r = 30 cm = 0.30 m According&hellip;","_links":{"self":[{"href":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/wp-json\/wp\/v2\/pages\/5435","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=5435"}],"version-history":[{"count":2,"href":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/wp-json\/wp\/v2\/pages\/5435\/revisions"}],"predecessor-version":[{"id":5520,"href":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/wp-json\/wp\/v2\/pages\/5435\/revisions\/5520"}],"wp:attachment":[{"href":"https:\/\/vartmaaninstitutesirsa.com\/index.php\/wp-json\/wp\/v2\/media?parent=5435"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}