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University of Rajasthan, Jaipur, , SYLLABUS, , , , B.Sc. Part-II, , Examination - 2021, , Dy. Registrar, Wei (Academic), . Diversity of Rajasth, Ore pu m

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|, |, |, q, , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , 2 Syllabus B.Sc. Part-II, r CONTENTS, Optional Subjects :- Page. NO, , 1._| Physics 4-9, 2. | Chemistry 1o- V7, 3._ | Zoology (8-27, 4. | Botany 28-35, 5._| Geology 36- 34, 6. | Mathematics ho- 44, 7. | Economics 45-48, 8. | Geography 49-52, 9, | Statistics 53-57, 10. | Applied Statistics 58-62, 11. | Psychology 63°F, , 2. | Electronics 68-75, 13. | Textile Craft 16-71%, 14. | Garment Production and Export Management 78-92, 15. | Geology and Mining | 83-8, 16. | Environmental Science | 86-9), 17. | Biotechnology ) 92-94, 18. | Computer Applications 45-96, , , , pg se, Lee,, Dy. Registrar (Academic-!), , University of Rajasthan, Jaipur

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|, {, {, |, |, |, , i,, B.Sc. Pt-ll, 1. PHYSICS, , Scheme Manx. Marks: 100, Min. Paa¥ Marks: 36, , Paper # 3 hes, duration Max. Marks: 33 Min, Pass marks 12, Paper it 3S hrs. duration Max. Marks: 33 Min, Pans marks 12, Paper LE 3 hrs, duration Max. Marka: 34 Min. Pass marks 12, Practiont S hrs. duration Max. Marks: 50 Min. Pass marks 18, , Paper-l ; Thermodynamics and Statistical Physics, Work Load: 2 brs, Lecture Aveek, Examination Duration: 3 Hrs., , Scheme of Examination: First question will be of nine marks comprising of six parts of, short answer type with answer not exceeding half a page. Remaining four questions will be, set with ane from each of the unit and will be of six marks cach, Second to fifth question will, have two parts namely (A) and (B) each carrying 3 marks. Part (A) of second to fifth, question shall be compulsory and Part (B) of these questions will have internal choice., , Unit-1, , Thermal,and adiabatic interactions: Thermal interaction; Zeroth law of thermodynamics., System AH thermal contact with a heat reservoir (canonical distribution), Energy Nuctuations,, Entropy of a'system in a heat bath: Helmholtz free energy: Adiabatic interaction and enthalpy:, Gigneral interaction and first law of thermodynamics; Infinitesimal general interaction: Gibb's free, energy; Phase transitions Clausius Clapeyron equation; Vapour pressure curve; Heat engine and, efficioney of engine, Cacnot's Cycle; Thermodynamic scale as an absoluic scale: Maxwell, relations and their applications., , Unit-2, , Production of law temperatures and applications: Joule Thomson expansion and J !, coefficients for ideal as well as Vander Waal's gas, porous plug experiment, temperature, inversion, Regenerative cooling. Cooling by adiabatic expansion and demagnetization; Liquid, HMelum, He fand He tH supertludity, Refrigeration through Helium dilution, Quest for absulute, cero, Nernst heat theorem, , The distribution of molecular velocities: Distribution law of molec, probable ave, , ar VEO Mes, Mast, ge and rms velocities, Energy distribution function; effusion amd molecular:, ental ventication of the Maxwell velocity distribution: the principle of equi, partition otenerys, , , , Heat fb spe, , , , Transport phenomena: Mean tree path, distribution of free paths, coefficients ot viscosity, thermal conductivity. dittusion and their interaction, Unit, , Classical Statistics: Validity of Classical approximation: Phase space micro and macro, , states, Higthedyname. probability. relation between entropy and thermodynama probability, , Mu aie Hdd pas. Baronets equation. Specific heat capacity of dhittonne nan, anccaty of afi, , , , , , , University of a;, @4AIPUR

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Unit-4, Quanton SGitstios: Hhiak Bests sad-ttion cine failure of classteai suttistics Postulates ol, joontane Abaisties. afdistaginshibelitty wave finction and exchange degeneracy. a prior, shty. Hose ftistern statistics and its distribution function, Planck distribution function and, nadiation formula, fenm-Dirac statistes and its distribution function, contact potential., therimoric cathision Speeilic heat anomaly of metals: Nuclear spin statistics (para- and ortholydroyen), , , , , , , , prob, , Paper- 11: Mathematical Physics and Special Theory of Relativity, , Work Load: 2 hrs. Lecture /week, Examination Duration: 3 Hrs., , Scheme of Examination: First question will be of nine marks comprising of six parts of, short answer type with answer not exceeding half a page. Remaining four questions will be, net with one from each of the unit and will be of six marks each. Second to fifth question will, have two parts namely (A) and (B) each carrying 3 marks. Part (A) of second to fifth, question shall be compulsory and Part (B) of these questions will have internal choice., , UNIT-1, , Orthogonal curvilinear coordinate system, scale factors, expression for gradient, divergence, curl, and their application to Cartesian, circular cylindrical and spherical polar coordinate., C “cording lgreformation and Jacobian, transformation of covariant, contra-variant and mixed, , tensor: ition, multiplication and contraction of tensors: Metric tensor and its use in, Cransformation of tensors., , Dirac delta function and its properties., , UNIT-2, Lorenty transtormation. Length Contraction, Time Dilation, Mass variation. rotation in spacctime like and space like vector, world line, macro-causality., Four vector formulation, energy momentum four vector, relativistic equation of motion., invarianee of rest mass, orthogonality of four force and four velocity, Lorentz force as an, @aample of four forse. transformation of four frequency vector. longitudinal and transverse, Dopplers effect, , Transtormation between laboratory and center of mass system. four momentum conser ation, kKinemates ot decay products of unstable particles and reaction thresholds: Pair production, elastic Collision ot v0 particles. Compton effect., , UNIT-3, (a) Pranstormatoen of elevire and magnetic fields between two inertial frames Fleciric field, , , , measured in nos, bY The second vd, , trames. Electric field of a point charge moving with constant velocity, near differential equation with variable coefficient and singular points., serres solution method and its appheation to the Hermite's, Legendre’s and Laguerre’s, differential equarions Bast properties like orthogonality, recurrence relation graphical, reprégentation and yenecatine tinction of Hermite, | +, applications), , , , , , vendre and Legnerre functions ¢sunple, , cad-mic), , , , WIAIPUR, , ty of Rajast, , 2an, , , , vn ttee es ne a