DIRECTORATE OF DISTANCE EDUCATION
Sri Krishnadevaraya University::Anantapuramu
ASSIGNMENT
Second Year MA ENGLISH
Max Marks: 25
Paper VI-Comparative Literature
Section –A
Answer any ONE of the following in minimum 20 lines 1 x 5 = 5
1). Greek Comedy.
2). Theatre of the Absurd
Section – B
Answer any TWO of the following in minimum 40 lines 2 x 10 = 20
3).State briefly the different modes of the comparative approach.
4).Describe the main features of Sanskrit drama.
5).Justify the title Abhijnana Sakuntalam.
6). Comment on the salient features of Aristophanic comedy with special reference to The Frogs.
DIRECTORATE OF DISTANCE EDUCATION
Sri Krishnadevaraya University::Anantapuramu
ASSIGNMENT
Second Year MA ENGLISH
Max Marks: 25
Paper VII-Commonwealth Literature
Section –A
Answer any ONE of the following in minimum 20 lines 1 x 5 = 5
1). Australian Poetry.
2). Postcolonialism
Section - B
Answer any TWO of the following in minimum 40 lines 2 x 10 = 20
3).Attempt a critical appreciation of Judith Wright’s poems.
4). Consider Walcott as a postcolonial poet.
5).Comment on the theme of mimicry in The Mimic Men.
6).Write an essay on the autobiographical element in Mansfield’s short stories.
DIRECTORATE OF DISTANCE EDUCATION
Sri Krishnadevaraya University::Anantapuramu
ASSIGNMENT
Second Year MA ENGLISH
Max Marks: 25
Paper VIII-Literary Criticism
Section –A
Answer any ONE of the following in minimum 20 lines 1 x 5 = 5
1). Rasa.
2).Three Unities.
Section – B
Answer any TWO of the following in minimum 40 lines 2 x 10 = 20
3). Examine Aristotle’s views on the play in Poetics.
4). Comment on T.S. Eliot’s views on the Metaphysical Poets.
5). Attempt a critical analysis of Cleanth Brooks’ Irony as a principle of structure.
6). Examine Edmund Wilson’s views on Marxism and Literature.
DIRECTORATE OF DISTANCE EDUCATION
Sri Krishnadevaraya University::Anantapuramu
ASSIGNMENT
Second Year MA ENGLISH
Max Marks : 25
Paper IX - American Literature
Section –A
Answer any ONE of the following in minimum 20 lines 1 x 5 = 5
1). Symbolism in Frost’s poetry.
2).Puritanism
Section - B
Answer any TWO of the following in minimum 40 lines 2 x 10 = 20
3). Consider The Scarlet Letter as an allegory of sin.
4). Discuss the character of Tommy Wilhelm in Seize the Day.
5). What according to Emerson are the factors that shape a man in to a scholar?
6). Attempt a critical appreciation of the poem The Lost Son.
DIRECTORATE OF DISTANCE EDUCATION
Sri Krishnadevaraya University::Anantapuramu
ASSIGNMENT
Second Year MA ENGLISH
Max Marks : 25
Paper X- Indian Literature
Section –A
Answer any ONE of the following in minimum 20 lines 1 x 5 = 5
1). Sri Sri.
2). Realism.
Section - B
Answer any TWO of the following in minimum 40 lines 2 x 10 = 20
3). Critically evaluate Sri Sri’s contribution to modern Telugu poetry.
4). What does Bharati wish to express in ‘PHOENIX’.
5). Write an essay on the theme of Gora.
6). Explain Chemmeen as a tragedy.
Directorate of Distance Education Sri Krishnadevaraya University:: Ananthapuramu
Second Year
M.A. Sociology
ASSIGNMENTS
Paper VI – Industrial Sociology & labour Welfare
Max Marks: 25
Section – A
Answer any ONE of the following in minimum 40 lines 1 x 5 = 5
1. principles of Scientific Management
2. Functions of trade union
Section – B
Answer any TWO of the following in minimum 60 lines 2 x 10 = 20
3. Discuss the scope of Industrial Sociology
4. Define collective bargaining and explain briefly its various forms
5. Describe the significance of Human Relations approach to industry
6. Critically examine various agencies for labour welfare in India
Paper VII – Social Demography & Family Welfare
Max Marks: 25
Section – A
Answer any ONE of the following in minimum 40 lines 1 x 5 = 5
1. Infant mortality
2. Internal Migration
Section – B Answer any TWO of the following in minimum 60 lines 2 x 10 = 20
3. Explain the salient features of the subject matter of Demography
4. Discuss the main features of optimum population theory.
5. Define Population Education Discuss its need in India.
6. Describe briefly about various family planning methods in India.
Paper VIII – Sociology of Weaker Sections & Development Max Marks: 25
Section – A
Answer any ONE of the following in minimum 40 lines 1 x 5 = 5
1. Concept of Weaker Sections.
2. Gender inequality
Section – B
Answer any TWO of the following in minimum 60 lines 2 x 10 = 20
3. Trace out the history of Untouchability in India.
4. Discuss the problems of scheduled Tribes in India.
5. Describe the views of Dr Ambedkar on weaker section in India
6. Bring out the causes and consequences of gender discrimination in India.
Paper IX – Medical Sociology Max Marks: 25
Section – A
Answer any ONE of the following in minimum 40 lines 1 x 5 = 5
1. Nature of Medical Sociology
2. Nutrition and Malnutrition
Section – B
Answer any TWO of the following in minimum 60 lines 2 x 10 = 20
3. Examine Hospital as a social system
4. Explain the various models of Health Education
5. Elucidate Primary Health care delivery and utilization
6. Explain the importance of National Health Programmes.
Paper X – Social Disorganization & Criminology
Max Marks: 25 Section – A
Answer any ONE of the following in minimum 40 lines 1 x 5 = 5
1. Open Prison
2. Criminal Tribes
Section – B
Answer any TWO of the following in minimum 60 lines 2 x 10 = 20
3. Discuss the concepts of deviance, Delinquency and crime 4. Comment on the correctional services in India 5. Trace out the advantages of the probation and parole 6. Discuss the sociological perspective on the causes for Crime
M.Sc. MATHEMATICS
PAPER – X : GRAPH THEORY
Section - A
Answer any one of the following. 5x1=5
1. Prove that a tree with n vertices has 1−n edges. 2. Prove that a connected planar graph with n vertices and e edges has 2+− ne
regions.
Section B
Answer any Two of the following. 2X10=20
3. Prove that a given connected graph G Is an Euler graph if and only if all vertices of G are of even degree.
4. Prove that a graph has a dual if and only if it is planar. 5. (a) Prove that the complete graph of five vertices is non planar.
(b) Prove tha every two or more vertices is 2-chromotic.
6. State and prove Five Colour theorem.
M.Sc. MATHEMATICS
PAPER – VI : Complex Analysis
Section A
Answer any one of the following. 5x1=5
1. Verify that )sin0(),( yysyxceyxu x −= is harmonic and find its analytic function )(zf and its conjugate ),( yxv .
2. Find two different Laurent expansions for )(
1)( 2 izzzf
−= around iz = and
examine that convergence for each series.
Section B
Answer any Two of the following. 2X10=20
3. (a) State and prove Cauchy’s integral formula.
( b). Evaluate dzzz
z∫ −
+23 2
1 , where 2)(: =+− izzC .
4. State andf prove cauchy’s – Hadmard Theorem.
5. (a) Show that )1(2)( 222
amea
dzaxx
mxSin −−=+∫
π .
(b) Prove that 22
1
0
2
0
2 π== ∫∫
∞∞
dzSinxdzCosx
6. State and prove Poisson integral formula.
M.Sc. MATHEMATICS
PAPER – VII: Commutative Algebra
Section A
Answer any one of the following. 5x1=5
1. State and prove Modular Law. 2. State and prove Krull’s Intersection Theorem .
Section B
Answer any Two of the following. 2X10=20
3. State and prove Jordan’s Theorem. 4. State and Prove Lasker – Noether decomposition Theorem
5. State and prove Principal Ideal Theorem.
6. Prove that Integral domain R is a Dedekind domain if and only if R satisfies
the following condition.
(i) R is Noetherian (ii) Every proper Prime ideal of R is maximal
(ii) R is integrally closed.
b) Show that the mapping 1−→ xx of G into G is continuous and
hence is an homeomorphism of G onto itself.
M.Sc. MATHEMATICS
PAPER – VIII : Functional Analysis
Section A
Answer any one of the following. 5x1=5
1. State and prove Minkowskis Inequality. 2. If P and Q are the projections on the closed linear subspace M and N
respectively then Prove that PQ is a projection if and only if PQ=QP.
Section B
Answer any Two of the following. 2X10=20
3. State and prove Hahn Banach Theorem. 4. a) Let M be a closed linear subspace of a Hilbert Space H. Let x be a vector
not in M and let d be the distance of M from x. Then prove that there exists a unique vector 0y such that dyx =− 0 . b) If M is a proper closed linear sub space of a Hilbert space H then prove that there exists a non – zero vector 0z in H such that Mz ⊥0 .
5. State and prove Finite Dimensional Spectral Theorem.
6. a) Let A be a Banach Algebra. Then Prove that every element x of A with
11 <−x is regular and the inverse 1−x of x is given by
∑∞
=
− −+=1
1 )1(1n
nxx .
b) Show that the mapping 1−→ xx of G into G is continuous and
hence is an homeomorphism of G onto itself.
M.Sc. MATHEMATICS
PAPER – IX : FLUID DYNAMICS
Section - A
Answer any one of the following. 5x1=5
1. Explain Analysis of a Fluid Motion. 2. Explain Source, Sink and Doublets.
Section - B
Answer any Two of the following. 2X10=20
3. (a) Derive the Euler’s Equation of Motion. (b) Describe the Bernoulli’s Equation for steady flows & Irrigational Flows.
4. (a). write the equation of Stationary Sphere in a Uniform Stream 5. (a) Show that for an irrotational incompressible two dimensional flow (steady
of unsteady) (x, y), ),( yxΨ are harmonic functions and the families of curves =φ constant (equipotentials) and =Ψ Constant (Streamlines) intersect
orthogonally. (b) Discuss the flow for which 2zW = .
6. Describe the relation between stress and rate of stain.
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