Post on 15-Jul-2015
OUR MOST RANKERSTOP
Himanshu Gupta
AIR
(2011)
430600
Total Marks in Mathematics (Opt.)
KULRAJ SINGHAIR-16AIR-16
(IFoS-2013)RAMESH RANJANAIR-76AIR-76
(IAS-2012)ANUPAM SHUKLA
AIR-7AIR-7(IAS-2012)
MOHIT GUPTAAIR-29AIR-29
(IFoS-2013)
OUR SUCCESSFUL STUDENTS IN IAS-2013Heartiest Congratulations to
Our Candidates in IAS-2013SUCCESSFUL
AJITH JOHN JOSHUA
SUMITKUMAR
B. SASHIKANT
GOWTHAMPOTRU
RAVINDER SINGH
ASHISH MODI
AIR-78 AIR-81 AIR-111 AIR-318 AIR-333 AIR-350
PARAS MANITRIPATHI
NIKHIL GOYAL
NITISH .K KULRAJ SINGH
VALLURU KRANTHI
SANTOSH KUMAR
AIR-391 AIR-399 AIR-547 AIR-552 AIR-562 AIR-1013
AN
D M
AN
Y MO
RE...
MARKS
(257/500)MARKS
(218/500)MARKS
(222/500)MARKS
(251/500)MARKS
(220/500)MARKS
(242/500)
MARKS
(260/500)MARKS
(215/500)MARKS
(247/500)MARKS
(214/500)MARKS
(240/500)
IMS OPENS ALL INDIA ONLINE LIVE INTERACTIVE CLASSES Learn directly from Venkanna Sir at HYDERABAD Centre
96523511529652661152
H.No. 1-10-237, 2nd floor, Room No. 202 R.K’S-Kacham’s Blue Sapphire
Ashok Nagar Hyd-20
CONTACT US
REGIONAL OFFICE
ONLINE LIVE INTERACTIVE CLASSES
are expected to Begin in the
1st WEEK of OCTOBER’14PRIOR REGISTRATION MUST*
FOR MORE DETAILS PLEASE VISIT OUR HYDERABAD BRANCH OFFICE
Regional Office: H.No. 1-10-237, 2nd floor, Room No. 202 R.K’S-Kacham’s Blue Sapphire Ashok Nagar Hyderabad-20.
Mobile Nos: 0 9652661152.9652351152,
OFFLINE IAS/IFoS MAIN TEST SERIES
31st AUG 2014begins on
TEST TIMING11:00AM to 2:00PM
REGISTRATION OPENS SEATS ARE LIMITED
Only IMS provides Scientific & innovative teaching methodologies,
FULLY REVISED STUDY MATERIALS and FULLY REVISED TEST SERIES.Now IAS and IFoS are joined together.
Choose those optionals which can bring win-win situations
in both the exams. So choose Mathematics (Opt.)
Head Office: 105-106, Top Floor, Mukherjee Tower, Mukherjee Nagar, Delhi-9. Branch Office: 25/8, Old Rajender Nagar M arket, Delhi-60.
9999197625, 011-45629987
(1)
TOTAL
2781000
TOTAL
3591000
TOTAL
2961000
TOTAL
3191000
TOTAL
3061000
TOTAL
2891000
TOTAL
2721000
TOTAL
3051000
TOTAL
2561000
TOTAL
257/500TOTAL
218/500
TOTAL
251/500TOTAL
221/500
TOTAL
242/500TOTAL
260/500
TOTAL
215/500TOTAL
247/500
TOTAL
214/500
Regional Office: H.No. 1-10-237, 2nd floor, Room No. 202 R.K’S-Kacham’s Blue Sapphire Ashok Nagar Hyderabad-20. Mobile Nos: 09652351152, 9652661152.H.O.: B.O.: 105-106, Top Floor, Mukherjee Tower, Mukherjee Nagar, Delhi-9. 25/8, Old Rajender Nagar Market, Delhi-60. Ph.:9999197625, 9999329111, 011-45629987
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KULRAJ SINGH (AIR-16) (IFoS-2013)
NITISH KUMAR (AIR-39) (IFoS-2013)
NAVIN P. SHAKYA (AIR-72) (IFoS-2013)
(6)
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RAMESH RANJAN (AIR-76) (IAS-2012)
ANKIT VERMA (AIR-247) (IAS-2012)
(7)
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PRADEEP MISHRA (AIR-633) (IAS-2012)
KETAN BANSAL (AIR-655) (IAS-2012)
SANJAY KR. JAIN (AIR-667) (IAS-2012)I want to thank Venkanna Sir for his continuous guidance and support all through my preparation of civil services. He is great mentor, and guided me not just in mathematics but in other areas as well. Without his efforts and unflinching faith in me, this would not have been possible. Sanjay Kumar Jain Rank – 667
SANTOSH KUMAR (AIR-849) (IAS-2012)
(8)
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ANUPAM SHUKLA (AIR-7) (IFoS-2012)
DILEEP KUMAR YADAV (AIR-48) (IFoS-2012)
SUSHEEL KUMAR (UP-PCS-2011)
(9)
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HIMANSHU GUPTA (AIR-7) (IAS-2011)
ARIJIT MUKHERJEE (AIR-25) (IAS-2011)Consolidated Reserve List
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GULNEET SINGH KHURANA (AIR-220) (IAS-2011)
AJIT PRATAP SINGH (AIR-288) (IAS-2011)
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MEGHA AGARWAL (AIR-538) (IAS-2011)
BHAGWATI PRASAD KALAL (AIR-154) (IAS-2010)
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ABHISHEK (AIR-223) (IAS-2010)
AWAKASH KUMAR (AIR-276) (IAS-2010)
(13)
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SYLLABUS for IAS (Main) Examination
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PAPER-I(1) Linear AlgebraVector spaces over R and C, linear dependence and independence, subspaces, bases, dimension; Linear transformations, rank and nullity, matrix of a linear transformation. Algebra of Matrices; Row and column reduction, Echelon form, congruence's and similarity; Rank of a matrix; Inverse of a matrix; Solution of system of linear equations; Eigenvalues and eigenvectors, characteristic polynomial, Cayley-Hamilton theorem, Symmetric, skew-symmetric, Hermitian, skew-Hermitian, orthogonal and unitary matrices and their eigenvalues. (2) CalculusReal numbers, functions of a real variable, limits, continuity, differentiability, mean-value theorem, Taylor's theorem with remainders, indeterminate forms, maxima and minima, asymptotes; Curve tracing; Functions of two or three variables: limits, continuity, partial derivatives, maxima and minima, Lagrange's method of multipliers, Jacobian. Riemann's definition of definite integrals; Indefinite integrals; Infinite and improper integrals; Double and triple integrals (evaluation techniques only); Areas, surface and volumes. (3) Analytic GeometryCartesian and polar coordinates in three dimensions, second degree equations in three variables, reduction to canonical forms, straight lines, shortest distance between two skew lines; Plane, sphere, cone, cylinder, paraboloid, ellipsoid, hyperboloid of one and two sheets and their properties. (4) Ordinary Differential EquationsFormulation of differential equations; Equations of first order and first degree, integrating factor; Orthogonal trajectory; Equations of first order but not of first degree, Clairaut's equation, singular solution. Second and higher order linear equations with constant coefficients, complementary function, particular integral and general solution. Second order linear equations with variable coefficients, Euler-Cauchy equation; Determination of complete solution when one solution is known using method of variation of parameters. Laplace and Inverse Laplace transforms and their properties; Laplace transforms of elementary functions. Application to initial value problems for 2nd order linear equations with constant coefficients. (5) Dynamics & StaticsRectilinear motion, simple harmonic motion, motion in a plane, projectiles; constrained motion; Work and energy, conservation of energy; Kepler's laws, orbits under central forces. Equilibrium of a system of particles; Work and potential energy, friction; common catenary; Principle of virtual work; Stability of equilibrium, equilibrium of forces in three dimensions. (6) Vector AnalysisScalar and vector fields, differentiation of vector field of a scalar variable; Gradient, divergence and curl in cartesian and cylindrical coordinates; Higher order derivatives; Vector identities and vector equations. Application to geometry: Curves in space, Curvature and torsion; Serret-Frenet's formulae. Gauss and Stokes' theorems, Green's identities.
PAPER-II(1) Algebra:Groups, subgroups, cyclic groups, cosets, Lagrange's Theorem, normal subgroups, quotient groups, homomorphism of groups, basic isomorphism theorems, permutation groups, Cayley's theorem. Rings, subrings and ideals, homomorphisms of rings; Integral domains, principal ideal domains, Euclidean domains and unique factorization domains; Fields, quotient fields. (2) Real Analysis: Real number system as an ordered field with least upper bound property; Sequences, limit of a sequence, Cauchy sequence, completeness of real line; Series and its convergence, absolute and conditional convergence of series of real and complex terms, rearrangement of series. Continuity and uniform continuity of functions, properties of continuous functions on compact sets. Riemann integral, improper integrals; Fundamental theorems of integral calculus. Uniform convergence, continuity, differentiability and integrability for sequences and series of functions; Partial derivatives of functions of several (two or three) variables, maxima and minima. (3) Complex Analysis: Analytic functions, Cauchy-Riemann equations, Cauchy's theorem, Cauchy's integral formula, power series representation of an analytic function, Taylor's series; Singularities; Laurent's series; Cauchy's residue theorem; Contour integration. (4) Linear Programming: Linear programming problems, basic solution, basic feasible solution and optimal solution; Graphical method and simplex method of solutions; Duality. Transportation and assignment problems. (5) Partial differential equations: Family of surfaces in three dimensions and formulation of partial differential equations; Solution of quasilinear partial differential equations of the first order, Cauchy's method of characteristics; Linear partial differential equations of the second order with constant coefficients, canonical form; Equation of a vibrating string, heat equation, Laplace equation and their solutions. (6) Numerical Analysis and Computer programming: Numerical methods: Solution of algebraic and transcendental equations of one variable by bisection, Regula-Falsi and Newton-Raphson methods; solution of system of linear equations by Gaussian elimination and Gauss-Jordan (direct), Gauss-Seidel(iterative) methods. Newton's (forward and backward) interpolation, Lagrange's interpolation. Numerical integration: Trapezoidal rule, Simpson's rules, Gaussian quadrature formula. Numerical solution of ordinary differential equations: Euler and Runga Kutta-methods. Computer Programming: Binary system; Arithmetic and logical operations on numbers; Octal and Hexadecimal systems; Conversion to and from decimal systems; Algebra of binary numbers. Elements of computer systems and concept of memory; Basic logic gates and truth tables, Boolean algebra, normal forms. Representation of unsigned integers, signed integers and reals, double precision reals and long integers. Algorithms and flow charts for solving numerical analysis problems. (7) Mechanics and Fluid Dynamics: Generalized coordinates; D' Alembert's principle and Lagrange's equations; Hamilton equations; Moment of inertia; Motion of rigid bodies in two dimensions. Equation of continuity; Euler's equation of motion for inviscid flow; Stream-lines, path of a particle; Potential flow; Two-dimensional and axisymmetric motion; Sources and sinks, vortex motion; Navier-Stokes equation for a viscous fluid.
Regional Office: H.No. 1-10-237, 2nd floor, Room No. 202 R.K’S-Kacham’s Blue Sapphire Ashok Nagar Hyderabad-20. Mobile Nos: 09652351152, 9652661152.H.O.: B.O.: 105-106, Top Floor, Mukherjee Tower, Mukherjee Nagar, Delhi-9. 25/8, Old Rajender Nagar Market, Delhi-60. Ph.:9999197625, 9999329111, 011-45629987
PAPER - I(Section-A)
Linear Algebra:Vector, space, linear dependence and independence, subspaces,
bases, dimensions. Finite dimensional vector spaces. Matrices, Cayley-
Hamilition theorem, eigen-values and eigenvectors, matrix of linear
transformation, row and column reduction, Echelon form, equivalences,
congruences and similarity, reduction to cannonical form, rank,
orthogonal, symmetrical, skew symmetrical, unitary, hermitian,
skewhermitian forms- their eigenvalues. Orthogonal and unitary
reduction of quadratic and hermitian forms, positive definite quardratic
forms.Calculus:Real numbers, limits, continuity ,differentiability, mean-value theorems,
Taylor’s theorem with remainders, indeterminate forms, maxima and
minima, asymptotes. Functions of several variables: continuity,
differentiability, partial derivatives, maxima and minima, Lagrange’s
method of multipliers, Jacobian. Riemann’s definition of definite
integrals, indefinite integrals, infinite and improper integrals, beta and
gamma functions. Double and triple integrals (evaluation techniques
only). Areas, surface and volumes, centre of gravity.Analytical Geometry:Cartesian and polar coordinates in two and three dimensions, second
degree equations in two and three dimensions, reduction to cannonical
forms, straight lines, shortest distance between two skew lines, plane,
sphere, cone, cylinder, paraboloid, ellipsoid, hyperboloid of one and two
sheets and their properties.(Section-B)
Ordinary Differential Equations:Formulation of differential equations, order and degree, equations of
first order and first degree, integrating factor, equations of first order but
not of first degree, Clariaut’s equation, singular solution. Higher order
linear equations with constant coefficients, complementary function and
particular integral, general solution, Euler-Cauchy equation.Second order linear equations with variable coefficients,
determination of complete solution when one solution is known, method
of variation of parameters.Dynamics, Statics and Hydrostatics: Degree of freedom and
constraints, rectilinear motion, simple harmonic motion, motion in a
plane, projectiles, constrained motion, work and energy, conservation of
energy, motion under impulsive forces, Kepler’s laws, orbits under
central forces, motion of varying mass, motion under resistance.Equilibrium of a system of particles, work and potential energy,
friction, common catenary, principle of virtual work, stability of
equilibrium, equilibrium of forces in three dimensions.Pressure of heavy fluids, equilibrium of fluids under given system
of forces, Bernoulli’s equation, centre of pressure, thrust on curved
surfaces, equilibrium of floating bodies, stability of equilibrium, meta-
centre, pressure of gases.Vector Analysis: Scalar and vector fields, triple products, differentiation of vector function
of a scalar variable, gradient, divergence and curl in Cartesian,
cylindrical and spherical coordinates and their physical interpretations.
Higher order derivatives, vector identities and vector equations.Application to Geometry:Curves in space curvature and torision. Serret-Frenet’s formulae,
Gauss and Stokes’ theorems, Green’s identities.
SYLLABUS for IFoS (Main) Examination
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PAPER - II(Section-A)
Algebra:Groups, sub-groups, normal subgroups, homomorphism of groups,
quotient groups, basic isomorphism theorems, Sylow’s group,
permutation groups, Cayley theorem, rings and ideals, principal ideal
domains, unique factorization domains and Euclidean domains. Field
extensions, finite fields.Real Analysis: Real number system, ordered sets, bounds, ordered field, real number
system as an ordered field with least upper bound property, Cauchy
sequence, completeness, Continuity and uniform continuity of
functions, properties of continuous functions on compact sets. Riemann
integral, improper integrals, absolute and conditional convergence of
series of real and complex terms, rearrangement of series, Uniform
convergence, continuity, differentiability and integrability for sequences
and series of functions. Differentiation of functions of several variables,
change in the order of partial derivatives, implicit function theorem,
maxima and minima, Multiple integrals.Complex Analysis:Analytic function Cauchy-Riemann equations, Cauchy’s theorem,
Cauchy’s integral formula, power series, Taylor’s series, Laurent’s
Series, Singularities, Cauchy’s residue theorem, contour integration,
Conformal mapping, bilinear transformations.Linear Programming:Linear programming problems, basic solution, basic feasible solution
and optimal solution, graphical method and Simplex method of
solutions, Duality. Transportation and assignment problems, Travelling
salesman problems.Section-B
Partial differential equations:Curves and surfaces in three dimensions, formulation of partial
differentiation equations, solutions of equations of type dx/p=dy/q=dz/r;
orthogonal trajectories, Pfaffian differential equations; partial differential
equation of the first order, solution by Cauchy’s method of
characteristics; Charpit’s method of solutions, linear partial differential
equations of the second order with constant coefficients, equations of
vibrating string, heat equation, Laplace equation.Numerical analysis and Computer programming:Numerical methods: solution of algebraic and transcendental equations
of one variable by bisection, Regula-Falsi and Newton-Raphson
methods, solution of system of linear equations by Gaussian elimination
and Gauss-Jordan (direct) methods, Gauss-Seidel (iterative) method.
Newton’s (Forward and backward) and Lagrange’s method of
interpolation.Numerical integration:Simpson’s onethird rule, tranpezodial rule, Gaussian quardrature
formula. Numerical solution of ordinary differential equations:Euler and Runge Kuttamethods. Computer Programming: Storage of
numbers in computers, bits, bytes and words, binary system, arithmetic
and logical operations on numbers, Bitwise operations. AND, OR, SOR,
NOT, and shift/rotate operators, Octal and Hexadecimal Systems.
Conversion to and form decimal Systems. Representation of unsigned
integers, signed integers and reals, double precision reals and long
integrers.Algorithms and flow charts for solving numerical analysis problems.
Developing simple programs in Basic for problems involving techniques
covered in the numerical analysis.Mechanics and Fluid Dynamics:Generalised coordinates, constraints, holonomic and non-holonomic,
systems, D’ Alembert’s principle and Lagrange’s equations, Hamilton
equations, moment of inertia, motion of rigid bodies in two dimensions.
Equation of continuity, Euler’s equation of motion for inviscid flow,
stream-lines, path of a particle, potential flow,two-dimensional and
axisymetric motion, sources and sinks, vortex motion, flow past a
cylinder and a sphere, method of images. Navier- Stokes equation for a
viscous fluid.
Regional Office: H.No. 1-10-237, 2nd floor, Room No. 202 R.K’S-Kacham’s Blue Sapphire Ashok Nagar Hyderabad-20. Mobile Nos: 09652351152, 9652661152.H.O.: B.O.: 105-106, Top Floor, Mukherjee Tower, Mukherjee Nagar, Delhi-9. 25/8, Old Rajender Nagar Market, Delhi-60. Ph.:9999197625, 9999329111, 011-45629987
Preparation StrategyIAS/IFoSMATHEMATICS(Opt.)
The Civil Services Examination, the creme de la creme of all examinations, is also known as the toughest and the
longest examination of India. Therefore, I consider it quite important to share my view points of the bright future of the
aspiring candidates.
Though the CSE is a hard nut to crack but one could sail through this 'hurdle race' via strategic planning, consistent
efforts, diligence, a patient and calm approach and most importantly with the belief in one's own potential.
The right selection of the optional is the pre requisite of a good rank in CSE. One must choose the optional keeping the
following points in mind:
1. A subject of your interest.
2. Scoring pattern of that subject in past few years.
3. The availability of study material and
4. Expert guidance.
Ideally, the students should choose their subject of graduation or post graduation as their optional but then one must
check their subject for its viability in the civil services examination keeping in consideration the aforementioned 4 points
namely Criterion of interest, scoring pattern, availability of study material and expert guidance
As per the above mentioned criteria of choosing optional, Mathematics is one of the safest and most scoring optional in
the Civil Services Examination. This is the only subject which allows the students a scope to score as high as 400+
marks in a new pattern of examination with one optional subject. The popular trends show that out of every 20 students,
at least one student has Mathematics as one of his or her optional subject. Data shows that before the year 2000, The
maximum number of students in the Civil services examination were the students who had taken Mathematics as their
optional. However, with the change in the CSE pattern, students have started facing difficulty with mathematics as an
optional due to the lack of availability of quality guidance and the confusion created by the labyrinth of false
propagandist and mercantile, inefficient and inexperienced teachers.
However since the last few years, the popularity of the subject has increased as expert guidance keeping in view the
need of the CSE is available now.
WHO CAN OPT IT ?
The students who have studied B.Sc Mathematics/ B. Tech. can take Mathematics as the optional in this examination.
In fact, Mathematics is one such optional which gives you the advantage of a much higher score than what one could
manage with other humanities subjects and thus, the chances of getting the best ranks are much better. However,
there is a certain phobia about choosing Mathematics as an optional amongst the students. Let us examine this
problem through an observational analysis of the situation.
We can broadly categorize the science students, especially the ones from the Mathematics background who are
aspiring for the CSE, into two categories. The first category is of those students who opt for Mathematics as an optional
in this prestigious examination. The second category is obviously those students. who do not opt for it. Talking about
the former category, it is a group of self motivated, diligent students who already have a penchant for this subject. This
category usually consists of those students who seem to eat, sleep and drink Mathematics. They are highly passionate
about this subject and extremely devoted to it. However, It is the latter category of students who encourage me to delve
into their mind set and explore the reasons for their decision. What I have discovered about the same is a disappointing
fact of these students being beguiled and demotivated by the ''opinion givers of the society. Even the illogical CSE
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Regional Office: H.No. 1-10-237, 2nd floor, Room No. 202 R.K’S-Kacham’s Blue Sapphire Ashok Nagar Hyderabad-20. Mobile Nos: 09652351152, 9652661152.H.O.: B.O.: 105-106, Top Floor, Mukherjee Tower, Mukherjee Nagar, Delhi-9. 25/8, Old Rajender Nagar Market, Delhi-60. Ph.:9999197625, 9999329111, 011-45629987
theories created by the mercantile propagandists affects the psychology of these students by enticing them to select
inconsequential and irrelevant optionals. Either they are discouraged enough to take the plunge with a safe subject
which ultimately results in their sad failure despite rigorous hard work, or else they achieve the results only after
investing insurmountable energies and irreversible time on a wrong decision.
I have a message for these students – 'Unleash your potential'; Go for something that channels your expertise in its
best direction rather than going for something that has not been your area of excellence and interest. Choose the
'stepping stone' not the 'stumbling block'. Overcome your irrational fears and anxieties and make a prudent decision.
Mathematics is the most advantageous and the highest scoring optional. You have been solving Mathematics
questions since elementary school. Think about it; After spending more than 15 years in the field of Mathematics, if you
are being manipulated to change your path for an irrelevant option with just 6 months or one year of preparation, you are
actually leaving your area of proficiency and are indirectly trying to take up the challenge of competing with the masters
of their respective fields.
As IAS and IFoS are joined together, so there is an opportunity for the Mathematics optional students to write the IFoS
exams along with the IAS exams simultaneously.
ROLE OF COACHING
The role of the coaching institute can never be underestimated in the preparation of CSE/IFoS. Expert guidance is a
very crucial aspect for these preparations. The mentor facilitates the process of preparation and enables the student to
savor the success in a strategized manner. One can score 80%+ in Mathematics with the help of professionally well
equipped and qualitatively upgraded teaching inputs based on most meticulously and scientifically designed
comprehensive guidance programme which allows conceptual clarification of all topics. Moreover, coaching institutes
may prepare a system of rigorous written tests and feedback mechanisms. This is mandatory to ensure the updating of
the student's conceptual and analytical knowledge reservoir as per the requirements of the latest emerging trends of
the civil services examination.
An academy with its experience and professional efficiency can prove to be a catalyst to ensure absolute proficiency
and perfection in the Subject.
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Schedule for IAS/IFoS Mathematics (Optional)
MAINS TEST SERIES PROGRAMME-2014
K. VENKANNA
TEST TIMING: 11:00am to 2:00pm for Hyderabad Centre
STARTS FROM 31 AUGUST’14
Under the guidance of
(14 yrs teach. exp.)
Time Duration: 3Hrs. IAS Exam Max. Marks: 250 IFoS Exam Max. Marks: 200
S. No. Test No. DATE TOPICS TO BE COVERED
1. Test-1 31-Aug-2014 Linear Algebra, Calculus and Three Dimensional Geometry
2. Test-2 07-Sep-2014 Algebra, Real Analysis and Complex Analysis & LPP (Linear Programming
Problem)
3. Test-3 14-Sep-2014 ODE (Ordinary Differential Equations), Dynamics & Statics and Vector
Analysis.
4. Test-4 21-Sep-2014 PDE (Partial Differential Equations), Numerical Analysis & Computer
Programming and Mechanics & Fluid Dynamics
5. Test-5 28-Sep-2014 Full Syllabus (Paper-I)
6. Test-6 05-Oct-2014 Full Syllabus (Paper-II)
7. Test-7 12-Oct-2014 Full Syllabus (Paper-I)
8. Test-8 19-Oct-2014 Full Syllabus (Paper-II)
9. Test-9 26-Oct-2014 Full Syllabus (Paper-I & Paper-II)
10. Test-10 02-Nov-2014 Full Syllabus (Paper-I)
11. Test-11 09-Nov-2014 Full Syllabus (Paper-II)
12. Test-12 16-Nov-2014 Full Syllabus (Paper-I)
13. Test-13 23-Nov-2014 Full Syllabus (Paper-II)
14. Test-14 30-Nov-2014 Full Syllabus (Paper-I & Paper-II)
15. Test-15 07-Dec-2014 Full Syllabus (Paper-I & Paper-II)
Regional Office: H.No. 1-10-237, 2nd floor, Room No. 202 R.K’S-Kacham’s Blue Sapphire Ashok Nagar Hyderabad-20. Mobile Nos: 09652351152, 9652661152.H.O.: B.O.: 105-106, Top Floor, Mukherjee Tower, Mukherjee Nagar, Delhi-9. 25/8, Old Rajender Nagar Market, Delhi-60. Ph.:9999197625, 9999329111, 011-45629987
(1) Every Year IAS/IFoS Mathematics (Opt.) Main Test Series will be conducted from Last week of August.(2) The above Test Series Programmes will be conducted at Mukherjee Nagar (North Delhi), Old Rajinder Nagar (Centre Delhi) and Hyderabad Centres.
NOTE:
(18)
HYDERABAD Centre Time Table
Head Office: Branch Office: 105-106, Top Floor, Mukherjee Tower, Mukherjee Nagar, Delhi-9. 25/8, Old Rajender Nagar Market, Delhi-60
9999197625, 9999329111, 011-45629987
AJITH JOHN JOSHUA
AIR-78SUMIT KUMAR
AIR-81B. SASHI KANT
AIR-111GOWTHAM POTRU
AIR-318RAVINDER SINGH
AIR-333ASHISH MODI
AIR-350
PARAS MANI TRIPATHI
AIR-391NIKHIL GOYAL
AIR-399NITISH .K
AIR-547KULRAJ SINGH
AIR-552VALLURU KRANTHI
AIR-562SANTOSH KUMAR
AIR-1013
(IAS-2013) (IAS-2013) (IAS-2013) (IAS-2013) (IAS-2013) (IAS-2013)
(IAS-2013) (IAS-2013) (IAS-2013) (IAS-2013) (IAS-2013) (IAS-2013)430/600Total Marks in Maths (Opt.)
RAMESH RANJAN
AIR-76(IAS-2012)
ANKIT VERMA
AIR-247(IAS-2012)
B. SASHI KANT
AIR-329(IAS-2012)
KRISHAN KANT
AIR-550(IAS-2012)
VISHAL GARG
AIR-560(IAS-2012)
PRADEEP MISHRA
AIR-633(IAS-2012)
KETAN BANSAL
AIR-655(IAS-2012)
SANJAY KR. JAIN
AIR-667(IAS-2012)
SANTOSH KUMAR
AIR-849(IAS-2012)
MEET KUMAR
AIR-944(IAS-2012)
ARIJIT MUKHERJEE
AIR-25(IAS-2011)
AJAY SINGH TOMAR
AIR-88(IAS-2011)
AWAKASH KUMAR
AIR-168(IAS-2011)
GULNEET SINGH
AIR-220(IAS-2011)
AJIT PRATAP SINGH
AIR-288(IAS-2011)
JAY YADAV
AIR-372(IAS-2011)
RAVI VERMA
AIR-485(IAS-2011)
MEGHA AGRAWAL
AIR-538(IAS-2011)
AWAKASH KUMAR
AIR-276(IAS-2010)
NAVNEET AGGRAWAL
AIR-362(IAS-2010)
AJIT PRATAP SINGH
AIR-497(IAS-2010)
SHAMBHU KUMAR
AIR-47(IAS-2009)
A. ARJUN
AIR-140(IAS-2009)
NISHA GUPTA
AIR-507(IAS-2009)
K.V.S.R. KISHORE
AIR-575(IAS-2008)
Consolidated Reserve List-2011
OUR ACHIEVEMENTS from 2008 to 2013from 2008 to 2013
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IAS-2011
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