Www.ims4maths.com Coaching Files Mathemathematics Complete Information Brochure for Ias Ifos Csir Gate Ugc Net Aspirants IMS Institute of Mathematical Sciences 2014 15



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(1) Our Toppers Marks List IAS & IFoS Terrible but truth...... In 2012 Results of CSE total score has come down in all the optional subjects as compare to previous years, but still in an awful circumstances, the score of Mathematics as an optional subject is far better and is incomparable with any other humanities optional subjects (Marks are in front of you, analyze yourself ). Now IAS and IFoS are joined together. Choose for those optionals which can bring win-win situations in both the exams. IMS (Institute of Mathematical Sciences) revolve Civil Services/IFoS aspirants into perfect and successful finalists. The ground reality in getting the aspirants through to the top is the tireless and honest efforts being made by Mr. K Venkanna for years together. So, IMS advises to go for Mathematics as an optional subject to score maximum marks and fly high with the subject having maximum success rate. IMS hopes it will strive further to get more hopefuls in coming years. No aspirant has seen 'Luck', the courageous efforts at IMS convert 'Luck' into proven reality. H.O.: 105-106, Top Floor, Mukherjee Tower, Mukherjee Nagar, Delhi-9. B.O.: 25/8, Old Rajender Nagar Market, Delhi-60. Ph.:9999197625, 9999329111, 011-45629987 Mukherjee Nagar. Ph. Top Floor. Mukherjee Tower. Delhi-60. Old Rajender Nagar Market.O.: 25/8.O.: 105-106. 9999329111. 011-45629987 . B. Delhi-9.(2) Our Toppers Marks List Our Toppers Marks List H.:9999197625. O.: 25/8. Top Floor. Old Rajender Nagar Market. Mukherjee Nagar. Ph.O. Delhi-60.(3) Feedback with Students Testimonial KULRAJ SINGH (AIR-16) (IFoS-2013) NITISH KUMAR (AIR-39) (IFoS-2013) NAVIN P. B.:9999197625. 011-45629987 . Mukherjee Tower.: 105-106. Delhi-9. SHAKYA (AIR-72) (IFoS-2013) H. 9999329111. Delhi-60. Ph. Old Rajender Nagar Market.: 105-106. 9999329111. Top Floor. B. Delhi-9.:9999197625. Mukherjee Tower. 011-45629987 .O.(4) Feedback with Students Testimonial RAMESH RANJAN (AIR-76) (IAS-2012) ANKIT VERMA (AIR-247) (IAS-2012) H.O. Mukherjee Nagar.: 25/8. this would not have been possible. 011-45629987 . Old Rajender Nagar Market. JAIN (AIR-667) (IAS-2012) I want to thank Venkanna Sir for his continuous guidance and support all through my preparation of civil services. 9999329111.O. Top Floor. He is great mentor. and guided me not just in mathematics but in other areas as well.(5) Feedback with Students Testimonial PRADEEP MISHRA (AIR-633) (IAS-2012) KETAN BANSAL (AIR-655) (IAS-2012) SANJAY KR.:9999197625. Delhi-9.: 105-106. Mukherjee Nagar. Delhi-60.: 25/8. B. Ph.O. Mukherjee Tower. Without his efforts and unflinching faith in me. Sanjay Kumar Jain Rank – 667 SANTOSH KUMAR (AIR-849) (IAS-2012) H. B. 011-45629987 .(6) Feedback with Students Testimonial ANUPAM SHUKLA (AIR-7) (IFoS-2012) DILEEP KUMAR YADAV (AIR-48) (IFoS-2012) SUSHEEL KUMAR (UP-PCS-2011) H. 9999329111. Delhi-60. Mukherjee Nagar. Delhi-9. Mukherjee Tower. Ph.O.O.: 25/8. Old Rajender Nagar Market.:9999197625.: 105-106. Top Floor. Top Floor. Mukherjee Nagar.: 25/8.O. Ph. Delhi-9.O. Delhi-60. Mukherjee Tower. Old Rajender Nagar Market. 9999329111. 011-45629987 . B.:9999197625.(7) Feedback with Students Testimonial HIMANSHU GUPTA (AIR-7) (IAS-2011) ARIJIT MUKHERJEE (AIR-25) (IAS-2011) Consolidated Reserve List H.: 105-106. O. Old Rajender Nagar Market. 9999329111. B.: 105-106. Mukherjee Nagar. Mukherjee Tower.(8) Feedback with Students Testimonial GULNEET SINGH KHURANA (AIR-220) (IAS-2011) AJIT PRATAP SINGH (AIR-288) (IAS-2011) H.: 25/8. Delhi-9. Ph. Top Floor.O. 011-45629987 .:9999197625. Delhi-60. B.:9999197625.O. 011-45629987 . Mukherjee Tower.(9) Feedback with Students Testimonial MEGHA AGARWAL (AIR-538) (IAS-2011) BHAGWATI PRASAD KALAL (AIR-154) (IAS-2010) H. Ph.O. Delhi-9.: 105-106. Old Rajender Nagar Market. Delhi-60. 9999329111. Mukherjee Nagar.: 25/8. Top Floor. :9999197625. 011-45629987 . Delhi-60. Mukherjee Nagar.O.: 25/8. Mukherjee Tower. 9999329111. Delhi-9.: 105-106. Top Floor.O. Ph.(10) Feedback with Students Testimonial ABHISHEK (AIR-223) (IAS-2010) AWAKASH KUMAR (AIR-276) (IAS-2010) H. Old Rajender Nagar Market. B. Duality. Jacobian. Uniform convergence. dimension. (6) Vector Analysis Scalar and vector fields.O. Riemann integral. conservation of energy. Echelon form. hyperboloid of one and two sheets and their properties. Application to initial value problems for 2nd order linear equations with constant coefficients. Computer Programming: Binary system. Algebra of binary numbers. (5) Partial differential equations: Family of surfaces in three dimensions and formulation of partial differential equations. Inverse of a matrix. (3) Complex Analysis: Analytic functions. Sources and sinks. skew-symmetric. subrings and ideals. linear dependence and independence. integrating factor. Sequences. power series representation of an analytic function. solution of system of linear equations by Gaussian elimination and Gauss-Jordan (direct). Riemann's definition of definite integrals. limits. permutation groups. Laurent's series. Simpson's rules. Stability of equilibrium. Work and potential energy. Clairaut's equation. Cauchy's integral formula. Cauchy's residue theorem. H. heat equation. Cauchy-Riemann equations. Algebra of Matrices. Functions of two or three variables: limits. mean-value theorem. Integral domains. Taylor's theorem with remainders. matrix of a linear transformation. maxima and minima. Vector identities and vector equations. Principle of virtual work. Orthogonal trajectory. Old Rajender Nagar Market.(11) SYLLABUS for IAS (Main) Examination PAPER-I PAPER-II (1) Linear Algebra Vector spaces over R and C. Cauchy sequence. Stream-lines. Twodimensional and axisymmetric motion. bases. Octal and Hexadecimal systems. cone. Boolean algebra. ellipsoid. orbits under central forces.: 25/8. properties of continuous functions on compact sets. particular integral and general solution. Moment of inertia. Numerical solution of ordinary differential equations: Euler and Runga Kutta-methods. Row and column reduction. singular solution. Top Floor. equilibrium of forces in three dimensions. Delhi-9.O. quotient fields. Curve tracing. continuity. Curvature and torsion. Gradient. differentiation of vector field of a scalar variable. Equation of a vibrating string. (2) Real Analysis: Real number system as an ordered field with least upper bound property. maxima and minima. Euler's equation of motion for inviscid flow. Hermitian. Series and its convergence. Algorithms and flow charts for solving numerical analysis problems. Cayley-Hamilton theorem. Equations of first order but not of first degree. absolute and conditional convergence of series of real and complex terms. indeterminate forms. subspaces. motion in a plane. differentiability and integrability for sequences and series of functions. projectiles. Higher order derivatives. 9999329111. Lagrange's interpolation. divergence and curl in cartesian and cylindrical coordinates. (2) Calculus Real numbers. subgroups. rank and nullity. continuity. EulerCauchy equation. Second order linear equations with variable coefficients. shortest distance between two skew lines. Euclidean domains and unique factorization domains. Symmetric. friction. (4) Ordinary Differential Equations Formulation of differential equations. completeness of real line. Elements of computer systems and concept of memory. congruence's and similarity. cosets. Continuity and uniform continuity of functions. characteristic polynomial. second degree equations in three variables. Gauss-Seidel(iterative) methods. path of a particle. (3) Analytic Geometry Cartesian and polar coordinates in three dimensions. Contour integration. homomorphism of groups. Solution of system of linear equations. Singularities. basic solution. Plane. Navier-Stokes equation for a viscous fluid. Work and energy. Graphical method and simplex method of solutions. Equilibrium of a system of particles. signed integers and reals. Newton's (forward and backward) interpolation. continuity. normal forms. Double and triple integrals (evaluation techniques only). Basic logic gates and truth tables. Mukherjee Nagar. Linear transformations. Ph. Lagrange's Theorem. differentiability. reduction to canonical forms. Representation of unsigned integers. 011-45629987 . maxima and minima. sphere. orthogonal and unitary matrices and their eigenvalues. quotient groups. Cauchy's theorem. Arithmetic and logical operations on numbers. Delhi-60. paraboloid. canonical form. Indefinite integrals. cylinder. Equation of continuity. cyclic groups. Kepler's laws. Cauchy's method of characteristics. basic isomorphism theorems. functions of a real variable. Eigenvalues and eigenvectors. simple harmonic motion. common catenary. improper integrals. Green's identities. Partial derivatives of functions of several (two or three) variables. (5) Dynamics & Statics Rectilinear motion. (1) Algebra: Groups. Rank of a matrix. D' Alembert's principle and Lagrange's equations. Linear partial differential equations of the second order with constant coefficients. vortex motion. limit of a sequence. straight lines.:9999197625. Laplace and Inverse Laplace transforms and their properties. Second and higher order linear equations with constant coefficients. Motion of rigid bodies in two dimensions. Solution of quasilinear partial differential equations of the first order. Hamilton equations. homomorphisms of rings. Areas. Taylor's series. asymptotes. Numerical integration: Trapezoidal rule. Gauss and Stokes' theorems. Determination of complete solution when one solution is known using method of variation of parameters. Fields. Mukherjee Tower. partial derivatives. constrained motion. Laplace transforms of elementary functions. (7) Mechanics and Fluid Dynamics: Generalized coordinates. skewHermitian. Potential flow. Conversion to and from decimal systems. double precision reals and long integers.: 105-106. Serret-Frenet's formulae. basic feasible solution and optimal solution. (6) Numerical Analysis and Computer programming: Numerical methods: Solution of algebraic and transcendental equations of one variable by bisection. normal subgroups. Equations of first order and first degree. B. Cayley's theorem. Lagrange's method of multipliers. surface and volumes. rearrangement of series. Application to geometry: Curves in space. Regula-Falsi and Newton-Raphson methods. Infinite and improper integrals. (4) Linear Programming: Linear programming problems. complementary function. principal ideal domains. Gaussian quadrature formula. Fundamental theorems of integral calculus. Transportation and assignment problems. Rings. Laplace equation and their solutions. Bernoulli’s equation. infinite and improper integrals. continuity . Serret-Frenet’s formulae. Second order linear equations with variable coefficients. Equilibrium of a system of particles. Dynamics. Gauss and Stokes’ theorems. differentiation of vector function of a scalar variable. motion under impulsive forces. hyperboloid of one and two sheets and their properties. common catenary. Clariaut’s equation. differentiability. Double and triple integrals (evaluation techniques only). maxima and minima. surface and volumes. Areas. congruences and similarity. skewhermitian forms. sphere. Mukherjee Nagar. Statics and Hydrostatics: Degree of freedom and constraints. second degree equations in two and three dimensions. cylinder. plane. symmetrical. determination of complete solution when one solution is known. partial derivatives. eigen-values and eigenvectors. principle of virtual work. meta-centre. linear dependence and independence.I (Section-A) Linear Algebra: Vector. Delhi-60. integrating factor. Application to Geometry: Curves in space curvature and torision. hermitian. Calculus: Real numbers. general solution. indeterminate forms. cylindrical and spherical coordinates and their physical interpretations. Green’s identities. (Section-B) Ordinary Differential Equations: Formulation of differential equations. work and energy. Finite dimensional vector spaces. equilibrium of forces in three dimensions. equations of first order but not of first degree. motion of varying mass. thrust on curved surfaces. Higher order linear equations with constant coefficients. indefinite integrals. equilibrium of fluids under given system of forces.(12) SYLLABUS for IFoS (Main) Examination PAPER . orbits under central forces. H. ellipsoid. equilibrium of floating bodies. limits. projectiles.: 105-106. conservation of energy. motion under resistance. Lagrange’s method of multipliers. dimensions. Kepler’s laws. 011-45629987 . subspaces. vector identities and vector equations. Higher order derivatives. Old Rajender Nagar Market. reduction to cannonical forms.O. Riemann’s definition of definite integrals. Cayley-Hamilition theorem.their eigenvalues. centre of gravity. method of variation of parameters. pressure of gases. rectilinear motion. friction. reduction to cannonical form. 9999329111. unitary. Ph. Pressure of heavy fluids.: 25/8. order and degree. complementary function and particular integral. Orthogonal and unitary reduction of quadratic and hermitian forms. cone. constrained motion. shortest distance between two skew lines.differentiability. Vector Analysis: Scalar and vector fields. singular solution. bases. skew symmetrical. stability of equilibrium. paraboloid. space. straight lines. positive definite quardratic forms. divergence and curl in Cartesian. Taylor’s theorem with remainders. mean-value theorems. Echelon form. matrix of linear transformation. Matrices. triple products. Jacobian. work and potential energy. equations of first order and first degree. Mukherjee Tower. beta and gamma functions. equivalences. centre of pressure. Delhi-9.O. Euler-Cauchy equation. maxima and minima. Top Floor. gradient. Functions of several variables: continuity. rank. B. asymptotes. row and column reduction. orthogonal.:9999197625. stability of equilibrium. simple harmonic motion. motion in a plane. Analytical Geometry: Cartesian and polar coordinates in two and three dimensions. unique factorization domains and Euclidean domains. Field extensions. basic solution. Charpit’s method of solutions. AND. Regula-Falsi and Newton-Raphson methods. holonomic and non-holonomic. contour integration. B. formulation of partial differentiation equations. 9999329111. Complex Analysis: Analytic function Cauchy-Riemann equations. binary system. systems. H. bits. NOT. power series. tranpezodial rule. normal subgroups.O. rings and ideals. Gaussian quardrature formula. Cauchy’s integral formula. implicit function theorem. sources and sinks. arithmetic and logical operations on numbers. D’ Alembert’s principle and Lagrange’s equations. ordered field. flow past a cylinder and a sphere. absolute and conditional convergence of series of real and complex terms. Multiple integrals. Navier. Ph. real number system as an ordered field with least upper bound property. Laurent’s Series. Cauchy sequence. moment of inertia. change in the order of partial derivatives. vortex motion. 011-45629987 . maxima and minima. solutions of equations of type dx/p=dy/q=dz/r.two-dimensional and axisymetric motion. sub-groups. orthogonal trajectories. properties of continuous functions on compact sets. OR. Algorithms and flow charts for solving numerical analysis problems. completeness. Cauchy’s residue theorem. and shift/rotate operators. Developing simple programs in Basic for problems involving techniques covered in the numerical analysis. permutation groups. Sylow’s group.II (Section-A) Algebra: Groups. signed integers and reals. Riemann integral. Octal and Hexadecimal Systems. Equation of continuity. method of images. partial differential equation of the first order. Computer Programming: Storage of numbers in computers. potential flow. continuity. homomorphism of groups. Laplace equation. linear partial differential equations of the second order with constant coefficients.Stokes equation for a viscous fluid. Top Floor.(13) PAPER . bytes and words. Cauchy’s theorem. Numerical integration: Simpson’s onethird rule. Gauss-Seidel (iterative) method. basic feasible solution and optimal solution. finite fields.:9999197625. Numerical solution of ordinary differential equations: Euler and Runge Kuttamethods. Linear Programming: Linear programming problems. Mukherjee Tower. solution of system of linear equations by Gaussian elimination and Gauss-Jordan (direct) methods. double precision reals and long integrers. bounds. graphical method and Simplex method of solutions. improper integrals. solution by Cauchy’s method of characteristics. Mechanics and Fluid Dynamics: Generalised coordinates. stream-lines. differentiability and integrability for sequences and series of functions. Delhi-9. Section-B Partial differential equations: Curves and surfaces in three dimensions. Duality. Newton’s (Forward and backward) and Lagrange’s method of interpolation. Numerical analysis and Computer programming: Numerical methods: solution of algebraic and transcendental equations of one variable by bisection. Euler’s equation of motion for inviscid flow. rearrangement of series. Conformal mapping. Bitwise operations.: 105-106. basic isomorphism theorems. Taylor’s series.: 25/8.O. equations of vibrating string. Uniform convergence. motion of rigid bodies in two dimensions. path of a particle. Continuity and uniform continuity of functions. Travelling salesman problems. ordered sets. Differentiation of functions of several variables. Delhi-60. principal ideal domains. Transportation and assignment problems. heat equation. Singularities. Old Rajender Nagar Market. quotient groups. Conversion to and form decimal Systems. Pfaffian differential equations. Real Analysis: Real number system. Cayley theorem. Mukherjee Nagar. SOR. Hamilton equations. bilinear transformations. constraints. Representation of unsigned integers. No. PDE (Partial Differential Equations) -Do- - 8. Numerical Analysis & CP -Do- - 4. 3-Dimensional Geometry Topic to be Topic to be started ended Class timings No. of Lectures Remarks 7AM / 3PM -Do- - 3. Numerical Analysis & CP -Do- - 8. LPP (Linear Programming Problem) -Do- - 4. Name of the Topic Topic to be Topic to be started ended Class timings No. Complex Analysis -Do- - 10. Dynamics & Statics -Do- - 12. ODE (Ordinary Differential Equations) -Do- - 7.) REGULAR CLASSROOM Time Table for Mukherjee Nagar & Rajinder Nagar Centre S. Name of the Topic 1. Mechanics & Fluid Dynamics -Do- - Timings: (Mukherjee Nagar: 7:00am to 12:00noon) & (Old Rajinder Nagar: 3:00pm to 8:00pm) NOTE: Regular Classes from Monday to Friday at Both the centres Weekend classes: Saturday & Sunday Regular class students must attend the weekend classes to complete the syllabus quickly . of Lectures 1. LPP (Linear Programming Problem) -Do- - 11. Vector Analysis -Do- - 6.No. Linear Algebra -Do- - 5. Modern Algebra -Do- - 10. exp. Calculus & Real Analysis -Do- - 9.(14) Schedule for IAS/IFoS Classroom Programme: 2014-15 IAS/IFoS OPTIONAL MATHEMATICS by K. PDE (Partial Differential Equations) -Do- - 3. Vector Analysis -Do- - 7. ODE (Ordinary Differential Equations) 2. Mechanics & Fluid Dynamics -Do- - Timings: (Mukherjee Nagar: 7:00am to 10:00am) & (Old Rajinder Nagar: 5:00pm to 8:00pm) & WEEKEND CLASSROOM Time Table for Mukherjee Nagar & Rajinder Nagar Centre S. Complex Analysis -Do- - Remarks 7AM / 5PM 6. Dynamics & Statics -Do- - 12. Calculus & Real Analysis -Do- - 5. Modern Algebra 2. Venkanna (14 yrs teach. Linear Algebra -Do- - 11. 3-Dimensional Geometry -Do- - 9. 13. Calculus and Three Dimensional Geometry Algebra. Marks: 200 Time Duration: 3Hrs. Test No. 4. 8. exp. No. Numerical Analysis & Computer Programming and Mechanics & Fluid Dynamics Full Syllabus (Paper-I) Full Syllabus (Paper-II) Full Syllabus (Paper-I) Full Syllabus (Paper-II) Full Syllabus (Paper-I & Paper-II) Full Syllabus (Paper-I) Full Syllabus (Paper-II) Full Syllabus (Paper-I) Full Syllabus (Paper-II) Full Syllabus (Paper-I & Paper-II) Full Syllabus (Paper-I & Paper-II) TEST TIMINGS: (Old Rajinder Nagar: 11:00am to 2:00pm) & (Mukherjee Nagar: 1:00pm to 4:00pm) NOTE: (1) Every Year IAS/IFoS Mathematics(Opt. No. Linear Algebra. Real Analysis and Complex Analysis & LPP (Linear Programming Problem) ODE (Ordinary Differential Equations). 6. . Marks: 250 IFoS Exam Max. 12. Venkanna (14 yrs teach. DATE TOPICS TO BE COVERED 1. 9. 11. 2. DATE TOPICS TO BE COVERED 1. (2) The Above Test Series Programmes will be conducted at Mukherjee Nagar & Old Rajinder Nagar Centres. Dynamics & Statics and Vector Analysis. No. 9. 4. Dynamics & Statics and Vector Analysis. 3. 15. Batch-1 (LEVEL-I) Begins from 14 June’14 S. Test No. 12. 7. 3. 7. Test-1 Test-2 Test-3 Test-4 31-Aug-2014 07-Sep-2014 14-Sep-2014 21-Sep-2014 5. 11. PDE (Partial Differential Equations). PDE (Partial Differential Equations). 10. 10. Full Syllabus (Paper-I) Full Syllabus (Paper-II) Full Syllabus (Paper-I) Full Syllabus (Paper-II) Full Syllabus (Paper-I & Paper-II) Full Syllabus (Paper-I) Full Syllabus (Paper-II) Full Syllabus (Paper-I) Full Syllabus (Paper-II) Full Syllabus (Paper-I & Paper-II) Full Syllabus (Paper-I & Paper-II) Test-5 Test-6 Test-7 Test-8 Test-9 Test-10 Test-11 Test-12 Test-13 Test-14 Test-15 31-Aug-2014 07-Sep-2014 14-Sep-2014 21-Sep-2014 05-Oct-2014 12-Oct-2014 19-Oct-2014 26-Oct-2014 02-Nov-2014 16-Nov-2014 30-Nov-2014 Batch-3 (LEVEL-I + LEVEL-II) Begins from 31 August’14 S. 15. 14. DATE TOPICS TO BE COVERED 5. 13. Numerical Analysis & Computer Programming and Mechanics & Fluid Dynamics Test-1 Test-2 Test-3 Test-4 14-June-2014 21-June-2014 28-June-2014 05-July-2014 Batch-2 (LEVEL-II) Begins from 31 August’14 S.) Main Test Series will be conducted from Middle of June.(15) Schedule for IAS/IFoS Mathematics TEST SERIES PROGRAMME-2014 Under the guidance of K. 14. Test-5 Test-6 Test-7 Test-8 Test-9 Test-10 Test-11 Test-12 Test-13 Test-14 Test-15 28-Sep-2014 05-Oct-2014 12-Oct-2014 19-Oct-2014 26-Oct-2014 02-Nov-2014 09-Nov-2014 16-Nov-2014 23-Nov-2014 30-Nov-2014 07-Dec-2014 Linear Algebra. Real Analysis and Complex Analysis & LPP (Linear Programming Problem) ODE (Ordinary Differential Equations). 8. 2.) IAS Exam Max. Calculus and Three Dimensional Geometry Algebra. Test No. 6. O. 011-45629987 . Mukherjee Tower. Delhi-9. Ph.(16) H. Mukherjee Nagar.: 105-106. 9999329111. Delhi-60.:9999197625.: 25/8. Top Floor.O. Old Rajender Nagar Market. B. ) The Civil Services Examination. Expert guidance. 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. Old Rajender Nagar Market. Scoring pattern of that subject in past few years. a patient and calm approach and most importantly with the belief in one's own potential. This category usually consists of those students who seem to eat. 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. consistent efforts. B. into two categories. Therefore. the popularity of the subject has increased as expert guidance keeping in view the need of the CSE is available now. 9999329111. The availability of study material and 4. Even the illogical CSE H. Ideally. The maximum number of students in the Civil services examination were the students who had taken Mathematics as their optional. diligence. there is a certain phobia about choosing Mathematics as an optional amongst the students.: 25/8. especially the ones from the Mathematics background who are aspiring for the CSE. The popular trends show that out of every 20 students. Data shows that before the year 2000. who do not opt for it. However. Mukherjee Nagar. Though the CSE is a hard nut to crack but one could sail through this 'hurdle race' via strategic planning. diligent students who already have a penchant for this subject. 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. 3. 011-45629987 . Delhi-60. They are highly passionate about this subject and extremely devoted to it. The right selection of the optional is the pre requisite of a good rank in CSE. 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. Let us examine this problem through an observational analysis of the situation. sleep and drink Mathematics. It is the latter category of students who encourage me to delve into their mind set and explore the reasons for their decision. at least one student has Mathematics as one of his or her optional subject. the chances of getting the best ranks are much better.(17) Preparation Strategy IAS/IFoS MATHEMATICS(Opt. it is a group of self motivated.O. availability of study material and expert guidance As per the above mentioned criteria of choosing optional. Top Floor.:9999197625. A subject of your interest. Delhi-9. inefficient and inexperienced teachers. We can broadly categorize the science students.Sc Mathematics/ B. In fact.O. One must choose the optional keeping the following points in mind: 1. The first category is of those students who opt for Mathematics as an optional in this prestigious examination. 2. 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. is also known as the toughest and the longest examination of India. the creme de la creme of all examinations. Mathematics is one of the safest and most scoring optional in the Civil Services Examination. scoring pattern. Ph. Talking about the former category. Mukherjee Tower. with the change in the CSE pattern. I consider it quite important to share my view points of the bright future of the aspiring candidates. WHO CAN OPT IT ? The students who have studied B. However.: 105-106. However since the last few years. However. can take Mathematics as the optional in this examination. The second category is obviously those students. Tech. 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. 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. Mukherjee Nagar. Choose the 'stepping stone' not the 'stumbling block'.O. B. Either they are discouraged enough to take the plunge with a safe subject which ultimately results in their sad failure despite rigorous hard work. Mathematics is the most advantageous and the highest scoring optional. Delhi-60. Mukherjee Tower. 011-45629987 . An academy with its experience and professional efficiency can prove to be a catalyst to ensure absolute proficiency and perfection in the Subject. coaching institutes may prepare a system of rigorous written tests and feedback mechanisms.O. As IAS and IFoS are joined together.:9999197625. You have been solving Mathematics questions since elementary school. Overcome your irrational fears and anxieties and make a prudent decision. 9999329111. ROLE OF COACHING The role of the coaching institute can never be underestimated in the preparation of CSE/IFoS. Delhi-9. After spending more than 15 years in the field of Mathematics.: 25/8. Ph. Moreover. The mentor facilitates the process of preparation and enables the student to savor the success in a strategized manner. so there is an opportunity for the Mathematics optional students to write the IFoS exams along with the IAS exams simultaneously. 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. Expert guidance is a very crucial aspect for these preparations. Top Floor. 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.: 105-106. 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'.(18) theories created by the mercantile propagandists affects the psychology of these students by enticing them to select inconsequential and irrelevant optionals. Think about it. H. Old Rajender Nagar Market. if you are being manipulated to change your path for an irrelevant option with just 6 months or one year of preparation. Website: www. 202 R.47 AIR-140 AIR-507 AIR-575 2010 2010 2009 Bhagwati P Kalal Awakash Kumar Navneet Aggrawal Ajit Pratap Singh Shambhu Kumar A. Mukherjee Tower.com || Email: ims4ims2010@gmail. Kishore IFoS Kulraj Singh Mohit Gupta Nitish Kumar Navin Prakash Shakya Anupam Shukla Abdul Qayum Dilip Kumar Yadav Rajesh Kumar AIR-16 (2013) AIR-29 (2013) AIR-39 (2013) AIR-72 (2013) AIR-7 (2012) AIR-32 (2012) AIR-48 (2012) AIR-72 (2012) UP-PCS Himanshu Gupta Tirumala Ravikiran Teswang Gyaltson Jai Yadav Vijaya Ratre Shambhu Kumar AIR-5 (2011) AIR-11 (2011) AIR-4 (2010) AIR-36 (2010) AIR-80 (2010) AIR-23 (2008) Susheel Kumar (UP-PCS . 1-10-237. Room No.J. Delhi-9. Branch Office: 25/8. Jain 2011 2012 B Sashi Kant 2012 AIR- 849 Santosh Kumar 2011 2012 Krishan Kant 2012 AIR- 944 Meet Kumar 2011 2012 Vishal Garg 2011 Pradeep Mishra 25 88 2011 AIR- Arijit Mukherjee Consolidated Reserve List-2011 AIR- Ajay Singh Tomar 2011 168 AIR-220 AIR-288 AIR-372 AIR-485 AIR-538 AIR-796 2010 AIR-223 Awakash Kumar 2010 AIR- Gulneet Singh Ajit Pratap Singh Jai Yadav Ravi Verma Megha Agrawal B. Delhi-60 9999197625.R. Old Rajender Nagar Market.K’S-Kacham’s Blue Sapphire Ashok Nagar Hyderabad-20.com OUR ACHIEVEMENTS from 2008 to 2013 INSTITUTE FOR IAS/IFoS/CSIR/GATE EXAMINATIONS IAS 2012 AIR- 76 AIR-247 AIR-329 AIR-550 AIR-560 AIR-633 2012 Ramesh Ranjan 7 HIMANSHU GUPTA IAS-2011 2011 AIR- 2011 2012 AIR- 655 2012 Ankit Verma 2012 AIR- Ketan Bansal 2011 667 Sanjay Kr. Arjun 2009 Nisha Gupta K. Mukherjee Nagar. Krupakar Abhishek Modi 2009 2008 2010 154 AIR276 AIR-362 AIR-497 AIR.V. 011-45629987 Regional Office: H. Top Floor.S. 9999329111. 9652351152 .No. Ph.2011) Head Office:105-106.ims4maths. 2nd floor.
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