COMEDK UGET 2018 Mathematics syllabus is based on chapters studied in class 12 CBSE/State Board. The other sections covered in the exam are Physics and Chemistry. It will be organizeed in online mode. The exam will be organized in May 2018 by the Consortium of Medical, Engineering, and Dental of Karnataka (COMEDK). Aspirants will be honored one mark for each accurate response. For every inaccurate or unresponseed question, no mark will be deducted. Check COMEDK Exam Format
COMEDK UGET 2018 will be organized for 3 hours’ duration. Aspirants may find sample papers/model test papers on the official website to help them prepare better for the exam. Aspirants will need to save their responses on a computer screen. All the three sections will equally i.e., 60 questions will be asked from each subject. Therefore, total marks for COMEDK UGET 2018 exam will be 180.
The exam will include questions from 3 sections- Physics, Chemistry, and Mathematics. Questions from all these sections will be asked equally (60 questions from each section). Marking will be such that, each accurate response will be rewarded with +1 mark, no marks will be deducted if the response is incorrect.
COMEDK UGET 2018 Syllabus is primarily based on the concepts from Class 12 syllabus. Aspirants must keep a check on the topics covered under COMEDK UGET syllabus.
Topics covered under Physics section are- Alternating Current, Oscillations, Heat and Thermodynamics, Present and Electricity, Units of Measurement, Electromagnetic Induction, Motion in one, two and three dimensions, Kinetic Energy, thermal and chemical effects of currents. Similarly, topics such as Transition of Metals, Bio-Molecules, Nuclear Chemistry, Electrochemistry, Polymers, Chemistry of Carbon Compounds, Organic Chemistry, Chemical Kinetics and chemistry in action are comprised of Chemistry section. In this article, aspirants can find the detail of the topics covered under Mathematics section.
COMEDK UGET 2018 Mathematics syllabus is based on the syllabus of 10+2 prescribed by the COMEDK. The important units in Mathematics are Integral and Differential Calculus, Circles, Differential Equations, 3D Geometry, Circles, and Probability. Syllabus for Mathematics consists of 8 major topics which dominate this section with most of the questions. The aspirant must exercise all topics to get a grip on them. It is important to focus on these units particularly while preparing for the exam.
Mathematics syllabus as prescribed by COMEDK is given below:
|Circles||Standard Form of Equation of a Circle, General Form of Equation of a Circle, its radius and center, Equation of a Circle when the End Points of a Diameter are Given, Points of Intersection of a Line and a Circle with the Centre at the Origin and Conditions for a Line to be Tangent to the Circle, Equation of the Tangent, Equation of a Family of Circles via the Intersection of Two Circles, Condition for Two Intersecting Circles to be Orthogonal.|
|Differential Equation||Differential Equations, Ordinary Differential Equation – Their Order and Degree, Formation of Differential Equations, Solution of Differential Equations by the Mode of Separation of Variables, Solution of Homogeneous and Linear Differential Equations and those of type d2y = f(x) dx2.|
|3-D Geometry||Coordinates of a Point in Space, Distance Between Two Points, Section Formula, Direction Ratios and Direction Cosines, Angle between Two Intersecting Lines, Skew Lines – The Shortest Distance between them and its Equation, Equations of a Line and a Plane in Various Forms: Intersection of a Line and a Plane, Coplanar Lines, Equation of a Sphere, Its Centre and Radius, Diameter form of the Equation of a Sphere.|
|Vector Algebra||Vectors and Scalars, Addition of Vectors, Components of a Vector in Two Dimensions and Three-Dimensional Space, Scalar and Vector Products, Scalar and Vector Triple Product, Application of Vectors to Plane Geometry|
|Integral Calculus||Integral as an Anti-Derivative, Fundamental Integrals Involving Algebraic, Trigonometric, Exponential and Logarithmic Functions, Integration by Substitution, by Parts and Partial Fractions, Integration using Trigonometric Identities, Integral as Limit of Sum, Properties of Definite Integrals, Evaluation of Definite Integrals, Determining Areas of the Regions Bounded by Simple Curves.|
|Probability||Probability of an Event, Addition and Multiplication Theorems of Probability and their Application, Conditional Probability: Bayes Theorem, Probability Distribution of a Random Variate, Binomial and Poisson Distributions and their Properties|
|Matrices and Determinants||Determinants and Matrices of Order Two and Three, Properties of Determinants, Evaluation of Determinants, Area of Triangles Using Determinants, Addition and Multiplication of Matrices, Adjoint and Inverse of Matrix, Test of Consistency and Solution of Similar Linear Equations using Determinants and Matrices.|
|Differential Calculus||Polynomials, Rational, Trigonometric, Logarithmic and Exponential Functions, Inverse Functions, Graphs of Simple Functions, Limits, Continuity: Differentiation of the Sum, Difference, Product and Quotient of Two Functions, Differentiation of Trigonometric, Inverse Trigonometric, Logarithmic, Exponential, Composite and Implicit Functions, Derivates of Order up to Two, Applications of Derivatives: Rate of Change of Quantities, Monotonic Increasing and Decreasing Functions, Maxims and At Least Functions of One Variable, Tangents and Normals, Rolle’s and Lagrange’s Mean Value Theorems|
|Circles||5 to 7|
|Differential Equations||10 to 12|
|3-D Geometry||5 to 8|
|Vector Algebra||9 to 12|
|Integral Calculus||10 to 12|
|Probability||5 to 8|
|Matrices and Determinants||6 to 8|
|Differential Calculus||10 to 12|
For better performance in the exam, aspirants must always solve some sample papers/mock tests before appearing for the final exam. It is important to know about strength and weaknesses well before the exam, and this can be done by solving sample papers. Some of the sample papers for COMEDK UGET Mathematics section have been offered here:
|COMEDK UGET Mathematics Sample Paper 1||Download|
|COMEDK UGET Mathematics Sample Paper 2||Download|
|COMEDK UGET Mathematics Sample Paper 3||Download|