Jamia Millia Islamia Entrance Exam M.Sc. (Mathematics with Computer Science) 2020 or JMI Entrance Exam M.Sc. (Mathematics with Computer Science) 2020 is the entrance examination for admission to M.Sc. (Mathematics) (Computer Science). JMI Entrance Exam M.Sc. (Mathematics with Computer Science) 2020 is conducted by Jamia Millia Islamia University.
JMI Entrance Exam M.Sc. (Mathematics with Computer Science) for the year 2020 has been announced by Jamia Millia Islamia University and will be held on 04/11/2020. The application forms will be available from 21/02/2020 till 14/09/2020. The exam is in written mode. The duration of the exam will be 90 minutes. It is being conducted in English, Hindi and Urdu languages. The result date will be announced later.
The Minimum Academic Qualifications for JMI Entrance Exam M.Sc. (Mathematics with Computer Science) 2020 required B.Sc. (Hons) Mathematics / B.Sc. (Hons) Applied Mathematics.
The qualifying marks in B.Sc. (Hons) for each category are as follows:
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|Events||Start Date||Last Date|
|Application Form||21/02/2020||14/09/2020 11:55 am|
|JMI Entrance Exam M.Sc. (Mathematics with Computer Science) 2020 Exam Date||
Application Form Fee - 700/-
Requirements to be readied before you start filling up the Application Form of JMI Entrance Exam M.Sc. (Mathematics with Computer Science) 2020:
The Usual Steps in filling up the Online Application Form of the JMI Entrance Exam M.Sc. (Mathematics with Computer Science) 2020:
Step-1: Students have register for Online Application Form. A login and password are created.
Step-2: Student has to complete the Application Form and its various sections
Step-3: Required documents in the form of Scanned Images of Candidate’s Photograph, Candidate’s Signature and Left Thumb Impression.
Step-4: Payments have to be made by Debit / Credit Card / Net Banking
Important Instructions about JMI Entrance Exam M.Sc. (Mathematics with Computer Science) 2020 Application Process:
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Calculus and Differential Equations
Unit I. definition of the limit of a function. Algebra of limits. Continuous functions and classification of discontinuous functions. Differentiability. Successive differentiation. Leibnitz theorem. Rolle’s theorem. Mean Value theorems. Taylor’s theorem with Lagrange’s and Cauchy’s form of remainder. Taylor’s and Maclaurin's series of elementary functions.
Unit II. Indeterminate forms. Curvature. Cartesian, polar and parametric formulae for radius o curvature. Partial derivatives. Euler’s theorem on homogeneous functions.
Unit III. Asymptotes. Test for concavity and convexity. Points of inflexion. Multiple points. Tracing of curves in Cartesian and polar coordinates.
Unit IV. Reduction formulae. Quadrature. Rectification. Intrinsic equation. Volumes and surfaces of solids of revolution.
Unit V. Order and degree of a differential equation. Equations of the first order and first degree. Equations in which the variables are separable. Homogeneous equation. Linear equations and equations reducible to linear form. Exact differential equations. Clairaut’s form and singular solutions. Linear differential equations with constant coefficients.
Unit VI. Homogeneous linear differential equations. Second-order linear differential equations (exact. Normal and variation of parameters). Systems of linear differential equations.
Geometry of Two and Three Dimensions
Unit I. Conic sections. General equation of second degree. Pair of lines. Lines Joining the origin to the points of intersection of a curve and a line. Equation of parabola in standard and parametric form. Tangent. Normal pole and polar and their properties.
Unit II. Equations of ellipse and hyperbola in standard and parametric forms. Tangent Normal. Pole and polar and their elementary properties. Conjugate diameters. Asymptotes. Conjugate hyperbola and rectangular hyperbola.
Unit III. Polar Equation of a conic. Polar equation of tangent, normal, polar and asymptotes. Tracing of parabola, ellipse and hyperbola.
Unit IV. Equation of plane. Pair of planes. Equations of a line. Line and plane. Shortest distance.
Unit V. Equation of the sphere. Tangent plane, plane of contact and polar plane. Intersection of two spheres. Radical plane. Coaxial spheres. Conjugate systems. Equation of cone. Intersection of Cone with plane and a line. Enveloping cone. Right circular cone.
Unit VI. Equation cylinder. Enveloping and right circular cylinders. Equations of central conicoids. Tangent plane. Normal. Plane of contact and polar plane. Enveloping cone and enveloping cylinder. Conjugate diameters and diameters planes. Equations of paraboloids and its simple properties.
Syllabus Link: View/Download
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After entering the centre
The Admit Card can be downloaded from the official site. Once it is downloaded it should be printed. Instructions on the Admit Card should be read carefully as very important details may be provided along with the Admit Card. Following information is provided with the admit card:
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The candidate has to pay fees of Rs. 500/- per programme to challenge the uploaded key.