Eligibility to Appear in UKSEE :
i) UKSEE MCA Courses : Recognized Bachelors Degree of minimum 3 year duration with mathematics as
compulsory subject at 10+2 level. Obtained at least 50% (45% in case of candidate belonging to
reserved category) at the qualifying examination.
ii) B. Pharm. : Passed 10+2 examination with Physics & Chemistry as compulsory subject along with
one of the Biology / Mathematics / Biotechnology.
iii) BHMCT : Passed 10+2 examination. Obtained at least 50% (45% in case of candidate belonging
to reserved category) at the qualifying examination.
iv) B. Tech. (Lateral Entry-only for Uttarakhand Domicile & Academic Domicile#)
A. Passed Diploma examination from an AICTE approved institution; with at least 50% marks (45% in
case of candidates belonging to reserved category) in appropriate branch of Engineering /
B. Passed B. Sc Degree from a recognized University as defined by UGC, with at least 50% marks
(45% in case of candidates belonging to reserved category) and passed XII standard with
mathematics as a subject.
C. Provided that in case of students belonging to B. Sc. Stream, shall clear the subjects of
Engineering Graphics / Engineering Drawing and Engineering Mechanics of the first year
engineering program along with the second year subjects.
D. Provided further that, the students belonging to B. Sc. Stream shall be considered only after
filling the supernumerary seats in this category with students belonging to the Diploma stream.
V) B. Pharm. (Lateral Entry-only for Uttarakhand Domicile & Academic Domicile#) Passed Diploma examination in Pharmacy from an AICTE approved institution, with at least 50%
marks (45% in case of candidates belonging to reserved category).
Results1st Jun 2017
Uttarakhand State Engineering Entrance Syllabus for those with BSc degree and wnat to take admission in UKSEE engineering entrance are as given below...
Linear Algebra: Matrix Algebra, Systems of linear equations, Eigen values and eigen vectors.
Calculus: Mean value theorems, Theorems of integral calculus, Evaluation of definite and improper integrals, Partial Derivatives, Maxima and minima, Multiple integrals, Fourier series. Vector identities, Directional derivatives, Line, Surface and Volume integrals, Stokes, Gauss and Green’s theorems.
Differential equations: First order equation (linear and nonlinear), Higher order linear differential equations with constant coefficients, Method of variation of parameters, Cauchy’s and Euler’s equations, Initial and boundary value problems, Linear partial differential equations with constant coefficients of 2nd order and their classifications and variable separable method.
Complex variables: Analytic functions, Cauchy’s integral theorem and integral formula, Taylor’s and Laurent’ series,Residue theorem, solution integrals.
Probability and Statistics: Sampling theorems, Conditional probability, Mean, median, mode and standard deviation, Random variables, Discrete and continuous distributions, Poisson, Normal and Binomial distribution, Correlation and regression analysis. Fourier Series: Periodic functions, Trignometric series, Fourier series of period 2π , Eulers formulae, Functions having arbitrary period, Change of interval, Even and odd functions, Half range sine and cosine series.
Transform Theory: Laplace transform, Laplace transform of derivatives and integrals, Inverse Laplace transform, Laplace transform of periodic functions, Convolution theorem, Application to solve simple linear and simultaneous differential equations. Fourier integral, Fourier complex transform, Fourier sine and cosine transforms and applications to simple heat transfer equations. Z – transform and its application to solve difference equations.