JRD Global EDU

      B.Tech + MBA Tech.integrated program course

      JRD Global EDU
      In Thane

      Rs 2,50,000
      You can also call the Study Centre

      Important information

      Typology Bachelor
      Location Thane
      Class hours 5h
      Duration 5 Years
      Start Different dates available
      • Bachelor
      • Thane
      • 5h
      • Duration:
        5 Years
      • Start:
        Different dates available
      Description

      B Tech is skill oriented. BE is more theoretical and B Tech is more practical. ... Universities which offered other degrees along with engineering called their engineering degree as BE (Bachelor of Engineering) and Institutes constituted for only Engineering studies named their degree as B.Tech (Bachelor of Technology).

      Facilities (1)
      Where and when
      Starts Location
      Different dates available
      Thane
      03 Lula Arcade bhanu sagar theatre, Kalyan w Thane, 421301, Maharashtra, India
      See map
      Starts Different dates available
      Location
      Thane
      03 Lula Arcade bhanu sagar theatre, Kalyan w Thane, 421301, Maharashtra, India
      See map

      To take into account

      · Who is it intended for?

      12th Sci students can apply

      · Requirements

      For this program student should have done Five yrs (Integrated. Program) & (Four yrs for lateral entry).

      · Qualification

      12th Sci students can apply

      · What marks this course apart?

      ONLINE STUDY SELF LEARNING PROGRAM

      · What happens after requesting information?

      ON LINE APPLICATION FORM REGISTRATION DETAILS

      Questions & Answers

      Ask a question and other users will answer you

      What you'll learn on the course

      Engineering Geology
      Engineer
      Engineering Drawing
      MBA
      Testing
      C++
      Engineering
      Technology
      Analysis
      About Books
      Books
      Production
      Engineering Mechanics
      IT Engineering
      Mechanics
      Biotech
      Engineering Mathematics
      Welding
      Gas
      Drawing

      Teachers and trainers (1)

      SNEHA SHARMA
      SNEHA SHARMA
      COUNSELOR

      Course programme

      This program focuses on technology and specially in this program they focus on B.Tech & MBA in technology

      Program Content:

      ** Computer Sci. & Engg.,
      ** Electronic & Com. Engg.
      ** IT
      ** Electrical Engg.
      ** Biotech.
      ** Civil Engg.
      ** Mechanical Engg.
      ** Agricultural Engg.

      DEPARTMENT OF METALLURGICAL ENGINEERING

      MATHEMATICS-III

      (Common with Mechanical Engineering)

      Vector calculus. Differentiation of vectors, curves in space, Velocity and acceleration, Relative velocity and acceleration, Scalar and Vector point functions – Vector operation del. Del applied to scalar point functions – Gradient, Del applied to vector point functions – Divergence and Curl. Physical interpretation of div F curl. F del applied twice to point functions, Del applied twice to point functions, Integration of vectors, Line integral- Circulation – Work surface integral – Flux, Green’s theorem in the plane, Stoke’s theorem, Orthogonal curvilinear co-ordinates Del applied to functions in orthogonal curvilinear co-ordinates, Cylindrical coordinates – spherical polar co-ordinates.

      Partial differential equations. Formation of partial differential equations, Solutions of a partial differential equation, Equations Solvable by direct integration. Linear equations of the first order, Homogenous linear equations with constant coefficients, Rules for finding the complementary function, Rules for finding the particular integral, working procedure to solve homogenous linear equations of any order. Non-homogeneous linear equations.

      Applications of Partial Differential equations. Introduction, Methods of separation of variables, partial differential equations of Engineering, Vibration of a stretched stirring-wave equation, One-dimensional heat flow, Two dimensional heat flow, Solution of Laplace’s equation, Laplace’s equation in polar co-ordinates .

      Integral Transforms. Introduction, Definition, Fourier integrals-Fourier sine and cosine integrals-complex forms of Fourier integral, Fourier transform-Fourier sine and cosine transforms – finite Fourier sine and cosine transforms, Properties of F-transforms, Convolutions theorem for properties F-Transforms, Paraseval’s identity for F-transforms, Relation between Fourier and Laplace transforms, Fourier transforms of the derivatives of a function, Inverse Laplace transforms by method of residuals, Application of transforms to boundary value problems.