#1
1st May 2015, 09:33 AM
| |||
| |||
FE Engineering Syllabus Mumbai University
Can you provide me the revised FE Engineering (First Year Engineering) syllabus of Mumbai University as though I am enrolled under the old scheme of engineering in Mumbai University but I just have a look at the new revised FE Engineering (First Year Engineering) syllabus of Mumbai University?
|
#2
9th May 2018, 09:26 AM
| |||
| |||
Re: FE Engineering Syllabus Mumbai University
I want the syllabus of First Year Engineering of Mumbai University so will you please provide me?
|
#3
9th May 2018, 09:30 AM
| |||
| |||
Re: FE Engineering Syllabus Mumbai University
I am providing you the syllabus of First Year Engineering of Mumbai University Mumbai University First Year Engineering syllabus Semester I Course Code Course Name FEC101 Applied Mathematics-I FEC102 Applied Physics-I FEC103 Applied Chemistry -I FEC104 Engineering Mechanics FEC105 Basic Electrical Engineering FEC106 Environmental studies FEL101 Basic Workshop Practice-I Semester II Course Code Course Name FEC201 Applied Mathematics-II FEC202 Applied Physics-II FEC203 Applied Chemistry -II FEC204 Engineering Drawing FEC205 Structured Programming Approach FEC206 Communication Skills FEL201 Basic Workshop Practice-II Applied Mathematics-I Objectives 1. To provide students with sound foundation in applied mathematics to solve real life problems in industry. 2. To provide hands on experience in using Scilab software to handle real life problems. Outcomes: Learner will be able to 1. Apply the concepts of complex numbers to the engineering problems. 2. Apply the knowledge of nth order derivatives of standard functions to engineering problems. 3. Apply the principles of basic operations of matrices to the engineering problems. 4. Apply the basic principles of partial differentiation to engineering problems. 5. Apply concepts of partial differentiation (maxima and minima, Jacobian), expansion of functions as an application of successive differentiation. 6. Apply SCILAB programming techniques to model problems based on solution of simultaneous linear algebraic equations. Module Complex Numbers Pre‐requisite: Review of Complex Numbers‐Algebra of Complex Number, Different representations of a Complex number and other definitions, DMoivres Theorem. 1.1. Powers and Roots of Exponential and Trigonometric Functions. 1.2. Expansion of sinnθ, cosnθ in terms of sines and cosines of multiples of θ and Expansion of sinnθ, cosnθ in powers of sinθ, cosθ 1.3. Circular functions of complex number and Hyperbolic functions. Inverse Circular and Inverse Hyperbolic functions. Separation of real and imaginary parts of all types of Functions. Logarithm of Complex Numbers , Successive Differentiation 2.1 Logarithmic functions, Separation of real and Imaginary parts of Logarithmic Functions. 2.2 Successive differentiation: nth derivative of standard functions. Leibnitzs Theorem (without proof) and problems Matrices Pre‐requisite: Inverse of a matrix, addition, multiplication and transpose of a matrix Types of Matrices (symmetric, skew‐ symmetric, Hermitian, Skew Hermitian, Unitary, Orthogonal Matrices and properties of Matrices). Rank of a Matrix using Echelon forms, reduction to normal form, PAQ in normal form, system of homogeneous and non homogeneous equations, their consistency and solutions. Linear dependent and independent vectors. Application of inverse of a matrix to coding theory. Mumbai University First Year Engineering syllabus Contact- Mumbai University (MU) Kalina, Santacruz East, Kolivery Village, University of Mumbai,Vidya Nagari, Kalina, Santacruz East, Mumbai, Maharashtra 400098 For complete syllabus here is the attachment |
|