mgu b tech syllabus

I want to get admission in mgu b tech so I want to know the syllabus so can you provide me that

[Shaleen]

You want to get the B.Tech syllabus of the Mahatma Gandhi University.
The University offers a wide range of programs in several disciplines.

The College also offers Engineering courses.

You can get the syllabus on the official website of the University. There is a link named ‘Syllabus’ on the homepage of the website in the left middle right of the page.

When you click on the link, you will reach on a new page, the page will look like the screen shot.


On the page, there is a notification for the Syllabus of the B.Tech syllabus. You have to click on the link.

When you click on the link, another page will be open. On the page, there is the syllabus of the B.Tech for every branch.

Sir I am looking for the Mahatma Gandhi University B.tech syllabus for Civil Branch so can you please provide me the same

[Kiran Chandar]

Mahatma Gandhi University was established on 2 October 1983 in Kottayam district of Kerala, India.

Mahatma Gandhi University, has been approved by UGC and accredited by the National Assessment and Accreditation Council of India


B.tech syllabus for Civil Branch
EN010301A ENGINEERING MATHEMATICS II
(Common to all branches except CS & IT)
Teaching scheme Credits: 4
2 hours lecture and 2 hour tutorial per week
Objectives
• To apply standard methods and basic numerical techniques for solving problems and to
know the importance of learning theories in Mathematics.
MODULE 1 Vector differential calculus ( 12 hours)
Scalar and vector fields – gradient-physical meaning- directional derivative-divergence an
curl - physical meaning-scalar potential conservative field- identities - simple problems
MODULE 2 Vector integral calculus ( 12 hours)
Line integral - work done by a force along a path-surface and volume integral-application
of Greens theorem, Stokes theorem and Gauss divergence theorem
MODULE 3 Finite differences ( 12 hours)
Finite difference operators and - interpolation using Newtons forward and
backward formula – problems using Stirlings formula, Lagrange’s formula and Newton’s divided
difference formula
MODULE 4 Difference Calculus ( 12 hours)
Numerical differentiation using Newtons forward and backward formula – Numerical
integration – Newton’s – cotes formula – Trapezoidal rule – Simpsons 1/3rd and 3/8th rule – Difference
equations – solution of difference equation
MODULE 5 Z transforms ( 12 hours)
Definition of Z transforms – transform of polynomial function and trignometric
functions – shifting property , convolution property - inverse transformation – solution of 1st and 2nd
order difference equations with constant coifficients using Z transforms.
Reference
1. Erwin Kreyszing – Advance Engg. Mathematics – Wiley Eastern Ltd.
2. B.S. Grewal – Higher Engg. Mathematics - Khanna Publishers
3. B.V. Ramana - Higher Engg. Mathematics – McGraw Hill
4. K Venkataraman- Numerical methods in science and Engg -National publishing co
5. S.S Sastry - Introductory methods of Numerical Analysis -PHI
6. T.Veerarajan and T.Ramachandran- Numerical Methods- McGraw Hill
7. Babu Ram – Engg. Mathematics -Pearson.
8. H.C.Taneja Advanced Engg. Mathematics Vol I – I.K.International


B.tech syllabus for Civil Branch