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#1
April 8th, 2016, 07:26 PM
 Unregistered Guest
Kerala University Btech S3 Syllabus Civil

Hello sir, I am SAnju Samson. I am from Kerala. I want oyu ot help me by providing me with the Kerala University B.Tech 3rd Semester (S3) Civil Engineering syllabus. Can you help me?

#2
April 9th, 2016, 10:19 AM
 Super Moderator Join Date: Nov 2011
Re: Kerala University Btech S3 Syllabus Civil

As you have asked about the Kerala University B.Tech 3rd Semester (S3) Civil Engineering syllabus, I am giving you information about it, check below for the details

III SEMESTER CIVIL ENGINEERING ( C )

Engineering Mathematics II
Mechanics of Structures
Fluid Mechanics
Concrete Technology & Advanced Construction
Surveying I
Engineering Geology
Building Drawing
Practical Surveying

ENGINEERING MATHEMATICS -II

Module – I Vector differentiation and integration: Scalar and vector functions-differentiation of vector functions-velocity and acceleration - scalar and vector fields - vector differential operator-Gradient-Physical interpretation of gradient - directional derivative – divergence - curl - identities involving (no proof) - irrotational and solenoidal fields - scalar potential. Vector integration: Line, surface and volume integrals. Green’s theorem in plane. Stoke’s theorem and Gauss divergence theorem (no proof).

Module – II Fourier series: Fourier series of periodic functions. Dirichlet’s condition for convergence. Odd and even functions. Half range expansions. Fourier Transforms: Fourier integral theorem (no proof) –Complex form of Fourier integrals-Fourier integral representation of a function- Fourier transforms – Fourier sine and cosine transforms, inverse Fourier transforms, properties.

Module – III Partial differential equations: Formation of PDE. Solution by direct integration. Solution of Langrage’s Linear equation. Nonlinear equations - Charpit method. Homogeneous PDE with constant coefficients.

Module – IV Applications of Partial differential equations: Solution by separation of variables. One dimensional Wave and Heat equations (Derivation and solutions by separation of variables). Steady state condition in one dimensional heat equation. Boundary Value problems in one dimensional Wave and Heat Equations.
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