2023 2024 EduVark > Education Discussion > Question Papers


  #1  
September 3rd, 2015, 10:02 AM
Unregistered
Guest User
 
CUSAT S6 EEE Question Papers

I am student of CUSAT University and from here I am doing my B.Tech EEE degree and at present I am in 6th semester. Can you please provide me 6th sem B.Tech EEE question papers or tell me can I download it from CUSAT website for doing exam preparation?
Similar Threads
Thread
CUSAT CAT Question Papers With Answers
Semester 3 CUSAT Question Papers
DCA CUSAT Question Papers
CUSAT Question Papers s3
CUSAT CS S4 Question Papers
CUSAT DSA question papers
CUSAT S8 CS Question Papers
CUSAT Question Papers
CUSAT Question Papers S4
EDC Question Papers CUSAT
CUSAT S3 It Question Papers
Cusat.nic.in question papers
Question Papers of CUSAT University
CUSAT EC S8 Question Papers
CUSAT CAT sample Question Papers

  #2  
October 23rd, 2019, 07:56 AM
Unregistered
Guest User
 
Re: CUSAT S6 EEE Question Papers

Can you provide me the syllabus of B Tech Electrical and Electronics Engineering (EEE) of Cochin University of Science & Technology on which the question paper is based?
  #3  
October 23rd, 2019, 08:00 AM
Super Moderator
 
Join Date: Mar 2012
Re: CUSAT S6 EEE Question Papers

The syllabus of B Tech Electrical and Electronics Engineering (EEE) of Cochin University of Science & Technology is as follows:


1101 ENGINEERING MATHEMATICS I

Module I

Ordinary differential equations:
First order differential equations - exact differential equations, Bernoulli's equations--Methods of solution and Simple applications.
Linear differential equations of higher orders with constant co-efficients-Methods of solution of these equations
Cauchys linear differential equations Simultaneous linear differential equations- Simple applications of linear differential equations in engineering problemsElectrical Circuits, Mechanical Systems.


Module II
Infinite series : Integral test, comparison test, ratio test, Cauchys root test, Raabes test, seies of positive and negative terms, concept of absolute convergence, alternating series, Leibniz test(No proofs for any of the above tests)
Power series : Taylor and Maclaurin series of functions, Leibniz formula for the nth derivative of the product of two functions (No proof),use of Leibniz formula for the determination of co-efficients of the power series.


Module III
Partial differentiation: Partial differentiation-Concept of partial derivative - Chain rule- Total derivative- Eulers theorem for homogeneous functions, Differentials and their applications in errors and approximations, Jacobians - Maxima minima of functions of two variables (Proof of the result not required)-Simple applications.
Co-ordinate systems: Rectangular co-ordinates-Polar co-ordinates-In plane and in Space-Cylindrical polar coordinates-Spherical polar co-ordinates.


Module IV
Integral calculus:
Application of definite integrals: Area, Volume, Arc length, Surface area.
Multiple integrals : Evaluation of double integrals-Change of order of integration. Evaluation of triple integralsChange of Variables in integrals
Applications of multiple integrals Plane Area, Surface area &Volumes of solids


References:
1. S.S.Sastry, Engineering Mathematics -Vol1, PHI publishers
2. Erwin Kreyzig, Advanced Engineering Mathematics, Wiley Eastern
3. T.Veerarajan, Engineering Mathematics, TMGH Publishers
4. B.S.Grewal, Higher Engineering Mathematics, Khanna Publishers



Syllabus B Tech EEE Cochin University of Science & Technology






Quick Reply
Your Username: Click here to log in

Message:
Options



All times are GMT +5. The time now is 04:17 PM.


Powered by vBulletin® Version 3.8.11
Copyright ©2000 - 2024, vBulletin Solutions Inc.
Content Relevant URLs by vBSEO 3.6.0

1 2 3 4 5 6 7 8