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21hs105 engineering mathematics i e hours per week total hours l t p c l t p 3 1 4 45 15 source https www google co in search q ...

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                   21HS105 ENGINEERING MATHEMATICS - I (E)
                  Hours Per Week :                Total Hours :
                    L      T     P      C            L     T     P
                    3      1      -     4           45    15      -
                                                                                                                                  SOURCE:
                                                                                                                                  https://www. google.
                                                                                                                                  co.in/search?q=math 
                 COURSE DESCRIPTION AND OBJECTIVES:                                                                               ematics+pictures& 
                                                                                                                                  source=lnms& 
                 To acquaint students with principles of mathematics through matrices, vector calculus, differential              tbm=isch&sa= 
                 equations  that serves as an essential tool in several engineering applications.                                 X&ved=0ahUKEwiQ-
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                 COURSE OUTCOMES:                                                                                                 imgrc=kipe 
                                                                                                                                  CaI6REorUM:  
                 Upon completion of the course, the student will be able to achieve the following outcomes:
                    COs                                       Course Outcomes
                      1      Understand the concept of matrices  and the method to solve the system of 
                             equation.
                      2      Understand Caley Hamilton theorem to evaluate inverse and power of a matrix.
                      3      Understand the concepts of vector differentiation.
                      4      Understand the concepts of vector Integration.
                      5      Apply various methods to solve  first order differential equations.
                 SKILLS:  
                     	    Find	the	rank	of	matrix	by	different	methods.
                          Solve the system of linear equations.
                          Compute Eigen values and Eigen vectors of a matrix.
                          Convert the matrix into diagonal form by suitable method.
                 	 	 Compute gradient, divergence and curl.
                     	 Evaluate surface and volume integrals through vector integral theorems.
                     	 Solve	first	order	ordinary	differential	equations	by	various	methods.	
              VFSTR 3
                                                                                                                   I Year I Semester
               ACTIVITIES:            UNIT - I                                                                                           L-9
               o  Compute the         MATRICES : Rank of  a matrix, Normal form, Triangular form, Echelon form; Consistency  of system 
                   rank of the        of linear equations, Gauss-Jordan method, Gauss elimination method, Gauss-Seidel method.
                   matrix 
               o  Solve the           UNIT - II                                                                                          L-9
                   system of          EIGEN VALUES AND EIGEN VECTORS : Eigen values, Eigen vectors, Properties (without  proofs); 
                   simultaneous       Cayley-Hamilton theorem (without proof), Power of a matrix, Diagonalisation of a matrix.
                   equations, 
                   Eigen values       UNIT - III                                                                                         L-9
                   and Eigen 
                   vectors            VECTOR DIFFERENTIATION : Review of Vector Algebra (Not for testing).
                   with any 
                   software like      Vector function, Differentiation, Scalar and Vector point functions, Gradient,  Normal vector,  Directional 
                   MATLAB.            Derivate, Divergence, Curl, Vector identities.
               o Compute 
                   the power          UNIT - IV                                                                                          L-9
                   of matrix          VECTOR INTEGRATION : Line integral, Surface integral, Volume integral,  Vector Integral Theorems 
                   and inverse 
                   of matrix          : Green’s theorem for plane, Gauss divergence theorem, Stokes’ theorem (without proofs)
                   by Cayley 
                   – Hamilton         UNIT - V                                                                                           L-9
                   Theorem 
                   with any           FIRST ORDER ORDINARY DIFFERENTIAL EQUATIONS :  Basic Definitions, Variable separable and 
                   software like      homogeneous differential equations, Linear differential equations, Bernoulli’s differential equations, 
                   MATLAB.            Exact and non-exact differential equations.
               o Evaluate 
                   surface 
                   and volume         TEXT BOOKS:
                   integrals 
                   through               1.    H. K. Dass and Er. Rajanish Verma, “Higher Engineering Mathematics”, 3rd edition,  
                   vector                      S. Chand & Co., 2015.
                   integral 
                   theorems.                                                                        th
                                         2.    B. S. Grewal, “Higher Engineering Mathematics”, 44  edition, Khanna Publishers, 2018.
               o Compute 
                   exact              REFERENCE BOOKS:
                   solutions of 
                   first	order	          1.    John Bird, “Higher Engineering Mathematics”, Routledge (Taylor & Francis Group), 2018.
                   differential	
                   equations             2.    Srimanta Pal and Subodh C. Bhunia, “Engineering Mathematics”, Oxford Publications, 
                   by various                  2015.
                   methods.              3.    B. V. Ramana, “Advanced Engineering Mathematics”, TMH Publishers, 2008.
                                         4.    N. P. Bali and K. L. Sai Prasad, “A Textbook of Engineering Mathematics I, II, III”, Universal 
                                               Science Press, 2018.
                                         5.    T. K.V. Iyengar et al., “Engineering Mathematics, I, II, III”, S. Chand & Co., 2018.
                                      VFSTR 4
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...Hs engineering mathematics i e hours per week total l t p c source https www google co in search q math course description and objectives ematics pictures lnms to acquaint students with principles of through matrices vector calculus differential tbm isch sa equations that serves as an essential tool several applications x ved ahukewiq lvxiahvpvhkh ecveq auiecgb outcomes imgrc kipe caireorum upon completion the student will be able achieve following cos understand concept method solve system equation caley hamilton theorem evaluate inverse power a matrix concepts differentiation integration apply various methods first order skills find rank by different linear compute eigen values vectors convert into diagonal form suitable gradient divergence curl surface volume integrals integral theorems ordinary vfstr year semester activities unit o normal triangular echelon consistency gauss jordan elimination seidel ii properties without proofs simultaneous cayley proof diagonalisation iii review ...

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