MA6151 MATHEMATICS – I
MA6151 MATHEMATICS – I
MA6151
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MATHEMATICS – I
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L T P
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C
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3 1 0
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4
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OBJECTIVES:
·
To
develop the use of matrix algebra techniques this is needed by engineers for
practical applications.
·
To
make the student knowledgeable in the area of infinite series and their
convergence so that he/ she will be familiar with limitations of using infinite
series approximations for solutions arising in mathematical modeling.
·
To
familiarize the student with functions of several variables. This is needed in
many branches of engineering.
·
To
introduce the concepts of improper integrals, Gamma, Beta and Error functions
which are needed in engineering applications.
·
To
acquaint the student with mathematical tools needed in evaluating multiple
integrals and their usage.
UNIT I MATRICES 9+3
Eigen values and Eigenvectors of a
real matrix – Characteristic equation – Properties of eigenvalues and
eigenvectors – Statement and applications of Cayley-Hamilton Theorem –
Diagonalization of matrices – Reduction of a quadratic form to canonical form
by orthogonal transformation – Nature of quadratic forms.
Sequences: Definition and
examples – Series: Types and Convergence
– Series of positive terms –
Tests of convergence: Comparison test, Integral test and
D‟Alembert‟s ratio test
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– Alternating series –
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Leibnitz‟s
test – Series of positive and negative terms – Absolute and conditional
convergence.
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UNIT
III
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APPLICATIONS OF DIFFERENTIAL
CALCULUS
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9+3
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Curvature in Cartesian co-ordinates –
Centre and radius of curvature – Circle of curvature – Evolutes
– Envelopes - Evolute as envelope of
normals.
UNIT IV DIFFERENTIAL
CALCULUS OF SEVERAL VARIABLES 9+3
Limits and Continuity – Partial
derivatives – Total derivative – Differentiation of implicit functions –
Jacobian and properties – Taylor‟s series for functions of two variables –
Maxima and minima of functions of two variables – Lagrange‟s method of
undetermined multipliers.
UNIT V MULTIPLE INTEGRALS 9+3
Double integrals in cartesian and
polar coordinates – Change of order of integration – Area enclosed by plane
curves – Change of variables in double integrals – Area of a curved surface -
Triple integrals
– Volume of Solids.
TOTAL (L:45+T:15): 60 PERIODS
OUTCOMES:
·
This
course equips students to have basic knowledge and understanding in one fields
of materials, integral and differential calculus.
TEXT BOOKS:
1.
Bali N. P and Manish Goyal, “A Text book
of Engineering Mathematics”, Eighth Edition, Laxmi
Publications
Pvt Ltd., 2011.
2.
Grewal. B.S, “Higher Engineering
Mathematics”, 41st Edition,
Khanna Publications, Delhi, 2011.
REFERENCES:
1 Dass, H.K., and Er. Rajnish Verma,”
Higher Engineering Mathematics”, S. Chand Private Ltd.,
2011.
2 Glyn James, “Advanced Modern
Engineering Mathematics”, 3rd Edition, Pearson Education, 2012.
3 Peter V. O‟Neil,” Advanced Engineering
Mathematics”, 7th
Edition, Cengage learning, 2012.
4 Ramana B.V,
“Higher Engineering Mathematics”, Tata
McGraw Hill Publishing
Company,
New Delhi, 2008.
5 Sivarama Krishna Das P. and
Rukmangadachari E., “Engineering Mathematics”, Volume I,
Second
Edition, PEARSON Publishing, 2011.
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