IP University Btech EEE Syllabus Download

 

FIRST SEMESTER EXAMINATION

Code No.	Paper	L	T/P	Credits
THEORY PAPERS
ETMA 101	Applied Mathematics – I	3	1	4
ETPH 103	Applied Physics – I	2	1	3
ETCH 105	Applied Chemistry – I	2	1	3
ETME 107	Manufacturing Process	2	0	2
ETCS 109	Introduction to Computers and Auto CAD	2	1	3
ETEL 111	Communication Skills – I	2	1	3
ETEL 113*	Impact of Science & Technology on Society	1	0	1
PRACTICAL/VIVA VOCE
ETPH 151	Applied Physics Lab. – I	-	2	1
ETCH 153	Applied Chemistry Lab. – I	-	2	1
ETCS 155	Introduction to Auto CAD Office Automation and Web Design	-	3	2
ETME 157	Workshop Practice	-	3	2
ETME 159	Engineering Graphics Lab.	-	2	1
	TOTAL	14	17	26

ETEL-113* is NUES

IP University Btech EEE Syllabus Download

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FIRST SEMESTER EXAMINATION

Mathematics
UNIT I
COMPLEX NUMBERS AND INFINITE SERIE S: De Moivre’s theorem and roots of complex numbers.
Euler’s theorem, Logarithmic Functions, Circular, Hyperbolic Functions and their Inverses. Convergence
and Divergence of Infinite series, Comparison test d’Alembert’s ratio test. Higher ratio test, Cauchy’s root
test. Alternating series, Lebnitz test, Absolute and conditioinal convergence.
UNIT II
CALCULUS OF ONE VARIABLE: Successive differentiation. Leibnitz theorem (without proof)
McLaurin’s and Taylor’s expansion of functions, errors and approximation.
Asymptotes of Cartesian curves. Curveture of curves in Cartesian, parametric and polar coordinates,
Tracing of curves in Cartesian, parametric and polar coordinates (like conics, astroid, hypocycloid, Folium
of Descartes, Cycloid, Circle, Cardiode, Lemniscate of Bernoulli, equiangular spiral). Reduction Formulae
for evaluating
Finding area under the curves, Length of the curves, volume and surface of solids of revolution.
UNIT III
LINEAR ALGEBRA – MATERICES: Rank of matrix, Linear transformations, Hermitian and skeew –
Hermitian forms, Inverse of matrix by elementary operations. Consistency of linear simultaneous
equations, Diagonalisation of a matrix, Eigen values and eigen vectors. Caley – Hamilton theorem
(without proof).
UNIT IV
ORDINARY DIFFERENTIAL EQUATIONS: First order differential equations – exact and reducible to
exact form. Linear differential equations of higher order with constant coefficients. Solution of
simultaneous differential equations. Variation of parameters, Solution of homogeneous differential
equations – Canchy and Legendre forms.

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