Mathematics

Course Code:MA101

Author:uLektz

University:

Regulation:2015

Categories:Engineering Mathematics

Format : ePUB3 (DRM Protected)

Type :eBook

Rs.189 Rs.28 Rs.85% off

Description :Mathematics of MA101 covers the latest syllabus prescribed by Delhi Technological University for regulation 2015. Author: uLektz, Published by uLektz Learning Solutions Private Limited.

Note : No printed book. Only ebook. Access eBook using uLektz apps for Android, iOS and Windows Desktop PC.

Topics
UNIT - I INFINITE SERIES

1.1 Infinite series: Tests for convergence of series (Comparison, Ratio, Root, Integral, Raabe's, logarithmic)

1.2 Alternating series, Absolute convergence, Conditional convergence

UNIT - II DIFFERENTIAL & INTEGRAL CALCULUS OF SINGLE VARIABLE

2.1 Differential & Integral Calculus of single variable: Taylor's & MaClaurin's expansion, Radius of curvature, Tracing of some standard curves

2.2 Applications of definite integral to Area, Arc length, Surface area and volume (in cartesian, parametric and polar co-ordinates)

UNIT - III CALCULUS OF SEVERAL VARIABLES

3.1 Calculus of several variables: Partial differentiation, Euler's theorem

3.2 Total differential, Taylor's theorem

3.3 Maxima-Minima, Lagrange's method of multipliers

3.4 Application in estimation of error and approximation

UNIT - IV MULTIPLE INTEGRALS

4.1 Multiple Integrals: Double integral (Cartesian and polar co-ordinates), Change of order of integration

4.2 Triple integrals (Cartesian, cylindrical and spherical co-ordinates)

4.3 Beta and Gamma functions, Applications of multiple integration in area and volume

UNIT - V VECTOR DIFFERENTIAL CALCULUS

5.1 Vector Differential Calculus: Continuity and differentiability of vector functions, Scalar and Vector point function

5.2 Gradient, Directional Derivative, Divergence, Curl and their applications

UNIT - VI VECTOR INTEGRAL CALCULUS

6.1 Vector Integral Calculus: Line integral, Surface integral and Volume integral

6.2 Applications to work done by the force, Applications of Green's, Stoke's and Gauss divergence theorems