Mathematics for engineers and applied scientists / Stanley C. Lennox, Mary Chadwick.
Series: An H.E.B. paperbackPublication details: London : Heinemann, c1977.Edition: 2nd editionDescription: xiv, 550 p. : ill. ; 22 cmISBN:- 0435712829 :
- 510. 22 510 LEN
Item type | Current library | Call number | Copy number | Status | Date due | Barcode |
---|---|---|---|---|---|---|
Book Closed Access | Engineering Library | 510 LEN 1 (Browse shelf(Opens below)) | 1 | Available | BUML23070671 |
CONTENTS
Chapter 1 : Introduction
1.1 Functions of one variable
1.2 Inverse functions
1.3 Coordinate systems
etc
Chapter 2: Differentiation
2.1 Defintion of the derivatives
2.2 Standard derivatives and rules
2.3 Repeated differentiation
etc
Chapter 3 : Infinite series and convergence
3.1 Limit of a sequence
3.2 Convergence of series
3.3 Some standards infinite series
etc
Chapter 4 : Exponential, Logarithmic, and Hyperbolic function
4.1 The exponential function
4.2 The logarithmic function
4.3 Limits connected with e and log x
etc
Chapter 5 : The main value theorem, Taylor series and further partial differentiation
5.1 The mean value theorem
5.2 Taylor series
5.3 Power series expansions of functions
etc
Chapter 6 : Intergration
6.1 The indefinite integral
6.2 Standard forms
6.3 The definite integral
etc
Chapter 7 : Applications of integration
7.1 Introduction
7.2 Integration as the limit of a sum
7.3 Application of integration
Chapter 8 : Matrices and determinants
8.1 Introduction
8.2 Definition and notation
8.3 Matrix algebra
etc
Chapter 9 : Vectors
9.1 Scalars
9.2 Directed magnitude
9.3 Vectors
etc
Chapter 10. Complex numbers and complex variables
10.0 Introduction
10.1 Symbols i as an operator
10.2 The algebra of complx numbers
10.3 Polar form of a complx numbers
etc
Chapter 11 : Ordinary differential equations
11..0 Introduction
11.1 First order equations
11.2 Some special types of second order equation
11.3 Some special types of second equations
etc
Chapter 12 : Analytical properties of algebraic equations
12.0 Introduction
12.1 The remainder theorem
12.2 Solution of equations. multiple roots
12.3 Detached coefficient. synthesis division
etc
Chapter 13 : Numeric method 1
13.0 Introduction
13.1 Graphic method
13.2 Graphical method of sloving
etc
Chapter 14. Numerical method ii
14.1 Interpolation
14.2 Difference table
14.3 The newton gregory formulae of interpolation
etc
Chapter 15 : Statistics I
15.0 Introduction
15.1 Statistical experiments
15.2 Probability
15.3 Random variables
etc
Chapter 16 Statistics ii
16.0. Introduction
16..1 Methods of sampling
16.2 Sampling distribution of the mean
16.3 Testing hypotheses and confidence intervals
etc
Chapter 17 : Applications
17.0 Introduction
17.1 Inequalities linear programming
17.2 Exponential function, hyperbolic. differential equations
17.3 Matrices. determinants. eigenvalues and eigenvectors
etc
Index : p.542-550
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