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|a Bird, J. O.,
|e author.
|0 http://id.loc.gov/authorities/names/n80089789
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| 245 |
1 |
0 |
|a Mathematics pocket book for engineers and scientists /
|c John Bird.
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| 250 |
|
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|a Fifth edition.
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| 264 |
|
1 |
|a Abingdon, Oxon ;
|a New York, NY :
|b Routledge,
|c 2020.
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| 300 |
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|a 1 online resource (xiv, 556 pages.) :.
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| 336 |
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|a text
|b txt
|2 rdacontent
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| 337 |
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|a computer
|b c
|2 rdamedia
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| 338 |
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|a online resource
|b cr
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|a Routledge Pocket Books
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| 505 |
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|a Machine generated contents note:
|g ch. 1
|t General conversions and the Greek alphabet --
|g ch. 2
|t Basic SI units, derived units and common prefixes --
|g ch. 3
|t Some physical and mathematical constants --
|g ch. 4
|t Recommended mathematical symbols --
|g ch. 5
|t Symbols for physical quantities --
|g ch. 6
|t Introduction to algebra --
|g ch. 7
|t Polynomial division --
|g ch. 8
|t factor theorem --
|g ch. 9
|t remainder theorem --
|g ch. 10
|t Continued fractions --
|g ch. 11
|t Solving simple equations --
|g ch. 12
|t Transposing formulae --
|g ch. 13
|t Solving simultaneous equations --
|g ch. 14
|t Solving quadratic equations by factorising --
|g ch. 15
|t Solving quadratic equations by completing the square --
|g ch. 16
|t Solving quadratic equations by formula --
|g ch. 17
|t Logarithms --
|g ch. 18
|t Exponential functions --
|g ch. 19
|t Napierian logarithms --
|g ch. 20
|t Hyperbolic functions --
|g ch. 21
|t Partial fractions --
|g ch. 22
|t Simple number sequences --
|g ch. 23
|t Arithmetic progressions --
|g ch. 24
|t Geometric progressions --
|g ch. 25
|t Inequalities --
|g ch. 26
|t binomial series --
|g ch. 27
|t Maclaurin's theorem --
|g ch. 28
|t Limiting values - L'Hopital's rule --
|g ch. 29
|t Solving equations by iterative methods (1) - the bisection method --
|g ch. 30
|t Solving equations by iterative methods (2) - an algebraic method of successive approximations --
|g ch. 31
|t Solving equations by iterative methods (3) - the Newton-Raphson method --
|g ch. 32
|t Computer numbering systems --
|g ch. 33
|t Area of plane figures --
|g ch. 34
|t Circles --
|g ch. 35
|t Volumes and surface areas of regular solids --
|g ch. 36
|t Volumes and surface areas of frusta of pyramids and cones --
|g ch. 37
|t frustum and zone of a sphere --
|g ch. 38
|t Areas and volumes of irregular figures and solids --
|g ch. 39
|t mean or average value of a waveform --
|g ch. 40
|t Types and properties of angles --
|g ch. 41
|t Properties of triangles --
|g ch. 42
|t theorem of Pythagoras --
|g ch. 43
|t Trigonometric ratios of acute angles --
|g ch. 44
|t Evaluating trigonometric ratios --
|g ch. 45
|t Fractional and surd forms of trigonometric ratios --
|g ch. 46
|t Solution of right-angled triangles --
|g ch. 47
|t Cartesian and polar co-ordinates --
|g ch. 48
|t Sine and cosine rules and areas of any triangle --
|g ch. 49
|t Graphs of trigonometric functions --
|g ch. 50
|t Angles of any magnitude --
|g ch. 51
|t Sine and cosine waveforms --
|g ch. 52
|t Trigonometric identities and equations --
|g ch. 53
|t relationship between trigonometric and hyperbolic functions --
|g ch. 54
|t Compound angles --
|g ch. 55
|t straight-line graph --
|g ch. 56
|t Determination of law --
|g ch. 57
|t Graphs with logarithmic scales --
|g ch. 58
|t Graphical solution of simultaneous equations --
|g ch. 59
|t Quadratic graphs --
|g ch. 60
|t Graphical solution of cubic equations --
|g ch. 61
|t Polar curves --
|g ch. 62
|t ellipse and hyperbola --
|g ch. 63
|t Graphical functions --
|g ch. 64
|t General complex number formulae --
|g ch. 65
|t Cartesian form of a complex number --
|g ch. 66
|t Polar form of a complex number --
|g ch. 67
|t Applications of complex numbers --
|g ch. 68
|t De Moivre's theorem --
|g ch. 69
|t Exponential form of a complex number --
|g ch. 70
|t Scalars and vectors --
|g ch. 71
|t Vector addition --
|g ch. 72
|t Resolution of vectors --
|g ch. 73
|t Vector subtraction --
|g ch. 74
|t Relative velocity --
|g ch. 75
|t i, j, k notation --
|g ch. 76
|t Combination of two periodic functions --
|g ch. 77
|t scalar product of two vectors --
|g ch. 78
|t Vector products --
|g ch. 79
|t Addition, subtraction and multiplication of matrices --
|g ch. 80
|t determinant and inverse of a 2 by 2 matrix --
|g ch. 81
|t determinant of a 3 by 3 matrix --
|g ch. 82
|t inverse of a 3 by 3 matrix --
|g ch. 83
|t Solution of simultaneous equations by matrices --
|g ch. 84
|t Solution of simultaneous equations by determinants --
|g ch. 85
|t Solution of simultaneous equations using Cramer's rule --
|g ch. 86
|t Solution of simultaneous equations using Gaussian elimination --
|g ch. 87
|t Eigenvalues and eigenvectors --
|g ch. 88
|t Boolean algebra and switching circuits --
|g ch. 89
|t Simplifying Boolean expressions --
|g ch. 90
|t Laws and rules of Boolean algebra --
|g ch. 91
|t De Morgan's laws --
|g ch. 92
|t Karnaugh maps --
|g ch. 93
|t Logic circuits and gates --
|g ch. 94
|t Universal logic gates --
|g ch. 95
|t Common standard derivatives --
|g ch. 96
|t Products and quotients --
|g ch. 97
|t Function of a function --
|g ch. 98
|t Successive differentiation --
|g ch. 99
|t Differentiation of hyperbolic functions --
|g ch. 100
|t Rates of change using differentiation --
|g ch. 101
|t Velocity and acceleration --
|g ch. 102
|t Turning points --
|g ch. 103
|t Tangents and normals --
|g ch. 104
|t Small changes using differentiation --
|g ch. 105
|t Parametric equations --
|g ch. 106
|t Differentiating implicit functions --
|g ch. 107
|t Differentiation of logarithmic functions --
|g ch. 108
|t Differentiation of inverse trigonometric functions --
|g ch. 109
|t Differentiation of inverse hyperbolic functions --
|g ch. 110
|t Partial differentiation --
|g ch. 111
|t Total differential --
|g ch. 112
|t Rates of change using partial differentiation --
|g ch. 113
|t Small changes using partial differentiation --
|g ch. 114
|t Maxima, minima and saddle points of functions of two variables --
|g ch. 115
|t Standard integrals --
|g ch. 116
|t Non-standard integrals --
|g ch. 117
|t Integration using algebraic substitutions --
|g ch. 118
|t Integration using trigonometric and hyperbolic substitutions --
|g ch. 119
|t Integration using partial fractions --
|g ch. 120
|t t = tan -2- substitution --
|g ch. 121
|t Integration by parts --
|g ch. 122
|t Reduction formulae --
|g ch. 123
|t Double and triple integrals --
|g ch. 124
|t Numerical integration --
|g ch. 125
|t Area under and between curves --
|g ch. 126
|t Mean or average values --
|g ch. 127
|t Root mean square values --
|g ch. 128
|t Volumes of solids of revolution --
|g ch. 129
|t Centroids --
|g ch. 130
|t Theorem of Pappus --
|g ch. 131
|t Second moments of area --
|g ch. 132
|t solution of equations of the form dy/dx = f(x) --
|g ch. 133
|t solution of equations of the form dy/dx = f(y) --
|g ch. 134
|t solution of equations of the form dy/dx = f(x).f(y) --
|g ch. 135
|t Homogeneous first order differential equations --
|g ch. 136
|t Linear first order differential equations --
|g ch. 137
|t Numerical methods for first order differential equations (1)- Euler's method --
|g ch. 138
|t Numerical methods for first order differential equations (2) - Euler-Cauchy method --
|g ch. 139
|t Numerical methods for first order differential equations (3) - Runge-Kutta method --
|g ch. 140
|t Second order differential equations of the form a d2y/dx2 + b dy/dx + cy = 0 --
|g ch. 141
|t Second order differential equations of the form a d2y/dx2 + b dy/dx + cy = f(x) --
|g ch. 142
|t Power series methods of solving ordinary differential equations (1)- Leibniz theorem --
|g ch. 143
|t Power series methods of solving ordinary differential equations (2) - Leibniz-Maclaurin method --
|g ch. 144
|t Power series methods of solving ordinary differential equations (3) - Frobenius method --
|g ch. 145
|t Power series methods of solving ordinary differential equations (4) - Bessel's equation --
|g ch. 146
|t Power series methods of solving ordinary differential equations (5) - Legendre's equation and Legendre's polynomials --
|g ch. 147
|t Power series methods of solving ordinary differential equations (6) - Rodrigue's formula --
|g ch. 148
|t Solution of partial differential equations (1) - by direct integration --
|g ch. 149
|t Solution of partial differential equations (2) - the wave equation --
|g ch. 150
|t Solution of partial differential equations (3) - the heat conduction equation --
|g ch. 151
|t Solution of partial differential equations (4)- Laplace's equation --
|g ch. 152
|t Standard Laplace transforms --
|g ch. 153
|t initial and final value theorems --
|g ch. 154
|t Inverse Laplace transforms --
|g ch. 155
|t Poles and zeros --
|g ch. 156
|t Laplace transform of the Heaviside function --
|g ch. 157
|t Solving differential equations using Laplace transforms --
|g ch. 158
|t Solving simultaneous differential equations using Laplace transforms --
|g ch. 159
|t Sequences --
|g ch. 160
|t Properties of z-transforms --
|g ch. 161
|t Inverse z-transforms --
|g ch. 162
|t Using z-transforms to solve difference equations --
|g ch. 163
|t Fourier series for periodic functions of period 2π --
|g ch. 164
|t Fourier series for a non-periodic function over period 2π --
|g ch. 165
|t Even and odd functions --
|g ch. 166
|t Half range Fourier series --
|g ch. 167
|t Expansion of a periodic function of period L --
|g ch. 168
|t Half-range Fourier series for functions defined over range L --
|g ch. 169
|t complex or exponential form of a Fourier series --
|g ch. 170
|t numerical method of harmonic analysis --
|g ch. 171
|t Complex waveform considerations --
|g ch. 172
|t Presentation of ungrouped data --
|g ch. 173
|t Presentation of grouped data --
|g ch. 174
|t Measures of central tendency --
|g ch. 175
|t Quartiles, deciles and percentiles --
|g ch. 176
|t Probability --
|g ch. 177
|t Permutations and combinations --
|g ch. 178
|t Bayes' theorem --
|g ch. 179
|t binomial distribution --
|g ch. 180
|t Poisson distribution --
|g ch. 181
|t normal distribution --
|g ch. 182
|t Linear correlation --
|g ch. 183
|t Linear regression --
|g ch. 184
|t Sampling and estimation theories --
|g ch. 185
|t Chi-square values --
|g ch. 186
|t sign test --
|g ch. 187
|t Wilcoxon signed-rank test --
|g ch. 188
|t Mann-Whitney test.
|
| 533 |
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|a Electronic reproduction.
|b Ann Arbor, MI
|n Available via World Wide Web.
|
| 545 |
0 |
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|a John Bird is the former Head of Applied Electronics in the Faculty of Technology at Highbury College, Portsmouth, UK. More recently, he has combined freelance lecturing at the University of Portsmouth, with examiner responsibilities for Advanced Mathematics with City and Guilds and examining for International Baccalaureate. He has over 45 years' experience of successfully teaching, lecturing, instructing, training, educating and planning trainee engineers study programmes. He is the author of 140 textbooks on engineering, science and mathematical subjects, with worldwide sales of over one million copies. He is a chartered engineer, a chartered mathematician, a chartered scientist and a Fellow of three professional institutions. He is currently lecturing at the Defence College of Marine Engineering in the Defence College of Technical Training at H.M.S. Sultan, Gosport, Hampshire, UK, one of the largest technical training establishments in Europe.
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|a Description based on online resource; title from digital title page (viewed on November 26, 2019).
|
| 650 |
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0 |
|a Engineering mathematics
|v Handbooks, manuals, etc.
|0 http://id.loc.gov/authorities/subjects/sh2008119498
|
| 650 |
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0 |
|a Science
|x Mathematics
|v Handbooks, manuals, etc.
|
| 650 |
|
7 |
|a Engineering mathematics.
|2 fast
|0 (OCoLC)fst00910601
|0 http://id.worldcat.org/fast/910601
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| 650 |
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|a Science
|x Mathematics.
|2 fast
|0 (OCoLC)fst01108310
|0 http://id.worldcat.org/fast/1108310
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| 650 |
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|a Science.
|2 fast
|0 (OCoLC)fst01108176
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|a Handbooks and manuals.
|2 fast
|0 (OCoLC)fst01423877
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