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141003s1983 enk of 000 0 eng d |
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|a 898771670
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|a 9781483106137
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|a 1483106136
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|z 0408709588
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|z 9780408709583
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|a (OCoLC)892067412
|z (OCoLC)898771670
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|a QA37
|b .B864 1983eb
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|a Bunday, Brian D.
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|a Pure mathematics for advanced level /
|c B.D. Bunday, H. Mulholland.
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|a Second edition.
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|a London :
|b Butterworths,
|c 1983.
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300 |
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|a 1 online resource (xiii, 511 pages)
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|a text
|b txt
|2 rdacontent
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|a computer
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|2 rdamedia
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|a online resource
|b cr
|2 rdacarrier
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|a With answers.
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|a Print version record.
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|6 880-01
|a Front Cover; Pure Mathematics for Advanced Level; Copyright Page; Preface to the second edition; Preface to the first edition; Table of Contents; Chapter 1 Operations with real numbers; 1.1 The real numbers; 1.2 Equations; 1.3 Elimination; 1.4 Inequalities; 1.5 The remainder and factor theorems; 1.6 Partial fractions; 1.7 Indices; 1.8 Logarithms; 1.9 Equations in which the unknown is an index; Chapter 2. Finite sequences and series; 2.1 Sequences and series; 2.2 The arithmetic sequence and series; 2.3 The finite geometric sequence and series; 2.4 The infinite geometric series.
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|a Chapter 3. The binomial theorem3.1 The binomial theorem for a positive integral index; 3.2 Proof of the binomial theorem when n is a positive integer; 3.3 The binomial theorem when n is not a positive integer; 3.4 Mathematical induction; Chapter 4. Complex numbers; 4.1 Introduction; 4.2 The rules for the manipulation of complex numbers; 4.3 The geometrical representation of complex numbers; 4.4 The geometry of complex numbers; 4.5 The cube roots of unity; Chapter 5. The quadratic function and the quadratic equation; 5.1 The general quadratic equation; 5.2 The quadratic function.
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|6 880-02
|a Chapter 10. Some techniques of differentiation10.1 Introduction; 10.2 Differentiation of a constant; 10.3 Differentiation of the sum or difference of functions; 10.4 Differentiation of a product; 10.5 Differentiation of a quotient; 10.6 Differentiation of the trigonometric functions; 10.7 Second and higher derivatives; 10.8 Differentiation of a function of a function; 10.9 The derivative of xn, where n is negative or a fraction; 10.10 Differentiation of inverse functions; 10.11 Differentiation of implicit functions; 10.12 Differentiation from parametric equations; 10.13 List of standard forms.
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|a Pure Mathematics for Advanced Level.
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650 |
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|a Mathematics
|v Handbooks, manuals, etc.
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650 |
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|a Math�ematiques
|0 (CaQQLa)201-0068291
|v Guides, manuels, etc.
|0 (CaQQLa)201-0377046
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650 |
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|a MATHEMATICS
|x Essays.
|2 bisacsh
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650 |
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|a MATHEMATICS
|x Pre-Calculus.
|2 bisacsh
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650 |
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|a MATHEMATICS
|x Reference.
|2 bisacsh
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650 |
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|a Mathematics
|2 fast
|0 (OCoLC)fst01012163
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655 |
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|a Handbook
|0 (DNLM)D020479
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|a handbooks.
|2 aat
|0 (CStmoGRI)aatgf300311807
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|a Handbooks and manuals
|2 fast
|0 (OCoLC)fst01423877
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|a Handbooks and manuals.
|2 lcgft
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|a Guides et manuels.
|2 rvmgf
|0 (CaQQLa)RVMGF-000001065
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700 |
1 |
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|a Mulholland, H.
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776 |
0 |
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|i Print version:
|a Bunday, Brian D.
|t Pure mathematics for advanced level.
|b Second edition
|z 0408709588
|w (OCoLC)10755776
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856 |
4 |
0 |
|u https://sciencedirect.uam.elogim.com/science/book/9780408709583
|z Texto completo
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|6 505-01/(S
|a 5.3 The relation between the roots of a quadratic equation and the coefficientsChapter 6. Properties of the trigonometric functions; 6.1 The measurement of angle; 6.2 The trigonometric ratios for an acute angle; 6.3 The trigonometric ratios for any angle; 6.4 The graphs of the trigonometric functions; 6.5 The addition formulae; 6.6 Multiple and submultiple angle formulae; 6.7 The factor formulae; 6.8 The function acosθ + bsinθ; 6.9 The inverse trigonometric functions; 6.10 Small angles; Chapter 7. Trigonometric equations; 7.1 The general expression for angles with a given trigonometric ratio.
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|6 505-02/(S
|a 7.2 Trigonometric equations involving different ratios of the same angle7.3 Trigonometric equations involving multiple angles; 7.4 The equation acosθ τ̔̈ΕΕΕΓ· bsinθ = c; Chapter 8. The solution of triangles; 8.1 The sine formula; 8.2 The cosine formula; 8.3 The area of a triangle; 8.4 Miscellaneous applications; Chapter 9. The fundamental ideas of the differential calculus; 9.1 Functions; 9.2 Graphical representation of a function; 9.3 The rate of change of a function; 9.4 Limits and limit notation; 9.5 The calculation of the derivative for some common functions.
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