Complex numbers

Celia, C W; Nice, A T F; Elliott, K F

doi:10.1007/978-1-349-06711-4_2

C W Celia⁷,
A T F Nice^8,9 &
K F Elliott¹⁰

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Abstract

Let n be an integer, i.e. let n ∈ ℤ. Then de Moivre’s theorem states that

$${(\cos \,\theta + i\sin \theta )^n} = \cos \,n\theta + i\sin \,n\theta .$$

Case 1 Let n be positive. The result is clearly true when n = 1.

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Authors and Affiliations

City of London Polytechnic, UK
C W Celia (formerly Principal Lecturer in Mathematics)
Mathematics Department, Lady Eleanor Holles School, Hampton, UK
A T F Nice (formerly Principal Lecturer in Mathematics)
Middlesex Polytechnic, UK
A T F Nice (formerly Principal Lecturer in Mathematics)
Division of Mathematics Education, Derby Lonsdale College of Higher Education, UK
K F Elliott (formerly Head)

Authors

C W Celia
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A T F Nice
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K F Elliott
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Editors and Affiliations

University of London School Examinations Board, UK
C. Plumpton (Moderator in Mathematics, formerly Reader in Engineering Mathematics) (Moderator in Mathematics, formerly Reader in Engineering Mathematics)
Queen Mary College, London, UK
C. Plumpton (Moderator in Mathematics, formerly Reader in Engineering Mathematics) (Moderator in Mathematics, formerly Reader in Engineering Mathematics)

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Celia, C.W., Nice, A.T.F., Elliott, K.F. (1985). Complex numbers. In: Plumpton, C. (eds) Advanced Mathematics 3. Palgrave, London. https://doi.org/10.1007/978-1-349-06711-4_2

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DOI: https://doi.org/10.1007/978-1-349-06711-4_2
Publisher Name: Palgrave, London
Print ISBN: 978-0-333-34827-7
Online ISBN: 978-1-349-06711-4
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