MAS/320
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Number Theory
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Coursework regulation:
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To be admitted to the final exam, you must submit all courseworks.
Requests for exemptions must be supported by a statement
from your advisor.
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Each coursework must be submitted in the course's box
and it must display the student's number and name.
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The coursework marks will be posted on this site,
the marked scripts will be returned in class.
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Model solutions -when given- will be given only in class.
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Any query must be submitted in writing to the lecturer, along with
the script, within one week of the marked script being returned.
Final examination:
- Duration:
- 3 hrs.
- Rubric:
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You should attempt all questions.
Marks awarded are shown next to the questions.
Calculators are permitted, but any programming,
plotting or algebraic facility may not be used.
- Grade boundaries:
- Standard QMW Maths.
Key objectives:
To pass the exam, you must be able to explain
and exemplify all concepts listed below,
and be fluent at computations.
- SIMPLE CONTINUED FRACTIONS:
expansion into SCF; convergents; accuracy of approximation.
- QUADRATIC IRRATIONALS:
reduced quadratic irrationals and their SCFs;
compute SCF given a quadratic irrational, and vice-versa;
Legendre's algorithm for sum of squares; solve x^2-Dy^2=N.
- QUADRATIC FORMS
discriminant; (in)definite forms; reduced forms;
unimodular transformations; equivalent forms; class number;
decide whether two forms are equivalent; compute all reduced
forms of a given discriminant; compute the class number.
- MODULAR ARITHMETIC
Euler's phi-function; additive and multiplicative orders;
primitive roots; quadratic residues; Legendre's symbol;
quadratic reciprocity.
