Difference between revisions of "Modular arithmetic"

Revision as of 18:25, 22 June 2006

Modular arithmetic a special type of arithmetic that involves only integers. If two integers ${a},{b}$ leave the same remainder when they are divided by some positive integer ${m}$ , we say that ${a}$ and $b$ are congruent modulo ${m}$ or $a\equiv b \pmod {m}$ .

Introductory

Useful Facts

Consider four integers ${a},{b},{c},{d}$ and a positive integer ${m}$ such that $a\equiv b\pmod {m}$ and $c\equiv d\pmod {m}$ . In modular arithmetic, the following identities hold:

Addition: $a+c\equiv b+d\pmod {m}$ .
Substraction: $a-c\equiv b-d\pmod {m}$ .
Multiplication: $ac\equiv bd\pmod {m}$ .
Division: $\frac{a}{e}\equiv \frac{b}{e}\pmod {\frac{m}{\gcd(m,e)}}$ , where $e$ is a positive integer that divides ${a}$ and $b$ .
Exponentiation: $a^e\equiv b^e\pmod {m}$ where $e$ is a positive integer.

Examples

${7}\equiv {1} \pmod {2}$

$49^2\equiv 7^4\equiv (1)^4\equiv 1 \pmod {6}$

$7a\equiv 14\pmod {49}\implies a\equiv 2\pmod {7}$

Applications

Modular arithmetic is an extremely useful tool in mathematics competitions. It enables us to easily solve Linear diophantine equations, and it often helps with other Diophantine equations as well.

Revision as of 14:51, 20 June 2006 (view source) MCrawford (talk \| contribs) m (altered useful facts section) ← Older edit		Revision as of 18:25, 22 June 2006 (view source) Solafidefarms (talk \| contribs) (links plurality) Newer edit →
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	=== Applications ===		=== Applications ===

−	Modular arithmetic is an extremely useful tool in mathematics competitions. It enables us to easily solve [[Linear diophantine ~~equations~~]], and it often helps with other [[Diophantine equations]] as well.	+	Modular arithmetic is an extremely useful tool in mathematics competitions. It enables us to easily solve [[Linear diophantine equation]]s, and it often helps with other [[Diophantine equation \| Diophantine equations]] as well.

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Difference between revisions of "Modular arithmetic"

Revision as of 18:25, 22 June 2006

Contents

Introductory

Useful Facts

Examples

Applications

Intermediate

Topics

See also