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Congruence -- from Wolfram MathWorld
If two numbers b and c have the property that their difference b-c is integrally divisible by a number m (i.e., (b-c)/m is an integer), then b and c are said to be "congruent modulo m." The number m is called the modulus, and the statement "b is congruent to c (modulo m)" is written mathematically as b=c (mod m). (1) If b-c is not integrally divisible by m, then it is said that "b is not congruent to c (modulo m)," which is written b≢c (mod m). (2) ...
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Congruence -- from Wolfram MathWorld
If two numbers b and c have the property that their difference b-c is integrally divisible by a number m (i.e., (b-c)/m is an integer), then b and c are said to be "congruent modulo m." The number m is called the modulus, and the statement "b is congruent to c (modulo m)" is written mathematically as b=c (mod m). (1) If b-c is not integrally divisible by m, then it is said that "b is not congruent to c (modulo m)," which is written b≢c (mod m). (2) ...
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Congruence -- from Wolfram MathWorld
If two numbers b and c have the property that their difference b-c is integrally divisible by a number m (i.e., (b-c)/m is an integer), then b and c are said to be "congruent modulo m." The number m is called the modulus, and the statement "b is congruent to c (modulo m)" is written mathematically as b=c (mod m). (1) If b-c is not integrally divisible by m, then it is said that "b is not congruent to c (modulo m)," which is written b≢c (mod m). (2) ...
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24- titleCongruence -- from Wolfram MathWorld
- DC.TitleCongruence
- DC.CreatorWeisstein, Eric W.
- DC.DescriptionIf two numbers b and c have the property that their difference b-c is integrally divisible by a number m (i.e., (b-c)/m is an integer), then b and c are said to be "congruent modulo m." The number m is called the modulus, and the statement "b is congruent to c (modulo m)" is written mathematically as b=c (mod m). (1) If b-c is not integrally divisible by m, then it is said that "b is not congruent to c (modulo m)," which is written b≢c (mod m). (2) ...
- descriptionIf two numbers b and c have the property that their difference b-c is integrally divisible by a number m (i.e., (b-c)/m is an integer), then b and c are said to be "congruent modulo m." The number m is called the modulus, and the statement "b is congruent to c (modulo m)" is written mathematically as b=c (mod m). (1) If b-c is not integrally divisible by m, then it is said that "b is not congruent to c (modulo m)," which is written b≢c (mod m). (2) ...
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