Match the lists together: Icm(a,b) = ab .A congruence .B dja and db. .C alb a=bn .D Division Algorithm Euclidean Algorithm .E gcd(a,b) a=qb+r .F gcd(a,b) = 1 b= an .G a- qb+r - gcd(a,b) = gcd(b,r) Fundamental Theorem of Arithmetic .H n>1is ether a prime or a product of primes Euclid's lemma ax b(mod n) prime ax + by .K linear congruence

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Match the lists together: Icm(a,b) = ab .A congruence .B dla and d|b. .c alb a=bn .D Division Algorithm Euclidean Algorithm .E gcd(a,b) a=qb+r .F gcd(a,b) = 1 b= an .G a= qb+r - gcd(a,b) gcd(b,r) Fundamental Theorem of Arithmetic .H n>1 is ether a prime or a product of primes Euclid's lemma ax = b(mod n) prime ax + by .K linear congruence .L