Question

proof of fundamental theorem of arithmetic

Answer 1

the fundamental theoram says that every integr greater than 1can be factored uniquily into a product of primes . the least common multiple (a,b) of non zero integers a and b is smallest positive integer divisible by both a and b.

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Answer 2

Answer:

Step-by-step explanation:

FUNDAMENTAL THEOREM OF ARITHMETIC :  

According to the fundamental theorem of arithmetic every composite number can be written or  factorized as the product of primes and this factorization is unique, apart from the order in which the prime factors occur.  

Fundamental theorem of arithmetic , is also called, UNIQUE FACTORIZATION THEOREM.

Composite number =  product of prime numbers

Or  

Any integer greater than one, either be a prime number or can be written as a product of prime factors.

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