Question

state euclids division lemma and fundamental theoremof arithmetic

Answer 1

Fundamental Theorem of Arithmetic states that every composite number greater than 1 can be expressed or factorised as a unique product of prime numbers except in the order of the prime factors.

Answer 2

Euclid Division lemma statement:- For any two positive integer a and b, there exist a unique whole no. q and r.

Such that a=bq + r where (0≤r<b)

Fundamental theorem of Arithmetic statement:-Every integer greater than one either is prime number or unique.