Question

hcf of 27727 and 53124 by euclid division

Answer 1

The HCF of 27727 and 53124 is 1.

Euclid's division:

It is the "process of division" of two "non-negative integers" in which the remainder and the quotient is less than the divisor provided, it is known that the obtained remainder and quotient are unique and they are existable too.

Highest common factor of the provided numbers is the "greatest number" which "divides" each of them exactly. This HCF can be extended as polynomials and other "commutative rings" in the HCF.

Hence, the HCF of 27727 and 53124 is 1.