. In Euclids Division Lemma when
a = bq + r where a,b are positive integers then what values r can take?
According to Euclid's division lemma, for any two positive integers a and b, there exist two
unique whole numbers q and r such that a = bq + r, where 0< r < b.
Dividend a, Divisor = b, Quotient =q, and Remainder =r.
As a result, the values 'r' can be 0< r < b.
Hence, according to Euclid's division lemma, the values 'r' can take 0< r < b.