Q4)For any two positive integers a and b, such that a > b. there exist (unique) whole numbers q and r such that
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Euclid's division Lemma states that 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. Here, a= Dividend, b= Divisor, q= quotient and r = Remainder. Hence, the values 'r' can take 0≤r<b.
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Euclid's division Lemma states that 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. Here, a= Dividend, b= Divisor, q= quotient and r = Remainder. Hence, the values 'r' can take 0≤r<b.
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