Now that you know that for every pair of positive integers a and b, there exist a unique pair of whole numbers a and r such that a=bq+r,Give examples of a and b, satisfying r>b :

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Given positive integers a and b, there exist unique integers q and r satisfying a = bq + r where 0≤r<b
Basically, it can be seen as and the remainder can never be more than the divisor, and is a non-negative integer (could be zero).So r>b is not possible.

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Now that you know that for every pair of positive integers a and b, there exist a unique pair of whole numbers a and r such that a=bq+r,Give examples of a and b, satisfying r>b :

Given positive integers a and b, there exist unique integers q and r satisfying a = bq + r where 0≤r<b Basically, it can be seen as and the remainder can never be more than the divisor, and is a non-negative integer (could be zero).So r>b is not possible.

Given positive integers a and b, there exist unique integers q and r satisfying a = bq + r where 0≤r<b
Basically, it can be seen as and the remainder can never be more than the divisor, and is a non-negative integer (could be zero).So r>b is not possible.