State ecludis division lemma
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According to Euclid’s Division Lemma
if we have two positive integers a and b, then there exists unique integers q and r which satisfies the condition a = bq + r
where 0 ≤ r ≤ b .
Eg
If we have two integers a=27 and b=4
Then 27= 4×6 + 3,
Where q= 6 and r= 3(less than b=4) are also integers.
if we have two positive integers a and b, then there exists unique integers q and r which satisfies the condition a = bq + r
where 0 ≤ r ≤ b .
Eg
If we have two integers a=27 and b=4
Then 27= 4×6 + 3,
Where q= 6 and r= 3(less than b=4) are also integers.
Answered by
1
given positive integint"a"and "b" there exists unique integer "q"and "r" to satisfy a=bq+r
it's a Euclid division lemma....
short and sweet
it's a Euclid division lemma....
short and sweet
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