Divisibilityhard
0:00.0

A variation of the Division Algorithm states that for any integers aa and bb with b0b \neq 0, there exist unique integers qq and rr such that a=qb+ra = qb + r and b2<rb2-\frac{|b|}{2} < r \le \frac{|b|}{2}. If we apply this variation to a=5000a = -5000 and b=83b = 83, what is the value of the quotient qq?