5,875 % 67
You asked:
Evaluate the expression: \(5,875 \:\%\: 67\)
MathBot Answer:
\[5,875 \:\%\: 67 = 46\]
\[\begin{aligned}5,875 \:\%\: 67& = 5875 \:\%\: 67\\& = 46\end{aligned}\]
The notation \(m \% n\) denotes the remainder of the integer \(m\) divided by the integer \(n\). \(m \% n = r\) means that given integers \(m\) and \(n\), where \(n\) is non-zero, there exist integers \(q\) and \(r\), where \(\lvert r \rvert < \lvert n \rvert\), such that \(m = q n + r\). MathBot adopts the convention that the remainder \(r\) and the divisor \(n\) share the same sign. Alternate notations for \(m \% n\) are \(\operatorname{mod}(m, n)\) and \(m \bmod n\).