3690 mod 12
You asked:
Evaluate \(3690\) modulo \(12\)
MathBot Answer:
\[3690 \bmod 12 = 6\]
Given two numbers \(a\) and \(n\), \(a\) modulo \(n\) (often written \(a \bmod n\)) is the remainder when \(a\) is divided by \(n\).
\(\dfrac{3690}{12} = 307\) with remainder \(6\)
Therefore \(3690 \bmod 12 = 6\)