Solve for \(m\) in \(m+3=5\).
Solve for \(m\).
\[m+3=5\]
Subtract \(3\) from both sides.
\[m=5-3\]
Simplify \(5-3\) to \(2\).
\[m=2\]
\[m=2\]
Substitute \(m=2\) into \(m=boxed\).
Start with the original equation.
\[m=boxed\]
Let \(m=2\).
\[2=boxed\]
\[2=boxed\]
Solve for \(d\) in \(2=boxed\).
Solve for \(d\).
\[2=boxed\]
Divide both sides by \(boxe\).
\[\frac{2}{boxe}=d\]
Switch sides.
\[d=\frac{2}{boxe}\]
\[d=\frac{2}{boxe}\]
Therefore,
\[\begin{aligned}&d=\frac{2}{boxe}\\&m=2\end{aligned}\]
d=2/boxe;m=2
