Simplify \(1\times (2x+3)\) to \((2x+3)\).
\[l\imath mx->2x+3\]
Regroup terms.
\[-+l\imath mx>2x+3\]
Divide both sides by \(\imath \).
\[-+lmx>\frac{2x+3}{\imath }\]
Rationalize the denominator: \(\frac{2x+3}{\imath } \cdot \frac{\imath }{\imath }=-(2x+3)\imath \).
\[-+lmx>-(2x+3)\imath \]
Regroup terms.
\[-+lmx>-\imath (2x+3)\]
Divide both sides by \(m\).
\[-+lx>-\frac{\imath (2x+3)}{m}\]
Divide both sides by \(x\).
\[-+l>-\frac{\frac{\imath (2x+3)}{m}}{x}\]
Simplify \(\frac{\frac{\imath (2x+3)}{m}}{x}\) to \(\frac{\imath (2x+3)}{mx}\).
\[-+l>-\frac{\imath (2x+3)}{mx}\]
Multiply both sides by \(-1\).
\[l<\frac{\imath (2x+3)}{mx}\]
l<(IM*(2*x+3))/(m*x)
