Simplify \({247}^{2}\) to \(61009\).
\[\frac{61009}{{225}^{2}}\times \frac{3}{-}\]
Simplify \({225}^{2}\) to \(50625\).
\[\frac{61009}{50625}\times \frac{3}{-}\]
Use this rule: \(\frac{a}{b} \times \frac{c}{d}=\frac{ac}{bd}\).
\[\frac{61009\times 3}{50625\times -}\]
Simplify \(61009\times 3\) to \(183027\).
\[\frac{183027}{50625\times -}\]
Simplify negative sign.
\[\frac{183027}{-50625}\]
Move the negative sign to the left.
\[-\frac{183027}{50625}\]
-183027/(50625*)
