Use this rule: \(\frac{a}{b} \times \frac{c}{d}=\frac{ac}{bd}\).
\[1212=\frac{1\times 22x\times 2\times 24}{3\times 7}\]
Simplify \(1\times 22x\times 2\times 24\) to \(1056x\).
\[1212=\frac{1056x}{3\times 7}\]
Simplify \(3\times 7\) to \(21\).
\[1212=\frac{1056x}{21}\]
Simplify \(\frac{1056x}{21}\) to \(\frac{352x}{7}\).
\[1212=\frac{352x}{7}\]
Multiply both sides by \(7\).
\[1212\times 7=352x\]
Simplify \(1212\times 7\) to \(8484\).
\[8484=352x\]
Divide both sides by \(352\).
\[\frac{8484}{352}=x\]
Simplify \(\frac{8484}{352}\) to \(\frac{2121}{88}\).
\[\frac{2121}{88}=x\]
Switch sides.
\[x=\frac{2121}{88}\]
Decimal Form: 24.102273
x=2121/88
