Problem of the Week

Updated at Jan 6, 2025 12:01 PM

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Jan 6, 2025

For this week we've brought you this equation problem.

How would you solve the equation \(4(\frac{w}{5}+2)-4=\frac{24}{5}\)?

Here are the steps:

\[4(\frac{w}{5}+2)-4=\frac{24}{5}\]

Add \(4\) to both sides.

\[4(\frac{w}{5}+2)=\frac{24}{5}+4\]

Simplify \(\frac{24}{5}+4\) to \(\frac{44}{5}\).

\[4(\frac{w}{5}+2)=\frac{44}{5}\]

Divide both sides by \(4\).

\[\frac{w}{5}+2=\frac{\frac{44}{5}}{4}\]

Simplify \(\frac{\frac{44}{5}}{4}\) to \(\frac{44}{5\times 4}\).

\[\frac{w}{5}+2=\frac{44}{5\times 4}\]

Simplify \(5\times 4\) to \(20\).

\[\frac{w}{5}+2=\frac{44}{20}\]

Simplify \(\frac{44}{20}\) to \(\frac{11}{5}\).

\[\frac{w}{5}+2=\frac{11}{5}\]

Subtract \(2\) from both sides.

\[\frac{w}{5}=\frac{11}{5}-2\]

Simplify \(\frac{11}{5}-2\) to \(\frac{1}{5}\).

\[\frac{w}{5}=\frac{1}{5}\]

Multiply both sides by \(5\).

\[w=\frac{1}{5}\times 5\]

Cancel \(5\).

\[w=1\]

Done