Problem of the Week

Updated at Jan 26, 2026 5:29 PM

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Jan 26, 2026

To get more practice in equation, we brought you this problem of the week:

How would you solve \(\frac{v+2}{3}-\frac{5}{4v}=\frac{25}{12}\)?

Check out the solution below!

\[\frac{v+2}{3}-\frac{5}{4v}=\frac{25}{12}\]

Multiply both sides by the Least Common Denominator: \(12v\).

\[4v(v+2)-15=25v\]

Simplify.

\[4{v}^{2}+8v-15=25v\]

Move all terms to one side.

\[4{v}^{2}+8v-15-25v=0\]

Simplify \(4{v}^{2}+8v-15-25v\) to \(4{v}^{2}-17v-15\).

\[4{v}^{2}-17v-15=0\]

Split the second term in \(4{v}^{2}-17v-15\) into two terms.

\[4{v}^{2}+3v-20v-15=0\]

Factor out common terms in the first two terms, then in the last two terms.

\[v(4v+3)-5(4v+3)=0\]

Factor out the common term \(4v+3\).

\[(4v+3)(v-5)=0\]

Solve for \(v\).

\[v=-\frac{3}{4},5\]

Done

Decimal Form: -0.75, 5