Problem of the Week

Updated at Nov 18, 2024 12:25 PM

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Nov 18, 2024

This week's problem comes from the equation category.

How would you solve the equation \({(4-2(3-t))}^{2}=36\)?

Let's begin!

\[{(4-2(3-t))}^{2}=36\]

Factor out the common term \(2\).

\[{(2(2-3+t))}^{2}=36\]

Simplify \(2-3+t\) to \(t-1\).

\[{(2(t-1))}^{2}=36\]

Use Multiplication Distributive Property: \({(xy)}^{a}={x}^{a}{y}^{a}\).

\[{2}^{2}{(t-1)}^{2}=36\]

Simplify \({2}^{2}\) to \(4\).

\[4{(t-1)}^{2}=36\]

Divide both sides by \(4\).

\[{(t-1)}^{2}=\frac{36}{4}\]

Simplify \(\frac{36}{4}\) to \(9\).

\[{(t-1)}^{2}=9\]

Take the square root of both sides.

\[t-1=\pm \sqrt{9}\]

Since \(3\times 3=9\), the square root of \(9\) is \(3\).

\[t-1=\pm 3\]

Break down the problem into these 2 equations.

\[t-1=3\]

\[t-1=-3\]

Solve the 1st equation: \(t-1=3\).

\[t=4\]

Solve the 2nd equation: \(t-1=-3\).

\[t=-2\]

Collect all solutions.

\[t=4,-2\]

Done