Problem of the Week

Updated at Dec 2, 2019 2:53 PM

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This week we have another equation problem:

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

Let's start!

\[\frac{4(z-3)+2}{5}=2\]

1

Factor out the common term \(2\).

\[\frac{2(2(z-3)+1)}{5}=2\]

2

Multiply both sides by \(5\).

\[2(2(z-3)+1)=2\times 5\]

3

Simplify \(2\times 5\) to \(10\).

\[2(2(z-3)+1)=10\]

4

Divide both sides by \(2\).

\[2(z-3)+1=\frac{10}{2}\]

5

Simplify \(\frac{10}{2}\) to \(5\).

\[2(z-3)+1=5\]

6

Subtract \(1\) from both sides.

\[2(z-3)=5-1\]

7

Simplify \(5-1\) to \(4\).

\[2(z-3)=4\]

8

Divide both sides by \(2\).

\[z-3=\frac{4}{2}\]

9

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

\[z-3=2\]

10

Add \(3\) to both sides.

\[z=2+3\]

11

Simplify \(2+3\) to \(5\).

\[z=5\]

Done

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