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A washer and a dryer cost $587 combined. The washer costs $63 less than the dryer. What is the cost of the dryer?

User Lbrandao
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1 Answer

17 votes
17 votes

Answer:

The dryer costs $325.

Explanation:

Let w represent the cost of the washer and d represent the cost of the dryer.

They cost $587 combined. In other words:


w+d=587

The washer costs $63 less than the dryer. Therefore:


w=d-63

Thus, we have the system of equations:


\displaystyle \begin{cases} w+d = 587 \\ w=d-63\end{cases}

We can solve it using substitution. Substitute the second equation into the first. Hence:


(d-63)+d=587

Combine like terms:


2d-63=587

Add 63 to both sides:


2d=650

And divide both sides by two. Hence:


d=325

The dryer costs $325.

Further Notes:

And since the washer is $63 less, the washer costs:


w=(325)-63=262

The washer costs $262.

User BalajiK
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