Cost of Washer and Dryer
What are the costs of the washer and the dryer?
Given that the washer and dryer cost $980 combined, and the washer costs $80 more than the dryer.
Answer:
The cost of the washer is $530 and the cost of the dryer is $450.
Let's represent the cost of the dryer as 'x'. Since the washer costs $80 more than the dryer, we can represent the cost of the washer as 'x + 80'.
According to the problem, the combined cost of the washer and the dryer is $980. So, we can set up the equation: x + (x + 80) = 980.
Simplifying this equation, we get 2x + 80 = 980. By subtracting 80 from both sides and then dividing by 2, we find that x = 450.
Therefore, the cost of the dryer is $450. To find the cost of the washer, we substitute x = 450 into the equation x + 80, which gives us $530 for the cost of the washer. Thus, the cost of the washer is $530 and the cost of the dryer is $450.