Solution:
Given:
Let the washer be represented by w.
Let the dryer be represented by d.
Hence,
[tex]\begin{gathered} A\text{ w}asher\text{ and a dryer cost \$}905 \\ This\text{ means;} \\ w+d=905.........................(1) \\ \\ \\ The\text{ washer costs \$55 more than the dryer} \\ w=d+55..........................(2) \end{gathered}[/tex]Substituting the equation (2) into equation (1);
[tex]\begin{gathered} d+55+d=905 \\ 2d+55=905 \\ 2d=905-55 \\ 2d=850 \\ d=\frac{850}{2} \\ d=425 \\ \\ \\ Hence,\text{ } \\ w=d+55 \\ w=425+55 \\ w=480 \end{gathered}[/tex]Hence, the cost of the dryer is $425 and the cost of the washer is $480.
Therefore, the cost of the dryer is $425.
