Answer:
method I = 88 chairs
method II = 62 chairs
Explanation:
This problem can be modeled by a system of two linear equations.
Define x as the number of chairs refinished by method I and y by method II
The sum of hours spent on both methods should equal 199 and the sum of total material cost should equal $1226, therefore:
[tex]0.5x + 2.5y = 199[/tex]
[tex]9x+7y = 1226[/tex]
Multiplying the first equation by -18 and adding it to the second equation we can solve for the value of y:
[tex]9x+7y +(-9x - 45)= 1226+(-3582)\\y=\frac{2356}{38} = 62\\[/tex]
We can now apply the value of y found to the first equation and solve for x:
[tex]0.5x+2.5*62 = 199\\x=\frac{199 - (2.5*62)}{0.5} = 88[/tex]
Therefore, they should refinish 88 chairs with method I and 62 chairs with method II
