SOLUTION: Restaurant owner want to purchase 250 sets of dishes. He has two designs, one $20 & $45. I have $6800 to spend. How many of each designs should I order? Please show step by step
Question 316441: Restaurant owner want to purchase 250 sets of dishes. He has two designs, one $20 & $45. I have $6800 to spend. How many of each designs should I order? Please show step by step solutions for x & y. x = $20 y = $45 Thanks Answer by moshiz08(60) (Show Source):
You can put this solution on YOUR website! x=the number of $20 dishes
y=the number of $45 dishes
Since you want to purchase 250 total, . We can rewrite this as . (eq1)
Now suppose you buy 4 of the $20 dishes and 2 of the $45 dishes. The you spend 4*$20 = $80 on the four $20 dishes and 2*$45= $90 on the two $45 dollar dishes.
In general, you multiply. So if you buy x dishes for $20, you spend 20*x dollars on them. Then if you buy y dishes for $45, you spend 45*y on them. The total amount of money you spend is , and since we know that you have $6800, we get . (eq2)
Let us substitute our equation for y given by (eq1) into (eq2).
Distributing the 45 gives
Combining like terms gives
Add 25x to both sides to get
Subtract 6800 from both sides to get
Divide both sides by 25 to get
Thus, from (eq1) we can get . So you should buy 178 of the $20 dish sets and you should buy 72 of the $45 dish sets.
Now let us check. The total number of dish sets you buy is 178 + 72 which is a total of 250 as you requested. The amount of money you pay is a total of 178 * $20 = $ 3560 for the $20 dishes and 72 * $45 = $3240 for the $45 dishes. This means you spend $3560 + $3240 = $6800.
