For this case we have to:
x: Let the variable representing the pounds of herbal tea
y: Let the variable representing the pounds of the mixture
According to the data we have:
[tex]x + 8 = y[/tex]
On the other hand, to find the cost of each type of tea it is necessary to multiply the cost per pound, by the amount of pounds of each type of tea, that is:
[tex]12x + 9 (8) = 10.50y\\12x + 72 = 10.50y[/tex]
Thus, we have the following system of equations:
[tex]x + 8 = y\\12x + 72 = 10.50y[/tex]
Substituting the first equation in the second we have:
[tex]12x + 72 = 10.50 (x + 8)[/tex]
ANswer:
The situation can be modeled by the following equation:
[tex]12x + 72 = 10.50 (x + 8)[/tex]
Answer:
[tex]12x+72=10.50(x+8)[/tex]
Step-by-step explanation:
Cost of 1 pound of herbal tea = $12
Cost of x pounds of herbal tea = 12x
Cost of 1 pound of regular tea = $9
Cost of 8 pounds of regular tea = [tex]9\times 8 = 72[/tex]
Now we are given that He makes a mixture that averages $10.50 per pound.
Total weight of mixture = 8 punds + x pounds = x+ 8
So, [tex]12x+72=10.50(x+8)[/tex]
Hence an equation to model the situation is [tex]12x+72=10.50(x+8)[/tex]
