Answer:
$ 22.6
Step-by-step explanation:
Given that
Price charged for each box of seeds = x
Profit gained from from selling boxes of seeds = p
The equation of profit is modeled as
P(x) = 0.5x² + 36x - 179
As per given information if the fundraisers make a profit of $379 then find the minimum price charged for each box of seed.
Now our above equation becomes
379 = -0.5x² + 36x - 179
Simplifying
379+179 = -0.5x² + 36x
558 = -0.5x² + 36x
0.5x² - 36x + 558 =0
multipying both sides of equation by 2
2(0.5x² - 36x + 558) = 2x0
x² - 72x +1116 = 0
Using quadratic formula we get the following factors
x= 49.4 or x= 22.60
As we can the smalles value is 22.6
So, they can charge 22.6 dollar for each bag of seeds in order to get profit of 379 dollars.
Answer:
Step-by-step explanation:
The given equation is:
[tex]p=-0.5x^{2}+36x-179[/tex]
Where x is the amount the class charges.
So, the problem is asking the smallest amount that can be charged if the profit is $379. Replacing this data, the expression would be:
[tex]-0.5x^{2}+36x-179\geq 379[/tex]
"at least" means "equal or more than".
Now, we have to solve this quadratic inequality, which we can do by just graphing, because the solution of inequalities are intervals, which are specific regions.
As you can see in the image attached, the smallest amount is
[tex]x=-6\sqrt{5}+36=22.58[/tex]
Therefore, we need to charge $22.58 to have $379 profit.
