Answer:
Part A) The vertex is the point (22,100) see the explanation
Part B) The x-intercepts are the points (12,0) and (32,0 see the explanation
Part C) The y-intercept is the point (0,-384) see the explanation
Step-by-step explanation:
Let
x ----> the number of cups of coffee sold
f(x) ---> the amount of profit
we have
[tex]f(x)=-x^{2} +44x-384[/tex]
This is a vertical parabola open downward (the leading coefficient is negative)
The vertex represent a maximum
Part A) Determine the vertex. What does this calculation mean in the context of the problem?
Convert the quadratic equation in vertex form
Factor -1
[tex]f(x)=-(x^{2}-44x)-384[/tex]
Complete the square
[tex]f(x)=-(x^{2}-44x+22^2)-384+22^2[/tex]
[tex]f(x)=-(x^{2}-44x+484)+100[/tex]
Rewrite as perfect squares
[tex]f(x)=-(x-22)^{2}+100[/tex]
The vertex is the point (22,100)
That means ----> The maximum profit of $100 is when the number of cups of coffee sold is 22
Part B) Determine the x-intercepts. What do these values mean in the context of the problem?
we know that
The x-intercepts are the values of x when the value of the function is equal to zero
so
we have
[tex]f(x)=-(x-22)^{2}+100[/tex]
For f(x)=0
[tex]0=-(x-22)^{2}+100[/tex]
solve for x
[tex](x-22)^{2}=100[/tex]
take square root both sides
[tex](x-22)=\pm10[/tex]
[tex]x=22\pm10[/tex]
so
[tex]x=22+10=32[/tex]
[tex]x=22-10=12[/tex]
The x-intercepts are the points (12,0) and (32,0)
That means -----> When the number of cups of coffee sold is 12 or 32 the profit is equal to zero
Part C) Determine the y-intercept. What does this value mean in the context of the problem?
we know that
The y-intercept is the value of the function when the value of x is equal to zero
so
For x=0
[tex]f(x)=-x^{2} +44x-384[/tex]
substitute the value of x
[tex]f(x)=-(0)^{2} +44(0)-384[/tex]
[tex]f(x)=-384[/tex]
The y-intercept is the point (0,-384)
That means ----> When the number of cups of coffee sold is zero the profit is negative -$384 (the cost is greater than the revenue)
