Asked by Aria
This is a concept check on quadratic equation application. I am having trouble with a couple of parts. If anyone can help I would appreciate it.
Suppose you are an event coordinator for a large performance theater. You need to supply information about projected ticket sales to the manager. You provide a quadratic equation that models expected number of sales for each day 'x'. (x=1 is the day tickets go on sale."
Tickets=-2x^2+12x+11
I answered a.
B. Describe what happens to the ticket sales as time passes.
I am not sure how to determine this. Do I determine this by the vertex or line of symmetry?
I answered C.
D.Will tickets peak or be at a low during the middle of the sale? How do you know?
Again, this question stumps me. How do you tell something like this with a parabola?
I would appreciate a detailed explanation. I don't want answers as much as how to determine the information.
Thanks for helping.
Suppose you are an event coordinator for a large performance theater. You need to supply information about projected ticket sales to the manager. You provide a quadratic equation that models expected number of sales for each day 'x'. (x=1 is the day tickets go on sale."
Tickets=-2x^2+12x+11
I answered a.
B. Describe what happens to the ticket sales as time passes.
I am not sure how to determine this. Do I determine this by the vertex or line of symmetry?
I answered C.
D.Will tickets peak or be at a low during the middle of the sale? How do you know?
Again, this question stumps me. How do you tell something like this with a parabola?
I would appreciate a detailed explanation. I don't want answers as much as how to determine the information.
Thanks for helping.
Answers
Answered by
Reiny
B. The direction of the parabola, which is downwards because of the -2x^2 term, will tell you that the ticket sales will decrease as x increases.
e.g. if x = 2 , Sales = -8 + 24 + 11 = 27
if x = 3, sales = -18 + 36 + 11 = 29
if x = 4, sales = -32 + 48 + 11 = 27
if x = 5 , sales = -50 + 60+11 = 21 , notice the sales are decreasing
it also looks like the vertex is at (3,29)
( Assume you know how to find the vertex)
so as x gets bigger (time passes), the first term becomes more negative at a faster rate than the two positive terms, so the sum (the ticket sales) gets smaller, until it becomes meaningless when ticket sales is a negative number.
(e.g. x = 10, sales = -200 + 120 + 11 = -69 )
I suggest you sketch the relation after making a table of values for x = 1,2,3,4,5,6,7
However keep in mind that you don't have a continuous curve, but rather a series of integer valued points, which will fall along the parabola
The vertex of (3,29) tells you that there was a maximum number of ticket sales of 29 on day 3
notice when x=6, sales = -72 + 72 + 11 = 11
but when x-7, the graph no longer has any real meaning.
e.g. if x = 2 , Sales = -8 + 24 + 11 = 27
if x = 3, sales = -18 + 36 + 11 = 29
if x = 4, sales = -32 + 48 + 11 = 27
if x = 5 , sales = -50 + 60+11 = 21 , notice the sales are decreasing
it also looks like the vertex is at (3,29)
( Assume you know how to find the vertex)
so as x gets bigger (time passes), the first term becomes more negative at a faster rate than the two positive terms, so the sum (the ticket sales) gets smaller, until it becomes meaningless when ticket sales is a negative number.
(e.g. x = 10, sales = -200 + 120 + 11 = -69 )
I suggest you sketch the relation after making a table of values for x = 1,2,3,4,5,6,7
However keep in mind that you don't have a continuous curve, but rather a series of integer valued points, which will fall along the parabola
The vertex of (3,29) tells you that there was a maximum number of ticket sales of 29 on day 3
notice when x=6, sales = -72 + 72 + 11 = 11
but when x-7, the graph no longer has any real meaning.
Answered by
Aria
Thanks a bunch. I appreciate the detail. quadratic equations are confusing for me to graph. I no sooner think I have it than I get an answer wrong.
There are no AI answers yet. The ability to request AI answers is coming soon!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.