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Quadratic Equation Word Problem To Quadratic Solution Type - Revenue with Price Change

Level 1

The topics in this unit focus on constructing and solving quadratic equations from word problems. Work on practice problems directly here, or download the printable pdf worksheet to practice offline.

WorksheetView

Quadratic Equation Word Problem To Quadratic Solution Type - Revenue with Price Change Worksheet

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Quadratic Equation Word Problem To Quadratic Solution Type - Revenue ...
1
Given this equation for the revenue from a movie theater, what would you use to find the price that generates the most revenue?
A LaTex expression showing R(p) = -12.50p to the power of 2 + 167.50p
a
The root of the quadratic
b
The x value of the vertex
c
The y value of the vertex
2
Given this equation for the revenue from a lemonade stand, what would you use to find the price that generates the most revenue?
A LaTex expression showing R(p) = -20.00p to the power of 2 + 187.50p
a
The root of the quadratic
b
The x value of the vertex
c
The y value of the vertex
3
Given this equation for the revenue from a lemonade stand, what would you use to find the maximum revenue possible?
A LaTex expression showing R(p) = -33.33p to the power of 2 + 196.67p
a
The root of the quadratic
b
The x value of the vertex
c
The y value of the vertex
4
Given this equation for the revenue from a lemonade stand, what would you use to find the price that generates the most revenue?
A LaTex expression showing R(p) = -50.00p to the power of 2 + 270.00p
a
The root of the quadratic
b
The x value of the vertex
c
The y value of the vertex
5
Given this equation for the revenue from a movie theater, what would you use to find the price that generates the most revenue?
A LaTex expression showing R(p) = -10.00p to the power of 2 + 200.00p
a
The x value of the vertex
b
The root of the quadratic
c
The y value of the vertex
6
Given this equation for the revenue from a lemonade stand, what would you use to find the price that generates the most revenue?
A LaTex expression showing R(p) = -14.29p to the power of 2 + 198.57p
a
The y value of the vertex
b
The x value of the vertex
c
The root of the quadratic
7
Given this equation for the revenue from a lemonade stand, what would you use to find the price that generates the most revenue?
A LaTex expression showing R(p) = -11.11p to the power of 2 + 178.89p
a
The y value of the vertex
b
The root of the quadratic
c
The x value of the vertex
8
Given this equation for the revenue from a lemonade stand, what would you use to find the maximum revenue possible?
A LaTex expression showing R(p) = -20.00p to the power of 2 + 113.64p
a
The root of the quadratic
b
The x value of the vertex
c
The y value of the vertex