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Quadratic Equation Word Problem To Quadratic Solution Type - 3-Sided Rectangle

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.

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Quadratic Equation Word Problem To Quadratic Solution Type - 3-Sided Rectangle Worksheet

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Quadratic Equation Word Problem To Quadratic Solution Type - 3-Sided ...
1
Given this equation for the area of a parking lot along a wall, what would you use to find the maximum area possible?
A LaTex expression showing A(x) = -0.5x to the power of 2 + 13.5x
a
The y value of the vertex
b
The x value of the vertex
c
The root of the quadratic
2
Given this equation for the area of a garden along a wall, what would you use to find the maximum area possible?
A LaTex expression showing A(x) = -0.5x to the power of 2 + 9x
a
The x value of the vertex
b
The y value of the vertex
c
The root of the quadratic
3
Given this equation for the area of a parking lot along a wall, what would you use to find the x dimension that maximizes area?
A LaTex expression showing A(x) = -0.5x to the power of 2 + 14x
a
The x value of the vertex
b
The y value of the vertex
c
The root of the quadratic
4
Given this equation for the area of a parking lot along a wall, what would you use to find the maximum area possible?
A LaTex expression showing A(x) = -0.5x to the power of 2 + 12x
a
The y value of the vertex
b
The root of the quadratic
c
The x value of the vertex
5
Given this equation for the area of a garden along a wall, what would you use to find the x dimension that maximizes area?
A LaTex expression showing A(x) = -0.5x to the power of 2 + 10x
a
The root of the quadratic
b
The x value of the vertex
c
The y value of the vertex
6
Given this equation for the area of a parking lot along a wall, what would you use to find the maximum area possible?
A LaTex expression showing A(x) = -0.5x to the power of 2 + 12.5x
a
The x value of the vertex
b
The root of the quadratic
c
The y value of the vertex
7
Given this equation for the area of a garden along a wall, what would you use to find the maximum area possible?
A LaTex expression showing A(x) = -0.5x to the power of 2 + 9.5x
a
The x value of the vertex
b
The root of the quadratic
c
The y value of the vertex
8
Given this equation for the area of a parking lot along a wall, what would you use to find the maximum area possible?
A LaTex expression showing A(x) = -0.5x to the power of 2 + 11.5x
a
The y value of the vertex
b
The x value of the vertex
c
The root of the quadratic