Answer:
1) The equation that represents the total area of Riley's proposed ratio is [tex]A' = (\sqrt{2}\cdot x)\cdot (\sqrt{2}\cdot y)[/tex].
2) The length and width of the new patio are approximately 18.4 feet and 21.2 feet, respectively.
Step-by-step explanation:
1) From Geometry we remember that area formula for the rectangle is represented by:
[tex]A = x\cdot y[/tex] (1)
Where:
[tex]A[/tex] - Area, measured in square feet.
[tex]x[/tex] - Length, measured in feet.
[tex]y[/tex] - Width, measured in feet.
From statement we know that Riley wants to double the area, that is:
[tex]A' = 2\cdot A[/tex] (2)
By applying (1) in (2), we get the following expression:
[tex]A' = 2\cdot x\cdot y[/tex] (3)
Given that Riley wants to double the area of the pation by increasing the length and width by the same amount, we can rearrange (3) by algebraic means:
[tex]A' = \sqrt{2}\cdot \sqrt{2}\cdot x\cdot y[/tex]
[tex]A' = (\sqrt{2}\cdot x)\cdot (\sqrt{2}\cdot y)[/tex] (3b)
The equation that represents the total area of Riley's proposed ratio is [tex]A' = (\sqrt{2}\cdot x)\cdot (\sqrt{2}\cdot y)[/tex].
2) If we know that [tex]x = 13\,ft[/tex] and [tex]y = 15\,ft[/tex], then the length and the width of the new patio are, respectively:
[tex]x' = \sqrt{2}\cdot x[/tex]
[tex]x' = \sqrt{2}\cdot (13\,ft)[/tex]
[tex]x' \approx 18.4\,ft[/tex]
[tex]y' = \sqrt{2}\cdot y[/tex]
[tex]y' = \sqrt{2}\cdot (15\,ft)[/tex]
[tex]y' \approx 21.2\,ft[/tex]
The length and width of the new patio are approximately 18.4 feet and 21.2 feet, respectively.
