Given data:
Surface Area of water = A = 1600[tex]ft^{2}[/tex]
Length of the swimming pool = L = 60[tex]ft[/tex] + W
Width of the swimming pool = W =?
Since,
Area = Length * Width
A = L * W
Therefore,
1600 = (60 + W) * W
1600 = 60W + W*W
=> [tex]W^{2} + 60W - 1600 = 0[/tex]
In the above equation(in terms of quadratic formula),
a = 1
b = 60
c = -1600
x = W
Use,
x(for positive) = [tex]x =\frac{ -b + \sqrt{ b^{2} - 4*a*c } }{2*a} [/tex]
Plug-in the values you would get:
x = (-60 + 100) / 2
x = 20 --- (1)
x(for negative) = [tex]x =\frac{ -b - \sqrt{ b^{2} - 4*a*c } }{2*a} [/tex]
Plug-in the values you would get:
x = (-60 - 100) / 2
x = -80 --- (2)
Since x = W = Width, and width CANNOT be negative, therefore, the correct answer is (1):
Ans: Width = 20ft
