Respuesta :
The width of the border will be 0.1648... ft or 1.9786... inches.
Explanation
Lets assume, the width of the border is [tex]x[/tex] ft.
The rectangular garden is 15 ft in length and 7 ft in width. So, the area of the garden [tex]=(15*7)ft^2= 105 ft^2[/tex]
Now, the length of the garden including border [tex]=(15+2x) ft[/tex] and the width of the garden including border [tex]=(7+2x) ft[/tex]
So, the area of the garden including the border [tex]= (15+2x)(7+2x) ft^2[/tex]
Thus the area of the border [tex]=[(15+2x)(7+2x)-105] ft^2[/tex]
Total amount of premixed cement needed is 1 yard³ = 27 ft³
As the depth of the border is 44 inches or [tex](\frac{44}{12})ft[/tex] or [tex] (\frac{11}{3})ft[/tex], so....
[tex]\frac{11}{3}[(15+2x)(7+2x)-105] = 27\\ \\ 11(105+44x+4x^2 -105)=81\\ \\ 11(4x^2+44x)=81\\ \\ 44x^2+484x-81=0[/tex]
Using quadratic formula....
[tex]x= \frac{-484+/-\sqrt{484^2-4(44)(-81)}}{2(44)}\\ \\ x= \frac{-484+/-\sqrt{234256+14256}}{88}\\ \\ x= \frac{-484+/-\sqrt{248512} }{88}\\ \\ x= 0.1648...[/tex]
(Negative value ignored)
So, the width of the border [tex]=0.1648...ft= (0.1648...*12)inches= 1.9786...inches[/tex]
