Respuesta :
Let the wall's length be y. So the fence parallel is also y.
We form the equation;
2x + y = 240
Now the area A is x*y, which is given as 5500.
We have 2 equations with 2 variables. Solve them and get the answer.
xy = 5500
2x + y = 240
Y = 5500/x
2x + (5500/x) = 240
2x^2 - 240x + 5500 = 0
x^2 - 120x + 2750 = 0
Work out the value(s) of x from above.
We form the equation;
2x + y = 240
Now the area A is x*y, which is given as 5500.
We have 2 equations with 2 variables. Solve them and get the answer.
xy = 5500
2x + y = 240
Y = 5500/x
2x + (5500/x) = 240
2x^2 - 240x + 5500 = 0
x^2 - 120x + 2750 = 0
Work out the value(s) of x from above.
Answer:
values of x = 30.85, 89.16 ft
Step-by-step explanation:
Let length of two sides perpendicular to the wall be x ft and length of the wall is y ft.
area A of the enclosure will be A = xy
Since area of the enclosure = 500 square feet
xy = 5500 ------(1)
Length of the three sides has been given as 240 ft.
2x + y = 240
y = 240 - 2x ------(2)
Now we put the value of y from equation 2 to equation 1
x(240 - 2x) = 5500
240x - 2x² = 5500
Now we divide this equation by 2
120x - x² = 2750
x² - 120x = - 2750
x² - 120x + 2750 = 0
x =[tex]\frac{120\pm \sqrt{(-120)^{2}-4(1)(2750)}}{2}[/tex]
=[tex]\frac{120\pm \sqrt{14400-11000}}{2}[/tex]
= [tex]\frac{120\pm \sqrt{3400}}{2}[/tex]
= [tex]\frac{120\pm 58.31}{2}[/tex]
x = 30.85, 89.16 ft
y = 178.28, 61.69 ft
If the wall is shorter than other sides then the value of x will be 89.16.
