Sam wants to fence his rectangular garden plot along its length on the front side. The perimeter of the plot is 24 meters, and its length is 3 times its width.

Sam wants to fence his rectangular garden plot along its length on the front side. The perimeter of the plot is 24 meters, and its length is 3 times its width. If x is the length and y is the width of the plot, set the equations of the system. Solve and determine the values of x and y. If the cost of fencing is $25 per meter, how much does Sam need to spend on fencing?

Answer:

Length of the plot [tex](x)[/tex] is 9 meter and width of the plot [tex](y)[/tex] is 3 meter.

Sam need to spend $225 on fencing.

Step-by-step explanation:

Given;

Perimeter of the plot =24 m

Length of the plot is denoted '[tex]x[/tex]'

Width of the plot is denoted by [tex]'y'[/tex]

Cost of Fencing = $25 per meter.

We need to find the the values of x and y.

Also we need to find how much does Sam need to spend on fencing.

Solution:

Now given that;

length is 3 times its width.

so we get;

[tex]x=3y[/tex]

Now we know that;

Perimeter of the rectangle is equal to 2 times sum of its length and width.

framing in equation form we get;

[tex]24=2(x+y)[/tex]

But [tex]x=3y[/tex]

so we get;

[tex]24 =2(3y+y)\\\\24=2(4y)\\\\24=8y[/tex]

Dividing both side by 8 we get;

[tex]\frac{24}{8}=\frac{8y}{8}\\\\y =3\ m[/tex]

Now width of the plot = 3 meter

Length of the plot [tex]x=3y=3\times3= 9\ m[/tex]

Hence Length of the plot [tex](x)[/tex] is 9 meter and width of the plot [tex](y)[/tex] is 3 meter.

Now given that;

Sam wants to fence his rectangular garden plot along its length on the front side.

So we can say that;

Length to be fenced = 9 m

Cost of fencing = $25/meter

Cost of fencing the garden = [tex]9\times 25= \$225[/tex]

Hence Sam need to spend $225 on fencing.