We know that the area is determined by the equation
[tex]3x^2+4x-4[/tex]And the width is
[tex](x+2)[/tex]First of all, remember that the area of a rectangle is
[tex]A=w\cdot l[/tex]Where the length would be
[tex]l=\frac{A}{w}[/tex]Before we use this length expression, first we need to find the solutions for the given quadratic equation. Using a calculator, the solutions are 2/3 and -2. Only the number 2/3 makes sense to the problem since length can't be negative.
Expressing these solutions as factors would be
[tex]3x^2+4x-4=(3x-2)(x+2)[/tex]Now, we replace all factors to find the length
[tex]l=\frac{\left(3x-2\right)\left(x+2\right)}{x+2}=3x-2[/tex]Therefore, the length is (3x-2) feet.
On the other hand, the perimeter is the sum of all sides, also it can be expressed as
[tex]P=2(l+w)[/tex]Using the length and width expressions
[tex]P=2(3x-2+x+2)=2(4x)=8x[/tex]Therefore, the perimeter is (8x) feet.
When x is 6, the area would be
[tex]3x^2+4x-4=3(6)^2+4(6)-4=3(36)+24-4=108+20=128[/tex]The area is 128 square feet. Now, if the cost of the fertilizer is $0.25, the total cost for the area would be
[tex]C=128(0.25)=32[/tex]