Answer:
width of the rectangle is 12 ft and the length is 18 ft.
Explanation:
Let's call the width of the rectangle "w" and the length "l". From the problem, we know that:
Area = 432 ft^2
l = w + 6 ft
We also know that the area of a rectangle is found by multiplying the width by the length, so:
432 = w * (w + 6)
We can simplify this equation by multiplying out the right side:
432 = w^2 + 6w
Now we have a quadratic equation in one variable, we can solve for w by either factoring, completing the square or using the quadratic formula.
432 = w^2 + 6w
432 = w(w + 6)
w(w+6)=432
w=12
Now that we know the width is 12 we can use the second equation to find the length:
l = w + 6 = 12 + 6 = 18
So the width of the rectangle is 12 ft and the length is 18 ft.