Find the length of a rectangle if the area is (2x^2|15x|18) inches^2 and the width is (x=6) inches.
To find the length of a rectangle given the area and the width, we can use the formula for the area of a rectangle, which is length multiplied by width.
In this case, the area is given as (2x^2|15x|18) square inches, and the width is (x=6) inches.
Let's substitute the value of the width into the formula to get an equation for the area:
Area = Length * Width
(2x^2|15x|18) = Length * 6
Now, let's solve for the length:
Divide both sides of the equation by 6:
(2x^2|15x|18) / 6 = Length
Simplify the equation:
(x^2|5x|9) = Length
So, the length of the rectangle is (x^2|5x|9) inches.