Answer :
A = l × w. Substitute 72 into A and fill in the rest of the equation.
w = l - 1. Plug l - 1 into w
72 = l × (l - 1). Multiply l by (l - 1)
72 = l^2 - l. Subtract 72 from each side.
0 = l^2 - l - 72. Factor.
0 = (l + 8) (l - 9). Set each term equal to zero.
(l + 8) = 0. Subtract 8 from each side.
l = -8. Length cant be a negative number so let's try the other term.
(l - 9) = 0. Add 9 to each side.
l = 9. The length is 9.
Earlier we stated that the width is one less than the length, therefore, the width is 9 - 1 = 8.
The width is 8 units.
The width of the rectangle should be 8 units.
Calculation of the width:
Since The width of a rectangle is 1 units less than the length. The area of the rectangle is 72 units.
Here we know that
Area = (length) (width)
Here we assume length be x
So, width be = x - 1
So,
(x) (x - 1) = 72
[tex]x^2 - x - 72 = 0\\\\x^2 -9x + 8x - 72 = 0\\\\x (x - 9) + 8(x - 9)[/tex]
(x + 8) (x - 9)
So, the width should be
= 9 - 1
= 8
hence,
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