Question

If the area of the rectangle is $9x^2-12x-32$, then the perimeter of the rectangle is .

• A. $2(3x-10)(3x+2)$
• B. $2(3x+10)(3x-2)$
• C. $2(6x-4)$

Answer 1

The correct option is C $2(6x-4)$

Given,
The area of the rectangle $=9x^2-12x-32$

Now,
$9x^2-12x-32$ can be written as
$=(3x{)}^2-2\times 3x\times 2+4-36=(3x-2{)}^2-6^2=(3x-2+6)\times (3x-2-6)=(3x+4)\times (3x-8)$
[Using the identity, $(a+b)\times (a-b)=a^2-b^2$]

Now,
Length $=3x+4$; Breadth $=3x-8$
Perimeter $=2\times (length+breadth)=2\times (3x+4+3x-8)=2\times (6x-4)$)