Source: Official Guide
If a rectangle of area \(24\) can be partitioned into exactly \(3\) nonoverlapping squares of equal area, what is the length of the longest side of the rectangle?
A. \(2\sqrt{2}\)
B. \(6\)
C. \(8\)
D. \(6\sqrt{2}\)
E. \(12\sqrt{2}\)
The OA is D
If a rectangle of area \(24\) can be partitioned into exactly \(3\) nonoverlapping squares of equal area, what is the
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Let's work backwardsBTGmoderatorLU wrote: ↑Fri May 19, 2023 11:08 amSource: Official Guide
If a rectangle of area \(24\) can be partitioned into exactly \(3\) nonoverlapping squares of equal area, what is the length of the longest side of the rectangle?
A. \(2\sqrt{2}\)
B. \(6\)
C. \(8\)
D. \(6\sqrt{2}\)
E. \(12\sqrt{2}\)
The OA is D
Here are 3 squares (with sides length x) comprising a rectangle
So, the rectangle has base of 3x and height of x
GIVEN: The rectangle has area 24
Area of rectangle = (base)(height)
We can write: 24 = (3x)(x)
Simplify: 24 = 3x²
So 8 = x²
This means x = √8 = √[(4)(2)] = (√4)(√2) = 2√2
What is the length of the longest side of the rectangle?
The longest side had length 3x
3x = 3(2√2) = 6√2
Answer: D
Cheers,
Brent