A certain floor of an office building has 1,200 square feet

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BTGmoderatorDC: Moderator; Posts: 7187; Joined: Thu Sep 07, 2017 4:43 pm; Followed by:23 members

A certain floor of an office building has 1,200 square feet

by BTGmoderatorDC » Tue Jul 31, 2018 3:59 pm

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A certain floor of an office building has 1,200 square feet of floor area allocated to 2 equally sized conference rooms and 6 rectangular offices. If no office can be larger than a conference room, does each conference room have a floor area of less than 200 square feet?

(1) Each conference room must have a smaller area than the combined areas of any three offices and a larger area than the combined areas of any two offices.
(2) The four walls of each office have a combined length of less than 46 feet.

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Source: Beat The GMAT — Data Sufficiency | Tue Jul 31, 2018 3:59 pm

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by Jay@ManhattanReview » Wed Aug 01, 2018 12:08 am

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BTGmoderatorDC wrote:A certain floor of an office building has 1,200 square feet of floor area allocated to 2 equally sized conference rooms and 6 rectangular offices. If no office can be larger than a conference room, does each conference room have a floor area of less than 200 square feet?

(1) Each conference room must have a smaller area than the combined areas of any three offices and a larger area than the combined areas of any two offices.
(2) The four walls of each office have a combined length of less than 46 feet.

Say the area of a conference room is x sq ft and the area of an office is y sq ft.

Thus, 2x + 6y = 1200

=> x + 3y = 600

Given that x > y.

We need to determine whether x < 200 sq ft.

Let's take each statement one by one.

(1) Each conference room must have a smaller area than the combined areas of any three offices and a larger area than the combined areas of any two offices.

=> 2y < x < 3y

From x < 3y and x + 3y = 600, we get that x < 300 and 3y > 300 => y > 100.

=> 2y = 2*100 = 200

Thus, 2y < x < 3y => 200 < x < 300. Sufficient. The answer is no, each conference room does not have a floor area of less than 200 square feet.

(2) The four walls of each office have a combined length of less than 46 feet.

Say length and the width of an office are l and w, respectively.

Thus, 2(l + b) < 46

l + b < 23

We know that the area of a rectangle = l*b

Needless to state that if the area of the offices is minimum, the area of the conference room is going to be maximum as it is governed by x + 3y = 600; thus x >> 200.

It is interesting to see when y, i.e., area of an office, is maximum, what is the minimum value of the area of a conference room?

Given l + b < 23, if we want to maximize, l*b, we must take l = b = (<23/2); or l = b = ~11.5

Thus, the area of an office = l*b < 11.5*11.5

It is time-consuming to calculate 11.5*11.5; we can better calculate 11*12, which is 132; thus, 11.5*11.5 = a little greater than 132

With x + 3y = 600, we see than x = 600 - 3*132 = 600 - 396 = 204 > 200. Sufficient. The answer is no, each conference room does not have a floor area of less than 200 square feet.

The correct answer: D

Hope this helps!

-Jay
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