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D
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Difficulty:
85%
(hard)
Question Stats:
46% (02:06) correct
54%
(01:53)
wrong
based on 615
sessions
History
Date
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Attachment:
1.jpg [ 7.36 KiB | Viewed 23367 times ]
(1) ABCD is a square.
(2) EFGH is a square.
11 Mar 2013, 02:32
Kudos
Bookmarks
nave81
Figure attached
Suppose the dimention of the tiles are l*b
STAT1
Let side of Square ABCD = a
then if you consider side AB then
AB = a = 3l + 2b
if you consider side AD then
AD = a = 4l
so, 4l = 3l + 2b
or, l =2b
Also, we know that a = 4l
so, l = a/4
b = l/2 = a/8
So, we can find the area of the tile in terms of "a"
Area of all the tiles = (constant)* a^2
So, we can find the percentage of area occupied by tile = ((constant)* a^2 / a^2 ) * 100
So, SUFFICIENT
STAT2
Let side of EFGH = c
then if you consider EF then
EF = c = 3l
if you consider EH then
EH = c = 2l + l-b + l-b = 4l-2b
=> 3l = 4l-2b
l = 2b
And we have c = 3l
=> l = c/3
b = l/2 = c/6
AB = 4l = 4c/3
So, we can find area of ABCD in terms of C And we can find area of the tiles in terms of c
So, we can find the percentage of area occupied by tiles
So, SUFFICIENT
Hence answer will be D
Hope it helps!
Attachments
image.png [ 8.69 KiB | Viewed 22916 times ]
19 Apr 2018, 15:35
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nave
Target question: What percent of the area of rectangle ABCD is covered by the tiles?
Statement 1: ABCD is a square
IMPORTANT: Once we know that ABCD is a square, we also know that EFGH is a square. Notice that if you take square ABCD and "slice" off the same amount (i.e., the width of each rectangle) from the four sides, we get another square (EFGH).
Let L = length of one rectangle.
Side AD has length 4L, which means all four sides of square ABCD have length 4L.
So, the area of ABCD = (4L)(4L) = 16L²
Side EF has length 3L, which means all four sides of square EFGH have length 3L.
So, the area of EFGH = (3L)(3L) = 9L²
From this, we can conclude that the total area of the rectangles = 16L² - 9L² = 7L²
So, the fraction of square ABCD taken up by tiles = (7L²)/(16L²) = 7/16
Since we could convert 7/16 to a percent, we could determine the percent of the area of rectangle ABCD is covered by the tiles.
Since we can answer the target question with certainty, statement 1 is SUFFICIENT
Statement 2: EFGH is a square
Using the same logic that we used above, we know that ABCD must also be a square.
From here, if we follow the same steps as above, we can answer the target question with certainty.
So statement 2 is SUFFICIENT
Answer = D
Cheers,
Brent
