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AbdurRakib
Joined: 11 May 2014
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28 Oct 2016, 13:57
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Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
95%
(hard)
Question Stats:
26% (01:36) correct
74%
(01:37)
wrong
based on 103
sessions
History
Date
Time
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Not Attempted Yet
An insect is located at one corner (point A) on the surface of a cube that measures 3 x 4 x 5 inches, as shown in the diagram.
Note: Figure is not drawn to scale.
If the insect crawls along the surface of the cube to the opposite corner (point B), what is the shortest possible length, in inches, of the insect’s path from point A to point B?
(A)5\(\sqrt{2}\)
(B)\(\sqrt{74}\)
(C)4\(\sqrt{5}\)
(D)3\(\sqrt{10}\)
(E)10
Note: Figure is not drawn to scale.
If the insect crawls along the surface of the cube to the opposite corner (point B), what is the shortest possible length, in inches, of the insect’s path from point A to point B?
(A)5\(\sqrt{2}\)
(B)\(\sqrt{74}\)
(C)4\(\sqrt{5}\)
(D)3\(\sqrt{10}\)
(E)10
28 Oct 2016, 17:33
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The shortest distance between plane A and B is 5 inches.
The shortest distance from point A to the point where shortest distance from point B meets plane A = sqrt(3^2+4^2)
= 5 inches
Total = 10 inches.
IMO E
Sent from my iPhone using GMAT Club Forum mobile app
The shortest distance from point A to the point where shortest distance from point B meets plane A = sqrt(3^2+4^2)
= 5 inches
Total = 10 inches.
IMO E
Sent from my iPhone using GMAT Club Forum mobile app
28 Oct 2016, 19:07
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AbdurRakib
Hi
Two points..
1) A cube is supposed to have same dimensions so it will be 3*3*3 or 4*4*4... here it is cuboid..
2) Now the answer..
a) if it can fly and is inside the box, it will be DIAGONAL.
b) but here it is crawling, so open the two rectangle faces adjacent.. these faces are 3*5 and 4*5..
So when you open it, it becomes rectangle with sides 3+4 and 5..
So the hypotenuse of this triangle will be our ANSWER and it is √(7^2+5^2)=√(49+25)=√74
