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04 Nov 2019, 00:04
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D
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Difficulty:
75%
(hard)
Question Stats:
55% (02:06) correct
45%
(02:37)
wrong
based on 203
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If x, y and z are positive integers, is \((x - y)(y - z)(x - z) > 0\)?
(1) \(x^2 + yz = xy + xz\)
(2) \(xy - y^2 = xz - yz\)
(1) \(x^2 + yz = xy + xz\)
(2) \(xy - y^2 = xz - yz\)
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04 Nov 2019, 00:16
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Answer should be D
1) solve the equation and you get (x-z)(x-y)=0
Which means either of the terms are zero. Using this inference, (x-y)(y-z)(x-z) = 0. Which is not greater than 0.
Sufficient
2) similarly st. 2 gives (x-y)(y-z)=0
Thus sufficient
Answer-D
Posted from my mobile device
1) solve the equation and you get (x-z)(x-y)=0
Which means either of the terms are zero. Using this inference, (x-y)(y-z)(x-z) = 0. Which is not greater than 0.
Sufficient
2) similarly st. 2 gives (x-y)(y-z)=0
Thus sufficient
Answer-D
Posted from my mobile device
04 Nov 2019, 01:21
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Bunuel
#1
\(x^2 + yz = xy + xz\)
x(x-y)=z(x-y)
x=z
so (x - y)(y - z)(x - z)= 0
sufficient
#2
xy - y^2 = xz - yz[/m]
solve
y=z
so (x - y)(y - z)(x - z) =0
IMO D
