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15 Oct 2022, 08:01
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A
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Difficulty:
5%
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Question Stats:
90% (00:50) correct
10%
(00:35)
wrong
based on 143
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Is the integer n even ?
(1) n^2 - 1 is odd.
(2) \(\sqrt{n}\) is an integer.
(1) n^2 - 1 is odd.
(2) \(\sqrt{n}\) is an integer.
15 Oct 2022, 08:18
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1) n^2 - 1 = odd
n^2 = even
So, n is also even
SUFFICIENT
2) Root(n) is an integer
If n = 25 (odd): Root(25) = 5
If n = 36 (even): Root(36) = 6
So, n can be either odd or even
NOT SUFFICIENT
Answer: A
Posted from my mobile device
n^2 = even
So, n is also even
SUFFICIENT
2) Root(n) is an integer
If n = 25 (odd): Root(25) = 5
If n = 36 (even): Root(36) = 6
So, n can be either odd or even
NOT SUFFICIENT
Answer: A
Posted from my mobile device
23 Oct 2022, 05:23
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av1901
Is number 1 also "not sufficient?"
n^2-1=odd
lets say n=3, therefore 3^2-1= -->even
lets say n=2, therefore 2^2-1= -->odd
Regarding the second option, I agree that its not sufficient.
