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12 Dec 2014, 07:07
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D
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
65%
(hard)
Question Stats:
55% (01:41) correct
45%
(01:49)
wrong
based on 585
sessions
History
Date
Time
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What is the value of k^2 - k?
(1) The value of k - 1/k is 1.
(2) The value of 2k –1 is \(\sqrt{5}\)
(1) The value of k - 1/k is 1.
(2) The value of 2k –1 is \(\sqrt{5}\)
12 Dec 2014, 15:56
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My guess for the answer is B.
(1) Not sufficient. Does not give any solution for k.
(2) Sufficient.
2k-1 = \sqrt{5}
2k=\sqrt{5}+1
k = (\sqrt{5}+1)/2
So k^2-k ----> ((\sqrt{5}+1)^2/4)- (\sqrt{5}+1)/2 ---> (5+2\sqrt{5}+1-2\sqrt{5}-2)/4 ---->(5+1-2)/4 ---> 1
(1) Not sufficient. Does not give any solution for k.
(2) Sufficient.
2k-1 = \sqrt{5}
2k=\sqrt{5}+1
k = (\sqrt{5}+1)/2
So k^2-k ----> ((\sqrt{5}+1)^2/4)- (\sqrt{5}+1)/2 ---> (5+2\sqrt{5}+1-2\sqrt{5}-2)/4 ---->(5+1-2)/4 ---> 1
12 Dec 2014, 20:54
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(a) Sufficient.
k - (1/k) = 1
or, k^2 - 1 = k (multiplying both sides by k)
or, k^2 - k = 1 (rearranging)
(b) Sufficient.
2k –1 = 5^(0.5)
or, k = finite value which can be used to solve for k^2 - k
Hence the answer is D
k - (1/k) = 1
or, k^2 - 1 = k (multiplying both sides by k)
or, k^2 - k = 1 (rearranging)
(b) Sufficient.
2k –1 = 5^(0.5)
or, k = finite value which can be used to solve for k^2 - k
Hence the answer is D
