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10 Sep 2015, 00:30
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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:
35%
(medium)
Question Stats:
68% (01:49) correct
32%
(01:43)
wrong
based on 578
sessions
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Not Attempted Yet
For all positive integers n, the nth term in sequence \(S_n\) is defined as follows:
\(S_n = (n!)^{-1}\)
The sum of the first six terms of \(S_n\) is
(A) between 0 and ½
(B) between ½ and 1
(C) between 1 and 1½
(D) between 1½ and 2
(E) greater than 2
Kudos for a correct solution.
\(S_n = (n!)^{-1}\)
The sum of the first six terms of \(S_n\) is
(A) between 0 and ½
(B) between ½ and 1
(C) between 1 and 1½
(D) between 1½ and 2
(E) greater than 2
Kudos for a correct solution.
10 Sep 2015, 01:30
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The sequence for the first six terms is: 1, 1/2, 1/6, 1/24, 1/120, 1/720
You can immediately rule out answer A, B and C as 1 + 1/2 alone will yield a result greater than 1,5.
Now the proceeding terms will get smaller and smaller and will not be 0,5 if summed, therefore the total sum has to be somewhere between 1,5 and 2. D
You can immediately rule out answer A, B and C as 1 + 1/2 alone will yield a result greater than 1,5.
Now the proceeding terms will get smaller and smaller and will not be 0,5 if summed, therefore the total sum has to be somewhere between 1,5 and 2. D
General Discussion
10 Sep 2015, 04:58
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Solution : Multiply and divide the sum by 6!
1/720(720+360+120+30+6+1)==> clearly b/n 1.5-2
Option D
1/720(720+360+120+30+6+1)==> clearly b/n 1.5-2
Option D
