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06 Jan 2018, 14:22
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B
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
45%
(medium)
Question Stats:
48% (00:53) correct
52%
(00:57)
wrong
based on 101
sessions
History
Date
Time
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Not Attempted Yet
What is the 999th term of the series S ?
(1) The first four terms of S are (1 + 1)^2, (2 + 1)^2, (3 + 1)^2, and (4 + 1)^2.
(2) For every x, the xth term of S is (x + 1)^2
(1) The first four terms of S are (1 + 1)^2, (2 + 1)^2, (3 + 1)^2, and (4 + 1)^2.
(2) For every x, the xth term of S is (x + 1)^2
06 Jan 2018, 20:37
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SajjadAhmad
Statement 1: we know the first \(4\) terms but what about terms after that? They could be anything. Hence insufficient
Statement 2: This clearly mentions the value of each term in the series.
So 999th term will be \((999+1)^2=1000^2\). Sufficient
Option B
16 Jan 2018, 11:11
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Can someone explain why A as well cannot provide an answer?
The first four terms of the series are given and we are asked to find the 999th term. If we see a pattern in a series(and we know at least two terms), can we not find the nth term?
Or did I not get the question correctly?
The first four terms of the series are given and we are asked to find the 999th term. If we see a pattern in a series(and we know at least two terms), can we not find the nth term?
Or did I not get the question correctly?
