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29 Feb 2016, 20:39
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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:
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Question Stats:
55% (02:01) correct
45%
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wrong
based on 292
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When there are consecutive integers and if their range is equal to their median, what is the number of them?
(1) The smallest number of them is 5
(2) The largest number of them is 15
(1) The smallest number of them is 5
(2) The largest number of them is 15
04 Aug 2016, 14:17
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MathRevolution
Let \(a\) be the first element of the set, \(b\) be the final element of the set, and \(n\) be the range.
The median of a set of consecutive numbers is the same as the mean: \(\frac{\text{first term} + \text{last term}}{2}\)
1) The smallest number of them is 5
\(a = 5\\\\
b = 5 + n\\\\
\text{median} = \frac{a + b}{2} = \frac{10 + n}{2} = n\\\\
2n = 10 + n\\\\
n = 10\\\)
Sufficient
2) The largest number of them is 15
\(b = 15\\\\
a = 15 - n\\\\
\text{median} = \frac{a + b}{2} =\frac{15 + 15 - n}{2} = n\\\\
30 - n = 2n\\\\
30 = 3n\\\\
n = 10\)
Sufficient
Knowing \(n\) and a start point, there are 11 elements from 5 to 15.
(D) each statement alone is sufficient
General Discussion
02 Mar 2016, 22:51
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Forget conventional ways of solving math questions. In DS, Variable approach is the easiest and quickest way to find the answer without actually solving the problem. Remember equal number of variables and independent equations ensures a solution.
When consecutive integers are there and if their range is equal to their median, what is the number of them?
1) The smallest number of them is 5
2) The largest number of them is 15
In the original condition, there are 2 variables(you need to figure out the starting number and the number of them) and 1 equation(range=median), which should match with the number of equations. So you need 1 variable. For 1) 1 equation, for 2) 1 equation, which is likely to make D the answer.
For 1), only 5,6,7,8,9,10,11,12,13,14,15 are possible and so as 2).
Therefore, the answer is D.
When consecutive integers are there and if their range is equal to their median, what is the number of them?
1) The smallest number of them is 5
2) The largest number of them is 15
In the original condition, there are 2 variables(you need to figure out the starting number and the number of them) and 1 equation(range=median), which should match with the number of equations. So you need 1 variable. For 1) 1 equation, for 2) 1 equation, which is likely to make D the answer.
For 1), only 5,6,7,8,9,10,11,12,13,14,15 are possible and so as 2).
Therefore, the answer is D.
