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EgmatQuantExpert
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The median of n consecutive odd integers is 30. If the fifth term..... Updated on: 29 Oct 2018, 23:38
Originally posted by EgmatQuantExpert on 25 Oct 2018, 01:22.
Last edited by EgmatQuantExpert on 29 Oct 2018, 23:38, edited 1 time in total.
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24% (02:33) correct 76% (02:18) wrong based on 616 sessions

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The median of n consecutive odd integers is 30. If the fifth term is 33, then which of the following can be the last term of the sequence?

    A. 19
    B. 21
    C. 25
    D. 33
    E. 41

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The median of n consecutive odd integers is 30. If the fifth term..... 25 Oct 2018, 05:23
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The median of n consecutive odd integers is 30. If the fifth term is 33, then which of the following can be the last term of the sequence?

    A. 19
    B. 21
    C. 25
    D. 33
    E. 41


Now median = 30, so two middle terms are 29 to 31
Fifth term is 33..
1) if the sequence is increasing...
33 as fifth term means ..... 25,27,29,31,33
So 3 terms either side of median, last term becomes 35, but that is not in the choices
2) if the sequence is decreasing..
33 is fifth term , so 31 is sixth term and therefore 6 terms on either side of median 30..
Total terms - 12, so last term = 33-(12-5)*2=33-14=19
So sequence 41,39,37,35,33,31,29,27,25,23,21,19

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The median of n consecutive odd integers is 30. If the fifth term..... 25 Oct 2018, 23:24
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I have one query here.
Median is calculated when we arrange all elements in increasing order.
Am I wrong?
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The median of n consecutive odd integers is 30. If the fifth term..... 29 Oct 2018, 01:39
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Solution


Given:
    • The median of n consecutive odd integers = 30
    • The fifth term = 33

To find:
    • The last term of the sequence

Approach and Working:
    • Let us assume that the ‘n’ consecutive odd integers are {a, a + d, a + 2d, a + 3d, ……a + (n-1)d}
    • The ‘n’ consecutive odd integers can be arranged in either decreasing order or increasing order
    • Per our conceptual knowledge, the difference between any two consecutive odd integers is 2

Case 1: They are arranged in increasing order
    • In this case, the value of d = 2, since they are arranged in increasing order
    • Given that the median of this set = 30, which is an even number
      o For median to be an even number, the number of terms must be even,
      o That is, median = average of middle two terms = \(\frac{(odd + odd)}{2}\)

Note: If the number of terms is odd, then median = the middle term, which is odd

    • Thus, median = \((t_{n/2} + t_{n/2 + 1})/2 = 30\)
      o Implies, \(t_{n/2} = 29\) and \(t_{n/2 + 1} = 31\)
      o \(t_{n/2} = a + (\frac{n}{2} -1)d = a + \frac{nd}{2} – d = 29\)

    • Substituting d = 2 in the above equation, we get, a + n – 2 = 29
      o Implies, a + n = 31 ……………………………………………… (1)

    • We are also given that \(t_5 = 33\)
      o Thus, a + (5 - 1)*2 = 33
      o Therefore, we get the value of a = 33 – 8 = 25

    • Substituting this value of a in equation (1), we get, n = 31 – 25 = 6
    • Therefore, the last term = a + (6 - 1)*d = 25 + 10 = 35

But we do not have any such answer choice, so let’s see the other case.

Case 2: They are arranged in decreasing order
    • In this case, the value of d = -2, since they are arranged in decreasing order
    • Thus, median = \((t_{\frac{n}{2}} + t_{\frac{n}{2} + 1})/2 = 30\)
    • Implies, \(t_{\frac{n}{2}} = 31\) and \(t_{\frac{n}{2} + 1} = 29\)
    • \(t_{\frac{n}{2}} = a + (\frac{n}{2} -1)d = a + \frac{nd}{2} – d = 31\)
      o Substituting the value of d as -2, we get, a - n + 2 = 31
         Implies, a - n = 29 ……………………………………………… (2)

    • We are also given that \(t_5 = 33\)
      o Which implies, a + (5 -1) * (-2) = 33
      o Therefore, a = 33 + 8 = 41

    • Substituting this value of a in equation (2), we get, n = 41 – 29= 12
    • Therefore, the last term = a + (12 - 1)*d = 41 - 22 = 19

Hence, the correct answer is option A.

Answer: A

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The median of n consecutive odd integers is 30. If the fifth term..... 29 Oct 2018, 05:24
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As given ,

Median = 30

Since consecutive numbers , they are in AP
So ,

first term (a)+ last term (l) / 2 = 30
therefore ,

a+l = 60 -----------(i)

now ,

fifth term = a +(n-1)d
33= a+ 4d
a= 33 -4d------------(ii)

Substituting value of a in equation i

33-4d+l=60
l= 27 - 4d

Since it is odd number we can take common difference as ( 1,2,3,5,7 ) and check answer

therefore ,

l = 27- 4X2
l= 27-8
l= 19

Simple as that. Great Question :)
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The median of n consecutive odd integers is 30. If the fifth term..... 01 Oct 2019, 10:29
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gvij2017
I have one query here.
Median is calculated when we arrange all elements in increasing order.
Am I wrong?
Show more

yes, you have to arranage in ascending or descending
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The median of n consecutive odd integers is 30. If the fifth term..... 08 Aug 2021, 21:43
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But when the question says consecutive odd integers, it is implied that the sequence is increasing. If the sequence is decreasing, the question must make it clear that it is a the elements in the sequence are decreasing consecutively.
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The median of n consecutive odd integers is 30. If the fifth term..... 13 Sep 2021, 08:06
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I assume you mean a consecutive integer sequence in the problem. Consecutive integers 'MUST' be an increasing sequence unless mentioned otherwise. The GMAT version is as below:

"The numbers - 2, - 1, 0, 1, 2, 3, 4, 5 are consecutive integers. Consecutive integers can be represented by n,n+1,n+2,n+3,...,where n is an integer.The numbers 0,2,4,6,8 are consecutive even integers, and 1, 3 , 5 , 7 , 9 are consecutive integers . Consecutive even integers can be represented by 2 n , 2 n + 2 , 2 n + 4 , . . . , and consecutive odd integers can be represented by 2n + 1, 2n + 3, 2n + 5, .. ., where n is an integer. "

Going by this stated version along with the lack of any qualified statement on the sequence in the problem statement, the sequence has to be increasing in nature.

Now, if my assumption is wrong and you don't mean a sequence of consecutive integers, the other possibility could be that they are just a set of consecutive integers arranged in a pattern. Since the pattern is not mentioned, there can be umpteen number of possible sequencing even while satisfying the other given conditions in the problem. For example:
The sequence could be defined by a very crude function as:

A(n) = 23, if n=1;
A(n) = 27, if n=2;
A(n) = 21, if n=3;

So, the last term ('not the min or max') could be any odd number between 21 and 43 (with only a few exclusions).

Please do let me know if I am horribly wrong anywhere in my reasoning.
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The median of n consecutive odd integers is 30. If the fifth term..... 28 Feb 2024, 08:37
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how can consecutive odd number contains 30 as median because 30 is even number i didn't understand that ?­
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The median of n consecutive odd integers is 30. If the fifth term..... 28 Feb 2024, 09:17
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madhur0899
how can consecutive odd number contains 30 as median because 30 is even number i didn't understand that ?­
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The median of an even count of elements is the average of the two middle terms when they are in order. For example, the median of {29, 31} is (29 + 31)/2 = 30.
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The median of n consecutive odd integers is 30. If the fifth term..... 11 Nov 2024, 21:57
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it can be increasing or decreasing. must be in an order

gvij2017
I have one query here.
Median is calculated when we arrange all elements in increasing order.
Am I wrong?
Show more
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