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Bunuel
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The numbers in set P denote the distance of certain positive integers 03 Feb 2023, 08:00
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The numbers in set P denote the distance of certain positive integers from -1 on the number line. The numbers in set Q denote the distance of the same integers from 1 on the number line. Which of the following statements is true about the standard deviation of the sets P and Q?

A. Standard Deviation (P) = Standard Deviation (Q)
B. Standard Deviation (P) = - Standard Deviation (Q)
C. Standard Deviation (P) = Standard Deviation (Q) + 2
D. Standard Deviation (P) = 2* Standard Deviation (Q)
E. None of the above
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A
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The numbers in set P denote the distance of certain positive integers 13 Feb 2023, 08:55
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Bunuel
The numbers in set P denote the distance of certain positive integers from -1 on the number line. The numbers in set Q denote the distance of the same integers from 1 on the number line. Which of the following statements is true about the standard deviation of the sets P and Q?

A. Standard Deviation (P) = Standard Deviation (Q)
B. Standard Deviation (P) = - Standard Deviation (Q)
C. Standard Deviation (P) = Standard Deviation (Q) + 2
D. Standard Deviation (P) = 2* Standard Deviation (Q)
E. None of the above
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Let us choose appropriate integers.

Let the original set be \({ 6,8,11,15,20 }\)

P \(= {7,9,12,16,21}\)

Q \(= {5,7,10,14,19}\)

Mean of P \(= 13\)
Mean of Q \(= 11\)

Deviation from Mean for P \(={ 6,4,1,3,8}\)
Devaition from Mean for Q \(= { 6,4,1,3,8}\)

Since both P and Q have the same deviation from the mean, they will have the same SD.

Ans A

Note: A smaller appropriate mother set could also be chosen to see the relation between P and Q

Hope it helps.
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The numbers in set P denote the distance of certain positive integers 13 Feb 2023, 22:46
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Bunuel
The numbers in set P denote the distance of certain positive integers from -1 on the number line. The numbers in set Q denote the distance of the same integers from 1 on the number line. Which of the following statements is true about the standard deviation of the sets P and Q?

A. Standard Deviation (P) = Standard Deviation (Q)
B. Standard Deviation (P) = - Standard Deviation (Q)
C. Standard Deviation (P) = Standard Deviation (Q) + 2
D. Standard Deviation (P) = 2* Standard Deviation (Q)
E. None of the above
Show more

Key information to notice in this question is the fact that all the distances are of "positive integers" which means that all the numbers lie on the same side of -1.

Let's assume that there are n numbers and the distances of those numbers from -1 are \(d_1 , d_2, d_3 , .... d_n\)

So set P = {\(d_1, \quad d_2, \quad d_3, \quad .... \quad,\quad d_n\)}

SD of P = x

Now the distances of those numbers from 1 will be \(d_1-2 , d_2-2, d_3-2 , .... d_n-2\)

We can visualize this over a number line

----------- -1 ----------------- 0 ----------------- 1 ----------------------- n ----------------

----------- -1 <----------------------------- d ----------------------------> n ---------------

----------- -1 -------------------------------------- 1 <-------(d-2)------> n ---------------

Therefore Q = {\(d_1-2, \quad d_2-2, \quad d_3-2, \quad .... \quad,\quad d_n-2\)}

If the same constant is added or subtracted from every term in the set, the SD of the set doesn't change.

Hence SD(P) = SD(Q)

Option A
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The numbers in set P denote the distance of certain positive integers 17 Nov 2025, 03:19
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Bunuel KarishmaB HOW TO SOLVE THIS & HOW TO CHOOSE NUMBER FROM THE SET
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shubhim20
Bunuel KarishmaB HOW TO SOLVE THIS & HOW TO CHOOSE NUMBER FROM THE SET
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I think you are asking how to choose the mother set?

Mother set can be any set.

Let M be \(1,2,3\)

P \(= 2,3,4\) : Distance of each member of mother set from \(-1\)

Q \(= 0,1,2\) : Distance of each member of mother set from \(1\)


Mean of P \(= 3\)
Mean of Q \(=1\)

Deviation of Set P from its mean \(= {1,0, 1}\)
Deviation of set Q from its mean \(= {1,0,1}\)

Since both sets have the same deviation from their respective means, hence both will have the same SD.

Hope it's clear now?
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The numbers in set P denote the distance of certain positive integers 17 Nov 2025, 07:12
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Bunuel
The numbers in set P denote the distance of certain positive integers from -1 on the number line. The numbers in set Q denote the distance of the same integers from 1 on the number line. Which of the following statements is true about the standard deviation of the sets P and Q?

A. Standard Deviation (P) = Standard Deviation (Q)
B. Standard Deviation (P) = - Standard Deviation (Q)
C. Standard Deviation (P) = Standard Deviation (Q) + 2
D. Standard Deviation (P) = 2* Standard Deviation (Q)
E. None of the above
Show more

Given a set of positive integers (they can take values 1, 2, 3, 4, 5, etc. only), if the distance of a number from -1 is d, its distance from 1 will be (d-2). Think about it on the number line. Say the number 5. It is 6 units away from -1 and only 4 units away from 1. So 6 will be in set P and 4 will be in set Q.
This means that the numbers in Q will be (each number in set P - 2).
If you subtract 2 from each number of a set, its mean decreases by 2 but its SD remains unchanged.
That is why the SD of P and Q will be the same.

Answer (A)
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