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If the median annual salary of the 127 employees in a certain 14 Dec 2023, 06:07
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If the median annual salary of the 127 employees in a certain department of Company X is $35,000, which of the following must be true?

I. At least 64 of the employees have an annual salary that is $35,000 or more

II. At least 63 of the employees have an annual salary that is less than $35,000

III. At most 64 of the employees have an annual salary that is $35,000 or more.

A) I only
B) II only
C) III only
D) I and II only
E) I, II, and III

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Bunuel
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If the median annual salary of the 127 employees in a certain 14 Dec 2023, 06:23
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Khk_Beastmode
If the median annual salary of the 127 employees in a certain department of Company X is $35,000, which of the following must be true?

I. At least 64 of the employees have an annual salary that is $35,000 or more

II. At least 63 of the employees have an annual salary that is less than $35,000

III. At most 64 of the employees have an annual salary that is $35,000 or more.

A) I only
B) II only
C) III only
D) I and II only
E) I, II, and III
Show more

The median of an odd count of terms is the middle number when the numbers are in order. Thus, the 64th highest salary is $35,000:


    \(x_1 \leq x_2 \leq ... \leq x_{63} \leq (x_{64} = $35,000)\leq x_{65} \leq ... \leq x_{126} \leq x_{127}\).

Let's evaluate the options:

I. At least 64 of the employees have an annual salary that is $35,000 or more

    This must be true, since terms from \(x_{64}\) to \(x_{127}\) must be at least $35,000.

II. At least 63 of the employees have an annual salary that is less than $35,000

    This is not necessarily true. For example, all terms from \(x_1\) till \(x_{64}\) can be $35,000, making this statement false.

III. At most 64 of the employees have an annual salary that is $35,000 or more.

    This is also not necessarily true. For example, all terms can be $35,000, making this statement false.

Answer: A.
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ostrick5465
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If the median annual salary of the 127 employees in a certain 16 Dec 2023, 07:37
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Khk_Beastmode
If the median annual salary of the 127 employees in a certain department of Company X is $35,000, which of the following must be true?

I. At least 64 of the employees have an annual salary that is $35,000 or more

II. At least 63 of the employees have an annual salary that is less than $35,000

III. At most 64 of the employees have an annual salary that is $35,000 or more.

A) I only
B) II only
C) III only
D) I and II only
E) I, II, and III
Show more

The median is the 64th in the set. the 64th number in the set is 35,000

I. Each of number from the 64th to the 127th is $35,000 or more. There are 64 values from 64 to 127. => True
II. The 63rd, 62nd, 61st values can be 35,000 => False
III. Same to II, The 63rd, 62nd, 61st values can be 35,000, so the number of employees who have an annual salary that is $35,000 or more can be more than 64. => False

=> Choice A
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If the median annual salary of the 127 employees in a certain 08 Apr 2025, 06:13
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Hi Bunuel, can you please explain the difference bw "Atleast" and "At most" here in this question. In option 1 too, cant the values be all equal to 35,000. Thanks
Bunuel
Khk_Beastmode
If the median annual salary of the 127 employees in a certain department of Company X is $35,000, which of the following must be true?

I. At least 64 of the employees have an annual salary that is $35,000 or more

II. At least 63 of the employees have an annual salary that is less than $35,000

III. At most 64 of the employees have an annual salary that is $35,000 or more.

A) I only
B) II only
C) III only
D) I and II only
E) I, II, and III

The median of an odd count of terms is the middle number when the numbers are in order. Thus, the 64th highest salary is $35,000:



\(x_1 \leq x_2 \leq ... \leq x_{63} \leq (x_{64} = $35,000)\leq x_{65} \leq ... \leq x_{126} \leq x_{127}\).

Let's evaluate the options:

I. At least 64 of the employees have an annual salary that is $35,000 or more


This must be true, since terms from \(x_{64}\) to \(x_{127}\) must be at least $35,000.

II. At least 63 of the employees have an annual salary that is less than $35,000


This is not necessarily true. For example, all terms from \(x_1\) till \(x_{64}\) can be $35,000, making this statement false.

III. At most 64 of the employees have an annual salary that is $35,000 or more.


This is also not necessarily true. For example, all terms can be $35,000, making this statement false.

Answer: A.
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If the median annual salary of the 127 employees in a certain 08 Apr 2025, 06:26
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Aishna1034
Hi Bunuel, can you please explain the difference bw "Atleast" and "At most" here in this question. In option 1 too, cant the values be all equal to 35,000. Thanks
Bunuel
Khk_Beastmode
If the median annual salary of the 127 employees in a certain department of Company X is $35,000, which of the following must be true?

I. At least 64 of the employees have an annual salary that is $35,000 or more

II. At least 63 of the employees have an annual salary that is less than $35,000

III. At most 64 of the employees have an annual salary that is $35,000 or more.

A) I only
B) II only
C) III only
D) I and II only
E) I, II, and III

The median of an odd count of terms is the middle number when the numbers are in order. Thus, the 64th highest salary is $35,000:



\(x_1 \leq x_2 \leq ... \leq x_{63} \leq (x_{64} = $35,000)\leq x_{65} \leq ... \leq x_{126} \leq x_{127}\).

Let's evaluate the options:

I. At least 64 of the employees have an annual salary that is $35,000 or more


This must be true, since terms from \(x_{64}\) to \(x_{127}\) must be at least $35,000.

II. At least 63 of the employees have an annual salary that is less than $35,000


This is not necessarily true. For example, all terms from \(x_1\) till \(x_{64}\) can be $35,000, making this statement false.

III. At most 64 of the employees have an annual salary that is $35,000 or more.


This is also not necessarily true. For example, all terms can be $35,000, making this statement false.

Answer: A.
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"At least" means greater than or equal to — so “at least 64 employees earn $35,000 or more” allows for exactly 64, or more than 64.

"At most" means less than or equal to — so “at most 64 employees earn $35,000 or more” means 64 or fewer.

Now your example:

Yes, all 127 salaries could be equal to $35,000. That would still satisfy Statement I (at least 64 earning $35,000 or more), but would violate Statement III, because in that case more than 64 employees earn $35,000 or more — not “at most” 64.

So the confusion clears up when you realize:

  • "At least" is fine with equality or more.
  • "At most" becomes false if you go over that number.
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If the median annual salary of the 127 employees in a certain 08 Apr 2025, 07:35
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A follow up to the discussion Bunuel, in the 3rd statement we are said that its At most 35000, meaning that it has to be 35000 or more only 64 times max. So, if we take the more than 35000 case, that can only be 64 times max right? So doesnt this fulfill the condition statement. Am I inferring something incorrectly here?
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If the median annual salary of the 127 employees in a certain 08 Apr 2025, 07:43
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Aishna1034
A follow up to the discussion Bunuel, in the 3rd statement we are said that its At most 35000, meaning that it has to be 35000 or more only 64 times max. So, if we take the more than 35000 case, that can only be 64 times max right? So doesnt this fulfill the condition statement. Am I inferring something incorrectly here?
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Yes - you're making a mistake in how you're interpreting “at most.”

Statement III says:

"At most 64 employees have a salary of $35,000 or more."

That means the number of employees earning $35,000 or more must be ≤ 64.

But we know the 64th employee earns exactly $35,000 (since it's the median in a list of 127). That alone already gives 64 people earning $35,000 or more - and if even one more person earns $35,000 or more, it becomes 65, violating the “at most 64” condition.

But it's entirely possible for more than 64 people to earn $35,000 or more - for example, all 127 salaries could be $35,000 or more. That means Statement III does not have to be true in every case, so it's not a must.

Hope it's clear.
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