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28 Jul 2023, 08:00
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Difficulty:
75%
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Question Stats:
62% (02:11) correct
38%
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In a set of k consecutive integers, where k is two-digit number, the largest number is 21. What is the average (arithmetic mean) of the set in terms of k ?
A. \(\frac{21k}{2}\)
B. \(\frac{21 - k}{2}\)
C. \(\frac{41 - k}{2}\)
D. \(\frac{42 - k}{2}\)
E. \(\frac{43 - k}{2}\)
A. \(\frac{21k}{2}\)
B. \(\frac{21 - k}{2}\)
C. \(\frac{41 - k}{2}\)
D. \(\frac{42 - k}{2}\)
E. \(\frac{43 - k}{2}\)
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28 Jul 2023, 08:27
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Given: In a set of k consecutive integers, where k is two-digit number, the largest number is 21.
Asked: What is the average (arithmetic mean) of the set in terms of k ?
First term a = 21
common difference = -1
Last term l = 21 + (k-1)(-1) = 21 + 1-k = 22 -k
Arithmetic mean = Sum / k = k/2(a+l)/k = (21 + 22 - k)/2 = (43-k)/2
IMO E
Asked: What is the average (arithmetic mean) of the set in terms of k ?
First term a = 21
common difference = -1
Last term l = 21 + (k-1)(-1) = 21 + 1-k = 22 -k
Arithmetic mean = Sum / k = k/2(a+l)/k = (21 + 22 - k)/2 = (43-k)/2
IMO E
28 Jul 2023, 08:27
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Bunuel
The average of a set of consecutive integers is the middle number if the count of numbers (k) is odd, or the average of the two middle numbers if k is even.
In this case, the largest number is 21 and there are k consecutive numbers. So, the smallest number is 21 - k + 1.
The average of the set would be (smallest number + largest number) / 2 = (21 + 21 - k + 1) / 2 = (42 - k + 1) / 2 = (43 - k) / 2.
So, the correct answer is E. (43−k)/2.
