The median of 11 different positive integers is 15 and seven of those 11 integers are 8, 12, 20, 6, 14, 22, and 13.
Statement I: The difference between the averages of four largest integers and four smallest integers is 13.25.
Statement II: The average of all the 11 integers is 16.
Which of the following statements would be sufficient to find the largest possible integer of these numbers?
Median of 11 integers is 15, => In ascending order 6th integer = 15
=> Numbers = 6,8,12,13,14,15,20,22
Statement I : Average of four smallest = 6 + 8 + 12 + 13
= $$\frac{39}{4} = 9.75$$
It is given that, avg of 4 largest - avg of 4 smallest = 13.25
=> Average of 4 largest = 13.25 + 9.75 = 23
=> Sum of 4 largest numbers = 23 * 4 = 92
So, we can easily allocate other three numbers different minimum values but more than 15 and maximize the remaining one value
Thus, statement I is sufficient.
Statement II : Sum of 11 integers = 11 * 16 = 176
Sum of given 8 integers = 6+8+12+13+14+15+20+22 = 110
Sum of remaining numbers = 176 - 110 = 66
So, we can easily allocate other three numbers different minimum values but more than 15 and maximize the remaining one value
Thus, statement II is sufficient.
$$\therefore$$ Either statement I or II is sufficient.
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