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29 Nov 2014, 02:28
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Set K consists of 4 integers. What is the median of K?
(1) The average (arithmetic mean) of K is 3.
(2) The mode of K is 3.
I found this question tough to crack.
Can someone explain the way to solve this question ??
(1) The average (arithmetic mean) of K is 3.
(2) The mode of K is 3.
I found this question tough to crack.
Can someone explain the way to solve this question ??
29 Nov 2014, 03:31
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Both statements alone are clearly insufficient.
Taking them together we know that the sum of the integers is 12., and that three appears atleast twice in the set.
So either all 4 of the integers are 3 OR one of them is less than three and other one is greater than 3.
Either way 2md and the 3rd digit in the set will be 3 so median = (3+3)/2 = 3. Sufficient.
Hope it helps!
Taking them together we know that the sum of the integers is 12., and that three appears atleast twice in the set.
So either all 4 of the integers are 3 OR one of them is less than three and other one is greater than 3.
Either way 2md and the 3rd digit in the set will be 3 so median = (3+3)/2 = 3. Sufficient.
Hope it helps!
General Discussion
29 Nov 2014, 15:08
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K is a set of four integers: y,x, z, t
Question: Whats is median? When we line the integers up in order (if let's say x<y<z<t) then it will look like x, y, z, t, so the median will be equal to (y+z)/2. If we would have an odd number of integers the median would be the middle one after lining them up in order ( in a set of 5,9,11,12,20 the median is 11)
(1) Insufficient. It would be sufficient if the set would contain consequent integers (then mean = median), but as we don't know if that is the case, just a mean of set K gives us this (x+y+z+t)/4 = 3 or (x+y+z+t) = 12 , which is not enough to answer the question.
(2) Insufficient. The mode just tells us that 3 is used more times than any other number in the set. That would look like: (x, y,3,3) or (3,3,z,t,) or (x,3,3,t) or even (3,3,3,3) and so on. Either way we cannot tell what actually the set K looks like.
(1)+(2) Sufficient. (3+3+y+z) = 12, so y+z = 6. Our question what (y+z)/2 equals to can be answered: 6/2=3
Question: Whats is median? When we line the integers up in order (if let's say x<y<z<t) then it will look like x, y, z, t, so the median will be equal to (y+z)/2. If we would have an odd number of integers the median would be the middle one after lining them up in order ( in a set of 5,9,11,12,20 the median is 11)
(1) Insufficient. It would be sufficient if the set would contain consequent integers (then mean = median), but as we don't know if that is the case, just a mean of set K gives us this (x+y+z+t)/4 = 3 or (x+y+z+t) = 12 , which is not enough to answer the question.
(2) Insufficient. The mode just tells us that 3 is used more times than any other number in the set. That would look like: (x, y,3,3) or (3,3,z,t,) or (x,3,3,t) or even (3,3,3,3) and so on. Either way we cannot tell what actually the set K looks like.
(1)+(2) Sufficient. (3+3+y+z) = 12, so y+z = 6. Our question what (y+z)/2 equals to can be answered: 6/2=3
