hey Parallel chase..parallel_chase wrote:The answer is indeed D.
6 consecutive integers, n = lowest integer * greatest integer
Statement I
the greatest number is 20
the smallest number = 20-6 +1 = 15
n= 15*20
sufficient.
Statement II
The mean is 17.5
In an evenly spaced set MEAN = MEDIAN
The integers above the median = 18,19,20
The integers below the median = 15,16,17
n=15*20
Sufficient.
Hence D is the answer.
First number : kdferm wrote:If n is the product of the least and the greatest of 6 consecutive integers, what is the value of n?
(1) The greatest of the 6 consecutive integers is 20.
(2) The average(arithmetic mean) of the 6 consecutive integers is 17.5.
Can someone help me on this question....
GOOD NEWS CRAMYA!! YOU DID NOT MISS ANYTHING BRO!! YAYcramya wrote:Stmt I
If the greatest number is given then we can get to the lowest then to n
SUFF
Stmt II
Avg is 17.5 Sum=105
Since they are consecutive integers only one unique set of 6 consecutive integers will give a sum of 105. Even if one number changes the sum will be different
Hence we can find the smallest and greates then n from here
Hope I dint miss something here.
D)
In consecutive integers, why don't we consider the question as an even/odd consecutive integers also ??
I guess this is where being simple minded helps but I took this approach.dferm wrote:If n is the product of the least and the greatest of 6 consecutive integers, what is the value of n?
(1) The greatest of the 6 consecutive integers is 20.
(2) The average(arithmetic mean) of the 6 consecutive integers is 17.5.
Can someone help me on this question....
