Say the first five integers are x, y, z, p and q; thus, z = 65 (Median - given); Again, say the greatest five integers are r, s, t, u and v; thus, v = x + 60 (given that range is 60). Since there are 11 integers, the 6th integer would be median = 90.
So, the 11 integers are:
x, y, 65, p, q, 90, r, s, t, u, (x + 60)
We have to find out the maximum possible range of r, s, t, u, (x + 60). Or, the maximum possible value of x + 60 – r.
To get the maximum possible value of x + 60 – r, we must maximize x and minimize r. The maximum possible value of x = 63 (= 65 – 1 – 1) and the minimum possible value of r = 91 (= 90 + 1) (Note that the integers are distinct.)
Thus, the maximum possible value of x + 60 – r = 63 + 60 – 91 = 32.
The correct answer: C
Hope this helps!
-Jay
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