Let Ω be a sample space such that Ω = {x
1,x
2,...,x
n} being the
n=9 value and the associated identity set [I
n] as defined by Kerigis
et al.1:
I1 = ShiningDrake
I2 = UncertainKitten
I3 = Zakeri
I4 = Affinity
I5 = Nietz
I6 = Serpentarius
I7 = Sol
I8 = Pesco
I9 = Ramus
For each subset x ⊂ Ω, a f(x) value is assigned such that f(x) = n
δ/t, being
nδ defined as a subset of the total number of MotK posts
n such that it includes only the posts in UGW and being
t defined by the time spent online.
In this manner, we obtain a set of values for Ω, based on the current available data
2,3,4,5,6,7,8,9,10.
x1 = 14,774
x2 = 21,791
x3 = 39,600
x4 = 34,098
x5 = 21,526
x6 = 16,997
x7 = 11,564
x8 = 23,139
x9 = 41,747
From this set, we can easily derive:
- An arithmetic mean μ(x) = 25,026
- A median μ
1/2(x) = 21,791
- A variance Var(X) = 118,922
- A standard deviation α = 10,905
Applying the values of μ α derived for the Ω set, and assigning a value of deviation from the mean, defined by D
n = [x
n- μ(x)]/α for every member of the Ω set, we arrive to the values:
D1 = 0,940
D2 = 0,296
D3 = 1,336
D4 = 0,832
D5 = 0,321
D6 = 0,736
D7 = 1,235
D8 = 0,173
D9 = 1,533
We therefore arrive to the value of D = 1,336 for the element x
3 of the Ω set that is, the element with the highest deviation from the mean, to be referred from now on as the
omega deviant.
Following I
3, we arrive to Zakeri as the identity of the
omega deviant.
As it is plain to see that a title such as
omega deviant can only belong to scum, we determine here that Zakeri is the most likely to be scum in this player set.
##QED Vote: ZakeriUnless I've forgotten some fundamental rule of mathematics, 1,533 > 1,336. See me after class.