Let
- x(k) ≡ % of the total value out of the sample space of possible values for some kth modifier
- r(k) ≡ relevancy of some kth modifier to cited build such that r(k) ∈ {1, 2, 3}
Then, for each kth modifier, there exists a product p(k) = x(k) × r(k).
Thus, for some item with n such modifiers, define the score for said item as follows:
S = (5/9) × (Σ_(k = 1)^n p(k)) = (5/9) × (p(1) + p(2) + ⋯ + p(n))
Thus
(1.00) × (3) = 3.00 ~ +2 to Paladin Skill Levels
(1.00) × (1) = 1.00 ~ +10% Faster Cast Rate
(0.73) × (1) ≈ 0.73 ~ +17 to Attack Rating
(1.00) × (3) = 3.00 ~ +20 to Dexterity
(0.85) × (3) ≈ 2.55 ~ +51 to Life
(0.83) × (3) ≈ 2.50 ~ All Resistances +17%
S ≈ 10*(12.78/18.00) ≈ 7.10
My score: 7.10/10.00
Under this system, a rare item possessing 6 modifiers, each with priority 3 for a given build, each at 80% of the maximum possible value, would score 8.00/10.00.
Thus, an item with score S is a trophy if and only if S ≥ 8.00/10.00.
As such, I do not consider your item a trophy.
This post was edited by SagaciousCRS on Nov 25 2019 09:32pm