Total stat value = ∑ i = 0 a added stat i ∗ ( 1 + ∑ j = 0 b increased stat j − ∑ k = 0 c reduced stat k ) ∗ ∏ l = 0 d ( 1 + more stat l ) ∗ ∏ m = 0 e ( 1 − less stat m ) \color [rgb]{0.6392156862745098,0.5529411764705883,0.42745098039215684}{\begin{aligned}{\text{Total stat value}}=&\sum _{i=0}^{a}{\text{added stat}}_{i}*\\&\left(1+\sum _{j=0}^{b}{\text{increased stat}}_{j}-\sum _{k=0}^{c}{\text{reduced stat}}_{k}\right)*\\&\prod _{l=0}^{d}(1+{\text{more stat}}_{l})*\prod _{m=0}^{e}(1-{\text{less stat}}_{m})\end{aligned}}
This template is used to display how stats are calculated in this game.
{{Stat total|Duration}}
yields:
Total Duration value = ∑ i = 0 a added Duration i ∗ ( 1 + ∑ j = 0 b increased Duration j − ∑ k = 0 c reduced Duration k ) ∗ ∏ l = 0 d ( 1 + more Duration l ) ∗ ∏ m = 0 e ( 1 − less Duration m ) \color [rgb]{0.6392156862745098,0.5529411764705883,0.42745098039215684}{\begin{aligned}{\text{Total Duration value}}=&\sum _{i=0}^{a}{\text{added Duration}}_{i}*\\&\left(1+\sum _{j=0}^{b}{\text{increased Duration}}_{j}-\sum _{k=0}^{c}{\text{reduced Duration}}_{k}\right)*\\&\prod _{l=0}^{d}(1+{\text{more Duration}}_{l})*\prod _{m=0}^{e}(1-{\text{less Duration}}_{m})\end{aligned}}