• Welcome to the Kancolle Wiki!
  • If you have any questions regarding site content, account registration, etc., please visit the KanColle Wiki Discord

Difference between revisions of "User:Jigaraphale/Sandbox/10"

From Kancolle Wiki
Jump to navigation Jump to search
Line 20: Line 20:
 
;Examples
 
;Examples
 
*[[Kongou Kai Ni]] equipped with 2 {{Equipment/Link|35.6cm Twin Gun Mount Kai Ni|text=IJN 35.6cm Twin K2}}:
 
*[[Kongou Kai Ni]] equipped with 2 {{Equipment/Link|35.6cm Twin Gun Mount Kai Ni|text=IJN 35.6cm Twin K2}}:
 +
<math>\text{ACC}_\text{bonus} = C_{35.6 cm} \times \sqrt{N_{35.6 cm}} + C_{35.6 cm Kongou-class} \times \sqrt{N_{35.6 cm}} = ( 4 + 3 ) \times \sqrt{2} = </math>
  
  

Revision as of 20:50, 19 March 2023

Table Explainer

When equiping '"Large Caliber Main Guns" on a FBB/BB/BBV, the resulting accuracy bonus/penalty is:

Fit Formula

[math]\displaystyle{ \text{ACC}_\text{bonus} = \sum^{\text{All Groups}} C_{Group} \times \sqrt{N_{Group}} \times M }[/math]

With
  • [math]\displaystyle{ \text{All Groups} }[/math] the gun groups and sub-groups defined in the following tables.
  • [math]\displaystyle{ C_{Group} }[/math] the accuracy modifier of the group, given in the following table.
    • When a ship has additional bonuses to a group compared to her type, this bonus is summed as a separate "Group"
  • [math]\displaystyle{ N_{Group} }[/math] the number of guns of a same group.
  • [math]\displaystyle{ M }[/math] the Marriage bonus of 0.6 when applicable, 1 else.
    • This bonus is applied in all cases, so penalties are reduced by 0.6, as well as bonuses.
    • For Iowa-class with the USN 16" Mk7 guns, M may be better, the observed bonu being [math]\displaystyle{ \text{ACC}_\text{bonus} = 6 \times \sqrt{N_{16inch Mk.7}} + 12 \times \sqrt{N_{16inch Mk.7 GFCS}} }[/math].

Do note that speed modding ships (to Fast+) has been observed to worsen the penalties on certain ships.

Examples

[math]\displaystyle{ \text{ACC}_\text{bonus} = C_{35.6 cm} \times \sqrt{N_{35.6 cm}} + C_{35.6 cm Kongou-class} \times \sqrt{N_{35.6 cm}} = ( 4 + 3 ) \times \sqrt{2} = }[/math]