Not to be confused with Devotion.
For the improved perk, see Enhanced devoted.
This article has a calculator here.
Calculators determine experience and costs based on real-time prices from the Grand Exchange Market Watch.
3% chance per rank on being hit that protection prayers will work at 100% (or 75% in PvP) for 3 seconds.
Release date 25 January 2016 (Update)
Gizmo type Armour
Maximum rank 3
Invention level required 74

Devoted is an Invention perk that has a chance each hit of replicating the Devotion ability for 3 seconds. This effect does not put the ability itself on cooldown. Devoted has an effective level requirement of 74 as the materials required can only be unlocked at that level; however, enhanced devoted can be utilised at any Invention level for the cost of 2 perk slots. It can be created in armour gizmos.

Any type of damage, including typeless damage and self-inflicting damage, can activate the perk. The hit that activates Devoted will also be affected by the perk's effect. Devoted will play the same animation as Devotion whenever it activates, but uses its own icon in the buffs/debuffs interface. In player-versus-player situations the icon does not appear.

Devoted will be superseded by enhanced devoted if both are active.

Activation chance
Rank Chance
1 3%
2 6%
3 9%


  • The average ratio of damage taken, $ r_{avg} $, from Devoted to that of without Devoted is
$ r_{avg} = \frac{\sum\limits_{n=0}^{\infty}\left(1-p_{R}\right)^{n}p_{R}\left[\left(\sum\limits_{i=1}^{n}d^{(0)}_{n,i}\right) + \left\lceil{\frac{t_{d}}{t_{AS}}}\right\rceil \right]}{\sum\limits_{n=0}^{\infty}\left(1-p_{R}\right)^{n}p_{R}\left[\sum\limits_{i=1}^{n}d^{(0)}_{n.i} + \sum\limits_{i=1}^{\left\lceil{\frac{t_{d}}{t_{AS}}}\right\rceil}d^{(1)}_{n.i} \right]} $
  • The average damage reduction is then, after some rearranging,
$ 1-r_{avg} = \frac{\sum\limits_{n=0}^{\infty}\left(1-p_{R}\right)^{n}p_{R}\sum\limits_{i=1}^{\left\lceil{\frac{t_{d}}{t_{AS}}}\right\rceil}\left(d^{(1)}_{n.i} - 1\right)}{\sum\limits_{n=0}^{\infty}\left(1-p_{R}\right)^{n}p_{R}\left[\sum\limits_{i=1}^{n}d^{(0)}_{n.i} + \sum\limits_{i=1}^{\left\lceil{\frac{t_{d}}{t_{AS}}}\right\rceil}d^{(1)}_{n.i} \right]} $
  • The average ratio of damage taken between procs (BP), $ r_{avg}^{BP} $, from Devoted to that of without Devoted is
$ r_{avg}^{BP} = \sum\limits_{n=0}^{\infty}\left(1-p_{R}\right)^{n}p_{R}\frac{\left(\sum\limits_{i=1}^{n}d^{(0)}_{n.i}\right) + \left\lceil{\frac{t_{d}}{t_{AS}}}\right\rceil }{\left[\sum\limits_{i=1}^{n}d^{(0)}_{n.i} + \sum\limits_{i=1}^{\left\lceil{\frac{t_{d}}{t_{AS}}}\right\rceil}d^{(1)}_{n.i} \right]} $
  • The average damage reduction between procs is then, after some rearranging,
$ 1-r_{avg}^{BP} = \sum\limits_{n=0}^{\infty}\left(1-p_{R}\right)^{n}p_{R}\frac{\sum\limits_{i=1}^{\left\lceil{\frac{t_{d}}{t_{AS}}}\right\rceil}\left(d^{(1)}_{n.i} - 1\right)}{\left[\sum\limits_{i=1}^{n}d^{(0)}_{n.i} + \sum\limits_{i=1}^{\left\lceil{\frac{t_{d}}{t_{AS}}}\right\rceil}d^{(1)}_{n,i} \right]} $
  • A calculator for this is at the top of this page.
  • Assumptions :
    • The enemy is always attacking with the same style.
    • The enemy is always attacking at the same attack speed.
    • The enemy always hits between their minimum and maximum damage (and never misses).
  • $ R $ is the rank of the Devoted perk.
  • $ p_{R} $ is the proc chance of Devoted to activate (if the Devoted perk is on level 20 gear, then this value is multiplied by 1.1).
  • $ \textstyle\sum_{n=0}^{\infty}\left(1-p\right)^{n}p = 1 $ when $ 0 \leq p < 1 $ or $ \left|1 - p\right| < 1 $. This represents summing over all possibilities where integer $ n \in [0,\infty) $ represents the amount of hits prior to the proc of Devoted. The probability of Devoted proccing on hit $ {n+1} $ is therefore $ \left(1-p\right)^{n}p $.
  • $ t_{d} $ is the time that Devoted is active. This is taken to be 5 game ticks.
  • $ t_{AS} $ is the attack speed of the enemy in game ticks.
  • $ d^{(j)}_{n,i} $ is the $ i^{th} $ random value uniformly sampled between the enemy's minimum hit and maximum hit. The $ j $ describes different sets of hits. The sets are regenerated for every new value of $ n $.
    • $ d^{(0)}_{n,i} $ has $ n $ elements with integer $ i \in [1,n] $. This is the damage taken before the perk procs.
      • Clarification : This does mean that for $ n=0 $ that there are no elements in this set.
    • $ d^{(1)}_{n,i} $ has $ \left\lceil{\frac{t_{d}}{t_{AS}}}\right\rceil $ elements with integer $ i \in \left[1,\left\lceil{\frac{t_{d}}{t_{AS}}}\right\rceil\right] $. This is the damage taken during the time where Devoted "would have procced".
    • The set of values in $ d^{(j)}_{n,i} $ for integer $ j \in [0,1] $ is the same in both the numerator and denominator of the ratios for any given $ n $.

  • This can be simplified if the assumption is that every value of $ d_{n,i}^{(j)} $ $ \forall $ integer $ i \in [1,n] $, integer $ n \in [0,\infty) $, integer $ j \in [0,1] $, is taken to be the same $ \left(d_{n,i}^{(j)} \rightarrow d\right) $. In this scenario, there is no random element and the above $ r_{avg} $ and $ r_{avg}^{BP} $ are then only dependent on the proc chance and the attack speed of the enemy. Two examples are simultaneously provided, both of which look at normal proc chance (non-level 20 gear) and a value of $ t_{AS} $ that could be either 4 (a common boss attack speed) or 3 (the attack speed of the player).
Average damage reduction for $ t_{AS} = 4 $ or $ t_{AS} = 3 $
Rank $ \left(1-r_{avg}\right) \times 100\% $ $ \left(1-r_{avg}^{BP}\right) \times 100\% $
1 5.8% 16.2%
2 11.3% 25.4%
3 16.5% 32.5%


MaterialRarityPerk ranks with X materials
Armadyl components
Armadyl componentsRare01222–3
Zamorak components
Zamorak componentsRare01222–3
Bandos components
Bandos componentsRare01222–3
Saradomin components
Saradomin componentsRare01222–3

Suggested gizmos

Gizmo layout Possible perks
Zaros components
Zamorak componentsZaros componentsZamorak components
Zamorak components
  • Other possible perks:
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