Palpatine unique and Traya lead both deals max health dmg each turn.
With GMY taking so many turns (and also called in as assist and occassionally counter under Bastila lead), why is his health/ protection not draining away quickly?
At the very least, I was expecting the 200% purple protection up to be gone by at least half, assuming GMY took 3 turns and 1 assist. 20%+20%+20%+35%= 95% health on the opening.
GMY 1st turn use special -20%
GMY follow up immediately with basic -20%
Ezra calls GMY for assist -35%
GMY gains enough turn meter for another turn -20%
Damage equal to 95% of a characters health won't even get through their regular protection, much less 200% bonus protection. My GMY has 16,204 health and 19026 protection. 20% health damage is 3,241, times 3 is 9,723. 35% is 5,672, for a total damage count of 15,395. I'd still have 809 protection left, even without the bonus protection. With the bonus, I'd still be at 36,039 protection (assuming I did that math right).
If Yoda uses his special, he is giving himself additional protection up beyond Bastila's as well. So he would have 135% worth still in your scenario.
There may be other things going on too; how much natural protection they have left can influence how the purple bar looks, so protection restore from Hermit can affect that, etc.
67.5% of the total bonus protection remaining if he used his special.
Half of the protection bar should be roughly what the bonus protection occupies.
,5 * .675 + .5 = .8375 so it should look like his protection bar is roughly 83.75% full after that.
Replies
GMY follow up immediately with basic -20%
Ezra calls GMY for assist -35%
GMY gains enough turn meter for another turn -20%
How can you tell it's not?
There may be other things going on too; how much natural protection they have left can influence how the purple bar looks, so protection restore from Hermit can affect that, etc.
Half of the protection bar should be roughly what the bonus protection occupies.
,5 * .675 + .5 = .8375 so it should look like his protection bar is roughly 83.75% full after that.