Thread:Double Slap/@comment-3017217-20150625141131/@comment-3017217-20160628192339

Find the Homogeneity Degree

If The Reduction Is X ^ Y

The increase in Damage from Y's penetration ,Calling it -Z, is X ^ - Z

X ^ -1 = 1.13075617016

1.13075617016 ^ -Z / -1 = 1.13075617016 ^ Z

Multiply Z by t

1.13075617016  ^  (Zt) > t * 1.13075617016 ^ Z Homogeneous of More than 1st Degree

The Exact Same Degree of Armour or rather EH goes to Armour Penetration.

X Penetration is like having -X Armor

Like Efective Health is The Inverse of Damage Reduction

Damage Increase is the Exact same Inverse

And the Elasticity

I went Even Lower than what we Agreed... e ^ (1/100) is the limit of Effective Health ^ (1 / Resistances) as Armour And Magic Resistance Approach O from the Right Hand.

So I took the Geometric Mean of e ^(1/100) and 1 ( The limit for Infinity)

e^(1/200) I tried to make the Same Curve The Same effect but smoother I would try to multiply

((100 + x) / 100) ^ (1/x)

By all the Positive Real Numbers for X and take the Infinite Geometric Mean which I don't know how to do so I took the two extremes and got the Geometric Mean which becomes

What would the Curve look if it was Increasing linear Elasticity and Not A Diminishing Hypelbola Same Min same Max