Context[]
It's simple, Stolas creates a pocket dimension in the new episode of Helluva Boss
Destroying the moon[]
Note: KE cannot be used, the distance alters
The volume of the moon is 2.1958e+25cm^3
Fragmentation = 8j/cm^3
Energy = 2.1958e+25*8
Energy = 1.75664e+26J
Destroying the moon = 1.75664e+26J (High 6-A)
Stolas move planets[]
Sun diameter = sqrt(1-(tan(35)*(96/510))^2/((tan(35)*(96/510))^2+1))*1392700000
Sun diameter = 1387193632.33
Distance[]
2atan(tan(70/2 deg)*(96/510)) in degrees = 15.0170391
Distance = 5.2623e+9
Speed[]
Time = 6
Speed = D/T
Speed = 5.2623e+9/6
Speed = 877050000m/s
FTL/2.92552389694c
Stolas explodes the Star[]
Star = 96pxl | 1387193632.33
Explosion = 909pxl | 13134989706.1
The formula is 4*U*(Er/Br)^2 = E, where U is GBE of the body, Er is the explosion's radius and Br is the celestial body's radius
GBE of the Sun = 5.693e+41J
Explosion Radius = 6567494853.05
Star radius = 693596816.165
Energy = 4*5.693e+41*(6567494853.05/693596816.165)^2
Energy = 2.0416744e+44J (High 4-C)
Conclusion[]
Stolas Speed = FTL (2.92552389694c)
Stolas potency = 2.0416744e+44J (High 4-C)