Introduction[]

A near-death Garou experiences a surge of strength through rage and knocks Genos, Bang, and Bomb off-balance with a Tanktop Blow before ripping a tree from the ground and spinning it around in order to disrupt his assailants.

Calculations[]

Garou: 147.5 px (1.77 m)
Tree: 1249.87 px (14.99844 m)

According to OneOak's tree facts and figures, a 23.9 m tall oak tree weighed 14.385 tons or 13049.8525 kg, and considering the diameter of the tree Garou is spinning, the figure should apply.

He spun the tree in a circle, so he spun it 360 degrees.

14.99844 * 360 / 180 * pi = 94.2379778 m
94.2379778 / 2 = 47.1189889 m

The formula for centripetal force is "F = mv^2 / r".

13049.8525*94.2379778^2 / 47.1189889 = 2459583.42 kg (Class M)

The 94.2379778 m/s comes from the assumption he spun it that distance in a second.

If it means anything, this is consistent with Garou's Tanktop Blow having enough strength to knock Bang, Bomb, and Genos off-balance, all of whom are Class M to G.

Edit[]

Revisions belong to User:Ugarik.

14.385 tonnes ≠ 14.385 tons
14.385 tonnes = 14385 kg

Rather than taking the height of the tree alone, we need to take the distance between the pivot axis and the center of mass, which would be about half the tree's height or about 7.5 m for simplicity.

And, using the one second figure, we need to use the angular velocity formula rather than a straight D/T.

Garou's Angular Velocity: 6.283 rad/s

14.385*7.5*6.283^2 / = 4258.97655 kN

Results[]

Garou's Lifting Strength = 434294.66 kg (Class K)