I have never played the TASM games and i do not have any context for this but there is a giant robot worm in the game that can shoot lasers and therefore i am obliged to calc it
Size of worm[]
Window: 21 pixels
the average height of a window is 1.5 meters
1.5m : 21 = 0.0714285m
Distance from teeth to top of head of worm: 58 pixels
58 x 0.0714285m = 4.14m
Distance from teeth to top of head: 190 pixels
4.14m : 190 = 0.0217894m
Worm head: 278 pixels
278 x 0.0217894m = 6.057m
Worm head: 318 pixels
6.057m : 318 = 0.0190471m
Ring thingy: 176 pixels
176 x 0.0190471m = 3.35m
Non-Ring thingy: 134 pixels
134 x 0.0190471m = 2.552m
Ring thingy: 225 pixels
3.35m : 225 = 0.01488888m
Smaller Ring thingy: 42 pixels
42 x 0.01488888m = 0.6253m
So basically the worm has 12 ring thingies (9 big ones and 3 smaller ones) with the ring thingies being connected by the non-ring thingies which there are 13 of because there is also one connecting the first ring thingy to the head thingy
ring thingies = 9 x 3.35m = 30.15m
smaller ring thingies = 3 x 0.6253m = 1.8759m
non-ring thingies = 13 x 2.552m = 33.176m
Total length = 30.15m + 33.176m + 1.8759m = 65.2019m
I will also need to calculate the head length real quick to get the total length of the worm
Head height: 99 pixels
6.057m : 99 = 0.0611818m
Head length: 121 pixels
121 x 0.0611818m = 7.402m
Total Total length = 65.2019m + 7.402m = 72.6039m (Large Size Type 1)
Worm burrows through the ground[]
Worm head: 75 pixels
6.057m : 75 = 0.08076m
Hole diameter: 129 pixels
Hole radius = 129 : 2 = 64.5 pixels
64.5 x 0.08076m = 5.209m
The worm could burrow through the ground so much that it's entire body got covered up, meaning that the length of the hole should be comparable to the worms length
Hole Volume = π x 5.209m^2 x 72.6039m = 6188.97m3 or 6188970000cm3
using the destruction values for concrete
(Frag) 6188970000 x 6 = 37133820000 joules
(V.Frag) 6188970000 x 17 = 105212490000 joules
during the cutscene it takes the worm 7 seconds to burrow, however later in the boss fight it can do it in around 3 seconds
37133820000j : 3s = 12377940000 joules or 2.9583 Tons of TNT (Large Building level)
105212490000j : 3s = 35070830000 joules or 8.3821 Tons of TNT (Large Building level+)
Worm KE[]
Worm Volume and Weight[]
Only doing a rough thing not including the rings because i'm lazy
Non-ring thing: 126
2.552m : 126 = 0.0202539m
Non-ring thing diameter: 156
Non-ring thing radius = 156 : 2 = 78
78 x 0.0202539m = 1.5798m
(rough) Worm Volume = π x 1.5798m^2 x 72.6039m = 569.26m3
Assuming 90% hollowness because this is a robot
569.26 : 10 = 56.926m3
Assuming the robot is made of steel, which has a density of 8050kg/m3
56.926 x 8050kg = 458254.3kg or 458.25 Tons (Class K) although i don't think it would scale to the LS of the worm
Worm Speed and KE[]
using the burrowing feat again, the worm appears to be able to travel it's body length in 3 seconds
72.6039m : 3s = 24.2m/s (Superhuman)
Worm KE = 0.5 x 458254.3kg x 24.2m/s^2 = 134186024.12 joules or 0.032071 Tons of TNT (Small Building level)
Worm laser blasts[]
I'll be using this blast since it's a clear shot
Worm head: 116 pixels
Panel Height: 1080 pixels
Distance from point of view to object = 6.057m x 1080 : (116 x 2 x tan(70deg : 2)) = 40.26m
The laser was capable of traveling that distance in roughly 7 frames or 0.2916s
Laser speed = 40.26m : 0.2916s = 138.06m/s (Subsonic)
Worm laser blasts but on a rooftop this time[]
Worm head: 229 pixels
Panel Height: 1080 pixels
i'll be using the distance from teeth to top of head instead of the full head size since it's obscured a bit
Distance from point of view to object = 4.14m x 1080 : (229 x 2 x tan(70deg : 2)) = 13.94m
It takes the lasers a single frame or 0.04166s to cross this distance
13.94m : 0.04166s = 334.61m/s (Transonic)
Tally[]
- Worms Size = 72.6039m (Large Size Type 1)
- Worm burrowing through the ground
- Low-End = 12377940000 joules or 2.9583 Tons of TNT (Large Building level)
- High-End = 35070830000 joules or 8.3821 Tons of TNT (Large Building level+)
- Worm Weight = 458254.3kg or 458.25 Tons (Class K)
- Worm Speed = 24.2m/s (Superhuman)
- Worm KE = 134186024.12 joules or 0.032071 Tons of TNT (Small Building level)
- Worm laser blasts = 138.06m/s (Subsonic)
- Worm rooftop lasers = 334.61m/s (Transonic)
Spidey can only harm the robot by targetting it's weak spots, so it's unlikely he would scale to it in AP/Durability
His combat speed should be able to scale to the worms travel speed however, as he can keep up with it in combat and dodge it's attacks