Okay, so here’s the situation:
W. Russia:
Russia attacks with 5 Infantry, Artillery, 2 Fighters
Germany defends with 3 Infantry, Artillery, Armor
Now, I’ve run this 12 times with Triple A and Russia gets creamed everytime. By creamed, I mean reduced to nothing but fighters and sometimes with only one fighter out of the two left.
Frood, on the other hand, has the following:
Attacker: 5 Inf, 1 Art, 2 Fig. v. Defender: 3 Inf, 1 Art, 1 Arm.
Average battle duration: 2.8 rounds of combat
avg. # units left IPC value Punch
Attacker: 4.53.5 27.311.7 9.84.2
Defender: 0.14.9 0.317.7 0.210.8
Surviving Attackers
Surviving Defenders #Casualties
Overall %*: A. survives: 94.9% D. survives: 4.1% No one survives: 1%
- percentages may not total 100 due to rounding. The average results from above are highlighted in charts below, while the median result (equal odds of getting a worse or better result) is written in red.
Attacker results:
Probability % # units / losses
2.11% 8: 5 Inf, 1 Art, 2 Fig. no units. : 0 IPCs
9.91% 7: 4 Inf, 1 Art, 2 Fig. 1 Inf. : 3 IPCs
20.16% 6: 3 Inf, 1 Art, 2 Fig. 2 Inf. : 6 IPCs
22.96% 5: 2 Inf, 1 Art, 2 Fig. 3 Inf. : 9 IPCs
18.45% 4: 1 Inf, 1 Art, 2 Fig. 4 Inf. : 12 IPCs
11.72% 3: 1 Art, 2 Fig. 5 Inf. : 15 IPCs
6.5% 2: 2 Fig. 5 Inf, 1 Art. : 19 IPCs
3.05% 1: 1 Fig. 5 Inf, 1 Art, 1 Fig. : 29 IPCs
5.14% 0: no units. 5 Inf, 1 Art, 2 Fig. : 39 IPCs
Defender results:
Probability % # units / losses
0.01% 5: 3 Inf, 1 Art, 1 Arm. no units. : 0 IPCs
0.23% 4: 2 Inf, 1 Art, 1 Arm. 1 Inf. : 3 IPCs
0.7% 3: 1 Inf, 1 Art, 1 Arm. 2 Inf. : 6 IPCs
1.39% 2: 1 Art, 1 Arm. 3 Inf. : 9 IPCs
1.79% 1: 1 Arm. 3 Inf, 1 Art. : 13 IPCs
95.88% 0: no units. 3 Inf, 1 Art, 1 Arm. : 18 IPCs
So which is it, is Dan’s math way off, or is TripleA completely insane with it’s dice!?!?