In two dimensions we say that a rigid body has only one rotational degree of freedom, whereas in three dimensions we say that a rigid body has three rotational degrees of freedom. This might lead you to infer that in three dimensions you need to have three scalar quantities to represent a body's rotation. Indeed, this is the minimum requirement.
| Game | Time | WPM | Accuracy |
|---|---|---|---|
| 289300 | 2019-03-17 04:20:44 | 138.58 | 98% |
| 283161 | 2019-02-28 06:16:10 | 136.71 | 96% |
| 260298 | 2018-09-27 04:14:44 | 121.02 | 94% |
| 259872 | 2018-09-26 02:34:28 | 149.72 | 99% |
| 257110 | 2018-09-16 05:18:30 | 140.49 | 96% |
| 253502 | 2018-09-07 21:06:06 | 137.76 | 98% |
| 253192 | 2018-09-07 04:15:07 | 133.10 | 97% |
| 251344 | 2018-09-05 04:07:09 | 144.38 | 98% |
| 250163 | 2018-09-02 03:39:05 | 131.32 | 98% |
| 247900 | 2018-08-30 21:35:42 | 143.79 | 98% |
| 246005 | 2018-08-28 01:21:32 | 139.88 | 97% |
| 242607 | 2018-08-24 20:12:39 | 128.54 | 96% |
| 242074 | 2018-08-23 05:10:56 | 146.92 | 97% |
| 240989 | 2018-08-17 02:06:08 | 154.27 | 99% |
| 221506 | 2018-01-14 14:02:43 | 110.52 | 97% |
| 218983 | 2017-12-31 04:21:08 | 144.30 | 99% |
| 214050 | 2017-12-10 04:04:02 | 164.39 | 99% |
| 203876 | 2017-11-18 00:45:27 | 147.72 | 98% |
| 202715 | 2017-11-11 20:43:08 | 113.88 | 97% |
| 167157 | 2017-05-25 23:49:41 | 159.68 | 96% |
| 166479 | 2017-05-24 00:27:33 | 152.85 | 93% |
| 166284 | 2017-05-23 20:09:48 | 147.71 | 95% |
| 164264 | 2017-05-15 16:42:07 | 132.01 | 91% |
| 161078 | 2017-04-29 04:13:12 | 124.97 | 94% |
| 160977 | 2017-04-29 02:06:54 | 129.04 | 91% |
| 160976 | 2017-04-29 02:06:11 | 141.41 | 95% |
| 160975 | 2017-04-29 02:05:35 | 141.49 | 95% |
| 158290 | 2017-04-17 05:06:56 | 151.68 | 95% |
| 156553 | 2017-04-09 06:21:03 | 159.85 | 96% |
| 156552 | 2017-04-09 06:19:52 | 155.34 | 99% |
| 156551 | 2017-04-09 06:18:38 | 127.02 | 89% |
| 135826 | 2017-01-16 08:40:09 | 146.39 | 95% |