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 |
|---|---|---|---|
| 306019 | 2020-08-21 02:03:21 | 116.28 | 96% |
| 291801 | 2020-05-10 20:17:20 | 140.30 | 98% |
| 254278 | 2020-03-06 06:42:31 | 159.98 | 99% |
| 191052 | 2019-11-14 16:40:25 | 138.04 | 98% |
| 185173 | 2019-11-05 23:41:38 | 110.82 | 97% |
| 168946 | 2019-08-29 22:25:28 | 111.19 | 96% |
| 153605 | 2019-07-25 20:05:48 | 115.76 | 97% |
| 138158 | 2019-06-23 16:29:39 | 125.09 | 98% |
| 129901 | 2019-06-06 02:36:20 | 117.97 | 97% |
| 118382 | 2019-05-11 03:38:55 | 129.13 | 98% |
| 113614 | 2019-04-26 15:38:11 | 140.50 | 97% |
| 113613 | 2019-04-26 15:37:22 | 122.10 | 96% |
| 113065 | 2019-04-24 23:54:55 | 127.91 | 98% |
| 92982 | 2019-03-21 04:27:22 | 121.74 | 98% |
| 62180 | 2019-02-10 05:49:38 | 110.80 | 98% |
| 53635 | 2019-01-21 00:42:09 | 110.21 | 97% |
| 38562 | 2018-12-15 04:12:55 | 103.98 | 96% |
| 37845 | 2018-12-13 16:31:18 | 118.58 | 95% |
| 34808 | 2018-12-05 18:30:34 | 107.83 | 96% |
| 32393 | 2018-11-29 18:08:37 | 114.25 | 97% |
| 26554 | 2018-11-10 17:08:33 | 98.08 | 96% |
| 26327 | 2018-11-09 21:26:08 | 111.58 | 96% |
| 24217 | 2018-11-04 19:23:06 | 107.85 | 97% |
| 21169 | 2018-10-28 23:11:15 | 95.08 | 96% |
| 10076 | 2018-09-13 00:32:08 | 113.11 | 97% |
| 552 | 2017-03-09 20:40:17 | 90.42 | 95% |