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 |
|---|---|---|---|
| 64721 | 2020-12-08 14:47:10 | 65.58 | 97% |
| 56270 | 2019-05-24 13:09:12 | 63.07 | 96% |
| 52967 | 2019-02-13 13:32:03 | 65.78 | 98% |
| 49627 | 2018-09-30 04:42:12 | 72.43 | 98% |
| 48607 | 2018-08-23 12:57:27 | 59.31 | 95% |
| 44484 | 2018-04-20 15:19:20 | 67.73 | 98% |
| 42482 | 2018-02-14 16:24:07 | 72.72 | 99% |
| 41560 | 2018-01-19 13:41:53 | 62.76 | 98% |
| 39612 | 2017-10-27 12:16:36 | 68.02 | 98% |
| 36524 | 2017-08-20 14:26:06 | 65.54 | 97% |
| 35009 | 2017-07-23 09:28:40 | 73.54 | 99% |
| 33319 | 2017-06-21 13:10:47 | 56.89 | 95% |
| 33140 | 2017-06-18 05:35:41 | 57.38 | 95% |
| 32507 | 2017-06-03 13:45:08 | 72.01 | 98% |
| 30442 | 2017-05-04 13:51:18 | 57.96 | 93% |
| 29568 | 2017-04-22 06:22:14 | 58.97 | 93% |
| 27625 | 2017-03-26 14:13:41 | 57.92 | 94% |
| 24596 | 2017-02-21 14:32:22 | 59.84 | 93% |
| 22610 | 2017-02-04 02:33:52 | 58.69 | 95% |