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 |
---|---|---|---|
65163 | 2020-08-26 16:28:13 | 120.16 | 99% |
64748 | 2020-08-19 20:33:41 | 116.05 | 99% |
64376 | 2020-08-10 22:15:06 | 115.97 | 99% |
52443 | 2019-05-17 23:40:38 | 110.22 | 99% |
43336 | 2019-01-21 23:45:15 | 106.22 | 97% |
38767 | 2018-11-20 03:04:29 | 99.91 | 97% |
36688 | 2018-10-25 23:00:12 | 97.59 | 97% |
34525 | 2018-10-06 18:39:04 | 113.66 | 99% |
26279 | 2018-06-28 17:38:18 | 109.66 | 98% |
23854 | 2018-05-09 02:18:18 | 101.21 | 98% |
20073 | 2018-03-21 21:40:59 | 104.28 | 99% |
19973 | 2018-03-21 02:35:17 | 100.35 | 98% |
17499 | 2018-02-20 02:00:38 | 101.65 | 97% |
16062 | 2018-02-03 02:32:50 | 105.77 | 99% |
12951 | 2017-11-10 00:22:53 | 98.82 | 97% |
7129 | 2017-06-24 21:25:44 | 99.02 | 97% |
6580 | 2017-06-17 21:22:04 | 94.74 | 97% |
4470 | 2017-05-19 00:56:12 | 92.81 | 93% |
3748 | 2017-05-03 17:14:38 | 87.53 | 91% |
1319 | 2017-03-25 00:26:20 | 80.97 | 95% |
661 | 2017-03-22 15:04:26 | 79.10 | 93% |
370 | 2017-03-21 17:22:10 | 73.68 | 93% |