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 |
---|---|---|---|
93555 | 2020-11-24 15:20:10 | 116.52 | 99% |
88324 | 2020-09-25 03:23:52 | 95.23 | 97% |
86782 | 2020-09-10 17:49:18 | 111.64 | 99% |
84287 | 2020-08-17 17:36:39 | 111.02 | 98% |
83732 | 2020-08-10 22:15:10 | 104.43 | 98% |
83276 | 2020-08-06 02:45:58 | 93.25 | 98% |
67599 | 2019-11-04 22:36:17 | 109.63 | 98% |
67078 | 2019-10-28 22:39:20 | 104.27 | 97% |
65876 | 2019-10-09 20:51:44 | 110.96 | 99% |
58750 | 2019-06-11 19:33:37 | 99.31 | 97% |
53103 | 2019-02-11 21:21:59 | 83.33 | 96% |
50862 | 2019-01-01 21:52:33 | 90.58 | 97% |
45080 | 2018-10-02 15:39:05 | 105.38 | 98% |
41137 | 2018-06-25 22:42:51 | 105.99 | 98% |
38302 | 2018-04-10 22:03:09 | 101.08 | 97% |
36587 | 2018-02-16 19:46:20 | 104.74 | 98% |
34052 | 2017-12-19 23:24:22 | 107.40 | 99% |
33207 | 2017-11-27 17:01:14 | 100.76 | 98% |
29886 | 2017-08-28 19:53:53 | 106.61 | 98% |
26239 | 2017-06-16 18:28:58 | 116.81 | 100% |
26117 | 2017-06-15 18:24:02 | 110.16 | 99% |
25202 | 2017-05-25 14:23:18 | 95.98 | 97% |
24731 | 2017-05-17 14:15:12 | 102.70 | 98% |