The tide timetable below is calculated from Karumba, Australia but is also suitable for estimating tide times in the following locations:
- Karumba (0km/0mi)
Day | High | Low | High | Low | High | Phase | Sunrise | Sunset | Moonrise | Moonset |
---|---|---|---|---|---|---|---|---|---|---|
Sun 01 | 5:47 AM AEST 3.31 m | 8:20 PM AEST 0.47 m | 6:43 AM AEST | 6:29 PM AEST | 5:32 AM AEST | 5:00 PM AEST | ||||
Mon 02 | 6:36 AM AEST 3.19 m | 9:06 PM AEST 0.64 m | 6:42 AM AEST | 6:29 PM AEST | 6:10 AM AEST | 5:51 PM AEST | ||||
Tue 03 | 7:23 AM AEST 3.02 m | 9:52 PM AEST 0.87 m | New Moon | 6:42 AM AEST | 6:30 PM AEST | 6:44 AM AEST | 6:40 PM AEST | |||
Wed 04 | 8:05 AM AEST 2.80 m | 10:41 PM AEST 1.12 m | 6:41 AM AEST | 6:30 PM AEST | 7:17 AM AEST | 7:26 PM AEST | ||||
Thu 05 | 8:42 AM AEST 2.57 m | 11:42 PM AEST 1.39 m | 6:40 AM AEST | 6:30 PM AEST | 7:48 AM AEST | 8:13 PM AEST | ||||
Fri 06 | 9:11 AM AEST 2.32 m | 5:12 PM AEST 1.59 m | 9:49 PM AEST 1.70 m | 6:39 AM AEST | 6:30 PM AEST | 8:19 AM AEST | 9:00 PM AEST | |||
Sat 07 | 1:55 AM AEST 1.63 m | 9:27 AM AEST 2.08 m | 4:37 PM AEST 1.57 m | 10:57 PM AEST 1.97 m | 6:38 AM AEST | 6:30 PM AEST | 8:52 AM AEST | 9:47 PM AEST | ||
Sun 08 | 5:01 AM AEST 1.74 m | 9:15 AM AEST 1.87 m | 4:08 PM AEST 1.47 m | 11:41 PM AEST 2.24 m | 6:37 AM AEST | 6:30 PM AEST | 9:27 AM AEST | 10:37 PM AEST | ||
Mon 09 | 3:42 PM AEST 1.31 m | 6:37 AM AEST | 6:30 PM AEST | 10:05 AM AEST | 11:30 PM AEST | |||||
Tue 10 | 12:21 AM AEST 2.52 m | 3:39 PM AEST 1.11 m | 6:36 AM AEST | 6:31 PM AEST | 10:47 AM AEST | |||||
Wed 11 | 1:01 AM AEST 2.78 m | 3:58 PM AEST 0.91 m | First Quarter | 6:35 AM AEST | 6:31 PM AEST | 11:36 AM AEST | 12:26 AM AEST | |||
Thu 12 | 1:43 AM AEST 3.02 m | 4:29 PM AEST 0.72 m | 6:34 AM AEST | 6:31 PM AEST | 12:30 PM AEST | 1:23 AM AEST | ||||
Fri 13 | 2:28 AM AEST 3.21 m | 5:08 PM AEST 0.59 m | 6:33 AM AEST | 6:31 PM AEST | 1:30 PM AEST | 2:20 AM AEST | ||||
Sat 14 | 3:17 AM AEST 3.34 m | 5:52 PM AEST 0.52 m | 6:32 AM AEST | 6:31 PM AEST | 2:33 PM AEST | 3:16 AM AEST | ||||
Sun 15 | 4:10 AM AEST 3.39 m | 6:43 PM AEST 0.53 m | 6:31 AM AEST | 6:31 PM AEST | 3:37 PM AEST | 4:08 AM AEST | ||||
Mon 16 | 5:06 AM AEST 3.34 m | 7:40 PM AEST 0.63 m | 6:31 AM AEST | 6:31 PM AEST | 4:40 PM AEST | 4:56 AM AEST | ||||
Tue 17 | 6:04 AM AEST 3.20 m | 8:47 PM AEST 0.82 m | 6:30 AM AEST | 6:31 PM AEST | 5:43 PM AEST | 5:41 AM AEST | ||||
Wed 18 | 7:04 AM AEST 2.97 m | 10:10 PM AEST 1.08 m | Full Moon | 6:29 AM AEST | 6:32 PM AEST | 6:44 PM AEST | 6:24 AM AEST | |||
Thu 19 | 8:03 AM AEST 2.68 m | 6:28 AM AEST | 6:32 PM AEST | 7:46 PM AEST | 7:06 AM AEST | |||||
Fri 20 | 12:02 AM AEST 1.36 m | 8:56 AM AEST 2.33 m | 3:40 PM AEST 1.94 m | 7:34 PM AEST 2.06 m | 6:27 AM AEST | 6:32 PM AEST | 8:48 PM AEST | 7:48 AM AEST | ||
Sat 21 | 3:13 AM AEST 1.53 m | 9:35 AM AEST 1.96 m | 2:10 PM AEST 1.81 m | 9:21 PM AEST 2.43 m | 6:27 AM AEST | 6:32 PM AEST | 9:52 PM AEST | 8:32 AM AEST | ||
Sun 22 | 5:39 AM AEST 1.52 m | 9:34 AM AEST 1.61 m | 1:26 PM AEST 1.51 m | 10:32 PM AEST 2.80 m | 6:26 AM AEST | 6:32 PM AEST | 10:56 PM AEST | 9:20 AM AEST | ||
Mon 23 | 1:43 PM AEST 1.18 m | 11:33 PM AEST 3.11 m | 6:25 AM AEST | 6:32 PM AEST | 10:12 AM AEST | |||||
Tue 24 | 2:23 PM AEST 0.89 m | 6:24 AM AEST | 6:32 PM AEST | 12:00 AM AEST | 11:08 AM AEST | |||||
Wed 25 | 12:29 AM AEST 3.33 m | 3:11 PM AEST 0.67 m | Last Quarter | 6:23 AM AEST | 6:33 PM AEST | 1:01 AM AEST | 12:07 PM AEST | |||
Thu 26 | 1:23 AM AEST 3.46 m | 4:02 PM AEST 0.55 m | 6:22 AM AEST | 6:33 PM AEST | 1:57 AM AEST | 1:05 PM AEST | ||||
Fri 27 | 2:15 AM AEST 3.49 m | 4:53 PM AEST 0.53 m | 6:22 AM AEST | 6:33 PM AEST | 2:47 AM AEST | 2:02 PM AEST | ||||
Sat 28 | 3:05 AM AEST 3.43 m | 5:43 PM AEST 0.61 m | 6:21 AM AEST | 6:33 PM AEST | 3:32 AM AEST | 2:56 PM AEST | ||||
Sun 29 | 3:54 AM AEST 3.29 m | 6:31 PM AEST 0.78 m | 6:20 AM AEST | 6:33 PM AEST | 4:11 AM AEST | 3:48 PM AEST | ||||
Mon 30 | 4:41 AM AEST 3.09 m | 7:20 PM AEST 1.02 m | 6:19 AM AEST | 6:33 PM AEST | 4:46 AM AEST | 4:37 PM AEST |
The tide timetable below is calculated from Karumba, Australia but is also suitable for estimating tide times in the following locations: