Departure: | Dover, England |
Arrival: | Skipton, England |
Fastest route: | 9h 25min |
Distance: | 424km |
Cheapest route: | £17 |
Transfers: | 1 |
Bus companies: | National Express |
One Passenger / One Trip
09:30
Dover, England
Dover (Town Centre) - Bus Station
20:05
Skipton, England
Skipton Bus Station
10h 35min
+
£20.6
09:30
Dover, England
Dover (Town Centre) - Bus Station
12:20
London, England
Victoria Coach Station
2h 50min
National Express
£6
1h 40min layover
14:00
London, England
Victoria Coach Station
20:05
Skipton, England
Skipton Bus Station
6h 5min
National Express
£14.6
13:30
Dover, England
Dover (Town Centre) - Bus Station
22:55
Skipton, England
Skipton Bus Station
9h 25min
+
£17
13:30
Dover, England
Dover (Town Centre) - Bus Station
16:20
London, England
Victoria Coach Station
2h 50min
National Express
£6
0h 40min layover
17:00
London, England
Victoria Coach Station
22:55
Skipton, England
Skipton Bus Station
5h 55min
National Express
£11
The Dover - Skipton route has approximately 2 frequencies and its minimum duration is around 9h 25min. It is important you book your ticket in advance to avoid running out, since £17 tickets tend to run out quickly.
The distance between Dover and Skipton is around 424 kilometers and the bus companies that can help you in your journey are: National Express.
Remember that the number of transfers to be made will be at least 1 so in some cases you should book the tickets separately.
Bus journey may vary depending on the state of the roads. The minimum duration is usually around 9h 25min to cover 424 kilometers.
According to our data, the cheapest ticket costs £17 and leaves Dover (Town Centre) - Bus Station. If you decide to make this journey you will have to do 1 stop before reaching Skipton Bus Station.
Last bus leaves at 13:30 from Dover (Town Centre) - Bus Station and arrives at 22:55 at Skipton Bus Station. It will take 9h 25min, its price is £17 and the number of changes will be 1.
We do not have direct routes in our database. The minimum number of transfers will be 1 and the total duration of the trip will be approximately 10h 35min.