| Bus Ticket Price: | $149 |
|---|---|
| Avg. Bus Duration: | 34h 20m |
| Bus Companies: | Greyhound |
| Daily buses: | 4 |
| Buses depart from: | Daytona Beach |
| Bus arrives in: | Iowa City |
Information about the bus from Daytona Beach to Iowa City.
The travel length between Daytona Beach and Iowa City takes by bus around 34 hours and 20 minutes, and the approximate price for a bus ticket between Daytona Beach and Iowa City is $149.
Please note that this information about the bus from Daytona Beach to Iowa City is approximate. GoTicketio struggles to keep its database with updated information, but for accuracy of schedules, number of stops, travel time and price of bus tickets from Daytona Beach to Iowa City, you have to ask directly to the bus company you want to travel from Daytona Beach to Iowa City. The information GoTicketio provides its costumers about the bus from Daytona Beach to Iowa City is not official.
According to our database there is a direct bus route between Daytona Beach and Iowa City. Book now to not miss out! Take a look at the available schedules and use the calendar to choose your preferred travel date(s).
Daytona Beach Ridgewood Bus Station
Iowa City Bus Sation
34h 20m
$150
Greyhound
Daytona Beach Ridgewood Bus Station
Iowa City Bus Sation
37h 40m
$150
Greyhound
Daytona Beach Ridgewood Bus Station
Iowa City Bus Sation
38h 55m
$153
Greyhound
Daytona Beach Ridgewood Bus Station
Iowa City Bus Sation
44h 15m
$153
Greyhound
If you want to get cheap bus tickets from Daytona Beach to Iowa City we recommend that you book in advance as the best Greyhound tickets sell out fast.The cheapest ticket is usually $149 and the most expensive one to go to Iowa City is approximately $153. .
The first bus leaves at 06:30 from Daytona Beach and costs $150 while the last one arriving at Iowa City costs $153 and it is at 11:40.
The companies that can help you are: Greyhound.
Each company has its rules and depending on the ticket, price, and offer different refund policies apply. We recommend that you contact the company where you bought the ticket to get a solution.
The approximate distance between the two places is 1946 km. With the route we propose, it will take approximately 34h 20m.