The Cost of Driving from Avon, Massachusetts to New Bedford, Massachusetts
Are you planning a road trip from Avon to New Bedford, Massachusetts, but you're not sure which route is the cheapest? Look no further! In this blog post, we'll lay out the different routes, their distances, the time it takes to get there, and the cost of each route based on current gas prices and toll prices.
Route 1: I-495 S
The first route we'll explore is taking I-495 S. This route is approximately 45.8 miles and will take about 50 minutes to get to New Bedford. If you take this route, the cost of gas will be about $7.90 based on the current average price of $2.74 per gallon in Massachusetts. You'll also encounter a toll of $0.90 at the Dartmouth toll plaza, making the total cost of this route around $8.80.
Route 2: MA-24 S
The second route we'll look at is taking MA-24 S. This route is about 36.2 miles and will take you around 45 minutes to get to New Bedford. If you choose this route, the cost of gas will be approximately $6.24 using the current average price in Massachusetts. There are no tolls on this route, so the total cost of this route is just the cost of gas, making it around $6.24.
Route 3: I-93 S and MA-140 S
The third route is taking I-93 S and MA-140 S. This is the longest route and is about 60.9 miles. It will take you around 1 hour and 10 minutes to reach New Bedford. If you choose this route, the cost of gas will be roughly $10.07 based on current gas prices in Massachusetts. You'll also need to pay a toll of $3.55 at the New Bedford / Fall River toll plaza, making the total cost of this route around $13.62.
Conclusion
When deciding which route to take from Avon to New Bedford, there are several factors to consider, including the distance, time, and cost. Overall, the cheapest option is Route 2, taking MA-24 S, which would cost just $6.24 in gas. However, the fastest option is I-495 S, which would take only 50 minutes to get there, but would cost around $8.80 due to the tolls. Lastly, Route 3 is the longest and the most expensive route, costing around $13.62 due to the tolls and the distance.
Now that you have all the information, you can make an informed decision about which route to take. Happy travels!