The Cost of a Trip between Bradbury, CA and Los Angeles, CA: A Guide based on gas prices

Traveling from Bradbury, California to Los Angeles, California is a common trip for many people, whether you're commuting to work or going on a weekend trip. The most significant factor to consider when planning the journey, apart from time and traffic, is cost, and gas prices play a significant role in determining how much you will spend. In this article, we will discuss the different routes you can take and their costs, as well as provide recommendations to help you plan your trip.

Route 1 – I-210 W and I-5 S (23.6 miles)

The I-210 W and I-5 S route is the most direct and popular route to get to Los Angeles from Bradbury. It is 23.6 miles long and takes approximately 35 minutes to drive in normal traffic conditions. The route is a combination of an interstate and state highway, which means there are tolls to pay.

A toll of $2.75 is collected at the Foothill Freeway exits, which will make your total cost $5.50 per round trip. Apart from this, the total cost of gasoline depends on your vehicle’s MPG (Miles Per Gallon) and the current gas prices. For example, a car that has an MPG of 25 and the current gas price of $3.50 per gallon will cost approximately $4.45 each way, making the total cost of the roundtrip $8.90.

Route 2 – I-210 W and CA-2 S/Santa Monica Blvd (30.5 miles)

The second shortest route is the I-210 W and CA-2 S/Santa Monica Blvd route. This route is slightly longer than Route 1 and takes around 40 minutes to drive in normal conditions. It will take you through the much quieter suburbs of Los Angeles and provides a scenic drive.

This route is also toll-free, which means there are no tolls to be paid. However, the total cost of gasoline depends on your car's MPG and the current gas prices. Suppose your car has an MPG of 25, and the current gas price is $3.50. In that case, it will cost approximately $5.40 one way, making the total cost of the round trip $10.80.

Route 3 – I-210 W and CA-134 W (35.6 miles)

The third and the longest route is the I-210 W and CA-134 W route. This route is approximately 35.6 miles long and takes about 45 minutes to drive in normal conditions. It is a little bit more complicated to drive because it takes you through the middle of the city and downtown Los Angeles. However, it is also the most scenic route.

This route is also toll-free, which means there are no tolls to be paid, but as previously stated, the total cost of gasoline depends on your car's MPG and the current gas prices. Suppose your car has an MPG of 25, and the current gas price is $3.50. In that case, it will cost approximately $6.75 one way, making the total cost of the round trip $13.50.

Recommendations

If your primary concern is cost, the I-210 W and I-5 S route is the cheapest and shortest route. Suppose you are looking for a scenic journey with minimal cost. In that case, the I-210 W and CA-2 S/Santa Monica Blvd route is your best option. A good alternative would be to take the I-210 W and CA-134 W route as it is the most scenic and takes you through the heart of the city.

The choice of the route mainly depends on the destination you are visiting, your preference, and traffic conditions. It is essential to check traffic conditions on your chosen route before you head out on the trip to avoid traffic in peak hours.

Conclusion

In conclusion, the total cost of a round trip between Bradbury and Los Angles depends on the chosen route, toll fares, MPG, and the current gas prices. If you are looking for a budget-friendly option, the I-210 W and I-5 S route is the most suitable option, while the I-210 W and CA-2 S/Santa Monica Blvd is an excellent option if you are looking for a scenic journey at minimal cost. If you are not too concerned with the added cost and want more of a scenic journey plus driving through the heart of the city, then the I-210 W and CA-134 W could be your choice. In any case, the trip between Bradbury and Los Angeles is relatively short and can take between 35 and 45 minutes, depending on the route and traffic conditions.