Distance from Newport Beach, CA to Hays, KS

Distance

1,359 mi

Time

23 hours 30 mins

Gas Cost

$97 - $189

Loading Newport Beach - Hays Route Map

There are 1,096.04 miles from Newport Beach to Hays in northeast direction and 1,359 miles (2,187.10 kilometers) by car, following the I-70 route.

Newport Beach and Hays are 23 hours 30 mins far apart, if you drive non-stop.

This is the fastest route from Newport Beach, CA to Hays, KS. The halfway point is Thompson, UT.

Please note the time difference between Newport Beach, CA and Hays, KS is 2 hours. The current time in Newport Beach is 9:48 am and the current time in Hays is 11:48 am.

Any questions or tips to share?

Share with fellow travellers any question or tips about the route from Newport Beach, CA to Hays, KS:



Gas Consumption and Emissions

A car with an MPG of will need 62.93 gallons of gas to cover the route between Newport Beach, CA and Hays, KS.

The estimated cost of gas to go from Newport Beach to Hays is $157.33.

During the route, an average car will release 1,232.93 pounds of CO2 to the atmosphere. Your carbon footprint is 0.91 pounds of CO2 per mile.


Halfway Point Between Newport Beach, CA and Hays, KS

If you want to meet halfway between Newport Beach, CA and Hays, KS or just make a stop in the middle of your trip, the exact coordinates of the halfway point of this route are 38.927726 and -109.657576, or 38º 55' 39.8136" N, 109º 39' 27.2736" W. This location is 679.65 miles away from Newport Beach, CA and Hays, KS and it would take approximately 11 hours 45 mins to reach the halfway point from both locations.

Closest City or Town to Halfway Point

The closest town to the halfway point is Thompson, UT, situated 705.51 miles from Newport Beach, CA and 655.73 miles from Hays, KS. It would take 12 hours 13 mins to go from Newport Beach to Thompson and 11 hours 23 mins to go from Hays to Thompson.

Major Cities Along the Route

Some major cities along the route include Aurora, CO, Denver, CO, Westminster, CO, Arvada, CO, Lakewood, CO, North Las Vegas, NV, Las Vegas, NV, Enterprise, NV, Victorville, CA, Fontana, CA, Rancho Cucamonga, CA, Ontario, CA, Corona, CA, Fullerton, CA, Anaheim, CA, Orange, CA, Santa Ana, CA, Garden Grove, CA, Irvine, CA, Costa Mesa, CA and Huntington Beach, CA.


Best Hotels In or Near Hays, KS

Do you have where to stay when you arrive to Hays, KS? Check out our hotel recommendations:


Lowest Price Rental Cars in Newport Beach, CA

Planning on renting a car to go from Newport Beach, CA to Hays, KS? Here there are some offers to rent a car in or near Newport Beach, CA:

Small

Small cars

From $14

Intermediate

Intermediate cars

From $18

Full-size

Full-size cars

From $24

SUVs

SUVs

From $28

Vans

Vans

From $40


Compare rental car prices in Newport Beach »

Weather in Newport Beach and Hays

Newport Beach

No precipitation throughout the week, with temperatures bottoming out at 72°F on Friday.

Tue
Oct 17
Wed
Oct 18
Thu
Oct 19
Fri
Oct 20
Sat
Oct 21
Partly cloudy day Partly cloudy day Partly cloudy day Partly cloudy day Clear day
83° 67° 79° 65° 73° 63° 72° 63° 76° 61°
9% Rain probability 16% Rain probability 22% Rain probability 15% Rain probability 0% Rain probability
2 229 degrees 4 203 degrees 4 201 degrees 4 191 degrees 1 197 degrees

Hays

No precipitation throughout the week, with temperatures falling to 68°F on Monday.

Tue
Oct 17
Wed
Oct 18
Thu
Oct 19
Fri
Oct 20
Sat
Oct 21
Partly cloudy day Partly cloudy day Wind Wind Wind
80° 43° 81° 45° 79° 45° 79° 59° 70° 50°
7% Rain probability 8% Rain probability 8% Rain probability 9% Rain probability 9% Rain probability
8 193 degrees 2 207 degrees 7 145 degrees 22 187 degrees 7 303 degrees

Distance conversions

Checkout the distance in miles, kilometers and nautical miles between Newport Beach, CA and Hays, KS in this table:

Distance type Miles Kilometers Nautical miles
Straight line distance 1,096.04 mi 1.61 km 0.87 nautical mi
Driving distance 1,359 mi 1.61 km 0.87 nautical mi

Road Trip Tips


Please type your origin and destination and pick one of the options.

Origin and destination have to be different.

Distance between and