train
Anything that travels 1,635 miles per hour.
32 miles per hour. The speed at which the car is travelling is the distance in miles that the car travels per hour. If the car travels 16 miles in 30 minutes it should then travel twice as far in one hour, since one hour is twice as long as 30 minutes (half an hour). So, the car travels 2 * 16 miles per hour, which equals 32 miles per hour.
The faster car travels at 48 miles per hour The slower car travels at 36 miles per hour 48mph - 36mph = 12mph Therefore, the faster car travels 12 miles per hour faster than the slower car. Note that the question refers to the relative speeds of the cars and not the relative distances.
In 1 hour it travels 60 km Hence In 6 hours it travels 6 x 60 = 360 km
train
Its average speed is exactly 160 km per 2.5 hours. On a unit basis, that reduces to 64 km per hour.
The distance between them is approximately 160km and will take you about 1 hour and 30 minutes to drive.
The distance between Calais, France, and Péronne, France, is 160km and will take approximately 1 Hour 34 Minutes of driving time.
There are 60 minutes in an hour, so the toy travels for (5 feet / hour) * (60 minutes / hour) = 300 ft / hour.There are 3 feet in a yard, so the toy travels (300 ft / hour) * (1 yd / 3 ft) = 100 yards in one hour.
Anything that travels 1,635 miles per hour.
Light travels at a speed of 186,000 miles per second or 669,600,000 miles per hour. Light travels somewhat slower when it is "in" something, such as glass or water.
32 miles per hour. The speed at which the car is travelling is the distance in miles that the car travels per hour. If the car travels 16 miles in 30 minutes it should then travel twice as far in one hour, since one hour is twice as long as 30 minutes (half an hour). So, the car travels 2 * 16 miles per hour, which equals 32 miles per hour.
60 km an hour
earthquake
Planet Earth
The faster car travels at 48 miles per hour The slower car travels at 36 miles per hour 48mph - 36mph = 12mph Therefore, the faster car travels 12 miles per hour faster than the slower car. Note that the question refers to the relative speeds of the cars and not the relative distances.