Average speed = Total distance/Total time
To find the speed of the winds, we can use the concept of vector components. The ground speed of the plane (95 mph) is the result of the vector sum of the airspeed of the plane (190 mph) and the speed of the winds (w mph). We can find the horizontal component of the airspeed by multiplying 190 mph by the cosine of the angle between the airspeed and the ground direction (240 - 90 = 150 degrees). Thus, the speed of the winds is 70 mph.
It is 45 mph.
To find how long it takes to drive 368 miles at 65 mph, divide 368 by 65. The answer is 3.66 hours.
46 mph and 50 mph
To find the percent increase from 55 mph to 70 mph, you first calculate the difference between the two speeds: 70 mph - 55 mph = 15 mph. Then, divide this difference by the original speed (55 mph) and multiply by 100 to get the percent increase: (15/55) * 100 β 27.27%.
you'll find out =]
Divide distance by time to find velocity: 130 ÷ 2.5 = 52 mph
64.37 km/h One mile is equivalent to 1.609 KM. To find the conversion, simply multiply the given MPH by 1.609 to find the equivalent kilometers per hour.
Do a search on "metric conversion" and you'll find tons of help
To find the average speed, add up all the speeds and then divide by the number of speeds given. (45 + 37 + 34 + 40) / 4 = 39 mph. Therefore, the average speed of the cars is 39 mph.
Warm-up, 10 minutes at 3.0 mph Gradually increase the setting to 4.5 mph and allow your body to adjust to this speed. Then: Run for one minute at 4.5 mph Recover for one minute at 3.5 mph increase 1 mph after every one minute rest
The formula for this conversion is as follows: MPH x 1.609344 = KPH To find the MPH when you know the KPH use the following formula: divide KPH by 1.609344 [My computer doesn't seem to have a division symbol on it.]
From what? If you mean from mph then 1kilometre = 5/8 mile, approximately.
Average speed = Total distance/Total time
It depends on the car...every car has a different top speed...to convert from MPH multiply the speed in MPH by 1.609 to find KPH
To find the speed of the winds, we can use the concept of vector components. The ground speed of the plane (95 mph) is the result of the vector sum of the airspeed of the plane (190 mph) and the speed of the winds (w mph). We can find the horizontal component of the airspeed by multiplying 190 mph by the cosine of the angle between the airspeed and the ground direction (240 - 90 = 150 degrees). Thus, the speed of the winds is 70 mph.