This question is a classic problem in mathematics that has been solved by many different methods. In this article, we will explore the simplest and most basic solution to the problem, using only a few algebraic equations. We will also discuss some of the more advanced methods for solving this type of equation, and how they can be used in practice.
The Speed of the Train and the Car
If the train’s speed is km/h, how long does it take the car to pass it?
If the train’s speed is km/h, and the car’s speed is km/h, then it takes the car 3 seconds to pass the train.
Formula to Calculate Time Taken for the Train to Pass the Car
If the train’s speed is km/h, how long does it take the car to pass it?
The time taken for the car to pass the train can be calculated using the following formula:
T = (Km/h*100) / (D)
where T is the time taken for the car to pass the train, Km/h is the train’s speed, D is the distance between the cars, and 100 is 100%
Application to a Real Life Problem
If you want to know how long it will take a car to pass a train, you first have to calculate the car’s speed. You can do this by using the following formula:
speed (km/h) = (train’s speed) × (car’s velocity)
In this example, the car’s velocity is 80 km/h. So, the equation would be:
speed (km/h) = (80 km/h) × (50 km/h)
The answer is 960 km/h. So, it will take the car 960 kilometers to travel the same distance as the train.
Conclusion
If the train’s speed is 75 km/h, how long does it take the car to pass it?
A car travelling at a speed of 75 km/h will travel for approximately 320 meters before the train has passed.