This is a very interesting and creative problem to think about! To approach this problem, we first need to calculate the total mass of all the people on Earth. With 6.2 billion people and an average mass of 60kg, the total mass would be 6.2 billion x 60kg = 372 billion kg.
Next, we need to consider the rotational motion of the Earth. The Earth rotates once every 24 hours, which means it rotates at a speed of 360 degrees per 24 hours, or 15 degrees per hour. This means that in one hour, the Earth rotates 15/360 = 1/24 of a full rotation.
Now, let's consider the people running along the equator. Since they are evenly spaced out, each person would have a distance of 40,075 km (the circumference of the Earth) divided by 6.2 billion people, or approximately 0.00644 meters between them. If they are all running at a speed of 2 m/s, they will cover this distance in 0.00644/2 = 0.00322 seconds.
Since the Earth rotates 1/24 of a full rotation in one hour, it will rotate 1/24 x 360 = 15 degrees in one hour. This means that in 0.00322 seconds, the Earth will rotate 15/360 x 0.00322 = 0.000134 degrees.
Now, let's consider the total mass of all the people running. Since they are evenly spaced out, we can assume that the center of mass of all the people will be at the equator. This means that the total torque of the people will be zero, and the rotational motion of the Earth will not be affected.
Therefore, the Earth will continue to rotate at its normal speed, and the day will remain 24 hours long.
In conclusion, the day will not change in length when all the people in the world run around the equator at a speed of 2 m/s. This is because the total mass of the people is very small compared to the mass of the Earth, and their relative motion does not affect the Earth's rotation.
