To determine the time when the position of the ball is equal to 5 meters, you would need the equation of motion for the ball, which typically depends on initial position, velocity, and acceleration. If you have a specific equation (e.g., (s(t) = vt + s_0) for constant velocity), you can set it equal to 5 meters and solve for time (t). Without that specific equation or additional information, it's impossible to provide an exact time.
Because if the given is meter the answer is second and when the given is seconds the answer is meters
You need to know how fast the ball is going, and divide the speed by the distance, which is 3 meters.
Some channels show you the distance between the ball and the goal at freekicks. They also show the speed of the shot. On average a freekick is between 80 and 100km\h.
The time it takes for the ball to hit the floor is approximately 0.64 seconds.
To find the time it takes for the soccer ball to travel 6.5 meters at a velocity of 22 meters per second, you can use the formula: time = distance/velocity. Plugging in the values, time = 6.5 meters / 22 meters per second, which equals approximately 0.295 seconds. Therefore, it would take the ball about 0.3 seconds to travel that distance.
At 3 metres per second it will roll 6 metres in 2 seconds.
Answer: 66 Meters. Just had that same problem on a math mates worksheet.
t matters how much mass the ball has
Assuming you release it from a position of rest, you must multiply the time by the acceleration. The acceleration due to gravity near Earth's surface is approximately 9.8 meters/second squared.
The time it took to hit the ball can be found using the impulse-momentum theorem. The impulse experienced by the ball is equal to the change in momentum. The impulse is equal to the average force multiplied by the time period over which it acted. The change in momentum of the ball is equal to the mass of the ball multiplied by its final velocity. By setting these two expressions equal to each other and solving for time, you can find the answer.
Perhaps it is B0. From a physics viewpoint, it seems to me the "initial position of the ball" would be inertia or "at rest".
After the 7th bounce, the ball will reach a height of 1 meter. This is because after each bounce, the ball reaches half of its previous height. So, after 1 bounce it reaches 64 meters, after 2 bounces it reaches 32 meters, after 3 bounces it reaches 16 meters, and so on, until it reaches 1 meter after the 7th bounce.