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F = m*a, or
a = F/m = 2N/10kg = 0.2 m/s^2
A more interesting solution comes from the fact that since
impulse = F*t, and
F = m*a, then
impulse = m*a*t, or
a = impulse/(m*t) = 6*N*s/(10*kg*3*s) = 0.2 m/s^2
3. What is the velocity at the end of the 3-second interval in question 1 above.
Answer:
The impulse is equal to the change in momentum, and the initial velocity is 0.
impulse = m*(v2 - v1) = m*v2, or
v2 = impulse/m = 6*N*s/(10*kg) = 0.6 m/s
We can check that answer by knowing that the acceleration is uniform at 0.3 m/s^2 for 3 s = 0.6 m/s.
A dip in the pool
You have a body mass of 70 kg. You are on your knees on an inflatable raft in a swimming pool. The raft has a mass of 1kg. Your outstretched hands are about two meters from a safety rope that is strung across the pool.
You decide to launch yourself from the raft to catch the rope, exerting a force with a horizontal component of5 newtons. (You assume that the vertical component of your launching force will take care of the downward pull of gravity, allowing you to fly in a parabolicarc to the rope.) Assuming uniform acceleration (which is unrealistic but we will assume that anyway), how long will it take you to flythrough the air to reach the rope?
Answer:
The force that you exert on the raft will be equal and opposite to the force that the raft exerts on you. Therefore,
F = my*ay = -mr*ar
where
Therefore
ay = F/my = 5N/70kg = 0.07143 m/s^2 toward the rope
ar = -F/mr = -5N/1kg = -5.00000 m/s^2 away from the rope
We learned in an earlier module that given a constant acceleration, the distance traveled versus time is:
d = v0t + 0.5*a*t^2
In this case, v0 is zero, so
d = 0.5*ay*t^2, or
t = sqrt(d/(0.5*ay)), or
t = sqrt(2m/(0.5*0.07143m/s^2)) = 7.48324 seconds
I doubt that you will stay in the air long enough to reach the rope.
During that time period, the raft will travel the following distance in the opposite direction (assuming no resistance from the water).
d = 0.5*ar*t^2, or
d = 0.5*(-5m/s^2)*(7.48324s)^2 = -140 meters
Railroad cars
Getting back to my example of coupling railroad cars, when the collision has been completed, the two masses have effectively been joined into a single massand they are moving at the same velocity.
In that case, we can write the above equation as
ma*(v2 - va1) = -mb*(v2 - vb1)
ma*v2 +mb*v2 = ma*va1 +mb*vb1
v2 = (ma*va1 +mb*vb1)/(ma + mb)
where
Then for any set of assumed mass values for the railroad cars and assumed values for the initial velocities, we can calculate the final velocity of thecoupled pair of railroad cars.
Scenario #1: Assume that the two railroad cars are just alike and empty giving them the same mass. Also assume that the initial velocity for Car-A is 10m/s and the initial velocity for Car-b is 0.
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