The discussion centers on calculating the initial velocity of a ball falling from a height of 10 meters, which loses 50% of its energy upon collision with the ground. Participants clarify that the ball cannot rebound to the original height if dropped without an initial velocity. They establish that the total energy before the collision consists of kinetic and potential energy, and apply the conservation of mechanical energy principle to derive the initial velocity using the equation \(y = v_0 t - 0.5 a t^2\). The final consensus is that the initial velocity \(v_0\) can be calculated using the kinematic equations and energy conservation principles.
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norhh said:... and then rises to same height
Fewmet said:I think you have a typo there. Should it be "and then rises to some height"?
uperkurk said:If an object is dropped from 10m it can NEVER bounce 10m's upwards again, it will always be slightly less so I think the wording is "some height"
lewando said:If you apply an initial non-zero downward velocity (not just dropping it), it is possible.
norhh said:ooooooooo it has a velocity while falling [it has an initial velocity v, and velocity increases as it free falls] and it cannot be equivalent to a freely falling body [it is a freely falling body] and i do not know how to start [the standard kinematic equations are a good place to start--also, since the word "energy" is used, consider energy equations: KE, PE].And i do not know many formulas for ccollisions i forgot.i just need starting.
Fewmet said:Thanks for the clarification, lewando. I see the error of my ways.
So, norrh, follow lewando's lead: what equations do you think would apply?
Nogueira said:would it be possible to find out v0 using just the following equation? y=v0t-0.5a(t*t)
Nogueira said:So, to do the conservative force work we have to equal the mass to zero, but still, for the non conservative work, how do we find the "v" in the final cinectic energy?
azizlwl said:...
Make at height 10m as reference of potential energy equal zero.
lewando said:Why would you not use the ground as the zero PE reference?
CAF123 said:I attempted this question too and came up with the following;
Taking the reference level of potential, U_o = 0 to be ground level,
\frac{1}{2}mv_o^2 + mgh = \frac{1}{2}mv_a^2, where v_o is the initial velocity and v_a is the velocity prior to impact.
Since there is 50% dissipation, I said that half of the total energy would be converted to potential energy;
\frac{1}{2}(\frac{1}{2}mv_a^2) = mgh
Solving for v_a yields v_a = \sqrt{4gh} but this gives an initial velocity of \sqrt{2gh} which is what it would be were it dropped. So I feel there is an error somewhere. Any ideas?