Luigi Fortunati il 22/07/2024 04:56:42 ha scritto:
In my animation https://www.geogebra.org/m/qterew9m the momentum of
body A before the collision is p=mv=15v.
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After the collision, the momentum of body A is reduced to
p=m*(1/4)v=15*(1/4)v=(15/4)v=3.75v
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During the collision, body A lost a momentum equal to 15v-3.75v=11.25v
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Where did this momentum lost by body A during the collision go?
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Luigi Fortunati
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[[Mod. note --
Hint: What is body B's mass? What was its velocity before the collision?
What is its velocity after the collision?
-- jt]]
Thank you for your suggestion.
It's true (and it's also obvious): there are only two bodies and what
one loses can only be gained by the other and vice versa.
However, Newton's 3rd law dictates that there are no gains or losses,
otherwise the equality between action and reaction would fail.
If body A passes some momentum to body B, body B must politely return
to body A the *same* momentum it received, no more and no less.
[[Mod. note -- Newton's laws say that (assuming that there are no external
forces acting) the *total* momentum of the system remains constant. In
this case, that's saying that
p_A + p_B = p_total = constant .
In other words, if we define
p_total_before = p_A_before + p_B_before
p_total_after = p_A_after + p_B_after
then we have
p_total_after = p_total_before .
This statement holds in any inertial reference frame.
This statement implies that
(p_A_after - p_A_before) = - (p_B_after - p_B_before) ,
i.e., the *change* in A's momentum during the collision is precisely
the opposite of the *change* in B's momentum during the collision.
-- jt]]
And instead, in the case of my animation this is precisely what doesn't
happen and I demonstrate it.
Before the collision, body A had 6 more momentum than body B (+15 for
body A and -9 for body B), after the collision it has only one and a
half points more momentum than body B ( body A +3.75, body B +2.25).
Body A gave (and received nothing), body B received (and gave nothing).
[[Mod. note -- I don't see any problem here.
Before the collision,
p_A_before = +15
p_B_before = -9 ,
hence
p_total_before = p_A_before + p_B_before = +6 ,
and after the collision
p_A_after = +3.75
p_B_after = +2.25 ,
hence
p_total_after = p_A_after + p_B_after = +6 ,
so we do indeed have
p_total_after = p_total_before .
If we look at the momentum *changes* during the collision, we have
p_A_after - p_A_before = 3.75 - 15 = -11.25 ,
while B's momentum change during the collision is
p_B_after - p_A_after = 2.25 - -9 = +11.25
so the momentum *changes* are indeed precisely opposite.
-- jt]]
The action was greater than the reaction and not equal: body A won and
moved forward, body B lost and went back.
[[Mod. note -- What you're describing is consistent with the mass of A
being larger than the mass of B. -- jt]]
My animation
https://www.geogebra.org/m/tgtrjjuw clearly demonstrates
that if the action and reaction were *always* equal and opposite, the
rods would never tilt.
Luigi Fortunati