Julio Di Egidio alle ore 07:29:41 di gioved=EC 14/07/2022 ha scritto:
>
> There is indeed a corresponding centripetal force in the inertial frame in
> which the bucket rotates ...

The centripetal force exerted by the walls of the bucket on the water
is already present before the bucket starts to rotate, because it must
counteract the centrifugal thrust of the water which, even when
stationary, would be set in motion centrifugally outwards if the walls
of the bucket did not oppose.

All of this continues to be there even when the bucket starts spinning
and the water still doesn't.

This ratio between the centrifugal and centripetal forces changes when
even the water starts to spin!

And what happens in this case? Is it the water accelerating
(centrifugally) outward or is the bucket walls accelerating
(centripetally) inward?

Is it the centrifugal force that pushes the water to accumulate against
the walls of the bucket or is it the centripetal force that pushes the
walls of the bucket to tighten against the water?

[[Mod. note -- It appears that you're confusing two quite different
forces:
(a) The outward force the water exerts on the walls of the bucket, and
the corresponding Newton's-3rd-law inward force the walls of the
bucket exert on the water, due to the water's *weight* and Pascal's
law:
... this force is described in
https://en.wikipedia.org/wiki/Vertical_pressure_variation
https://en.wikipedia.org/wiki/Pascal%27s_law
... this force is ONLY present if there's an ambient (vertical)
gravitational field (or an equivalent vertical acceleration);
this force is proportional to the vertical Newtonian "little g"
and is ABSENT if the bucket is in free-fall ("weightless"),
e.g., in a space station
... this force varies with vertical position along the bucket's
walls, i.e., this force goes to zero at the water surface,
and is at a maximum at the bottom of the bucket
... for a given volume/shape filled with water, this force is
INDEPENDENT of the water's spin (or the bucket's spin), so
it's "just" an irrelevant distraction in the context of Newton's
bucket
(b) The outward force the water exerts on the walls of the bucket, and
the corresponding Newton's-3rd-law inward force the walls of the
bucket exert on the water, due to the water's *mass* moving on
an accelerated (spinning) trajectory:
... this force depends on the water's spin (NOT the bucket's spin);
this force is ONLY present if the water is spinning; this force
is ABSENT if the water is not spinning
... this force is INDEPENDENT of vertical position along the bucket's
walls: this force is IDENTICAL at the water surface and at the
bottom of the bucket
... for a given volume/shape filled with water, this force is
INDEPENDENT of the ambient gravitational field (or equivalent
vertical acceleration); notably, this force would be IDENTICAL
if the bucket were in free-fall ("weightless"), e.g., in a
space station
... this force is the one we usually discuss in the context of
Newton's bucket

Now to your specific statements & questions:

> The centripetal force exerted by the walls of the bucket on the water
> is already present before the bucket starts to rotate, because it must
> counteract the centrifugal thrust of the water which, even when
> stationary, would be set in motion centrifugally outwards if the walls
> of the bucket did not oppose.

You're referring to (a) here, which (since it doesn't vary with the water's
spin) is not relevant to a discussion of Newton's bucket.

> All of this continues to be there even when the bucket starts spinning
> and the water still doesn't.

The bucket's spin doesn't matter (for the dynamics of the water); only
the water's spin matters. [The bucket's spin does matter for calculating
the mechanical stresses on the bucket itself, due to the bucket's own
mass moving on an accelerated (spinning) trajectory.]

> This ratio between the centrifugal and centripetal forces changes when
> even the water starts to spin!

Yes, the statement "the water is spinning" implies the statement that
"the water is accelerated inwards (with respect to an inertial reference
frame)" and hence (by Newton's 2nd law) there must be net inwards forces
acting on the water. Those forces are the ones I described in (b) above.

> And what happens in this case? Is it the water accelerating
> (centrifugally) outward or is the bucket walls accelerating
> (centripetally) inward?

For simplicity let's focus on what happens once the bucket has been
spinning at a constant angular velocity for a long time, so that the water
is in uniform rotation at that same angular velocity. [I.e., let's ignore
the transient "startup" phase where the water's rotation is not yet uniform,
since the motion then is very complicated and hard to analyze.]

Then the answer to your first question is "no, the water is not accelerating
outward with respect to an inertial reference frame", and the answer to your
second question is "yes, the bucket walls (and the water) are accelerating
inward with respect to an inertial reference frame".
-- jt]]

On Friday, 15 July 2022 at 01:57:10 UTC+2, Luigi Fortunati wrote:
> Julio Di Egidio alle ore 07:29:41 di gioved=EC 14/07/2022 ha scritto:
> >
> > There is indeed a corresponding centripetal force in the inertial frame in
> > which the bucket rotates ...
>
> The centripetal force exerted by the walls of the bucket on the water
> is already present before the bucket starts to rotate, because it must
> counteract the centrifugal thrust of the water which, even when
> stationary, would be set in motion centrifugally outwards if the walls
> of the bucket did not oppose.

But that is not "Newton's bucket", it's just something else. Moreover,
and more basically, centripetal/centrifugal is not just any old force,
in fact has not even to do with shapes and "containers", it is
specifically how we call forces that derive from *rotational motion*.

<snip>
> This ratio between the centrifugal and centripetal forces changes when
> even the water starts to spin!

That just cannot be: those two forces are just two different descriptions
of the same physics, typically associated with the two distinct frames
of reference, the one inertial in which the thing (bucket, spinning top,
whatever) is rotating, and the one rotating with the thing.

In fact, more concretely, whichever the frame of reference we
choose, we can draw vectors representing both the centripetal and
the centrifugal force (as measured in their respective frames) and
those two vectors, unless I am badly mistaken, stay identically
equal and opposite.

Incidentally, this is not Newton's third law, though it looks analogous
since it's another case of equal and opposite: the two forces in the
third law actually both exist, are not simply two sides (descriptions)
of the same coin...

> Is it the centrifugal force that pushes the water to accumulate against
> the walls of the bucket or is it the centripetal force that pushes the
> walls of the bucket to tighten against the water?
>
> [[Mod. note -- It appears that you're confusing two quite different
> forces:

While I second what the moderator goes on explaining there,
I think that more basic and to the point here was to note that
centrifugal/centripetal are, as said, just two sides of the same
one coin.

Julio

Tom Roberts alle ore 11:11:21 di venerdì 15/07/2022 ha scritto:

> You should see from the above discussion that it is ESSENTIAL that you
> specify which coordinates or frame you are discussing. Your repeated
> failure to do that turns what you say into nonsense.

None of the things I said happen in one reference yes and in the other
no.

The accumulation of water on the walls of the bucket occurs in ALL
references.

The transition from initially still water particles and then moving
outwards (radial acceleration) occurs in ALL references.

Tom Roberts alle ore 07:14:21 di lunedì 18/07/2022 ha scritto:
> On 7/18/22 4:50 AM, Luigi Fortunati wrote:
>> Tom Roberts alle ore 07:54:37 di domenica 17/07/2022 ha scritto:
>>> The difference is: a real force cannot be made to vanish by
>>> changing coordinates, while a fictitious "force" will vanish in
>>> inertial coordinates.
>>
>> I totally agree with you, the fictitious force disappears in the
>> inertial reference. But if it doesn't go away, obviously it's not
>> fictitious!
>
> In inertial coordinates, "fictitious forces" DO go away, as you agreed.
>
>> So, look at my animation https://www.geogebra.org/m/mrthyefq We are
>> in an inertial reference where the centrifugal force should not be
>> there. Still, the rope gets longer!
>
> Yes.
>
>> Can you explain to me how it stretches if there is no centrifugal
>> force?
>
> To start the object going around in the circle, you had to give the
> object an impulse [#] to the right; your drawing also starts the object
> at the (pre-computed) radius with which it will orbit [@]. To keep the
> object orbiting in a circle, the rope must pull it off its inertial
> straight-line path -- that pull is the centripetal force that keeps the
> object in circular orbit, and is what stretches the rope. No
> "centrifugal force" is involved.
>
> [#] Large force of very short duration.
> [@] Given the elasticity of the rope. There is an initial
> radially-outward force on the object to stretch the rope
> appropriately; it vanishes as soon as the object starts
> to move, as the rope then provides the centripetal force.

It is true that the rope provides its centripetal force to the object B
of my animation
https://www.geogebra.org/m/mrthyefq
but it is also true that, at the same time, object B provides the rope
with centrifugal force, otherwise the rope could not maintain its
elongation over time (elongation present in all references).

Centripetal and centrifugal forces act together and never separately:
one exists only by virtue of the fact that the other also exists (and
vice versa).

The centripetal force of A on B could not exist without the
corresponding (and opposite) centrifugal force of B on A.

Therefore the centrifugal force of A on B cannot disappear until the
centripetal force of B on A also disappears.

Luigi Fortunati

On 11/1/22 2:44 AM, xray4abc wrote:
> Centrifugal forces in rotational reference frames are not active
> forces but reactive forces.

No. Here's why:

Consider a mass with a rope attached, and you pull on the rope, straight
away from the mass -- i.e. you apply a force to the rope, which is
clearly an active force. The reactive force of Newton's third law is the
tension of the rope, generated by the inertia of the mass and the force
you applied to the rope. To apply Newton's laws, one must use an
inertial frame, and I am implicitly using one when I describe this
physical situation that way.

Now consider the exact same physical situation, but using rotating
coordinates. To be clear, no object is rotating, only the coordinates
are rotating. The active and reactive forces remain exactly the same
(because coordinates are a human construct that cannot possibly affect
any natural/physical phenomenon, such as forces). But if you want to
apply Newton's laws using those rotating coordinates, you must also
include "centrifugal, Coriolis, and Euler forces" -- these are purely
artifacts of using the rotating coordinates. They are not real in any
sense of the word, and they are not "reactive", they are FICTIONS
created by human mathematics in order to permit a human analyst to act
as if Newton's laws applied in the rotating coordinates.

[Note: I put "centrifugal, Coriolis, and Euler forces" in
"scare quotes" because those names are inappropriate and
lead all too many people to error. They are not really
forces, they are imaginary constructs of human minds.
But the names are solidly established historically.]

> The active force on any given point of a spinning object is the
> centripetal force imposed on it by the mass-points on the same
> radius ..namely the ONES which are closer to the rotational axis.
> The reaction force ,to the centripetal force exerted in-and-on this
> given point......is the so called centrifugal force.

No. The reactive force is the tension on whatever is exerting the
centripetal force on the object, and it is generated by the inertia of
the object and the centripetal force. The "centrifugal force" is purely
an artifact of the mathematics of using rotating coordinates -- mental
constructs of humans are not real.

> [... repetitions of the above]

Tom Roberts

Tom Roberts lunedì 07/11/2022 alle ore 03:57:05 ha scritto:
> On 11/3/22 3:39 AM, xray4abc wrote:
>> On Wednesday, July 13, 2022 at 5:50:42 AM UTC-4, Luigi Fortunati wrote:
>>> When Newton's bucket starts to rotate, the water slowly starts to rotate as well and accelerates outwards due to the centrifugal force.
>
> ... only in the rotating-bucket coordinates. In any inertial frame the
> water does not "accelerate outwards", it merely tries to move in a
> straight line -- in the rotating coordinates that is indeed accelerating
> outward.
>
>>> But the centrifugal force is ONLY in the rotating reference and
>>> not in the inertial one.
>
> Right. Ditto for any "centrifugal acceleration".
>
>>> So, how is the centrifugal acceleration of water justified EVEN in the inertial reference where the centrifugal force is not there?
>
> It isn't justified, because it does not exist. You seem to be confusing
> straight-line motion in an inertial frame with "centrifugal acceleration".

No, the centripetal acceleration in the inertial reference is there.

Look at my animation
https://www.geogebra.org/m/fpwnumsy

Initially the bucket is stationary and the water does not move: zero speed.

When the rotation begins, the water begins to move from the center outwards (towards the walls of the bucket where it accumulates).

The change in water speed from zero to greater than zero is (like all changes in speed) an acceleration.

Centrifuge, in this case, because it moves radially away from the center to the outside.

On Monday, November 7, 2022 at 1:57:09 PM UTC-5, Tom Roberts wrote:
> On 11/3/22 3:39 AM, xray4abc wrote:
> > On Wednesday, July 13, 2022 at 5:50:42 AM UTC-4, Luigi Fortunati
> > wrote:
> >> When Newton's bucket starts to rotate, the water slowly starts to
> >> rotate as well and accelerates outwards due to the centrifugal
> >> force.
> ... only in the rotating-bucket coordinates. In any inertial frame the
> water does not "accelerate outwards", it merely tries to move in a
> straight line -- in the rotating coordinates that is indeed accelerating
> outward.
> >> But the centrifugal force is ONLY in the rotating reference and
> >> not in the inertial one.
> Right. Ditto for any "centrifugal acceleration".
> >> So, how is the centrifugal acceleration of water justified EVEN in
> >> the inertial reference where the centrifugal force is not there?
> It isn't justified, because it does not exist. You seem to be confusing
> straight-line motion in an inertial frame with "centrifugal acceleration".
> > In our ,that is exterior, reference frame...we realize that the
> > water is forced into movement by the friction between itself and
> > the bucket.
> Sure. That accelerates it both tangentially and radially inward.
Which does not explain in itself whatsoever..why then it is moving from
the central area OUTWARD and UPWARD!
>
> Tom Roberts
Regards, LL

[[Mod. note -- Tom Roberts and others have noted (correctly) that
purely rotational motion involves ONLY a radial acceleration INWARD.
If this were the only motion involved, then the infinitesimal mass
element of water which starts out on the surface at the very center
(rotational axis) of the bucket, wouldn't move.

But the actual water motion during the transient startup phase
(bucket is rotating, but water isn't yet in purely rotational moton)
is much more complicated, involving vortices with mixed tangential
and radial motion.
-- jt]]

On Sunday, November 13, 2022 at 5:10:07 AM UTC-5, Luigi Fortunati wrote:
> xray4abc venerd=C4=9B 11/11/2022 alle ore 17:33:24 ha scritto:
>
> > How about the ones from the extremes, the very end of the radius vector
> > AND the ones situated one the central symmetry axis? Especially when we
> > look at.... the spinning of a rigid body!
> >
> > Regards, LL
> In my new animation
> https://www.geogebra.org/m/s9tss84k
> there are the particles at the extremes (R and U) and the central
> particle (S).
>
> The red forces are centrifugal, the blue forces are centripetal.
>
> In most physics textbooks......is considered that ..for a material point to move on a circle
..a centripetal force on it is needed. That particular centripetal force can be exerted from the interior part of that
circle/disc, or of course could be exerted from outside of the circle.
In the majority of practical situations ..the first case scenario applies, because it is the easier one to put in practice. For the liquid in the rotating bucket this centripetal force is due mainly to the bucket itself.
The reaction force to the centripetal force ..would be
the centrifugal force,( in the analyzed case) exerted by the liquid on the bucket.
Let us note that in other cases of rotation, like the rotation of a rigid body-system...the placement of the
forces is exactly the reverse of the situation described above.
For even more clarity, in this last case ..the innermost parts exert the centripetal force (which is the ACTION) and the outermost particles ( where the "every single particle" you mentioned is included as well) exert the centrifugal
force (which is the REACTION).
There are situations of movement on a circle, where is not clear at all, whether the centripetal force is exerted
from inside or from outside of the circle, or how it is exerted at all.
As an example is, the case of the rotation of a charged particle under the effect of the Lorentz force in a uniform
magnetic field, where it is assumed that this particular force is exerted on the entirety of that particle.
The point of all of the above is....a case based analysis is needed for pointing out...who is who..in the world of centrifugal and centripetal forces. One should not just analyze one case and generalize to apply to all other ones,
because it does not work that way.
Now , regarding an earlier posting of mine which was not accepted as one sticking to the subject of this thread, I have to say that , I was disappointed.
Though the subject here seems sort of contained..I hoped that the discussions would eventually lead to
more than just an interesting, yet still very limited, case of rotation.
Best regards, Laszlo Lemhenyi