There is a solution of solute and water inside the bottle, placed on a smooth horizontal surface with no friction, with the density of the solute greater than the density of the water, and the concentration of the solute on the left side of the bottle is greater than the concentration of the solute on the right side of the bottle. In the process of solute diffusion from left to right, the mass on the right side will become larger, will this cause the bottle to move to the left?
[Physics] Does diffusion cause the bottle to move to the left
brownian motiondiffusionstatistical mechanics
Related Solutions
The drift velocity of a particle of mass $m$ under gravity in a fluid of viscosity $\xi$ is $mg/\xi$, from which it follows that the relevant diffusion equation is
$$ \frac{\partial C}{\partial t} = D\frac{\partial^2 C}{\partial z^2}+\frac{mg}{\xi}\frac{\partial C}{\partial z} $$
The steady-state ($\partial C/\partial t=0$) solution is of the form
$$ C(z)=\alpha \frac{D\xi}{mg}e^{-mgz/\xi D}+\beta $$
where $\alpha,\beta$ can be solved by imposing appropriate boundary conditions.
So the answer to your question is yes, the ions do sink. However, as $mg/D\xi$ becomes very small, the $C(z)$ distribution becomes almost uniform. And if you plug in the appropriate numbers for sodium chloride, you'll find that the gravitational gradient is negligible. Indeed, I do a lot of simulation studies of diffusion and we completely disregard effects of gravity.
Question 1: Is the density of water still the same as it was at the beginning now that salt has begun dissolving? Ie. is the density of water constant? Or will the dissolved salt molecules "squeeze" the water molecules into a smaller volume thus increasing the density of water? And actually we should be talking about concentration of water now instead of density of water as we are dealing with a mixture comprised of two substances?
If you don't mix the water, the salt will slowly dissolve into it, starting at the bottom of the container. This will give you a concentration gradient in the container, where the highest density corresponds to the solubility limit of salt at that temperature, on the bottom of the container, and the density decreases as you go up in the container. For a container that is sufficiently deep, you should have fresh water at the surface for a certain time, but salt will slowly diffuse from lower in the container, so I doubt that the surface will stay totally fresh as you observe the container for long time periods. There is a practical device, known as a solar pond, that operates on the principle that the density of water at the bottom of the pond is so high that absorbed solar radiation will not heat the bottom of the container enough to induce convection currents, effectively enabling the "top" water to insulate higher temperature "bottom" water. See https://en.wikipedia.org/wiki/Solar_pond for details. Note that the concentration gradient remains stable, even though the bottom of the pond is substantially warmer than the top of the pond.
Regarding your other sub-questions, the sodium ions and chlorine ions from the salt crystal become "solvated" with water molecules. From a chemistry viewpoint, I doubt that it is correct to assume that the different molecular species remain separate when the salt dissolves in water.
Question 2: Is the concentration/density of salt in the solution constant? This questions seems to have the obvious answer of "no it isn't because the salt is dissolving and thus the concentration of the salt in the solution is changing over space and time as it spreads out"?
As mentioned previously, the concentration of salt is not constant, IF you don't mix the water. Even if you let a lot of time go by, there will be a concentration gradient in the water column that is enough to allow solar ponds (mentioned above) to work.
Question 3: The density of the solution itself, ρt...as the concentration of salt seems to be non-constant it therefore implies that the density of the solution is non-constant...I.e. it will vary at different points in the fluid over space and time as the salt dissolves until it reaches an equilibrium when all the salt is dissolved?
If you carefully set up this experiment and do not stir the water, it is possible to have undissolved salt at the bottom of the container. Whether or not this is the case depends on how much salt you add.
Question 4: So if the solution has non-constant density it means it is compressible? And it will be governed by the compressible Navier-Stokes equations?
Unless you intend to impose VERY high pressures on your container, you can consider the liquid to be imcompressible. The density profile is caused by the concentration gradient, not compressibility.
Assuming that you want equations to estimate density vs. height in the water column, you may want to start with solar pond design. I have no doubt that designers had to work some of the same problems you are dealing with.
Best Answer
Yes, the bottle will move.
It will move in such a way, that center of mass of system "bottle and everything inside it" will remain at the same position.
This is because there are no external forces acting on this system. Errrghh, need to be more accurate here: this is because horizontal component of all the external forces is zero => horizontal velocity of center of mass will remain constant => it will remain zero, as it was zero in the begining = > horizontal coordinates of center of mass will remain constant.
Center of mass will not move, but you will see that the bottle moved, because the mass distribution of things inside the bottle changed.