# Pressure: Variable of depth or time?

For an object falling in a fluid, pressure on that object $$P=\rho\cdot g\cdot h$$ Is $$h$$ a function of time or depth? i.e- does pressure change to time or depth?

• In the spirit of always defining one's variables, what is $h$ here? Nov 19, 2022 at 20:05
• h is height from the water level- depth Nov 19, 2022 at 20:07
• So you're asking if the depth is a function of depth? Maybe it would be clearer if you wrote $P(t)=\rho g h(t)$, indicating the depending of the depth (and thus the pressure) on time. Nov 19, 2022 at 20:13
• Yes. Thats what I am all confused about. I've trying to think of velocity with respect to time and distance too, trying to find relation between them. I am, like most, used with velocity but have a hard time employing pressure as a function of time or distance itself. Nov 20, 2022 at 3:49
• Yes, many parameters are a function of everything. In this example, even the density and gravitational attraction are a function of depth! The trick is to identify when the dependence is negligible. Nov 20, 2022 at 4:08

$$P=\rho g h$$ is not a function of time or depth as much as it is a relationship that holds in all circumstances (or at least all circumstances within the domain of the model). If you are in any situation with fluid pressure, it is expected that the static pressure at a point will be exactly equal to the density of the liquid times the acceleration of gravity times the height of the column of fluid above the point.
If you have a situation where something is changing, then you can use that relationship to create a functional relationship. That could be $$P(t)=\rho g h(t)$$, in which case pressure and height are functions of t. It could also be $$P(t)=\rho g(t) h$$, which seems a bit absurd, but if you looked at the pressure at the bottom of a container on a rocket ship and that rocket ship flew far away from earth, the varying components may be the acceleration of gravity (which decreases) and pressure (which also decreases), while the height of the column is a constant.
You could also come up with some interesting cases in brackish estuaries where salty water meets fresh water, where the most meaningful functions could be functions of distance from the mouth of the river, rather than time. $$P(x)=\rho(x)gh$$ might be very meaningful if the density of the water is changing as a function of distance.