Problem 2.79 — Capillary Rise

Problem Statement

Solve the fluid mechanics problem: Find the height to which water rises in a glass capillary of radius $r = 0.20\ \text{mm}$. ($\sigma = 0.073\ \text{N/m}$, contact angle $\theta = 0°$, $\rho = 1000\ \text{kg/m}^3$) At equilibrium, the surface tension force balances the weight of the liquid column: $$2\pi r\sigma\cos\theta = \pi r^2\

Given Information

• See problem statement for all given quantities.

Physical Concepts & Formulas

Surface tension $\sigma$ is the energy per unit area (or force per unit length) at a liquid surface. It arises from cohesive intermolecular forces. Capillary rise results from the balance between surface tension pulling liquid up and gravity pulling it down. The Laplace pressure across a curved interface is $\Delta P = 2\sigma/r$ (sphere) or $\sigma/r$ (cylinder).

• $h = 2\sigma\cos\theta/(\rho g r)$ — capillary height
• $\Delta P = 2\sigma/r$ — excess pressure inside a droplet
• $W = \sigma \Delta A$ — work done against surface tension

Step-by-Step Solution

Step 1 — Verify the result: Check units, limiting cases, and order of magnitude to confirm the answer is physically reasonable.

Step 2 — Verify the result: Check units, limiting cases, and order of magnitude to confirm the answer is physically reasonable.

Step 3 — Verify the result: Check units, limiting cases, and order of magnitude to confirm the answer is physically reasonable.

Worked Calculation

$$2\pi r\sigma\cos\theta = \pi r^2\

Given Information

• Fluid density $\rho$, velocities, cross-sections, and heights as given
• Atmospheric pressure $P_0 = 1.013\times10^5\,\text{Pa}$
• $g = 9.8\,\text{m/s}^2$

Physical Concepts & Formulas

Fluid statics is governed by Pascal’s Law and the hydrostatic pressure formula $P = P_0 + \rho g h$. Archimedes’ principle states that the buoyant force equals the weight of fluid displaced: $F_b = \rho_f V g$. Fluid dynamics for ideal (incompressible, non-viscous, steady) flow uses two key results: the continuity equation $A_1 v_1 = A_2 v_2$ (mass conservation) and Bernoulli’s equation $P + \frac{1}{2}\rho v^2 + \rho g h = \text{const}$ (energy conservation per unit volume).

• $P = P_0 + \rho g h$ — hydrostatic pressure
• $F_b = \rho_f V g$ — Archimedes buoyancy
• $A_1 v_1 = A_2 v_2$ — continuity equation
• $P + \tfrac{1}{2}\rho v^2 + \rho g h = \text{const}$ — Bernoulli’s equation
• $v_{\text{efflux}} = \sqrt{2gh}$ — Torricelli’s theorem

Step-by-Step Solution

Step 1 — Identify the situation: Static (use $P = P_0+\rho gh$ and Archimedes) or dynamic (use continuity + Bernoulli).

Step 2 — Apply Bernoulli between two points at the same streamline:

$$

$$

Step 3 — Use continuity to relate $v_1$ and $v_2$: $v_2 = v_1 A_1/A_2$.

Step 4 — Solve for the unknown (pressure, velocity, or flow rate).

Worked Calculation

Substituting all values with units:

Torricelli: Tank depth $h = 2\,\text{m}$, hole at bottom:

$$

$$

Answer

$$

Answer

$$\boxed{v_{\text{efflux}} = \sqrt{2gh}}$$

Physical Interpretation

Capillary action allows plants to draw water from roots to leaves against gravity. The thinner the tube, the higher the rise — but also the smaller the volume transported.