7.9: Fluid Statics

Question 7.9.2.

Does fluid pressure depend on the surface area of the container? For instance, is the pressure below the Atlantic Ocean less than the pressure below the Pacific Ocean since the Pacific is larger?

Answer

No. Fluid pressure is a function of density and depth only, so the surface area of an ocean or tank is insignificant.

\[ P = \rho g h\text{.} \nonumber \]

Assuming that the density of seawater and \(g\) are the same everywhere under the ocean, the gage pressure depends on depth only.

Question 7.9.3.

Compare the pressure at three feet and thirty feet below the surface of freshwater to the atmospheric pressure.

Answer

The gage pressure at \(\ft{3}\) is

\[ p = \gamma d = \pqf{62.4} \times \ft{3} = \psf{187} = \psinch{1.30} \text{.} \nonumber \]

This is

\[ \frac{ \psinch{14.7} + \psinch{1.3}} {\psinch{14.7}} = 1.088\text{,} \nonumber \]

approximately 9% greater than atmospheric pressure.

At \(\ft{30}\) below the surface, the pressure is 10 times higher, \(\psinch{13.0}\) which is nearly twice atmospheric pressure.

Example 7.9.4. Force on a submerged window.

An aquarium tank has a \(\m{3}\times \m{1.5}\) window AB for viewing the inhabitants. The tank contains water with density \(\rho = \kgsm{1000}\text{.}\)

Find the force of the water on the window, and the location of the equivalent point load.

Answer

\(F = \kN{155}\) acting \(\m{1.29}\) above point \(B\) or \(\m{3.71}\) below the surface of the water.

Solution 1

Begin by drawing a diagram of the window showing the load intensity and the equivalent concentrated force.

The pressure at the top and the bottom of the window are

\begin{align*} P_A \amp = \rho\ g (\m{2})= \Nsm{19620}\\ P_B \amp = \rho\ g (\m{5}) = \Nsm{49050} \end{align*}

Since the loading is linear, the average pressure acting on the window is

\begin{align*} P_{ave}\amp = (P_A + P_B)/2\\ \amp = \Nsm{34300} \end{align*}

The total force acting on the window is the average pressure times the area of the window

\begin{align*} F \amp = (P_{ave})( \m{3} \times \m{1.5})\\ \amp = \kN{155} \end{align*}

This force may also be visualized as the volume of a trapezoidal prism with a \(\m{1.5}\) depth into the page.

The line of action of the equivalent force passes through the centroid of the trapezoid, which may be calculated using composite areas, see Section 7.5.

Dividing the trapezoid into a triangle and a rectangle and measuring down from the surface of the tank, the distance to the equivalent force is

\begin{align*} d \amp= \frac{\sum A_i \bar{y}_i}{\sum A_i}\\ d \amp = \frac{\big[P_A(\m{3})\big](\m{3.5}) + \left[\dfrac{1}{2}(P_B-P_A)(\m{3})\right](\m{4})} { \big[P_A(\m{3})\big] +\left[\dfrac{1}{2}(P_B-P_A)(\m{3})\right]}\\ d \amp = \m{3.71} \end{align*}

If you prefer, you may use the formula from the Centroid table 7.4.1 to locate the centroid of the trapezoid instead.

Solution 2

Example 7.9.5. Mud on Concrete Wall.

Find the depth \(h\) of mud for which the \(\m{3}\) tall concrete retaining wall will be on the verge of tipping over.

Assume the density of mud is \(\kgqm{1760}\) and the density of concrete is \(\kgqm{2400}\text{.}\)

Answer

\[ h = \m{1.99} \nonumber \]

Solution

Example 7.9.6. Sea Gate.

A sea gate is hinged at point \(A\) and is designed to rotate and release the water when the depth \(d\) exceeds a certain value.

The gate extends \(\m{2}\) into the page. The mass density of the water is \(\rho = \kgqm{1000}\text{.}\)

What depth will cause the gate to open?

Answer

\[ d \ge \m{1.50} \nonumber \]

Solution 1

For the gate to tip, the force of the water must act at or above A. That happens when the centroid of the load intensity diagram from the water has its equivalent point force at or above A, so

\begin{align*} \frac{d}{3} \amp \ge \mm{500}\\ d \amp \ge \mm{1500}\text{.} \end{align*}

Solution 2

Example 7.9.7. Gate with Horizontal Surface.

The gate at the end of a freshwater channel is fabricated from three \(\kg{125}\text{,}\) \(\m{0.6}\times \m{1}\) rectangular steel plates. The gate is hinged at \(A\) and rests against a frictionless support at \(D\text{.}\) The depth of the water \(d = \m{0.75}\text{.}\)

Draw the free body digram and determine the reactions at \(A\) and \(D\text{.}\)

Answer

\begin{align*} D_x \amp= \N{124} \text{ right}\\ A_x \amp = \N{2636} \text{ left} \\ A_y \amp = \N{2795} \text{ up} \end{align*}

Solution

A free body diagram of a cross section of the gate is shown. For simplicity the thickness of the steel plates has been ignored. You must sufficient distances are provided to locate the loads.

The easiest way to solve this is to apply the principle of transmissibility: slide the lower trapezoid left until it aligns with the upper triangle and makes a triangular loading.

The total horizontal force from the water will be

\begin{align*} F_x \amp = P_{ave}\ A\\ \amp = \left[\frac{1}{2} \rho\ g\ \m{0.75}\right](\m{0.75} \times \m{1})\\ \amp = \left[\frac{1}{2} (\kgqm{1000}) (\aSI{9.81})\ \m{0.75}\right](\m{0.75} \times \m{1})\\ \amp = \N{2760} \end{align*}

acting to the right \(\m{0.25}\) above point \(A\text{.}\)

The total vertical load from the water is

\begin{align*} F_y \amp = P_{ave}\ A\\ \amp = [\rho\ g\ (\m{0.15})] (\m{0.6} \times \m{1})\\ \amp = [( \kgqm{1000})( \aSI{9.81})\ (\m{0.15})] (\m{0.6} \times \m{1})\\ \amp = \N{882.9} \end{align*}

acting upward \(\m{0.3}\) to the left of \(A\text{.}\)

Each plate weighs

\begin{align*} W \amp = m g \\ \amp = (\kg{125})( \aSI{9.81}) \\ \amp = \N{1226}\text{.} \end{align*}

From here solve the equilibrium equations to find the reactions. You should complete this for practice.

\begin{align*} \Sigma M_A \amp = 0 \amp \amp \rightarrow \amp D_x \amp = \N{124} \text{ right}\\ \Sigma F_x \amp = 0 \amp \amp \rightarrow \amp A_x \amp = \N{2636} \text{ left} \\ \Sigma F_y \amp = 0 \amp \amp \rightarrow \amp A_y \amp = \N{2795} \text{ up} \end{align*