Question 2.1: What is the intensity of pressure in the ocean at a depth of...

(a) For an incompressible f luid, the intensity of pressure at a depth, according to Eq. (2.16), is p (pressure in gauge) = \rho g h = 10050 (1500) N/m^{2} = 15.08 MN/m^{2} gauge

p-p_{0}=\rho g\left(z_{0}-z_{1}\right)=\rho g h (2.16)

(b) The change in pressure with the depth of liquid h from free surface can be written according to Eq. (2.14) as

\frac{ d p}{ d z}=-\rho g (2.14)

\frac{ d p}{ d h}=\rho g (2.68)

Again from the definition of bulk modulus of elasticity E (Eq. (1.5)),

E=\lim _{\Delta \rho \Rightarrow 0} \frac{\Delta p}{(\Delta \rho / \rho)}=\rho \frac{ d p}{ d \rho} (1.5)

d p=E \frac{ d \rho}{\rho} (2.69)

Integrating equation (2.69), for a constant value of E, we get

p=E \ln \rho+C (2.70)

The integration constant C can be found out by considering p=p_{0} \text { and } \rho=\rho_{0} at the free surface.

Therefore Eq. (2.70) becomes

p-p_{0}=E \ln \left(\frac{\rho}{\rho_{0}}\right) (2.71)

Substitution of dp from Eq. (2.68) into Eq. (2.69) yields

After integration

The constant C_{1} is found out from the condition that, \rho=\rho_{0} \text { at } h = 0 (free surface)

Hence, h=\frac{E}{g}\left(\frac{1}{\rho_{0}}-\frac{1}{\rho}\right)

from which \frac{\rho}{\rho_{0}}=\frac{E}{E-h \rho_{0} g}

Substituting this value \text { of } \rho / \rho_{0} \text { in } Eq. (2.71), we have

Therefore,

p(\text { in gauge })=2.07 \times 10^{9} \ln \left[\frac{2.07 \times 10^{9}}{2.07 \times 10^{9}-(10050)(1500)}\right] N / m ^{2} \text { gauge }

= 15.13 MN / m ^{2} \text { gauge }