Question: Which one of the following is the unit of compressibility? A.\[{{m}^{3/}}N\] B.\[{{m}^{2}}/N\] ...

Question

Which one of the following is the unit of compressibility?
A. ${{m}^{3/}}N$
B. ${{m}^{2}}/N$
C. ${{m}^{2}}-N$
D. $m/N$

Answer 1

Solution

Compressibility is the property of being decreased to a smaller space by pressure. This property is a result of porosity, and the difference in mass originates from the particles being united by the weight.

Complete answer:
Compressibility is the proportional of bulk modulus of flexibility (k). Bulk modulus is characterized as the proportion of compressive worry to the volumetric strain.
Consider a chamber loaded up with liquid and shut by cylinder when cylinder push ahead and pressure increment yet volume decline
Introductory pressure is $P$
Increments in pressure $=dP$
Introductory volume is $V$
Diminishing in volume = $-dV$ (- sign for diminishing volume)
Volumetric strain = change in volume/beginning volume
Volumetric strain = $\dfrac{-dV}{V}$
Mass modulus $\left( k \right)=-V\dfrac{dP}{dV}$
$\left( k \right)=-\dfrac{dP}{dV}\times V$ ( condition - 1)
Unit of weight is $N/{{m}^{2}}$
Unit of volume is ${{m}^{3}}$
Put this unit in condition — - 1
We get unit of bulk modulus $N/{{m}^{2}}$
Presently compressibility is equal to mass modulus.
The compressibility of liquid is essentially a proportion of the adjustment in thickness that will be created in the liquid by a predetermined change in pressure. Gases are exceptionally compressible while most fluids have low compressibility.

The correct answer is B.

Note:
The deviation from the perfect gas conduction becomes especially large (or, proportionately, the compressibility factor wanders a long way from solidarity) and close to the basic point, or on account of high weight or low temperature.
In these cases, a summed-up compressibility figure or an elective condition of the state which is more qualified to the issue must be used to deliver the precise outcomes.