Write the formula,dimensional formula,and $SI$ unit for the Shear Modulus and the Bulk Modulus.
- AShear Modulus: $\eta = \frac{F/A}{\Delta x/L}$,$[M^1 L^{-1} T^{-2}]$,$N/m^2$; Bulk Modulus: $B = -\frac{\Delta P}{\Delta V/V}$,$[M^1 L^{-1} T^{-2}]$,$N/m^2$
- BShear Modulus: $\eta = \frac{F}{A}$,$[M^1 L^1 T^{-2}]$,$N/m$; Bulk Modulus: $B = -\Delta P \Delta V$,$[M^1 L^2 T^{-2}]$,$N/m^2$
- CShear Modulus: $\eta = \frac{F \cdot A}{\Delta x}$,$[M^1 L^0 T^{-2}]$,$N/m^2$; Bulk Modulus: $B = -\frac{\Delta P}{V}$,$[M^1 L^{-1} T^{-1}]$,$N/m^2$
- DShear Modulus: $\eta = \frac{A}{F}$,$[M^{-1} L^1 T^2]$,$N/m^2$; Bulk Modulus: $B = -\frac{\Delta V}{\Delta P}$,$[M^{-1} L^1 T^2]$,$N/m^2$
Explore More
Similar Questions
$A$ man grows into a giant such that his linear dimensions increase by a factor of $9$. Assuming that his density remains the same,the stress in the leg will change by a factor of
$A$ string of length $0.314 \text{ m}$ and Young's modulus $2 \times 10^{10} \text{ N/m}^2$ is connected to another string of length $B$ and Young's modulus both twice of those of $A$. This series combination of strings is then suspended from a rigid support and its free end is fixed to a load of mass $0.8 \text{ kg}$. The net change in length of the combination is . . . . . . $\text{mm}$. (radius of both the strings is $0.2 \text{ mm}$ and acceleration due to gravity $= 10 \text{ m/s}^2$) (Mass of both strings is to be neglected as compared to the mass of load)
DifficultJEE MAIN 2026
View Solution$A$ sphere of mass $4 \,kg$ is attached to one end of a steel wire of length $1 \,m$ and radius $1 \,mm$. It is whirled in a vertical circle with an angular velocity $10 \,rad \,s^{-1}$. If the sphere is at the lowest point of its path,the elongation in the wire is . . . . . . $(g=10 \,ms^{-2}, Y_{\text{steel}}=20 \times 10^{10} \,Nm^{-2})$ (in $\,mm$)
One end of a steel wire is fixed to the ceiling of an elevator moving up with an acceleration $2 \ m/s^2$ and a load of $10 \ kg$ hangs from the other end. If the cross-section of the wire is $2 \ cm^2$,then the longitudinal strain in the wire will be ($g = 10 \ m/s^2$ and $Y = 2.0 \times 10^{11} \ N/m^2$).
MediumWBJEE 2025
View SolutionStatement $(A)$ For an ideal liquid,the bulk modulus is infinite and the shear modulus is zero.
Statement $(B)$ The volume contraction of a metal cube of bulk modulus $140 \text{ GPa}$ and side length $10 \text{ cm}$,when subjected to a hydraulic pressure of $7 \times 10^6 \text{ Pa}$,is $-0.05 \text{ m}^3$.
Statement $(C)$ $A$ spiral spring is stretched by a weight attached to it. The strain is tensile.
Statement $(B)$ The volume contraction of a metal cube of bulk modulus $140 \text{ GPa}$ and side length $10 \text{ cm}$,when subjected to a hydraulic pressure of $7 \times 10^6 \text{ Pa}$,is $-0.05 \text{ m}^3$.
Statement $(C)$ $A$ spiral spring is stretched by a weight attached to it. The strain is tensile.
Vedclass Products
For Students
Vedclass Test Series
Mock tests in real JEE/NEET style with performance analysis. 5-day free trial.
Start Free TrialFor Teachers
Exam Paper Generator
Generate Set A/B/C/D exam papers from 7.5L+ questions in 2 minutes. 3 chapters free.
Try FreeFor Institutes
Online Exam Module
Live online exams with unlimited students, 360° analytics & white-label branding.
See Demo