The work done in increasing the length of a metre long wire of cross-sectional area ........ J. 1,mm^2 through 1,mm will be (Y = 2

Q: The work done in increasing the length of a metre long wire of cross-sectional area ........ $J.$ $1\,mm^2$ through $1\,mm$ will be $(Y = 2 \times 10^{11}\,Nm^{-2})$

a Young's modulus $Y=\frac{F / A}{l / L} \Rightarrow F=\frac{Y A}{L} l$ Work done $d W=F \times d l=\int_{o}^{I} \frac{Y A}{L} l d l=\frac{1}{2} Y A \frac{l^{2}}{L}$ Given $, A=1 m m^{2}=10^{-6}$ $l=1 m m=10^{-3} m, Y=2 \times 10^{11} N m^{-2}, L=1 m=$ $W=\frac{1}{2} \times 2 \times 10^{11} \times 10^{-6} \times\left(10^{-3}\right)^{2} \mathrm{W}=0.1 \mathrm{J}$

SECTION - A [PHYSICS MCQ]

GSEB - English Medium

The work done in increasing the length of a metre long wire of cross-sectional area ........ $J.$ $1\,mm^2$ through $1\,mm$ will be $(Y = 2 \times 10^{11}\,Nm^{-2})$

A$0.1$
B$5$
C$10$
D$250$

Diffcult

STD 11 Science
JEE
STD 11- 8. mechanical properties of solids
Physics

Download our app
and get started for free

Experience the future of education. Simply download our apps or reach out to us for more information. Let's shape the future of learning together!No signup needed.*

Download App

Similar Questions

1
For a constant hydraulic stress on an object, the fractional change in the object's volume $\left( {\frac{{\Delta V}}{V}} \right)$ and its bulk modulus $(B)$ are related as
View Solution
2
A rod is fixed between two points at $20°C$. The coefficient of linear expansion of material of rod is $1.1 \times {10^{ - 5}}/^\circ C$ and Young's modulus is $1.2 \times {10^{11}}\,N/m$. Find the stress developed in the rod if temperature of rod becomes $10°C$
View Solution
3
Given below are two statements: one is labelled as Assertion $A$ and the other is labelled as Reason $R$

Assertion $A$: Steel is used in the construction of buildings and bridges.

Reason $R:$ Steel is more elastic and its elastic limit is high.

In the light of above statements, choose the most appropriate answer from the options given below
View Solution
4
The pressure applied from all directions on a cube is $P$. How much its temperature should be raised to maintain the original volume $?$ The volume elasticity of the cube is $\beta $ and the coefficient of volume expansion is $\alpha $
View Solution
5
A wire is suspended by one end. At the other end a weight equivalent to $20\, N$ force is applied. If the increase in length is $1.0\, mm$, the increase in energy of the wire will be ....... $joule$
View Solution
6
The elasticity of invar
View Solution
7
If a spring extends by $x$ on loading, then the energy stored by the spring is (if $T$ is tension in the spring and $k$ is spring constant)
View Solution
8
The breaking stress of a wire depends upon
View Solution
9
A wooden wheel of radius $R$ is made of two semicircular part (see figure). The two parts are held together by a ring made of a metal strip of cross section area $S$ and length $L$. $L$ is slighly less than $2\pi R$. To fit the ring on the wheel, it is heated so that its temperature rises by $\Delta T$ and it just steps over the wheel.As it cools down to surronding temperature, it presses the semicircular parts together. If the coefficint of linear expansion of the metal is $\alpha$, and its young's modulus is $Y$, the force that one part of wheel applies on the other part is
View Solution
10
$A$ rod of length $1000\, mm$ and coefficient of linear expansion $a = 10^{-4}$ per degree is placed symmetrically between fixed walls separated by $1001\, mm$. The Young’s modulus of the rod is $10^{11} N/m^2$. If the temperature is increased by $20^o C$, then the stress developed in the rod is ........... $MPa$
View Solution

Download our appand get started for free

Similar Questions

Download our app
and get started for free