$A$ body is performing $SHO$ with a total energy of $100\,J$. In the table below, column-$I$ shows the kinetic energy $(K)$ at a specific time, and column-$II$ shows the potential energy $(U)$ at that same time. Match them appropriately.
Column-$I$ Column-$II$ $(a)$ $K = 10\,J$ $(i)$ $U = 40\,J$ $(b)$ $K = 60\,J$ $(ii)$ $U = 90\,J$ $(iii)$ $U = 50\,J$
| Column-$I$ | Column-$II$ |
| $(a)$ $K = 10\,J$ | $(i)$ $U = 40\,J$ |
| $(b)$ $K = 60\,J$ | $(ii)$ $U = 90\,J$ |
| $(iii)$ $U = 50\,J$ |
$(A)$ For a body performing $SHO$, the total energy $(E)$ is the sum of kinetic energy $(K)$ and potential energy $(U)$:
$E = K + U$
Given $E = 100\,J$.
For $(a)$, $K = 10\,J$:
$U = E - K = 100\,J - 10\,J = 90\,J$.
This matches $(ii)$.
For $(b)$, $K = 60\,J$:
$U = E - K = 100\,J - 60\,J = 40\,J$.
This matches $(i)$.
Therefore, the correct matching is $(a-ii, b-i)$.
$E = K + U$
Given $E = 100\,J$.
For $(a)$, $K = 10\,J$:
$U = E - K = 100\,J - 10\,J = 90\,J$.
This matches $(ii)$.
For $(b)$, $K = 60\,J$:
$U = E - K = 100\,J - 60\,J = 40\,J$.
This matches $(i)$.
Therefore, the correct matching is $(a-ii, b-i)$.
Explore More
Similar Questions
The maximum restoring force of a body executing $SHM$ is $\alpha$ and the total energy is $\beta$. Obtain its amplitude in terms of $\beta$ and $\alpha$.
Medium
View Solution$A$ particle undergoing simple harmonic motion has time-dependent displacement given by $x(t) = A \sin \left( \frac{\pi t}{90} \right)$. The ratio of kinetic energy to potential energy of the particle at $t = 210 \ s$ will be:
$A$ body is executing simple harmonic motion. At a displacement $x$,its potential energy is $E_1$ and at a displacement $y$,its potential energy is $E_2$. The potential energy $E$ at a displacement $(x+y)$ is
An object of mass $3 \,kg$ is executing simple harmonic motion with an amplitude $\frac{2}{\pi} \,m$. If the kinetic energy of the object when it crosses the mean position is $6 \,J$, the time period of oscillation of the object is (in $\,s$)
$A$ particle of mass $m$ executes simple harmonic motion with amplitude $a$ and frequency $v$. The average kinetic energy during its motion from the position of equilibrium to the end is
DifficultAIEEE 2007
View SolutionVedclass 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