(A) Gravitational constant $G = \frac{Fr^2}{m^2}$. The dimensional formula is $[G] = \frac{[MLT^{-2}][L^2]}{[M^2]} = [M^{-1} L^3 T^{-2}] \ (IV)$.$(B)$

Name: Exam Paper Generator | JEE NEET Paper Generator | Vedclass
Brand: Vedclass
Rating: 5 (35 reviews)

(A) Gravitational constant $G = \frac{Fr^2}{m^2}$. The dimensional formula is $[G] = \frac{[MLT^{-2}][L^2]}{[M^2]} = [M^{-1} L^3 T^{-2}] \ (IV)$.$(B)$ Gravitational potential energy $U = mgh$. The dimensional formula is $[U] = [M][LT^{-2}][L] = [ML^2 T^{-2}] \ (III)$.$(C)$ Gravitational potential $V = \frac{GM}{r}$. The dimensional formula is $[V] = \frac{[M^{-1} L^3 T^{-2}][M]}{[L]} = [L^2 T^{-2}] \ (II)$.$(D)$ Acceleration due to gravity $g$. The dimensional formula is $[g] = [LT^{-2}] \ (I)$.Thus,the correct matching is $A-IV, B-III, C-II, D-I$.

Class 11 Physics Gravitation Mix Examples-Gravitation

Medium

Match the $\text{LIST-I}$ with $\text{LIST-II}$:

$\text{LIST-I}$ $\text{LIST-II}$

$A$. Gravitational constant $I$. $[LT^{-2}]$

$B$. Gravitational potential energy $II$. $[L^2 T^{-2}]$

$C$. Gravitational potential $III$. $[ML^2 T^{-2}]$

$D$. Acceleration due to gravity $IV$. $[M^{-1} L^3 T^{-2}]$

Choose the correct answer from the options given below:

$\text{LIST-I}$	$\text{LIST-II}$
$A$. Gravitational constant	$I$. $[LT^{-2}]$
$B$. Gravitational potential energy	$II$. $[L^2 T^{-2}]$
$C$. Gravitational potential	$III$. $[ML^2 T^{-2}]$
$D$. Acceleration due to gravity	$IV$. $[M^{-1} L^3 T^{-2}]$

JEE MAIN 2025 All JEE MAIN

A
$A-IV, B-III, C-II, D-I$
B
$A-III, B-II, C-I, D-IV$
C
$A-II, B-IV, C-III, D-I$
D
$A-I, B-III, C-IV, D-II$

Explore More

Browse All

Question Bank

All Subjects

Class 11 Questions

Class 11

Physics Questions

Chapter

Gravitation

Subtopic

Mix Examples-Gravitation

Previous Year

JEE MAIN 2025 Paper All JEE MAIN years →

Assume that a tunnel is dug along a chord of the earth,at a perpendicular distance $(R / 2)$ from the earth's centre,where '$R$' is the radius of the Earth. The wall of the tunnel is frictionless. If a particle is released in this tunnel,it will execute a simple harmonic motion with a time period:

Medium

View Solution

Many exoplanets have been discovered by the transit method,where one monitors a dip in the intensity of the parent star as the exoplanet moves in front of it. The exoplanet has a radius $R$ and the parent star has a radius $100 \,R$. If $I_0$ is the intensity observed on Earth due to the parent star,then as the exoplanet transits:

KVPY 2018

View Solution

What is the gravitational force exerted by the sphere of mass $M$ and radius $a$ on a ring of mass $m$ and radius $a$,where the distance between the center of the ring and the center of the sphere is $r = 1.73a = \sqrt{3}a$?

Difficult

View Solution

Two planets $A$ and $B$ having masses $m_1$ and $m_2$ move around the sun in circular orbits of $r_1$ and $r_2$ radii respectively. If angular momentum of $A$ is $L$ and that of $B$ is $3L$,the ratio of time period $\left(\frac{T_A}{T_B}\right)$ is:

DifficultJEE MAIN 2024

View Solution

$A$ geostationary satellite is at a height $h$ above the surface of the Earth. If the Earth's radius is $R$,which of the following statements is correct?

View Solution

Vedclass Products

For Students

Vedclass Test Series

Mock tests in real JEE/NEET style with performance analysis. 5-day free trial.

Start Free Trial

For Teachers

Exam Paper Generator

Generate Set A/B/C/D exam papers from 7.5L+ questions in 2 minutes. 3 chapters free.

Try Free

For Institutes

Online Exam Module

Live online exams with unlimited students, 360° analytics & white-label branding.

See Demo

Similar Questions

Assume that a tunnel is dug along a chord of the earth,at a perpendicular distance $(R / 2)$ from the earth's centre,where '$R$' is the radius of the Earth. The wall of the tunnel is frictionless. If a particle is released in this tunnel,it will execute a simple harmonic motion with a time period:

What is the gravitational force exerted by the sphere of mass $M$ and radius $a$ on a ring of mass $m$ and radius $a$,where the distance between the center of the ring and the center of the sphere is $r = 1.73a = \sqrt{3}a$?

Two planets $A$ and $B$ having masses $m_1$ and $m_2$ move around the sun in circular orbits of $r_1$ and $r_2$ radii respectively. If angular momentum of $A$ is $L$ and that of $B$ is $3L$,the ratio of time period $\left(\frac{T_A}{T_B}\right)$ is:

$A$ geostationary satellite is at a height $h$ above the surface of the Earth. If the Earth's radius is $R$,which of the following statements is correct?

Vedclass Test Series

Exam Paper Generator

Online Exam Module