Given that T^(2) = kR^(3), express the c...

Given that `T^(2) = kR^(3)`, express the constant `k` of the above relation in days and kilometres. Given, `k= 10^(-13)s^(2) m^(-3)`. The Moon is at a distance of `3.84 xx 10^(5) km` from the earth. Obtain its time period of revolution in days.

Text Solution

AI Generated Solution

To solve the problem, we will follow these steps: ### Step 1: Understand the given relation We are given the relation \( T^2 = kR^3 \), where: - \( T \) is the time period of revolution, - \( R \) is the distance from the Earth to the Moon, - \( k \) is a constant. ...

Topper's Solved these Questions

GRAVITATION
VMC MODULES ENGLISH|Exercise LEVEL -0 Long Answer Type|3 Videos
GRAVITATION
VMC MODULES ENGLISH|Exercise Level-1 MCQs|60 Videos
GRAVITATION
VMC MODULES ENGLISH|Exercise LEVEL -0 Short Answer Type – I|6 Videos
GASEOUS STATE & THERMODYNAMICS
VMC MODULES ENGLISH|Exercise JEE ADVANCED (ARCHIVE )|111 Videos
INTRODUCTION TO VECTORS & FORCES
VMC MODULES ENGLISH|Exercise JEE Advanced ( ARCHIVE LEVEL-2)|12 Videos

Similar Questions

Explore conceptually related problems

The rate constant of a reaction is given by k = 2.1 xx 10^(10) exp(-2700//RT) . It means that

Calculate the area covered per second (m^(2)s^(-1)) by the Moon for one complete revolution round the Earth (distance of Moon from Earth =3.845 times 10^(8) and period of revolution of Moon =27""1/3 days).

Rate constant of two reactions are given below. Identifying their order of reaction k = 5.3 xx 10^(-2) L mol^(-1) s^(-1) k = 3.8 xx 10^(-4) s^(-1)

The rate constant for a second order reaction is given by k=(5 times 10^11)e^(-29000k//T) . The value of E_a will be:

The distance of the planet Jupiter from the Sun is 5.2 times that of the Earth. Find the period of Jupiter's revolution around the Sun.

Calculate the distance from the earth to the point where the gravitational field due to the earth and the moon cancel out. Given that the earth-moon distance is 3.8 xx 10^(8) m and the mass of earth is 81 times that of moon.

The Earth and Jupiter are two planets of the sun. The orbital radius of the earth is 10^(7)m and that of Jupiter is 4 xx 10^(7)m If the time period of revolution of earth is T = 365 days find time period of revolution of the Jupiter .

The velocity constant of a reaction at 290 K was found to be 3.2 xx 10^(-3) s^(-1) . When the temperature is raised to 310 K, it will be about

VMC MODULES ENGLISH-GRAVITATION-LEVEL -0 Short Answer Type – II

Why rockets are launched from west to east in the equatorial plane?
Text Solution
|
A person in an artificial satellite of Earth feels weightlessness. But...
Text Solution
|
Why does a tunnis ball bounce heigher on a hill than on plains?
Text Solution
|
The escape speed of a body from the earth depends upon
Text Solution
|
Two particles of masses 0.2 kg and 0.8 kg are separated by 12 cm. At w...
Text Solution
|
Two satellites S1 and S2 revolve around the earth at distances 3R and ...
Text Solution
|
Assertion : A geostationary satellite rotates in a direction from west...
Text Solution
|
How many hours would make a day if the earth were rotating at such a h...
Text Solution
|
Imagine what would happen if the value of G becomes : (i) 100 times o...
Text Solution
|
Given that T^(2) = kR^(3), express the constant k of the above relatio...
Text Solution
|
A planet travels in an elliptical orbit about a star as shown. At what...
Text Solution
|
Three mass points each of mass m are placed at the vertices of an equi...
Text Solution
|
Mention at least three conditions under which weight of a person can b...
Text Solution
|