Two bodies of masses `100 kg` and `10,000 kg` are at a distance `1m` part. At which point on the line joining them will the resultant gravitational field intensity be zero?
Text Solution
AI Generated Solution
To solve the problem of finding the point where the resultant gravitational field intensity is zero between two masses, we can follow these steps:
### Step 1: Understand the Setup
We have two masses:
- Mass \( m_1 = 100 \, \text{kg} \) at point \( P \)
- Mass \( m_2 = 10,000 \, \text{kg} \) at point \( Q \)
The distance between the two masses is \( 1 \, \text{m} \).
...
Two point masses of mass 10 kg and 1000 kg are at a distance 1 m apart. At which points on the line joining them, will the gravitational field intensity be zero ?
Two point charges +4q and +q are placed 30cm apart. At what point on the line joining them is the electric field zero
Two point masses having mass m and 2m are placed at distance d . The point on the line joining point masses , where gravitational field intensity is zero will be at distance
Two particles of masses 'm' and '9m' are separated by a distance 'r'. At a point on the line joining them the gravitational field is zero. The gravitational potential at that point is (G = Universal constant of gravitation)
Two bodies of masses m and 4m are placed at a distance r. The gravitational potential at a point due to mass m on the line joining where gravitational field is zero
Two bodies of masses 10 kg and 100 kg are seperated by a distance of 2 m. The gravitational potential at the mid-point of the line joining the two bodies is:
Two bodies of mass 10^(2) kg and 10^(3) kg are lying 1 m apart . The gravitational potential at the mid-point of the line joining them is
Two particles of masses 0.2 kg and 0.8 kg are separated by 12 cm. At which point from the 0.2 kg particle, gravitational field intensity due to the two particles is zero?
Two point charges of 5 mu C and 20 mu C are separated by a distance of 2m. Find the point on the line joining them at which electric field intensity is zero.
Two stationary particles of masses M_(1) and M_(2) are 'd' distance apart. A third particle lying on the line joining the particles, experiences no resultant gravitational force. What is the distance of this particle from M_(1) ?
