Gravitational Potential of Square System

Gravitational Potential Energy of Square System

Example 8.3: Four masses at vertices of a square

Mass (m):

Side length (l):

System's gravitational potential energy: -5.41 Gm²/l

Gravitational potential at center: -4√2 Gm/l

Numerical values:

Total PE: -5.41 Gm²/l

Center potential: -5.66 Gm/l

This simulation demonstrates the gravitational potential energy of four equal masses arranged at the corners of a square.

For four masses (each mass = m) at the corners of a square (side length = l):

\[ W(r) = -4 \frac{G m^2}{l} - 2 \frac{G m^2}{\sqrt{2} l} \]

\[ W(r) = -\frac{2 G m^2}{l} \left(2 + \frac{1}{\sqrt{2}}\right) \approx -5.41 \frac{G m^2}{l} \]

The distance from center to any corner is \( r = \frac{\sqrt{2}}{2} l \):

\[ U(r) = -4 \frac{G m}{r} = -4 \sqrt{2} \frac{G m}{l} \approx -5.66 \frac{G m}{l} \]

11 Example 8.3