Calculating Gravitational Potential

Gravitational potential V_g can be calculated at a distance r from a point mass M using the equation:

$V_{g} = - \frac{G M}{r}$

Where:
- V_g = gravitational potential (J kg^–¹)
- G = Newton’s gravitational constant (N m² kg^–2)
- M = mass of the body causing the gravitational field (kg)
- r = distance from the centre of mass of M to the point in the field (m)

This means that the gravitational potential is negative on the surface of a mass (such as a planet), and increases with distance from that mass (becomes less negative toward zero)
Work has to be done against the gravitational pull of the planet to take a unit mass away from the planet
The gravitational potential at a point depends on the mass of the object producing the gravitational field and the distance the point is from that mass

Changes in Gravitational Potential

Two points at different distances from a mass will have different gravitational potentials
- This is because the gravitational potential increases with distance from a mass
Therefore, there will be a gravitational potential difference between the two points
- This is represented by the symbol ΔV
ΔVcan therefore be expressed as the difference between the 'final' gravitational V_f potential and the 'initial' gravitational potential V_i

ΔV = V_f – V_i

Therefore, the change in potential between two points a distance r₁ and r₂ from some mass M is given by:

$Δ V = - \frac{G M}{r_{2}} - (- \frac{G M}{r_{1}})$

This simplifies to:

$Δ V = G M (\frac{1}{r_{1}} - \frac{1}{r_{2}})$

Where:
- ΔV = change in potential (J kg^–1)
- G = Newton’s gravitational constant (N m² kg^–2)
- M = mass causing the gravitational field (kg)
- r₁ = initial distance from mass M (m)
- r₂ = final distance from mass M (m)

Worked example

Calculate gravitational potential at the surface of Mars.

Radius of Mars = 3400 km

Mass of Mars = 6.4 × 10²³ kg

Step 1: Write the gravitational potential equation

$V_{g} = - \frac{G M}{r}$

Step 2: Substitute known quantities

$V_{g} = - \frac{(6.67 \times 10^{- 11}) \times (6.4 \times 10^{23})}{3400 \times 10^{3}}$ = – 1.3 × 10⁷ J kg^–1

Examiner Tip

The equation for gravitational potential in a radial field looks very similar to the equation for gravitational field strength in a radial field, but there is a very important difference! Remember, for gravitational potential:

$V_{g} = - \frac{G M}{r}$ so $V_{g} \propto - \frac{1}{r}$

However, for gravitational field strength:

$g = - \frac{G M}{r^{2}}$ so $g \propto - \frac{1}{r^{2}}$

Additionally, remember that both V_g and g are measured from the centre of the mass M causing the field!

Calculating Gravitational Potential (OCR A Level Physics)

Revision Note