Newton’s Law of Universal Gravitation was one of the most audacious ideas in the history of science: the same force that pulls an apple from a tree also holds the Moon in its orbit and keeps every planet circling the Sun. The Moon is not falling toward Earth any differently from the apple — it is simply moving so fast sideways that as it falls, the curved Earth drops away beneath it. Understanding this single insight unlocks the mechanics of every orbit, every tide, and every spacecraft trajectory ever calculated.

GGravitational constant
6.674×10⁻¹¹G in N·m²/kg²
1687Newton’s Principia
9.81g at Earth’s surface (m/s²)

1. The Law of Universal Gravitation

Newton proposed that every object with mass attracts every other object with mass. The magnitude of this attractive gravitational force depends on both masses and the distance between their centres:

F = Gm₁m₂ / r²
Newton’s Law of Universal Gravitation
F = gravitational force (N) G = 6.674 × 10⁻¹¹ N·m²/kg² m₁, m₂ = masses (kg) r = distance between centres (m)

G is the gravitational constant — one of the fundamental constants of nature. Its tiny value (6.674 × 10⁻¹¹) explains why gravity is the weakest of the four fundamental forces at small scales. The gravitational force between two 1 kg masses 1 metre apart is only 6.67 × 10⁻¹¹ N — utterly negligible. You only notice gravity when at least one object has planetary-scale mass.

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Why gravity is unusual: Gravity is the weakest of the four fundamental forces (gravitational, electromagnetic, weak nuclear, strong nuclear) — yet it dominates at astronomical scales because it always attracts, never repels, and acts over infinite range. Electromagnetic forces are much stronger but tend to cancel out (equal amounts of positive and negative charge). Gravity has no such cancellation.

2. The Inverse-Square Law — Why r² in the Denominator?

The r² dependence is not arbitrary — it arises from the geometry of three-dimensional space. Gravitational influence spreads outward in all directions uniformly, like light from a point source. At distance r, this influence is spread over the surface of a sphere of area 4πr². The “flux” of gravitational influence through any shell around the source is fixed — so the intensity at any point decreases as 1/r² as the shell area grows.

Distance from Earth’s centreGravitational field strength gRatio to surface value
1 R_Earth (surface, ~6,371 km)9.81 m/s²1.00 (reference)
2 R_Earth (~12,742 km)2.45 m/s²1/4
3 R_Earth (~19,113 km)1.09 m/s²1/9
10 R_Earth (~63,710 km)0.098 m/s²1/100
60 R_Earth (Moon’s distance)0.0027 m/s²1/3,600

The Moon is about 60 Earth radii away. Newton tested his law by checking that the Moon’s centripetal acceleration (0.0027 m/s²) equals g/60² = 9.81/3600 = 0.00272 m/s². It matched perfectly — the same law governing falling apples also governs the Moon’s orbit.

3. Weight vs Mass — The Critical Distinction

⚡ Mass vs Weight

Mass (kg) is a fundamental property of matter — its resistance to acceleration (inertia). Mass does not change with location. A 70 kg person has the same mass on the Moon, on Mars, and in deep space.

Weight (N) is the gravitational force on that mass: W = mg. Weight changes with location because g changes. On the Moon (g ≈ 1.62 m/s²), a 70 kg person weighs only 113 N instead of the 686 N they weigh on Earth.

Locationg (m/s²)Weight of 70 kg person (N)Equivalent “weight” (kg-force)
Earth’s surface9.81686.7 N70 kgf
Moon’s surface1.62113.4 N11.6 kgf
Mars’s surface3.72260.4 N26.6 kgf
Jupiter’s surface24.791,735 N177 kgf
International Space Station (orbit)8.70 N (apparent)0 (weightlessness)
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Astronauts are NOT weightless! At the ISS’s altitude (400 km), g ≈ 8.7 m/s² — still 89% of surface gravity. Astronauts experience “weightlessness” because they and the station are both in free fall together. They feel no normal force (no floor pushing up) because there is no surface to push against. True weightlessness would require being infinitely far from all mass.

4. Gravitational Field Strength

Instead of thinking about forces between pairs of objects, it is often more useful to think about the gravitational field created by a mass. The gravitational field strength g at distance r from a mass M is the force per unit mass that any test object would experience:

g = GM / r²
Gravitational field strength at distance r from mass M
g = field strength (N/kg = m/s²) G = 6.674 × 10⁻¹¹ N·m²/kg² M = source mass (kg) r = distance from centre of M (m)

At Earth’s surface: g = GM_Earth/R_Earth² = (6.674×10⁻¹¹ × 5.97×10²⁴)/(6.371×10⁶)² = 9.81 m/s² ✓

5. Circular Orbits

For a satellite in circular orbit at radius r from Earth’s centre, gravity provides exactly the centripetal force needed for circular motion. Setting them equal:

v = √(GM/r)
Orbital speed for a circular orbit at radius r around mass M

Notice: orbital speed does not depend on the satellite’s mass — it cancels out. A golf ball and the International Space Station at the same altitude orbit at exactly the same speed. This is why all debris at the same orbital altitude must be tracked — it all orbits at the same speed regardless of size.

ObjectOrbital radiusOrbital speedOrbital period
International Space Station6,770 km (~400 km altitude)7,660 m/s (27,600 km/h)92 minutes
Moon384,400 km1,022 m/s (3,679 km/h)27.3 days
Geostationary satellite42,164 km3,075 m/s (11,070 km/h)24 hours
GPS satellite26,560 km3,874 m/s (13,950 km/h)12 hours

6. Worked Examples

Example 1Gravitational force between Earth and Moon

Given: M_Earth = 5.97 × 10²⁴ kg, M_Moon = 7.35 × 10²² kg, r = 3.84 × 10⁸ m, G = 6.674 × 10⁻¹¹ N·m²/kg²

1
F = Gm₁m₂/r² = (6.674×10⁻¹¹ × 5.97×10²⁴ × 7.35×10²²) / (3.84×10⁸)²
2
Numerator: 6.674×10⁻¹¹ × 4.388×10⁴⁷ = 2.927×10³⁷
3
Denominator: (3.84×10⁸)² = 1.475×10¹⁷. F = 2.927×10³⁷ / 1.475×10¹⁷ = 1.98×10²⁰ N
✓ F ≈ 1.98 × 10²⁰ N — nearly 200 quintillion Newtons. This enormous force keeps the Moon in orbit and is responsible for ocean tides on Earth.
Example 2Orbital speed of the ISS

Problem: Calculate the orbital speed of the ISS at 400 km altitude. (M_Earth = 5.97 × 10²⁴ kg, R_Earth = 6.371 × 10⁶ m)

1
Orbital radius: r = 6,371,000 + 400,000 = 6,771,000 m = 6.771 × 10⁶ m
2
v = √(GM/r) = √(6.674×10⁻¹¹ × 5.97×10²⁴ / 6.771×10⁶)
3
v = √(3.982×10¹⁴ / 6.771×10⁶) = √(58,811,108) = 7,669 m/s
✓ v ≈ 7,669 m/s (27,610 km/h). At this speed, the ISS completes one orbit every 92 minutes. Astronauts see 16 sunrises every 24 hours.
Example 3Weight on Mars

Problem: A person has a mass of 75 kg. What is their weight on Mars? (M_Mars = 6.39 × 10²³ kg, R_Mars = 3.39 × 10⁶ m)

1
Find g_Mars: g = GM/r² = (6.674×10⁻¹¹ × 6.39×10²³) / (3.39×10⁶)²
2
g_Mars = 4.263×10¹³ / 1.149×10¹³ = 3.71 m/s²
3
W_Mars = mg = 75 × 3.71 = 278 N
✓ Weight on Mars ≈ 278 N (compared to 736 N on Earth). The person’s mass remains 75 kg — mass never changes with location, only weight does.

7. Tides — Gravity in Action

Ocean tides are caused by the variation of the Moon’s gravitational pull across Earth’s diameter. The side of Earth facing the Moon is pulled more strongly toward it than Earth’s centre; the far side is pulled less strongly. This differential force — the tidal force — stretches Earth’s oceans into a bulge on both sides, producing two high tides per day as Earth rotates beneath them.

The Sun also exerts tidal forces on Earth — about 46% as strong as the Moon’s, despite the Sun being 27 million times more massive, because it is 390 times further away and tidal forces scale as 1/r³ (not 1/r²).

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Spring and Neap Tides: When the Sun and Moon align (new or full moon), their tidal forces add together → extra-high spring tides. When they are at 90° (first/third quarter moon), they partially cancel → smaller neap tides. This monthly pattern governs coastal ecosystems, shipping schedules, and extreme flood risk worldwide.

8. Common Misconceptions

✗ Misconception 1

“Gravity stops at some distance from Earth.” Gravity has infinite range — it decreases as 1/r² but never reaches exactly zero. Even at the distance of the nearest star (4 light-years), Earth exerts a tiny but non-zero gravitational pull. Every mass in the universe gravitationally influences every other mass, however weakly.

✗ Misconception 2

“There is no gravity in space.” The ISS orbits in a region where g ≈ 8.7 m/s² — almost as strong as on Earth’s surface. Astronauts experience weightlessness not because there is no gravity, but because they and the station are both in free fall. They are not floating — they are falling, continuously, around the Earth.

✗ Misconception 3

“The Moon and Earth don’t pull on each other equally.” By Newton’s Third Law, the force Earth exerts on the Moon is exactly equal and opposite to the force the Moon exerts on Earth. The Moon pulls Earth toward it with exactly 1.98 × 10²⁰ N — the same force Earth pulls the Moon. Earth “barely moves” because its mass is 81 times greater, giving it 81 times less acceleration.

9. Frequently Asked Questions

Why do all objects fall at the same speed (ignoring air resistance)? +
Because gravitational force is proportional to mass (F = mg), but acceleration = F/m. Substituting: a = mg/m = g. The mass cancels out exactly. A feather and a hammer in vacuum fall at 9.81 m/s² regardless of mass. This was demonstrated dramatically on the Moon by astronaut David Scott in 1971 — he dropped a hammer and feather simultaneously; both hit the ground at the same instant.
What is the difference between g and G? +
G (capital) is the universal gravitational constant: G = 6.674 × 10⁻¹¹ N·m²/kg². It appears in Newton’s law F = Gm₁m₂/r² and is the same everywhere in the universe. g (lowercase) is the local gravitational field strength or acceleration due to gravity — it equals GM/r² for the specific planet and distance. At Earth’s surface, g = 9.81 m/s². On Mars, g = 3.71 m/s². G never changes; g changes with location.
How does Newton’s gravity relate to Einstein’s general relativity? +
Newton describes gravity as a force acting at a distance between masses. Einstein’s general relativity (1915) describes gravity as the curvature of spacetime caused by mass and energy. Massive objects warp the fabric of spacetime; other objects follow the straightest possible paths (geodesics) through this curved spacetime — which we observe as gravitational attraction. Newton’s law is an excellent approximation when gravity is weak and speeds are much less than light. General relativity is required for GPS satellites, black holes, gravitational waves, and the expansion of the universe.
What causes tides — is it gravity or something else? +
Tides are caused by tidal forces — the difference in gravitational pull across Earth’s diameter. The Moon pulls the ocean on the near side more strongly than Earth’s centre, and pulls Earth’s centre more strongly than the far-side ocean. These differential forces stretch Earth’s oceans into two bulges. As Earth rotates beneath these bulges, any given coastal location experiences two high tides and two low tides approximately every 24 hours (slightly more, as the Moon also moves).

Conclusion

Newton’s Law of Universal Gravitation — F = Gm₁m₂/r² — was the first successful attempt to describe a force acting at astronomical distances with mathematical precision. It unified terrestrial and celestial mechanics into one framework and gave humanity the ability to predict planetary positions, design satellite orbits, and understand tides.

The inverse-square law arises geometrically from three-dimensional space. The tiny value of G explains why we only notice gravity at planetary scales. And the crucial equivalence between gravitational mass (what determines force in F = Gm₁m₂/r²) and inertial mass (what determines resistance to acceleration in F = ma) means that all objects fall with the same acceleration — a profound fact that eventually led Einstein to his general theory of relativity.