Gravitational field

General physics

🎯 Learning Objectives

Understand that for a point outside a uniform sphere, its mass may be treated as concentrated at its centre
Recall and apply Newton’s law of gravitation (F = G dfrac{m_1 m_2}{r^2}) for two point masses
Sketch and interpret force vs distance relationships for point masses
Calculate gravitational forces and discuss the inverse-square nature of gravity

🗣️ Language Objectives

Use terms “uniform sphere,” “point mass,” “centre of mass,” “inverse-square law” correctly
Explain gravitational interactions clearly in academic English
Interpret and describe formulae and graphs using precise terminology
Discuss proportionality and dependency on distance in speaking and writing

📚 Key Terms and Translations

English Term	Russian	Kazakh
Point mass	Точечная масса	Нүктелік масса
Uniform sphere	Однородная сфера	Теңмасса сфера
Centre of sphere	Центр сферы	Сфера орталығы
Gravitational constant (G)	Гравитационная постоянная	Гравитациялық тұрақты
Inverse-square law	Закон обратных квадратов	Квадраттық кері заң
Gravitational force	Сила гравитации	Гравитациялық күш

🃏 Vocabulary Study Cards

Point Mass

Definition: An object whose dimensions are negligible compared to distances involved

Use: Simplifies gravitational calculations

Uniform Sphere

Definition: Sphere with constant density throughout

Key Fact: External gravity behaves as if mass concentrated at centre

Inverse-Square Law

Definition: Physical quantity varies as (1/r^2) with distance

Example: Gravitational force decreases with square of separation

Newton’s Law

Formula: (F = G dfrac{m_1 m_2}{r^2})

Role: Calculates force between two masses

📖 Glossary of Terms

Point mass

An idealized object with all its mass concentrated at a single point for ease of calculation.

Translation

Russian: Идеализация, при которой вся масса сосредоточена в одной точке.
Kazakh: Барлық масса бір нүктеге шоғырланған идеализация.
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Uniform sphere

A sphere of constant density; gravitational field outside equals that of a point mass at its centre.

Translation

Russian: Сфера с постоянной плотностью; поле вне такой сферы аналогично полю точечной массы.
Kazakh: Тұрақты тығыздықты сфера; оның сыртындағы өріс нүктелік массаға ұқсас.
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🔬 Theory: Newton’s Law of Gravitation

Mass of Uniform Sphere as Point Mass

For any point outside a uniform sphere, the gravitational effect is identical to that of a point mass located at the centre with the same total mass.

Newton’s Law of Gravitation

The magnitude of the force between two point masses (m_1) and (m_2) separated by distance (r) is:

(F = G dfrac{m_1 m_2}{r²}),
where (G) is the gravitational constant.

Translation

Russian: Сила между двумя точечными массами (m_1) и (m_2), разделенными на расстоянии (r): (F = G dfrac{m_1 m_2}{r^2}).
Kazakh: Екі нүктелік масса (m_1) және (m_2) арасындағы күш: (F = G dfrac{m_1 m_2}{r^2}).
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Theory Questions

Easy: Why can a uniform sphere’s mass be treated as at its centre for external points?

Answer

By spherical symmetry, gravitational contributions sum to that of a point mass at the centre.

Medium: Write down Newton’s law of gravitation and define each symbol.

Answer

(F = G dfrac{m_1 m_2}{r^2}): (F) is force, (G) constant, (m_1,m_2) masses, (r) separation.

Medium: How does (F) change if (r) doubles? Explain using the inverse-square law.

Answer

If (r) doubles, (F) becomes (tfrac{1}{4}) of its original value (since (1/(2r)^2 = 1/4r^2)).

Hard (Critical Thinking): Discuss limitations of treating extended bodies as point masses in gravitational calculations.

Answer

For points inside or very close to non-point masses, distribution matters; near-surface fields differ if density is non-uniform.

💪 Memorization Exercises

Fill in the Blanks

A uniform sphere’s gravity acts as if mass is at its _______.
Newton’s law: (F = G dfrac{m_1 m_2}{r^______}).
Gravitational force varies inversely with the _______ of distance.
(G) is called the gravitational _______.

Answer

1. Centre
2. 2
3. Square
4. Constant

🎥 Video Lesson

Additional Video Resources:

• Newton’s Law of Gravitation Explained

• Gravity & Inverse-Square Law

📐 Worked Examples

Example 1: Point Mass Approximation

A uniform sphere of mass 2×10³ kg and radius 0.5 m. Calculate gravitational force on a 1 kg mass 2 m from centre.

Gravity diagram

Solution

Answer

Treat sphere as mass at centre:
(F = G dfrac{(2times10^3)(1)}{2^2} = G times dfrac{2000}{4} = 500G text{N}.)

Example 2: Inverse-Square Effect

Two 5 kg masses separated by 0.1 m. Find (F) (use (G=6.67times10^{-11})).

Solution

Answer

(F = 6.67times10^{-11}dfrac{5times5}{0.1^2} = 6.67times10^{-11}times dfrac{25}{0.01} = 1.67times10^{-8}text{ N}.)

🧪 Interactive Investigation

Explore gravity between point masses:

Investigation Answers

Vary masses and distance; observe force ∝ (m_1 m_2) and ∝ (1/r^2).

👥 Collaborative Group Activity

Using an online quiz (e.g. Quizizz), challenge peers to calculate gravitational forces for given scenarios.

📝 Individual Assessment

Solve these structured questions:

Show why external field of uniform sphere equals that of point mass at centre.
Calculate force between Earth (6×10²⁴ kg) and 70 kg person at surface (R=6.4×10⁶ m).
Derive dependence of weight on altitude using inverse-square law.
Compare gravitational force inside vs outside a uniform sphere.
Critically evaluate errors if density is not uniform.

🔗 Additional Learning Resources

🤔 Lesson Reflection

Which assumption (point mass) simplifies gravitational calculations most?
How does changing (r) affect (F)? Explain with examples.
What practical limitations arise from non-uniform density?
How can you apply Newton’s law in astrophysical contexts?