5.5 Work Done by a Variable Force - Class 11 Physics

Section 5.5 introduces one of the most powerful extensions of the concept of work — calculating work when force is not constant. In realistic physical systems, forces rarely remain constant. They often depend on displacement, position, configuration, or even velocity. This section develops the calculus-based method required to calculate work in such situations and forms the backbone of advanced mechanics.

At Deeksha Vedantu, we train students to handle both board-level and JEE-advanced level questions from this topic. Mastery of integration and graphical reasoning gives a decisive competitive advantage.

Why Constant Force Formula Is Not Sufficient

Earlier we used:

$\boldsymbol$

This works only when force is constant in magnitude and direction.

However, in real systems:

Spring force changes with displacement.
Gravitational force changes with distance.
Electrostatic force varies with separation.
Many JEE problems define force as a function of x.

Hence we require a general definition.

Elementary Work for Infinitesimal Displacement

Consider a force that varies with position as $\boldsymbol$ .

For a very small displacement $\boldsymbol$ , the small amount of work done is:

$\boldsymbol$

Total work from $\boldsymbol$ to $\boldsymbol$ is obtained by integration:

$\boldsymbol{W = \int_^ F(x) dx}$

This is the most general expression for work in one dimension.

Geometrical Interpretation: Area Under F–x Curve

Work done equals the area under the force–displacement graph.

Constant Force

Area = rectangle =

$\boldsymbol$

Linearly Increasing Force

If force increases from 0 to F:

Area = triangle =

$\boldsymbol$

General Non-Linear Curve

Work equals total area under curve:

$\boldsymbol$

If the area lies below the x-axis, work is negative.

Graph interpretation is heavily tested in JEE.

Work Done by a Spring (Hooke's Law Detailed Treatment)

Hooke's Law:

$\boldsymbol$

Work done by spring from 0 to x:

$\boldsymbol$

Work done by external agent:

$\boldsymbol$

This becomes elastic potential energy.

Solved Example 1 (Board Level)

A spring of constant $\boldsymbol$ is stretched by $\boldsymbol$ . Find work done.

$\boldsymbol$

Work Done by Position-Dependent Force (JEE Level)

Suppose:

$\boldsymbol$

Find work done from 0 to 2 m.

$\boldsymbol$

This type of polynomial integration is common in JEE Main.

Work Done by Gravitational Force (Advanced Treatment)

Gravitational force at distance r:

$\boldsymbol$

Work done from $\boldsymbol$ to $\boldsymbol$ :

$\boldsymbol{W = \int_^ \frac{G M m}{r^2} dr}$

$\boldsymbol{W = G M m \left( \frac{1} - \frac{1} \right)}$

This directly leads to gravitational potential energy expression.

Advanced JEE Problem (Graph-Based)

A force–displacement graph consists of:

Rectangle area = 10 J
Triangle area = 5 J
Curved negative area = -3 J

Total work:

$\boldsymbol$

Students must carefully account for sign of area.

Work Done in Three Dimensions

General vector form:

$\boldsymbol$

Total work:

$\boldsymbol$

If force has components:

$\boldsymbol$

This form is used in advanced JEE Advanced problems.

Conservative vs Non-Conservative Forces (Deeper Insight)

Conservative Force

Work independent of path
Potential energy definable
Work over closed path = 0

Examples:

Spring force
Gravitational force

Non-Conservative Force

Work depends on path
Mechanical energy not conserved

Example:

Friction

Understanding this distinction is critical for energy conservation problems.

Advanced Concept: Closed Loop Work

For conservative forces:

$\boldsymbol$

This property is frequently used in higher-level mechanics.

High-Level Numerical (JEE Advanced Type)

Force varies as:

$\boldsymbol$

Find work from 0 to a.

$\boldsymbol$

Such power-function integrations are standard in competitive exams.

Applications in Competitive Exams

Work done by variable force appears in:

Spring compression and release
Particle under polynomial force
Gravitational potential derivation
Force–displacement graph problems
Energy conservation derivations

Integration mastery directly improves score.

Common Mistakes to Avoid

Using $\boldsymbol$ for variable force
Ignoring integration limits
Forgetting sign of restoring force
Misreading graph area below axis
Confusing force–time graph with force–displacement graph

Accuracy in interpretation is essential.

Key Formula Summary

Concept	Formula
Elementary Work	$\boldsymbol$
Total Work	$\boldsymbol$
Spring Force	$\boldsymbol$
Spring Work	$\boldsymbol$
Gravitational Work	$\boldsymbol{W = G M m \left( \frac{1} - \frac{1} \right)}$
Vector Form	$\boldsymbol$

FAQs

Q1. Why can't we use $\boldsymbol$ for variable force?

Because force changes during displacement, so simple multiplication does not apply.

Q2. What is the most general formula for work?

$\boldsymbol$

Q3. What does the area under the F–x graph represent?

Work done by the force.

Q4. Why is spring work negative when calculated using spring force?

Because spring force is restoring and opposite to displacement.

Q5. Why is this topic important for JEE?

Because advanced mechanics problems frequently define force as a function of position and require integration.

Conclusion

Section 5.5 elevates the concept of work from simple multiplication to a powerful calculus-based tool. The integral form of work enables accurate calculation of energy transfer in realistic physical systems where forces vary continuously.

At Deeksha Vedantu, we ensure students gain conceptual clarity, graphical interpretation skills, and integration mastery so they can confidently solve board-level as well as JEE Advanced-level problems involving variable forces.

5.5 Work Done by a Variable Force – Class 11 Physics

Why Constant Force Formula Is Not Sufficient

Elementary Work for Infinitesimal Displacement

Geometrical Interpretation: Area Under F–x Curve

Constant Force

Linearly Increasing Force

General Non-Linear Curve

Work Done by a Spring (Hooke's Law Detailed Treatment)

Solved Example 1 (Board Level)

Work Done by Position-Dependent Force (JEE Level)

Work Done by Gravitational Force (Advanced Treatment)

Advanced JEE Problem (Graph-Based)

Work Done in Three Dimensions

Conservative vs Non-Conservative Forces (Deeper Insight)

Conservative Force

Non-Conservative Force

Advanced Concept: Closed Loop Work

High-Level Numerical (JEE Advanced Type)

Applications in Competitive Exams

Common Mistakes to Avoid

Key Formula Summary

FAQs

Q1. Why can't we use for variable force?

Q2. What is the most general formula for work?

Q3. What does the area under the F–x graph represent?

Q4. Why is spring work negative when calculated using spring force?

Q5. Why is this topic important for JEE?

Conclusion

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Q1. Why can't we use $\boldsymbol$ for variable force?