A force displaces a body from to . The work done by this force is:
- A
- B
- C
- D
A force displaces a body from to . The work done by this force is:
Correct answer:B
Standard Method
Given: Force varies with position as and the body moves from to .
Find: The work done by the force.
For a variable force, work is the definite integral of force with respect to displacement:
Now integrate term by term:
Apply the limits to :
Evaluate each bracket:
So,
Therefore, the work done is . The correct option is B.
Average Force Check
Given: The displacement is from to .
Find: A quick consistency check for work.
The average force over the interval is
Then work can be checked as
This confirms that the work done is , so the correct option is B.
Using with a single force value is incorrect because the force changes with position. Instead, use the definite integral over the given limits.
Forgetting the lower limit contribution gives a wrong answer. After finding the antiderivative, always evaluate upper limit minus lower limit.
Making a sign error while integrating the constant term is common. Since , the negative sign must be retained.
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