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What is the amount of work done in moving a point charge Q around a circular arc of radius 'r' at the centre of which another point charge 'q',is located? (CBSE 2016)?
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What is the amount of work done in moving a point charge Q around a ci...
Work Done in Moving a Point Charge Around a Circular Arc
The amount of work done in moving a point charge Q around a circular arc of radius 'r' at the center of which another point charge 'q' is located can be determined using the following steps:
Step 1: Determine the Electric Potential Energy of the System
The first step is to determine the electric potential energy of the system. This can be done using the formula:
U = kQq/r
where U is the electric potential energy, k is Coulomb's constant, Q is the charge of the point charge being moved, q is the charge of the point charge at the center of the circular arc, and r is the radius of the circular arc.
Step 2: Determine the Change in Electric Potential Energy
The next step is to determine the change in electric potential energy as the point charge Q is moved around the circular arc. This can be done using the formula:
ΔU = Uf - Ui
where ΔU is the change in electric potential energy, Uf is the final electric potential energy of the system when the point charge Q has completed its circular motion, and Ui is the initial electric potential energy of the system.
Step 3: Determine the Work Done
The final step is to determine the work done in moving the point charge Q around the circular arc. This can be done using the formula:
W = -ΔU
where W is the work done and ΔU is the change in electric potential energy. The negative sign indicates that the work done is negative, which means that the point charge Q loses energy as it moves around the circular arc.
Therefore, the amount of work done in moving a point charge Q around a circular arc of radius 'r' at the center of which another point charge 'q' is located is equal to the negative change in electric potential energy of the system.
The amount of work done in moving a point charge Q around a circular arc of radius 'r' at the center of which another point charge 'q' is located can be determined using the following steps:
Step 1: Determine the Electric Potential Energy of the System
The first step is to determine the electric potential energy of the system. This can be done using the formula:
U = kQq/r
where U is the electric potential energy, k is Coulomb's constant, Q is the charge of the point charge being moved, q is the charge of the point charge at the center of the circular arc, and r is the radius of the circular arc.
Step 2: Determine the Change in Electric Potential Energy
The next step is to determine the change in electric potential energy as the point charge Q is moved around the circular arc. This can be done using the formula:
ΔU = Uf - Ui
where ΔU is the change in electric potential energy, Uf is the final electric potential energy of the system when the point charge Q has completed its circular motion, and Ui is the initial electric potential energy of the system.
Step 3: Determine the Work Done
The final step is to determine the work done in moving the point charge Q around the circular arc. This can be done using the formula:
W = -ΔU
where W is the work done and ΔU is the change in electric potential energy. The negative sign indicates that the work done is negative, which means that the point charge Q loses energy as it moves around the circular arc.
Therefore, the amount of work done in moving a point charge Q around a circular arc of radius 'r' at the center of which another point charge 'q' is located is equal to the negative change in electric potential energy of the system.
Community Answer
What is the amount of work done in moving a point charge Q around a ci...
The electric force is conservative so you can write down a potential energy for the charge.
Since the physics is spherically symmetric so is the potential energy. Thus it requires Zero work to move the charge.
Another way to look at it is that the force point either towards or away from the center charge.
Moving in a circular arc is perpendicular to the force and thus requires no work.
Since the physics is spherically symmetric so is the potential energy. Thus it requires Zero work to move the charge.
Another way to look at it is that the force point either towards or away from the center charge.
Moving in a circular arc is perpendicular to the force and thus requires no work.
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What is the amount of work done in moving a point charge Q around a circular arc of radius 'r' at the centre of which another point charge 'q',is located? (CBSE 2016)?
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What is the amount of work done in moving a point charge Q around a circular arc of radius 'r' at the centre of which another point charge 'q',is located? (CBSE 2016)? for Class 12 2024 is part of Class 12 preparation. The Question and answers have been prepared according to the Class 12 exam syllabus. Information about What is the amount of work done in moving a point charge Q around a circular arc of radius 'r' at the centre of which another point charge 'q',is located? (CBSE 2016)? covers all topics & solutions for Class 12 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for What is the amount of work done in moving a point charge Q around a circular arc of radius 'r' at the centre of which another point charge 'q',is located? (CBSE 2016)?.
What is the amount of work done in moving a point charge Q around a circular arc of radius 'r' at the centre of which another point charge 'q',is located? (CBSE 2016)? for Class 12 2024 is part of Class 12 preparation. The Question and answers have been prepared according to the Class 12 exam syllabus. Information about What is the amount of work done in moving a point charge Q around a circular arc of radius 'r' at the centre of which another point charge 'q',is located? (CBSE 2016)? covers all topics & solutions for Class 12 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for What is the amount of work done in moving a point charge Q around a circular arc of radius 'r' at the centre of which another point charge 'q',is located? (CBSE 2016)?.
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