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A steady current is passing through a linear conductor of non-uniform cross-section. The current density in the conductor is
- a)independent of area of cross-section
- b)directly proportional to area of cross-section
- c)inversely proportional to area of cross-section
- d)inversely proportional to the square root of area of cross-section
Correct answer is option 'C'. Can you explain this answer?
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A steady current is passing through a linear conductor of non-uniform ...
Current density is equal to Electric current divided by a given surface area, or it is the current flowing per a given cross section area.
The current density decreases with increase in cross section area which means they are inversely proportional.
The current density decreases with increase in cross section area which means they are inversely proportional.
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A steady current is passing through a linear conductor of non-uniform ...
Current Density in a Linear Conductor of Non-Uniform Cross-Section
The current density in a conductor is defined as the amount of current flowing per unit area of the cross-section. In other words, it gives us an idea of how concentrated the current is within the conductor.
When a steady current passes through a linear conductor with a non-uniform cross-section, the current density is inversely proportional to the area of the cross-section. This means that as the area of the cross-section decreases, the current density increases, and vice versa. The correct answer is option 'C': inversely proportional to the area of the cross-section.
Explanation:
1. Definition of Current Density:
Current density (J) is defined as the ratio of the magnitude of the current (I) passing through a conductor to the area (A) of its cross-section. Mathematically, it can be expressed as J = I/A.
2. Relationship with Area of Cross-Section:
In a linear conductor, the cross-sectional area is not constant but varies along its length. Let's consider a small section of the conductor with a smaller cross-sectional area (A1) and another section with a larger cross-sectional area (A2).
3. Conservation of Charge:
According to the principle of conservation of charge, the total amount of charge that enters a section of the conductor must be equal to the total amount of charge that leaves that section. In other words, the current flowing into a section must be equal to the current flowing out of it.
4. Variation of Current with Cross-Sectional Area:
Since the current is constant throughout the conductor, the product of current density and the area of the cross-section should remain constant along the length of the conductor. Mathematically, J1 * A1 = J2 * A2.
5. Inverse Proportionality:
From the above equation, we can see that when the cross-sectional area decreases (A2 < a1),="" the="" current="" density="" (j2)="" must="" increase="" to="" maintain="" the="" same="" current.="" similarly,="" when="" the="" cross-sectional="" area="" increases="" (a2="" /> A1), the current density (J2) must decrease. Therefore, the current density is inversely proportional to the area of the cross-section.
Conclusion:
In a linear conductor of non-uniform cross-section, the current density is inversely proportional to the area of the cross-section. This means that as the cross-sectional area decreases, the current density increases, and vice versa.
The current density in a conductor is defined as the amount of current flowing per unit area of the cross-section. In other words, it gives us an idea of how concentrated the current is within the conductor.
When a steady current passes through a linear conductor with a non-uniform cross-section, the current density is inversely proportional to the area of the cross-section. This means that as the area of the cross-section decreases, the current density increases, and vice versa. The correct answer is option 'C': inversely proportional to the area of the cross-section.
Explanation:
1. Definition of Current Density:
Current density (J) is defined as the ratio of the magnitude of the current (I) passing through a conductor to the area (A) of its cross-section. Mathematically, it can be expressed as J = I/A.
2. Relationship with Area of Cross-Section:
In a linear conductor, the cross-sectional area is not constant but varies along its length. Let's consider a small section of the conductor with a smaller cross-sectional area (A1) and another section with a larger cross-sectional area (A2).
3. Conservation of Charge:
According to the principle of conservation of charge, the total amount of charge that enters a section of the conductor must be equal to the total amount of charge that leaves that section. In other words, the current flowing into a section must be equal to the current flowing out of it.
4. Variation of Current with Cross-Sectional Area:
Since the current is constant throughout the conductor, the product of current density and the area of the cross-section should remain constant along the length of the conductor. Mathematically, J1 * A1 = J2 * A2.
5. Inverse Proportionality:
From the above equation, we can see that when the cross-sectional area decreases (A2 < a1),="" the="" current="" density="" (j2)="" must="" increase="" to="" maintain="" the="" same="" current.="" similarly,="" when="" the="" cross-sectional="" area="" increases="" (a2="" /> A1), the current density (J2) must decrease. Therefore, the current density is inversely proportional to the area of the cross-section.
Conclusion:
In a linear conductor of non-uniform cross-section, the current density is inversely proportional to the area of the cross-section. This means that as the cross-sectional area decreases, the current density increases, and vice versa.
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A steady current is passing through a linear conductor of non-uniform ...
Current density is equal to Electric current divided by a given surface area, or it is the current flowing per a given cross section area.
The current density decreases with increase in cross section area,means they are inversely proportional.
The current density decreases with increase in cross section area,means they are inversely proportional.
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A steady current is passing through a linear conductor of non-uniform cross-section. The current density in the conductor isa)independent of area of cross-sectionb)directly proportional to area of cross-sectionc)inversely proportional to area of cross-sectiond)inversely proportional to the square root of area of cross-sectionCorrect answer is option 'C'. Can you explain this answer?
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A steady current is passing through a linear conductor of non-uniform cross-section. The current density in the conductor isa)independent of area of cross-sectionb)directly proportional to area of cross-sectionc)inversely proportional to area of cross-sectiond)inversely proportional to the square root of area of cross-sectionCorrect answer is option 'C'. Can you explain this answer? 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 A steady current is passing through a linear conductor of non-uniform cross-section. The current density in the conductor isa)independent of area of cross-sectionb)directly proportional to area of cross-sectionc)inversely proportional to area of cross-sectiond)inversely proportional to the square root of area of cross-sectionCorrect answer is option 'C'. Can you explain this answer? covers all topics & solutions for Class 12 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for A steady current is passing through a linear conductor of non-uniform cross-section. The current density in the conductor isa)independent of area of cross-sectionb)directly proportional to area of cross-sectionc)inversely proportional to area of cross-sectiond)inversely proportional to the square root of area of cross-sectionCorrect answer is option 'C'. Can you explain this answer?.
A steady current is passing through a linear conductor of non-uniform cross-section. The current density in the conductor isa)independent of area of cross-sectionb)directly proportional to area of cross-sectionc)inversely proportional to area of cross-sectiond)inversely proportional to the square root of area of cross-sectionCorrect answer is option 'C'. Can you explain this answer? 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 A steady current is passing through a linear conductor of non-uniform cross-section. The current density in the conductor isa)independent of area of cross-sectionb)directly proportional to area of cross-sectionc)inversely proportional to area of cross-sectiond)inversely proportional to the square root of area of cross-sectionCorrect answer is option 'C'. Can you explain this answer? covers all topics & solutions for Class 12 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for A steady current is passing through a linear conductor of non-uniform cross-section. The current density in the conductor isa)independent of area of cross-sectionb)directly proportional to area of cross-sectionc)inversely proportional to area of cross-sectiond)inversely proportional to the square root of area of cross-sectionCorrect answer is option 'C'. Can you explain this answer?.
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