Electric Field Due to a Ring of Charge, Linear Charge Density, Physics Practice Problems | Summary and Q&A

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January 6, 2017
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The Organic Chemistry Tutor
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Electric Field Due to a Ring of Charge, Linear Charge Density, Physics Practice Problems

TL;DR

This video explains how to calculate the electric field at a given point and the linear charge density of a ring.

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Key Insights

  • 😋 The electric field at a point on a ring can be found by considering each segment of the ring and summing up the electric fields they produce.
  • 🏑 The y and z components of the electric field cancel out due to the symmetry of the ring, resulting in a net electric field only in the x direction.
  • 😋 The linear charge density of a ring can be calculated by dividing the total charge of the ring by its circumference.

Transcript

a ring-shaped conductor with radius 5 centimeters has a total charge of 50 nano clubs what is the electric field at a point 12 centimeters east from its center and also what is the linear charge density of the ring so what we're going to do is derive a formula and then we'll use it to get the answer to this problem so feel free to pause the video i... Read More

Questions & Answers

Q: How is the electric field at a specific point on a ring calculated?

The electric field at a specific point on a ring can be calculated using the formula k * x * q / r^3, where x is the distance from the center of the ring to the point of interest, q is the total charge of the ring, and r is the distance between the center and the point.

Q: Why do the y and z components of the electric field cancel out?

The y and z components of the electric field cancel out due to the symmetry of the ring. Each segment of the ring produces an electric field with opposite y components, resulting in cancellation when all segments are considered.

Q: What is the linear charge density of a ring?

The linear charge density of a ring, represented by lambda, is calculated by dividing the total charge of the ring by its circumference. It is given by the formula lambda = q / (2 * pi * a), where q is the total charge and a is the radius of the ring.

Q: How can the linear charge density be used to calculate the total charge of a ring?

The total charge of a ring can be calculated by multiplying the linear charge density (lambda) by the circumference of the ring. The formula to calculate the total charge is q = (2 * pi * a * lambda), where a is the radius of the ring.

Summary & Key Takeaways

  • The video discusses the process of deriving a formula to calculate the electric field at a specific point on a ring and the linear charge density of the ring.

  • It explains the concept of an electric field emanating from a positive charge and how it can be calculated using the distance and charge of a segment of the ring.

  • The video demonstrates the symmetry of the ring, which allows cancellation of y and z components of the electric field, resulting in a net electric field only in the x direction.

  • The formula for the electric field is derived as k * x * q / r^3, where x is the distance from the center of the ring to the point of interest, q is the total charge of the ring, and r is the distance between the center and the point.

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