Which equation correctly relates work, charge, and potential difference?

Study for the Electrostatics Test. Enhance your understanding with interactive questions, detailed explanations, and comprehensive review. Prepare for success!

Multiple Choice

Which equation correctly relates work, charge, and potential difference?

Explanation:
Work is the energy transferred when a charge moves through an electric potential difference. The potential difference V tells how much energy per unit charge is gained or lost in moving from one point to another. Therefore the total energy change for a charge q is the charge times that energy per charge, which gives W = qΔV. In introductory contexts, V is used to denote that potential difference, so W = qV is the correct relation. This has the right units: volts (Joules per coulomb) times coulombs gives joules. The other forms mix up the quantities or units. W = V/q would divide energy per charge by charge, not yielding energy. W = q/E or W = E/q introduce the electric field E (with units of V/m) in a way that doesn’t produce energy in joules.

Work is the energy transferred when a charge moves through an electric potential difference. The potential difference V tells how much energy per unit charge is gained or lost in moving from one point to another. Therefore the total energy change for a charge q is the charge times that energy per charge, which gives W = qΔV. In introductory contexts, V is used to denote that potential difference, so W = qV is the correct relation. This has the right units: volts (Joules per coulomb) times coulombs gives joules.

The other forms mix up the quantities or units. W = V/q would divide energy per charge by charge, not yielding energy. W = q/E or W = E/q introduce the electric field E (with units of V/m) in a way that doesn’t produce energy in joules.

Subscribe

Get the latest from Passetra

You can unsubscribe at any time. Read our privacy policy