Problem Statement
A resistor connected to $14\,\text{V}$ passes a current of $3.0\,\text{A}$. Find (a) its resistance and (b) the power dissipated.
Given Information
- $V = 14\,\text{V}$
- $I = 3.0\,\text{A}$
Physical Concepts & Formulas
Ohm’s law relates voltage, current, and resistance: $V = IR$. Power dissipated is $P = VI = I^2 R = V^2/R$ — the Joule heating rate.
- $R = V/I$ — Ohm’s law
- $P = VI = I^2R$ — power dissipated
Step-by-Step Solution
Step 1 — Resistance: $$R = V/I = 14/3.0 = 4.67\,\Omega$$
Step 2 — Power: $$P = VI = 14\times3.0 = 42.0\,\text{W}$$
Step 3 — Check: $P = I^2 R = 3.0^2\times4.67 = 42.0\,\text{W}$ ✓
Worked Calculation
$$R = 4.67\,\Omega;\quad P = 42.0\,\text{W}$$
Answer
$$\boxed{R = 4.67\,\Omega,\quad P = 42.0\,\text{W}}$$
The 4.67 Ω resistor dissipates 42.0 W at 14 V. This power appears as heat, warming the resistor at a rate determined by its thermal mass and cooling.
Physical Interpretation
The 4.67 Ω resistor dissipates 42.0 W at 14 V. This power appears as heat, warming the resistor at a rate determined by its thermal mass and cooling.
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