2. Write the equation linking voltage ($V$), current ($I$) and resistance ($R$), defining each symbol and its unit. [3]
5. A resistor of $8\,\Omega$ carries a current of $0.5\,\text{A}$. Calculate the voltage across it. [2]
9. A student investigates resistance by measuring current for different voltages across a resistor. Describe the graph they would expect if the resistor is ohmic, and explain what the gradient represents. [3]
10. Two identical resistors of $10\,\Omega$ are connected in series to a 20 V supply. Calculate: [4]
a) The total resistance
b) The current in the circuit
c) The voltage across one resistor
Mark Scheme
1. For a metallic conductor at constant temperature [1], current is directly proportional to voltage [1] [2]
2. $V = IR$ [1]; $V$ = voltage in volts (V), $I$ = current in amperes (A) [1], $R$ = resistance in ohms (Ω) [1] [3]
3. Current doubles [1]; because $I = V/R$ and $R$ is constant, so $I$ is proportional to $V$ [1] [2]
4. $R = V/I = 9/3 = 3\,\Omega$ [2]
5. $V = IR = 0.5 \times 8 = 4\,\text{V}$ [2]
6. $I = V/R = 12/6 = 2\,\text{A}$ [2]
7. $I = V/R = 12/4 = 3\,\text{A}$ [2]
8. $R = V/I = 230/3.0 \approx 76.7\,\Omega$ [2]
9. Straight line through the origin [1]; constant gradient = constant resistance [1]; gradient = $1/R$ (reciprocal of resistance) [1] [3]
10. a) $R_{total} = 10 + 10 = 20\,\Omega$ [1]; b) $I = V/R = 20/20 = 1\,\text{A}$ [2]; c) $V = IR = 1 \times 10 = 10\,\text{V}$ [1] [4]