Electricity Exercises (by Peter Valdia)
Calculate the equivalent resistor and the current in the battery.
Remember: In a series circuit, the total resistance of the circuit (also called effective resistance) is equal to the sum of the individual resistances, so Re = R1 + R2 + R3 …
In a parallel circuit, a quicker method of finding the equivalent resistance is to use the general formula:
1 / Re = 1/R1 + 1/R2 + 1/R3 …..
Solution: We have three resistances in serial (10, 10 and 20 ) in the first branch.
After that, we have two branches with a resistor of 40 each one (in parallel). Then
Re = 20 Ω , Now using Ohm`s Law I = V/R, I =5V/20Ohm = 250 mA
Re = 64,18 Ω I = 77,9 mA
Re = 58,41 Ω I = 85,6 mA
1º
In this circuit, the value of the battery is 10 Volts and the current measured in the ammeter is 2 mA.
a) Calculate the value of Resistor 1 in this circuit.
b) How much current would flow if the value of R was doubled?
Solutions: R = 5 KΩ and b) I = 1 mA
2º Calculate the current flowing in this circuit.
b) What would be the ammeter reading if the resistor’s value was halved?
Solutions: a) 200 mA b) 400 mA
3º a) Calculate the current flowing through the 40 Ohms resistor.
Total resistor is 100, then the current in the circuit is 0.15A
Using Ohm`s Law V=IR = 0.15A40Ohm = 6V
b) Calculate the current flowing through the 60 Ohms resistor.
Total Voltage is 15 V and I use 6V in the first resistor. So, I use 9V in the second resistor
c) What will be the reading on the current in the battery?
d ) What is the total resistance in this circuit?
Solutions: V1 = 6 volts b) V2 = 9 volts c) 150 mA d) Rt = 100 Ω
4º What will be the value of the current flowing through the 100 Ohm resistor?
And what about the current in the other resistor?
Solutions: 50 mA and 100 mA
6º We have a two parallel resistors. Calculate the total resistance of the circuit and the current flowing through each resister.
Solutions: Rt = 33,33 Ω, I1 = 0,05 A and I2 = 0,1 A
7º A series circuit has 4 resistances of 20, 40, 10 and 5 Ohms. Calculate the Total resistance and the current flowing through each one if the battery has a value of 10 Volts
Solutions: Total resistance = 75 Ω. I = 0,13 Amps
8º In this circuit, calculate:
a ) The total resistance in the circuit
b) The current flowing in the circuit.
c) The voltage across every resistor
Solutions:
a) = 40 Ω b) = 0,225 A c ) V1 = 2,25 V2 =1,125 V3 = 5,625
Note: If you ad V1 plus V2 plus V3, you get the Battery voltage
9º 5 ,10 and 25 Ohms resistors are connected in parallel. Calculate the total resistance and the current flowing through each one
Solutions: Rt = 2,94 Ω I1 = 1,8 A I2 = 0,9 A and I3 = 0,36 A
10º In the circuit on the left, we have 3 series resistors. We measure 8 volts in the voltmeter ( represented by V ).
Calculate the voltage across the 20 Ω resistance
V = 32 V
11º In the next circuit , calculate the voltage across the 20 Ohm resistor.
Solution: 1,64 volts
12º What is The electric power?. How it is measured?
13º A hair dryer has a resistance of 100 Ω and it is plugged to a 220 mains supply. If it is operating for 40 minutes, calculate how many kilowatts per hour of energy does it use and how much do you pay if 1kwh = 0,20€.
14º What resistor values are indicated by the following colour bands? (A) Blue, black, yellow