Electricity

ELECTRICITY

Electricity has an important place in modern society. It is a controllable and convenient form of energy for a variety of uses in homes, schools, hospitals, industries and so on. What constitutes electricity? How does it flow in an electric circuit? What are the factors that control or regulate the current through an electric circuit? In this Chapter, we shall attempt to answer such questions. We shall also discuss the heating effect of electric current and its applications.

11.1 ELECTRIC CURRENT AND CIRCUIT

We are familiar with air current and water current. We know that flowing water constitute water current in rivers. Similarly, if the electric charge flows through a conductor (for example, through a metallic wire), we say that there is an electric current in the conductor. In a torch, we know that the cells (or a battery, when placed in proper order) provide flow of charges or an electric current through the torch bulb to glow. We have also seen that the torch gives light only when its switch is on. What does a switch do? A switch makes a conducting link between the cell and the bulb. A continuous and closed path of an electric current is called an electric circuit. Now, if the circuit is broken anywhere (or the switch of the torch is turned off), the current stops flowing and the bulb does not glow.

How do we express electric current? Electric current is expressed by the amount of charge flowing through a particular area in unit time. In other words, it is the rate of flow of electric charges. In circuits using metallic wires, electrons constitute the flow of charges. However, electrons were not known at the time when the phenomenon of electricity was first observed. So, electric current was considered to be the flow of positive charges and the direction of flow of positive charges was taken to be the direction of electric current. Conventionally, in an electric circuit the direction of electric current is taken as opposite to the direction of the flow of electrons, which are negative charges.

Figure 11.1

A schematic diagram of an electric circuit comprising - cell, electric bulb, ammeter and plug key If a net charge $Q$, flows across any cross-section of a conductor in time $t$, then the current $I$, through the cross-section is

$ I=\frac{Q}{t} $

The SI unit of electric charge is coulomb (C), which is equivalent to the charge contained in nearly $6 \times 10^{18}$ electrons. (We know that an electron possesses a negative charge of $1.6 \times 10^{-19} C$.) The electric current is expressed by a unit called ampere (A), named after the French scientist, Andre-Marie Ampere (1775-1836). One ampere is constituted by the flow of one coulomb of charge per second, that is, $1 A=1 C / 1 s$. Small quantities of current are expressed in milliampere $(1 mA=10^{-3} A)$ or in microampere $(1 \mu A=10^{-6} A)$. An instrument called ammeter measures electric current in a circuit. It is always connected in series in a circuit through which the current is to be measured. Figure 11.1 shows the schematic diagram of a typical electric circuit comprising a cell, an electric bulb, an ammeter and a plug key. Note that the electric current flows in the circuit from the positive terminal of the cell to the negative terminal of the cell through the bulb and ammeter.

11.2 ELECTRIC POTENTIAL AND POTENTIAL DIFFERENCE

What makes the electric charge to flow? Let us consider the analogy of flow of water. Charges do not flow in a copper wire by themselves, just as water in a perfectly horizontal tube does not flow. If one end of the tube is connected to a tank of water kept at a higher level, such that there is a pressure difference between the two ends of the tube, water flows out of the other end of the tube. For flow of charges in a conducting metallic wire, the gravity, of course, has no role to play; the electrons move only if there is a difference of electric pressure - called the potential difference along the conductor. This difference of potential may be produced by a battery, consisting of one or more electric cells. The chemical action within a cell generates the potential difference across the terminals of the cell, even when no current is drawn from it. When the cell is connected to a conducting circuit element, the potential difference sets the charges in motion in the conductor and produces an electric current. In order to maintain the current in a given electric circuit, the cell has to expend its chemical energy stored in it.

We define the electric potential difference between two points in an electric circuit carrying some current as the work done to move a unit charge from one point to the other -

Potential difference $(V)$ between two points $=$ Work done $(W) /$ Charge $(Q)$

$V=W / Q$

The SI unit of electric potential difference is volt $(V)$, named after Alessandro Volta (1745-1827), an Italian physicist. One volt is the potential difference between two points in a current carrying conductor when 1 joule of work is done to move a charge of 1 coulomb from one point to the other.

Therefore, 1 volt $=\frac{1 \text{ joule }}{1 \text{ coulomb }}$

$ 1 V=1 J C^{-1} $

The potential difference is measured by means of an instrument called the voltmeter. The voltmeter is always connected in parallel across the points between which the potential difference is to be measured.

11.3 CIRCUIT DIAGRAM

We know that an electric circuit, as shown in Fig. 11.1, comprises a cell (or a battery), a plug key, electrical component(s), and connecting wires. It is often convenient to draw a schematic diagram, in which different components of the circuit are represented by the symbols conveniently used. Conventional symbols used to represent some of the most commonly used electrical components are given in Table 11.1.

Table 11.1 Symbols of some commonly used components in circuit diagrams

11.4 OHM’S LAW

Is there a relationship between the potential difference across a conductor and the current through it? Let us explore with an Activity.

Activity 11.1
  • Set up a circuit as shown in Fig. 11.2, consisting of a nichrome wire XY of length, say $0.5 m$, an ammeter, a voltmeter and four cells of $1.5 V$ each. (Nichrome is an alloy of nickel, chromium, manganese, and iron metals.)
  • First use only one cell as the source in the circuit. Note the reading in the ammeter $I$, for the current and reading of the voltmeter $V$ for the potential difference across the nichrome wire $XY$ in the circuit. Tabulate them in the Table given.
  • Next connect two cells in the circuit and note the respective readings of the ammeter and voltmeter for the values of current through the nichrome wire and potential difference across the nichrome wire.
  • Repeat the above steps using three cells and then four cells in the circuit separately.
  • Calculate the ratio of $V$ to $I$ for each pair of potential difference $V$ and current $I$.
S.
No.
Number of cells
used in the
circuit
(ampere)
Current through
the nichrome
wire, $I$
wire, $V$ (volt)
Potential difference
across the
nichrome
$V / I$
(volt/ampere)
1 1
2 2
3 3
4 4

Plot a graph between $V$ and $I$, and observe the nature of the graph.

Figure 11.3

$V-I$ graph for a nichrome wire. A straight line plot shows that as the current through a wire increases, the potential difference across the wire increases linearly - this is Ohm’s law. In this Activity, you will find that approximately the same value for $V / I$ is obtained in each case. Thus the $V-I$ graph is a straight line that passes through the origin of the graph, as shown in Fig. 11.3. Thus, $V / I$ is a constant ratio.

In 1827, a German physicist Georg Simon Ohm (1787-1854) found out the relationship between the current $I$, flowing in a metallic wire and the potential difference across its terminals. The potential difference, $V$, across the ends of a given metallic wire in an electric circuit is directly proportional to the current flowing through it, provided its temperature remains the same. This is called Ohm’s law. In other words -

$ \hspace{50 px}V \propto I \\ \text{or} \hspace{40 px} V/I = \text{ constant} \\ \hspace{70 px} = R \\ \text{or} \hspace{50 px} V = IR $

In Eq. (11.4), $R$ is a constant for the given metallic wire at a given temperature and is called its resistance. It is the property of a conductor to resist the flow of charges through it. Its SI unit is ohm, represented by the Greek letter $\Omega$. According to Ohm’s law,

$ R=V / I $

If the potential difference across the two ends of a conductor is $1 V$ and the current through it is $1 A$, then the resistance $R$, of the conductor is $1 \Omega$. That is, $1 ohm=\frac{1 \text{ volt }}{1 \text{ ampere }}$

Also from Eq. (11.5) we get

$ I=V / R $

It is obvious from Eq. (11.7) that the current through a resistor is inversely proportional to its resistance. If the resistance is doubled the current gets halved. In many practical cases it is necessary to increase or decrease the current in an electric circuit. A component used to regulate current without changing the voltage source is called variable resistance. In an electric circuit, a device called rheostat is often used to change the resistance in the circuit. We will now study about electrical resistance of a conductor with the help of following Activity.

Activity 11.2
  • Take a nichrome wire, a torch bulb, a $10 W$ bulb and an ammeter ( 0 - 5 A range), a plug key and some connecting wires.
  • Set up the circuit by connecting four dry cells of $1.5 V$ each in series with the ammeter leaving a gap XY in the circuit, as shown in Fig. 11.4.

Nichrome wire

Torch bulb

Figure 11.4

  • Complete the circuit by connecting the nichrome wire in the gap XY. Plug the key. Note down the ammeter reading. Take out the key from the plug. [Note: Always take out the key from the plug after measuring the current through the circuit.]
  • Replace the nichrome wire with the torch bulb in the circuit and find the current through it by measuring the reading of the ammeter.
  • Now repeat the above step with the $10 W$ bulb in the gap XY.
  • Are the ammeter readings different for different components connected in the gap XY? What do the above observations indicate?
  • You may repeat this Activity by keeping any material component in the gap. Observe the ammeter readings in each case. Analyse the observations.

In this Activity we observe that the current is different for different components. Why do they differ? Certain components offer an easy path for the flow of electric current while the others resist the flow. We know that motion of electrons in an electric circuit constitutes an electric current. The electrons, however, are not completely free to move within a conductor. They are restrained by the attraction of the atoms among which they move. Thus, motion of electrons through a conductor is retarded by its resistance. A component of a given size that offers a low resistance is a good conductor. A conductor having some appreciable resistance is called a resistor. A component of identical size that offers a higher resistance is a poor conductor. An insulator of the same size offers even higher resistance.

11.5 FACTORS ON WHICH THE RESISTANCE OF A CONDUCTOR DEPENDS

Activity 11.3
  • Complete an electric circuit consisting of a cell, an ammeter, a nichrome wire of length $l$ [say, marked (1)] and a plug key, as shown in Fig. 11.5.

Figure 11.5 Electric circuit to study the factors on which the resistance of conducting wires depends

  • Now, plug the key. Note the current in the ammeter.
  • Replace the nichrome wire by another nichrome wire of same thickness but twice the length, that is $2 l$ [marked (2) in the Fig. 11.5].
  • Note the ammeter reading.
  • Now replace the wire by a thicker nichrome wire, of the same length $l$ [marked (3)]. A thicker wire has a larger cross-sectional area. Again note down the current through the circuit.
  • Instead of taking a nichrome wire, connect a copper wire [marked (4) in Fig. 11.5] in the circuit. Let the wire be of the same length and same area of cross-section as that of the first nichrome wire [marked (1)]. Note the value of the current.
  • Notice the difference in the current in all cases.
  • Does the current depend on the length of the conductor?
  • Does the current depend on the area of cross-section of the wire used?

It is observed that the ammeter reading decreases to one-half when the length of the wire is doubled. The ammeter reading is increased when a thicker wire of the same material and of the same length is used in the circuit. A change in ammeter reading is observed when a wire of different material of the same length and the same area of cross-section is used. On applying Ohm’s law [Eqs. (11.5) - (11.7)], we observe that the resistance of the conductor depends (i) on its length, (ii) on its area of cross-section, and (iii) on the nature of its material. Precise measurements have shown that resistance of a uniform metallic conductor is directly proportional to its length $(l)$ and inversely proportional to the area of cross-section $(A)$. That is,

$ \hspace{60 px} R \propto l \\ \text{ and } \hspace{40 px} R \propto 1 / A $

Combining Eqs. (11.8) and (11.9) we get

$ \begin{aligned} R & \propto \frac{l}{A} \\ \text{ or, } \quad R & =\rho \frac{l}{A} \end{aligned} $

where $\rho$ (rho) is a constant of proportionality and is called the electrical resistivity of the material of the conductor. The SI unit of resistivity is $\Omega m$. It is a characteristic property of the material. The metals and alloys have very low resistivity in the range of $10^{-8} \Omega m$ to $10^{-6} \Omega m$. They are good conductors of electricity. Insulators like rubber and glass have resistivity of the order of $10^{12}$ to $10^{17} \Omega m$. Both the resistance and resistivity of a material vary with temperature.

Table 11.2 reveals that the resistivity of an alloy is generally higher than that of its constituent metals. Alloys do not oxidise (burn) readily at high temperatures. For this reason, they are commonly used in electrical heating devices, like electric iron, toasters etc. Tungsten is used almost exclusively for filaments of electric bulbs, whereas copper and aluminium are generally used for electrical transmission lines.

Table 11.2 Electrical resistivity* of some substances at $20^{\circ} C$

Material Resistivity $(\boldsymbol{{}\Omega} \mathbf{~ m})$
Conductors Silver $1.60 \times 10^{-8}$
Copper $1.62 \times 10^{-8}$
Aluminium $2.63 \times 10^{-8}$
Tungsten $5.20 \times 10^{-8}$
Nickel $6.84 \times 10^{-8}$
Iron $10.0 \times 10^{-8}$
Chromium $12.9 \times 10^{-8}$
Mercury $94.0 \times 10^{-8}$
Manganese $1.84 \times 10^{-6}$
Alloys Constantan $49 \times 10^{-6}$
(alloy of Cu and Ni)
Manganin $44 \times 10^{-6}$
(alloy of Cu, Mn and Ni)
Nichrome $100 \times 10^{-6}$
(alloy of Ni, Cr, Mn and Fe)
Insulators Glass $10^{10}-10^{14}$
Hard rubber $10^{13}-10^{16}$
Ebonite $10^{15}-10^{17}$
Diamond $10^{12}-10^{13}$
Paper (Dry) $10^{12}$
  • You need not memorise these values. You can use these values for solving numerical problems.

11.6 RESISTANCE OF A SYSTEM OF RESISTORS

In preceding sections, we learnt about some simple electric circuits. We have noticed how the current through a conductor depends upon its resistance and the potential difference across its ends. In various electrical gadgets, we often use resistors in various combinations. We now therefore intend to see how Ohm’s law can be applied to combinations of resistors.

There are two methods of joining the resistors together. Figure 11.6 shows an electric circuit in which three resistors having resistances $R_1$, $R_2$ and $R_3$, respectively, are joined end to end. Here the resistors are said to be connected in series.

Figure 11.6 Resistors in series

Figure 11.7 shows a combination of resistors in which three resistors are connected together between points $X$ and $Y$. Here, the resistors are said to be connected in parallel.

Figure 11.7 Resistors in parallel

11.6.1 Resistors in Series

What happens to the value of current when a number of resistors are connected in series in a circuit? What would be their equivalent resistance? Let us try to understand these with the help of the following activities.

Activity 11.4
  • Join three resistors of different values in series. Connect them with a battery, an ammeter and a plug key, as shown in Fig. 11.6. You may use the resistors of values like $1 \Omega, 2 \Omega, 3 \Omega$ etc., and a battery of $6 V$ for performing this Activity.
  • Plug the key. Note the ammeter reading.
  • Change the position of ammeter to anywhere in between the resistors. Note the ammeter reading each time.
  • Do you find any change in the value of current through the ammeter?

You will observe that the value of the current in the ammeter is the same, independent of its position in the electric circuit. It means that in a series combination of resistors the current is the same in every part of the circuit or the same current through each resistor.

Activity 11.5
  • In Activity 11.4, insert a voltmeter across the ends $X$ and $Y$ of the series combination of three resistors, as shown in Fig. 11.6.
  • Plug the key in the circuit and note the voltmeter reading. It gives the potential difference across the series combination of resistors. Let it be $V$. Now measure the potential difference across the two terminals of the battery. Compare the two values.
  • Take out the plug key and disconnect the voltmeter. Now insert the voltmeter across the ends $X$ and $P$ of the first resistor, as shown in Fig. 11.8.

Figure 11.8

  • Plug the key and measure the potential difference across the first resistor. Let it be $V_1$.
  • Similarly, measure the potential difference across the other two resistors, separately. Let these values be $V_2$ and $V_3$, respectively.
  • Deduce a relationship between $V, V_1, V_2$ and $V_3$.

You will observe that the potential difference $V$ is equal to the sum of potential differences $V_1, V_2$, and $V_3$. That is the total potential difference across a combination of resistors in series is equal to the sum of potential difference across the individual resistors. That is,

$ V=V_1+V_2+V_3 $

In the electric circuit shown in Fig. 11.8 , let $I$ be the current through the circuit. The current through each resistor is also $I$. It is possible to replace the three resistors joined in series by an equivalent single resistor of resistance $R$, such that the potential difference $V$ across it, and the current I through the circuit remains the same. Applying the Ohm’s law to the entire circuit, we have

$ V=I R $

On applying Ohm’s law to the three resistors separately, we further have

$ \begin{aligned} & V_1=I R_1 \\ & V_2=I R_2 \end{aligned} $

$ \text{ and } \quad V_3=I R_3 $

From Eq. (11.11),

or

$ I R=I R_1+I R_2+I R_3 $

$ R_s=R_1+R_2+R_3 $

We can conclude that when several resistors are joined in series, the resistance of the combination $R_s$ equals the sum of their individual resistances, $R_1, R_2, R_3$, and is thus greater than any individual resistance.

11.6.2 Resistors in Parallel

Now, let us consider the arrangement of three resistors joined in parallel with a combination of cells (or a battery), as shown in Fig.11.7.

Activity 11.6
  • Make a parallel combination, XY, of three resistors having resistances $R_1, R_2$, and $R_3$, respectively. Connect it with a battery, a plug key and an ammeter, as shown in Fig. 11.10. Also connect a voltmeter in parallel with the combination of resistors.
  • Plug the key and note the ammeter reading. Let the current be $I$. Also take the voltmeter reading. It gives the potential difference $V$, across the combination. The potential difference across each resistor is also $V$. This can be checked by connecting the voltmeter across each individual resistor (see Fig. 11.11).

Figure 11.10

  • Take out the plug from the key. Remove the ammeter and voltmeter from the circuit. Insert the ammeter in series with the resistor $R_1$, as shown in Fig. 11.11. Note the ammeter reading, $I_1$.

Figure 11.11

  • Similarly, measure the currents through $R_2$ and $R_3$. Let these be $I_2$ and $I_3$, respectively. What is the relationship between $I, I_1, I_2$ and $I_3$ ?

It is observed that the total current $I$, is equal to the sum of the separate currents through each branch of the combination.

$I=I_1+I_2+I_3$

Let $R_p$ be the equivalent resistance of the parallel combination of resistors. By applying Ohm’s law to the parallel combination of resistors, we have

$I=V / R_p$

On applying Ohm’s law to each resistor, we have

$I_1=V / R_1 ; \quad I_2=V / R_2 ;$ and $I_3=V / R_3$

From Eqs. (11.15) to (11.17), we have

or

$ V / R_p=V / R_1+V / R_2+V / R_3 $

$ 1 / R_p=1 / R_1+1 / R_2+1 / R_3 $

Thus, we may conclude that the reciprocal of the equivalent resistance of a group of resistances joined in parallel is equal to the sum of the reciprocals of the individual resistances.

We have seen that in a series circuit the current is constant throughout the electric circuit. Thus it is obviously impracticable to connect an electric bulb and an electric heater in series, because they need currents of widely different values to operate properly (see Example 11 .3). Another major disadvantage of a series circuit is that when one

Figure 11.12

An electric circuit showing the combination of series and parallel resistors component fails the circuit is broken and none of the components works. If you have used ‘fairy lights’ to decorate buildings on festivals, on marriage celebrations etc., you might have seen the electrician spending lot of time in trouble-locating and replacing the ‘dead’ bulb - each has to be tested to find which has fused or gone. On the other hand, a parallel circuit divides the current through the electrical gadgets. The total resistance in a parallel circuit is decreased as per Eq. (11.18). This is helpful particularly when each gadget has different resistance and requires different current to operate properly.

11.7 HEATING EFFECT OF ELECTRIC CURRENT

We know that a battery or a cell is a source of electrical energy. The chemical reaction within the cell generates the potential difference between its two terminals that sets the electrons in motion to flow the current through a resistor or a system of resistors connected to the battery. We have also seen, in Section 11.2, that to maintain the current, the source has to keep expending its energy. Where does this energy go? A part of the source energy in maintaining the current may be consumed into useful work (like in rotating the blades of an electric fan). Rest of the source energy may be expended in heat to raise the temperature of gadget. We often observe this in our everyday life. For example, an electric fan becomes warm if used continuously for longer time etc. On the other hand, if the electric circuit is purely resistive, that is, a configuration of resistors only connected to a battery; the source energy continually gets dissipated entirely in the form of heat. This is known as the heating effect of electric current. This effect is utilised in devices such as electric heater, electric iron etc.

Consider a current $I$ flowing through a resistor of resistance $R$. Let the potential difference across it be $V$ (Fig. 11.13). Let $t$ be the time during which a charge $Q$ flows across. The work done in moving the charge $Q$ through a potential difference $V$ is $V Q$. Therefore, the source must supply energy equal to $V Q$ in time $t$. Hence the power input to the circuit by the source is

$ P=V \frac{Q}{t}=VI $

Or the energy supplied to the circuit by the source in time $t$ is $P \times t$, that is, VIt. What happens to this energy expended by the source? This energy gets dissipated in the resistor as heat. Thus for a steady current $I$, the amount of heat $H$ produced in time $t$ is

$ H=V I t $

Applying Ohm’s law [Eq. (11.5)], we get

$ H=I^{2} R t $

This is known as Joule’s law of heating. The law implies that heat produced in a resistor is (i) directly proportional to the square of current for a given resistance, (ii) directly proportional to resistance for a given current, and (iii) directly proportional to the time for which the current flows through the resistor. In practical situations, when an electric appliance is connected to a known voltage source, Eq. (11.21) is used after calculating the current through it, using the relation $I=V / R$.

Figure 11.13

A steady current in a purely resistive electric circuit

11.7.1 Practical Applications of Heating Effect of Electric Current

The generation of heat in a conductor is an inevitable consequence of electric current. In many cases, it is undesirable as it converts useful electrical energy into heat. In electric circuits, the unavoidable heating can increase the temperature of the components and alter their properties. However, heating effect of electric current has many useful applications. The electric laundry iron, electric toaster, electric oven, electric kettle and electric heater are some of the familiar devices based on Joule’s heating.

The electric heating is also used to produce light, as in an electric bulb. Here, the filament must retain as much of the heat generated as is possible, so that it gets very hot and emits light. It must not melt at such high temperature. A strong metal with high melting point such as tungsten (melting point $3380^{\circ} C$ ) is used for making bulb filaments. The filament should be thermally isolated as much as possible, using insulating support, etc. The bulbs are usually filled with chemically inactive nitrogen and argon gases to prolong the life of filament. Most of the power consumed by the filament appears as heat, but a small part of it is in the form of light radiated.

Another common application of Joule’s heating is the fuse used in electric circuits. It protects circuits and appliances by stopping the flow of any unduly high electric current. The fuse is placed in series with the device. It consists of a piece of wire made of a metal or an alloy of appropriate melting point, for example aluminium, copper, iron, lead etc. If a current larger than the specified value flows through the circuit, the temperature of the fuse wire increases. This melts the fuse wire and breaks the circuit. The fuse wire is usually encased in a cartridge of porcelain or similar material with metal ends. The fuses used for domestic purposes are rated as $1 A, 2 A, 3 A, 5 A, 10 A$, etc. For an electric iron which consumes $1 kW$ electric power when operated at $220 V$, a current of (1000/220) A, that is, $4.54 A$ will flow in the circuit. In this case, a $5 A$ fuse must be used.

11.8 ELECTRIC POWER

You have studied in your earlier Class that the rate of doing work is power. This is also the rate of consumption of energy.

Equation (11.21) gives the rate at which electric energy is dissipated or consumed in an electric circuit. This is also termed as electric power. The power $P$ is given by

$ \begin{aligned} & P=V I \\ \text{ Or } & P=I^{2} R=V^{2} / R \end{aligned} $

The SI unit of electric power is watt (W). It is the power consumed by a device that carries $1 A$ of current when operated at a potential difference of $1 V$. Thus,

$ 1 W=1 \text{ volt } \times 1 \text{ ampere }=1 V A $

The unit ‘watt’ is very small. Therefore, in actual practice we use a much larger unit called ‘kilowatt’. It is equal to 1000 watts. Since electrical energy is the product of power and time, the unit of electric energy is, therefore, watt hour (W h). One watt hour is the energy consumed when 1 watt of power is used for 1 hour. The commercial unit of electric energy is kilowatt hour (kW h), commonly known as ‘unit’.

$1 kWh=1000$ watt $\times 3600$ second

$=3.6 \times 10^{6}$ watt second

$=3.6 \times 10^{6}$ joule $(J)$


More to know!

Many people think that electron are consumed in a electric circuit. This is wrong! We pay the electricity board or electric company to provide energy to move electrons through the electric gadgets like electric bulb, fan and engines. We pay fir the energy that we use.


What you have learnt

  • A stream of electrons moving through a conductor constitutes an electric current. Conventionally, the direction of current is taken opposite to the direction of flow of electrons.
  • The SI unit of electric current is ampere.
  • To set the electrons in motion in an electric circuit, we use a cell or a battery. A cell generates a potential difference across its terminals. It is measured in volts (V).
  • Resistance is a property that resists the flow of electrons in a conductor. It controls the magnitude of the current. The SI unit of resistance is ohm $(\Omega)$.
  • Ohm’s law: The potential difference across the ends of a resistor is directly proportional to the current through it, provided its temperature remains the same.
  • The resistance of a conductor depends directly on its length, inversely on its area of cross-section, and also on the material of the conductor.
  • The equivalent resistance of several resistors in series is equal to the sum of their individual resistances.
  • A set of resistors connected in parallel has an equivalent resistance $R_p$ given by $\frac{1}{R_p}=\frac{1}{R_1}+\frac{1}{R_2}+\frac{1}{R_3}+\ldots$
  • The electrical energy dissipated in a resistor is given by $W=V \times I \times t$
  • The unit of power is watt (W). One watt of power is consumed when $1 A$ of current flows at a potential difference of $1 V$.
  • The commercial unit of electrical energy is kilowatt hour (kWh). $1 kWh=3,600,000 J=3.6 \times 10^{6} J$.


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