Some Basic Concepts of Chemistry

UNIT 1

SOME BASIC CONCEPTS OF CHEMISTRY

“Chemistry is the science of molecules and their transformations. It is the science not so much of the one hundred elements but of the infinite variety of molecules that may be built from them.”

Roald Hoffmann

Science can be viewed as a continuing human effort to systematise knowledge for describing and understanding nature. You have learnt in your previous classes that we come across diverse substances present in nature and changes in them in daily life. Curd formation from milk, formation of vinegar from sugarcane juice on keeping for prolonged time and rusting of iron are some of the examples of changes which we come across many times. For the sake of convenience, science is sub-divided into various disciplines: chemistry, physics, biology, geology, etc. The branch of science that studies the preparation, properties, structure and reactions of material substances is called chemistry.

DEVELOPMENT OF CHEMISTRY

Chemistry, as we understand it today, is not a very old discipline. Chemistry was not studied for its own sake, rather it came up as a result of search for two interesting things:

i. Philosopher’s stone (Paras) which would convert all baser metals e.g., iron and copper into gold.

ii. ‘Elexir of life’ which would grant immortality.

People in ancient India, already had the knowledge of many scientific phenomenon much before the advent of modern science. They applied that knowledge in various walks of life. Chemistry developed mainly in the form of Alchemy and Iatrochemistry during 1300-1600 CE. Modern chemistry took shape in the $18^{\text {th }}$ century Europe, after a few centuries of alchemical traditions which were introduced in Europe by the Arabs.

Other cultures - especially the Chinese and the Indian - had their own alchemical traditions. These included much knowledge of chemical processes and techniques.

In ancient India, chemistry was called Rasayan Shastra, Rastantra, Ras Kriya or Rasvidya. It included metallurgy, medicine, manufacture of cosmetics, glass, dyes, etc. Systematic excavations at Mohenjodaro in Sindh and Harappa in Punjab prove that the story of development of chemistry in India is very old. Archaeological findings show that baked bricks were used in construction work. It shows the mass production of pottery, which can be regarded as the earliest chemical process, in which materials were mixed, moulded and subjected to heat by using fire to achieve desirable qualities. Remains of glazed pottery have been found in Mohenjodaro. Gypsum cement has been used in the construction work. It contains lime, sand and traces of $\mathrm{CaCO}_{3}$. Harappans made faience, a sort of glass which was used in ornaments. They melted and forged a variety of objects from metals, such as lead, silver, gold and copper. They improved the hardness of copper for making artefacts by using tin and arsenic. A number of glass objects were found in Maski in South India (1000-900 BCE), and Hastinapur and Taxila in North India (1000-200 BCE). Glass and glazes were coloured by addition of colouring agents like metal oxides.

Copper metallurgy in India dates back to the beginning of chalcolithic cultures in the subcontinent. There are much archeological evidences to support the view that technologies for extraction of copper and iron were developed indigenously.

According to Rigveda, tanning of leather and dying of cotton were practised during $1000-400 \mathrm{BCE}$. The golden gloss of the black polished ware of northen India could not be replicated and is still a chemical mystery. These wares indicate the mastery with which kiln temperatures could be controlled. Kautilya’s Arthashastra describes the production of salt from sea.

A vast number of statements and material described in the ancient Vedic literature can be shown to agree with modern scientific findings. Copper utensils, iron, gold, silver ornaments and terracotta discs and painted grey pottery have been found in many archaeological sites in north India. Sushruta Samhita explains the importance of Alkalies. The Charaka Samhita mentions ancient indians who knew how to prepare sulphuric acid, nitric acid and oxides of copper, tin and zinc; the sulphates of copper, zinc and iron and the carbonates of lead and iron.

Rasopanishada describes the preparation of gunpowder mixture. Tamil texts also describe the preparation of fireworks using sulphur, charcoal, saltpetre (i.e., potassium nitrate), mercury, camphor, etc.

Nagarjuna was a great Indian scientist. He was a reputed chemist, an alchemist and a metallurgist. His work Rasratnakar deals with the formulation of mercury compounds. He has also discussed methods for the extraction of metals, like gold, silver, tin and copper. A book, Rsarnavam, appeared around $800 \mathrm{CE}$. It discusses the uses of various furnaces, ovens and crucibles for different purposes. It describes methods by which metals could be identified by flame colour.

Chakrapani discovered mercury sulphide. The credit for inventing soap also goes to him. He used mustard oil and some alkalies as ingredients for making soap. Indians began making soaps in the $18^{\text {th }}$ century $\mathrm{CE}$. Oil of Eranda and seeds of Mahua plant and calcium carbonate were used for making soap.

The paintings found on the walls of Ajanta and Ellora, which look fresh even after ages, testify to a high level of science achieved in ancient India. Varähmihir’s Brihat Samhita is a sort of encyclopaedia, which was composed in the sixth century $\mathrm{CE}$. It informs about the preparation of glutinous material to be applied on walls and roofs of houses and temples. It was prepared entirely from extracts of various plants, fruits, seeds and barks, which were concentrated by boiling, and then, treated with various resins. It will be interesting to test such materials scientifically and assess them for use.

A number of classical texts, like Atharvaveda (1000 BCE) mention some dye stuff, the material used were turmeric, madder, sunflower, orpiment, cochineal and lac. Some other substances having tinting property were kamplcica, pattanga and jatuka.

Varähmihir’s Brihat Samhita gives references to perfumes and cosmetics. Recipes for hair dying were made from plants, like indigo and minerals like iron power, black iron or steel and acidic extracts of sour rice gruel. Gandhayukli describes recipes for making scents, mouth perfumes, bath powders, incense and talcum power.

Paper was known to India in the $17^{\text {th }}$ century as account of Chinese traveller I-tsing describes. Excavations at Taxila indicate that ink was used in India from the fourth century. Colours of ink were made from chalk, red lead and minimum.

It seems that the process of fermentation was well-known to Indians. Vedas and Kautilya’s Arthashastra mention about many types of liquors. Charaka Samhita also mentions ingredients, such as barks of plants, stem, flowers, leaves, woods, cereals, fruits and sugarcane for making Asavas.

The concept that matter is ultimately made of indivisible building blocks, appeared in India a few centuries BCE as a part of philosophical speculations. Acharya Kanda, born in $600 \mathrm{BCE}$, originally known by the name Kashyap, was the first proponent of the ‘atomic theory’. He formulated the theory of very small indivisible particles, which he named ‘Paramãnu’ (comparable to atoms). He authored the text Vaiseshika Sutras. According to him, all substances are aggregated form of smaller units called atoms (Paramãnu), which are eternal, indestructible, spherical, suprasensible and in motion in the original state. He explained that this individual entity cannot be sensed through any human organ. Kanda added that there are varieties of atoms that are as different as the different classes of substances. He said these (Paramãnu) could form pairs or triplets, among other combinations and unseen forces cause interaction between them. He conceptualised this theory around 2500 years before John Dalton (1766-1844).

Charaka Samhita is the oldest Ayurvedic epic of India. It describes the treatment of diseases. The concept of reduction of particle size of metals is clearly discussed in Charaka Samhita. Extreme reduction of particle size is termed as nanotechnology. Charaka Samhita describes the use of bhasma of metals in the treatment of ailments. Now-a-days, it has been proved that bhasmas have nanoparticles of metals.

After the decline of alchemy, Iatrochemistry reached a steady state, but it too declined due to the introduction and practise of western medicinal system in the $20^{\text {th }}$ century. During this period of stagnation, pharmaceutical industry based on Ayurveda continued to exist, but it too declined gradually. It took about 100-150 years for Indians to learn and adopt new techniques. During this time, foreign products poured in. As a result, indigenous traditional techniques gradually declined. Modern science appeared in Indian scene in the later part of the nineteenth century. By the mid-nineteenth century, European scientists started coming to India and modern chemistry started growing.

From the above discussion, you have learnt that chemistry deals with the composition, structure, properties and interection of matter and is of much use to human beings in daily life. These aspects can be best described and understood in terms of basic constituents of matter that are atoms and molecules. That is why, chemistry is also called the science of atoms and molecules. Can we see, weigh and perceive these entities (atoms and molecules)? Is it possible to count the number of atoms and molecules in a given mass of matter and have a quantitative relationship between the mass and the number of these particles? We will get the answer of some of these questions in this Unit. We will further describe how physical properties of matter can be quantitatively described using numerical values with suitable units.

1.1 IMPORTANCE OF CHEMISTRY

Chemistry plays a central role in science and is often intertwined with other branches of science.

Principles of chemistry are applicable in diverse areas, such as weather patterns, functioning of brain and operation of a computer, production in chemical industries, manufacturing fertilisers, alkalis, acids, salts, dyes, polymers, drugs, soaps, detergents, metals, alloys, etc., including new material.

Chemistry contributes in a big way to the national economy. It also plays an important role in meeting human needs for food, healthcare products and other material aimed at improving the quality of life. This is exemplified by the large-scale production of a variety of fertilisers, improved variety of pesticides and insecticides. Chemistry provides methods for the isolation of lifesaving drugs from natural sources and makes possible synthesis of such drugs. Some of these drugs are cisplatin and taxol, which are effective in cancer therapy. The drug AZT (Azidothymidine) is used for helping AIDS patients.

Chemistry contributes to a large extent in the development and growth of a nation. With a better understanding of chemical principles it has now become possible to design and synthesise new material having specific magnetic, electric and optical properties. This has lead to the production of superconducting ceramics, conducting polymers, optical fibres, etc. Chemistry has helped in establishing industries which manufacture utility goods, like acids, alkalies, dyes, polymesr metals, etc. These industries contribute in a big way to the economy of a nation and generate employment.

In recent years, chemistry has helped in dealing with some of the pressing aspects of environmental degradation with a fair degree of success. Safer alternatives to environmentally hazardous refrigerants, like CFCs (chlorofluorocarbons), responsible for ozone depletion in the stratosphere, have been successfully synthesised. However, many big environmental problems continue to be matters of grave concern to the chemists. One such problem is the management of the Green House gases, like methane, carbon dioxide, etc. Understanding of biochemical processes, use of enzymes for large-scale production of chemicals and synthesis of new exotic material are some of the intellectual challenges for the future generation of chemists. A developing country, like India, needs talented and creative chemists for accepting such challenges. To be a good chemist and to accept such challanges, one needs to understand the basic concepts of chemistry, which begin with the concept of matter. Let us start with the nature of matter.

1.2 NATURE OF MATTER

You are already familiar with the term matter from your earlier classes. Anything which has mass and occupies space is called matter. Everything around us, for example, book, pen, pencil, water, air, all living beings, etc., are composed of matter. You know that they have mass and they occupy space. Let us recall the characteristics of the states of matter, which you learnt in your previous classes.

1.2.1 States of Matter

You are aware that matter can exist in three physical states viz. solid, liquid and gas. The constituent particles of matter in these three states can be represented as shown in Fig. 1.1.

Particles are held very close to each other in solids in an orderly fashion and there is not much freedom of movement. In liquids, the particles are close to each other but they can move around. However, in gases, the particles are far apart as compared to those present in solid or liquid states and their movement is easy and fast. Because of such arrangement of particles, different states of matter exhibit the following characteristics:

(i) Solids have definite volume and definite shape.

(ii) Liquids have definite volume but do not have definite shape. They take the shape of the container in which they are placed.

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(iii) Gases have neither definite volume nor definite shape. They completely occupy the space in the container in which they are placed.

These three states of matter are interconvertible by changing the conditions of temperature and pressure.

Solid $\xrightleftharpoons[\text { cool }]{\text { heat }}$ liquid $\xrightleftharpoons[\text { cool }]{\text { heat }}$ Gas

On heating, a solid usually changes to a liquid, and the liquid on further heating changes to gas (or vapour). In the reverse process, a gas on cooling liquifies to the liquid and the liquid on further cooling freezes to the solid.

1.2.2. Classification of Matter

In Class IX (Chapter 2), you have learnt that at the macroscopic or bulk level, matter can be classified as mixture or pure substance. These can be further sub-divided as shown in Fig. 1.2.

When all constituent particles of a substance are same in chemical nature, it is said to be a pure substance. A mixture contains many types of particles.

A mixture contains particles of two or more pure substances which may be present in it in any ratio. Hence, their composition is variable. Pure substances forming mixture are called its components. Many of the substances present around you are mixtures. For example, sugar solution in water, air, tea, etc., are all mixtures. A mixture may be homogeneous or heterogeneous. In a homogeneous mixture, the components completely mix with each other. This means particles of components of the mixture are uniformly distributed throughout the bulk of the mixture and its composition is uniform throughout. Sugar solution and air are the examples of homogeneous mixtures. In contrast to this, in a heterogeneous mixture, the composition is not uniform throughout and sometimes different components are visible. For example, mixtures of salt and sugar, grains and pulses along with some dirt (often stone pieces), are heterogeneous mixtures. You can think of many more examples of mixtures which you come across in the daily life. It is worthwhile to mention here that the components of a mixture can be separated by using physical methods, such as simple hand-picking, filtration, crystallisation, distillation, etc.

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Pure substances have characteristics different from mixtures. Constituent particles of pure substances have fixed composition. Copper, silver, gold, water and glucose are some examples of pure substances. Glucose contains carbon, hydrogen and oxygen in a fixed ratio and its particles are of same composition. Hence, like all other pure substances, glucose has a fixed composition. Also, its constituents-carbon, hydrogen and oxygen - cannot be separated by simple physical methods.

Pure substances can further be classified into elements and compounds. Particles of an element consist of only one type of atoms. These particles may exist as atoms or molecules. You may be familiar with atoms and molecules from the previous classes; however, you will be studying about them in detail in Unit 2. Sodium, copper, silver, hydrogen, oxygen, etc., are some examples of elements. Their all atoms are of one type. However, the atoms of different elements are different in nature. Some elements, such as sodium or copper, contain atoms as their constituent particles, whereas, in some others, the constituent particles are molecules which are formed by two or more atoms. For example, hydrogen, nitrogen and oxygen gases consist of molecules, in which two atoms combine to give their respective molecules. This is illustrated in Fig. 1.3.

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When two or more atoms of different elements combine together in a definite ratio, the molecule of a compound is obtained. Moreover, the constituents of a compound cannot be separated into simpler substances by physical methods. They can be separated by chemical methods. Examples of some compounds are water, ammonia, carbon dioxide, sugar, etc. The molecules of water and carbon dioxide are represented in Fig. 1.4.

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Note that a water molecule comprises two hydrogen atoms and one oxygen atom. Similarly, a molecule of carbon dioxide contains two oxygen atoms combined with one carbon atom. Thus, the atoms of different elements are present in a compound in a fixed and definite ratio and this ratio is characteristic of a particular compound. Also, the properties of a compound are different from those of its constituent elements. For example, hydrogen and oxygen are gases, whereas, the compound formed by their combination i.e., water is a liquid. It is interesting to note that hydrogen burns with a pop sound and oxygen is a supporter of combustion, but water is used as a fire extinguisher.

1.3 PROPERTIES OF MATTER AND THEIR MEASUREMENT
1.3.1 Physical and chemical properties

Every substance has unique or characteristic properties. These properties can be classified into two categories - physical properties, such as colour, odour, melting point, boiling point, density, etc., and chemical properties, like composition, combustibility, ractivity with acids and bases, etc.

Physical properties can be measured or observed without changing the identity or the composition of the substance. The measurement or observation of chemical properties requires a chemical change to occur. Measurement of physical properties does not require occurance of a chemical change. The examples of chemical properties are characteristic reactions of different substances; these include acidity or basicity, combustibility, etc. Chemists describe, interpret and predict the behaviour of substances on the basis of knowledge of their physical and chemical properties, which are determined by careful measurement and experimentation. In the following section, we will learn about the measurement of physical properties.

1.3.2 Measurement of physical properties

Quantitative measurement of properties is reaquired for scientific investigation. Many properties of matter, such as length, area, volume, etc., are quantitative in nature. Any quantitative observation or measurement is represented by a number followed by units in which it is measured. For example, length of a room can be represented as $6 \mathrm{~m}$; here, 6 is the number and $m$ denotes metre, the unit in which the length is measured.

Earlier, two different systems of measurement, i.e., the English System and the Metric System were being used in different parts of the world. The metric system, which originated in France in late eighteenth century, was more convenient as it was based on the decimal system. Late, need of a common standard system was felt by the scientific community. Such a system was established in 1960 and is discussed in detail below.

1.3.3 The International System of Units (SI)

The International System of Units (in French Le Systeme International d’Unités - abbreviated as SI) was established by the $11^{\text {th }}$ General Conference on Weights and Measures (CGPM from Conference Generale des Poids et Measures). The CGPM is an intergovernmental treaty organisation created by a diplomatic treaty known as Metre Convention, which was signed in Paris in 1875.

The SI system has seven base units and they are listed in Table 1.1. These units pertain to the seven fundamental scientific quantities. The other physical quantities, such as speed, volume, density, etc., can be derived from these quantities.

Table 1.1 Base Physical Quantities and their Units

Base Physical
Quantity
Symbol for
Quantity
Name of
SI Unit
Symbol for
SI Unit
Length $l$ metre $\mathrm{m}$
Mass $m$ kilogram $\mathrm{kg}$
Time $t$ second $\mathrm{s}$
Electric current $I$ ampere $\mathrm{A}$
Thermodynamic temperature $T$ kelvin $\mathrm{K}$
Amount of substance $n$ mole $\mathrm{mol}$
Luminous intensity $I_{v}$ candela $\mathrm{cd}$

The definitions of the SI base units are given in Table 1.2.

The SI system allows the use of prefixes to indicate the multiples or submultiples of a unit. These prefixes are listed in Table 1.3.

Let us now quickly go through some of the quantities which you will be often using in this book.

Table 1.2 Definitions of SI Base Units

Unit of length metre The metre, symbol $\mathrm{m}$ is the SI unit of length. It is defined by taking the fixed numerical value of the speed of light in vacuum $\mathrm{c}$ to be 299792458 when expressed in the unit $\mathrm{ms}^{-1}$, where the second is defined in terms of the caesium frequency $\Delta^{V}{ }_{C s}$.
Unit of mass kilogram The kilogram, symbol kg. is the SI unit of mass. It is defined by taking the fixed numerical value of the Planck constant $h$ to be $6.62607015 \times 10^{-34}$ when expressed in the unit Js, which is equal to $\mathrm{kgm}^{2} \mathrm{~s}^{-1}$, where the metre and the second are defined in terms of c and $\Delta^{V}{ }_{c s}$.
Unit of time second The second symbol $\mathrm{s}$, is the SI unit of time. It is defined by taking the fixed numerical value of the caesium frequency $\Delta^{V}$ the unperturbed ground-state hyperfine transition frequency of the caesium-133 atom, to be 9192631770 when expressed in the unit $\mathrm{Hz}$, which is equal to $\mathrm{s}^{-1}$.
Unit of electric current amphere The ampere, symbol A, is the SI unit of electric current. It is defined by taking the fixed numerical value of the elementary charge $e$ to be $1.602176634 \times 10^{-19}$ when expressed in the unit $\mathrm{C}$, which is equal to As, where the second is defined in terms of $\Delta^{V}{ }_{C s^{\circ}}$
Unit of thermodynamic temperature kelvin The Kelvin, symbol $\mathrm{k}$, is the SI unit of thermodynamic temperature. It is defined by taking the fixed numerical value of the Boltzmann constant $k$ to be $1.380649 \times 10^{-23}$ when expressed in the unit $\mathrm{JK}^{-1}$, which is equal to $\mathrm{kgm}^{2} \mathrm{~s}^{-2} \mathrm{k}^{-1}$ where the kilogram, metre and second are defined in terms of $h, c$ and $\Delta_{C s}^{V}$
Unit of amount of substance mole The mole, symbol mol, is the SI unit of amount of substance. One mole contains exactly $6.02214076 \times 10^{23}$ elementary entities. This number is the fixed numerical value of the Avogadro constant, $N_{A}$, when expressed in the unit $\mathrm{mol}^{-1}$ and is called the Avogadro number. The amount of substance, symbol $n$, of a system is a measure of the number of specified elementary entities. An elementary entity may be an atom, a molecule, an ion, an electron, any other particle or specified group of particles.
Unit of luminous Intensity Candela The candela, symbol cd is the SI unit of luminous intensity in a given direction. It is defined by taking the fixed numerical value of the luminous efficacy of monochromatic radiation of frequency $540 \times 10^{12} \mathrm{~Hz}, K_{\mathrm{cd}}$, to be 683 when expressed in the unit $\mathrm{lm} \cdot \mathrm{W}^{-1}$, which is equal to $\mathrm{cd} \cdot \mathrm{sr}^{\cdot} \cdot \mathrm{W}^{-1}$, or cd sr $\mathrm{kg}^{-1}$ $\mathrm{~m}^{-2} \mathrm{~s}^{3}$, where the kilogram, metre and second are defined in terms of $h, c$ and $\Delta^{V}{ }_{C s} \cdot$

Table 1.3 Prefixes used in the SI System

Multiple Prefix Symbol
$10^{-24}$ yocto $\mathrm{y}$
$10^{-21}$ zepto $\mathrm{z}$
$10^{-18}$ atto $\mathrm{a}$
$10^{-15}$ femto $\mathrm{f}$
$10^{-12}$ pico $\mathrm{p}$
$10^{-9}$ nano $\mathrm{n}$
$10^{-6}$ micro $\mathrm{\mu}$
$10^{-3}$ milli $\mathrm{m}$
$10^{-2}$ centi $\mathrm{c}$
$10^{-1}$ deci $\mathrm{d}$
10 deca $\mathrm{da}$
$10^{2}$ hecto $\mathrm{h}$
$10^{3}$ kilo $\mathrm{k}$
$10^{6}$ mega $\mathrm{M}$
$10^{9}$ giga $\mathrm{G}$
$10^{12}$ tera $\mathrm{T}$
$10^{15}$ peta $\mathrm{P}$
$10^{18}$ exa $\mathrm{E}$
$10^{21}$ zeta $\mathrm{Z}$
$10^{24}$ yotta $\mathrm{Y}$

Maintaining the National Standards of Measurement

The system of units, including unit definitions, keeps on changing with time. Whenever the accuracy of measurement of a particular unit was enhanced substantially by adopting new principles, member nations of metre treaty (signed in 1875), agreed to change the formal definition of that unit. Each modern industrialised country, including India, has a National Metrology Institute (NMI), which maintains standards of measurements. This responsibility has been given to the National Physical Laboratory (NPL), New Delhi. This laboratory establishes experiments to realise the base units and derived units of measurement and maintains National Standards of Measurement. These standards are periodically inter-compared with standards maintained at other National Metrology Institutes in the world, as well as those, established at the International Bureau of Standards in Paris.

1.3.4 Mass and Weight

Mass of a substance is the amount of matter present in it, while weight is the force exerted by gravity on an object. The mass of a substance is constant, whereas, its weight may vary from one place to another due to change in gravity. You should be careful in using these terms.

The mass of a substance can be determined accurately in the laboratory by using an analytical balance (Fig. 1.5).

The SI unit of mass as given in Table 1.1 is kilogram. However, its fraction named as gram $(1 \mathrm{~kg}=1000 \mathrm{g})$, is used in laboratories due to the smaller amounts of chemicals used in chemical reactions.

1.3.5 Volume

Volume is the amont of space occupied by a substance. It has the units of (length) ${ }^{3}$. So in SI system, volume has units of $\mathrm{m}^{3}$. But again, in chemistry laboratories, smaller volumes are used. Hence, volume is often denoted in $\mathrm{cm}^{3}$ or $\mathrm{dm}^{3}$ units.

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A common unit, litre (L) which is not an SI unit, is used for measurement of volume of liquids.

$$ 1 \mathrm{~L}=1000 \mathrm{~mL}, \quad 1000 \mathrm{~cm}^{3}=1 \mathrm{dm}^{3} $$

Fig. 1.6 helps to visualise these relations.

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In the laboratory, the volume of liquids or solutions can be measured by graduated cylinder, burette, pipette, etc. A volumetric flask is used to prepare a known volume of a solution. These measuring devices are shown in Fig. 1.7.

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1.3.6 Density

The two properties - mass and volume discussed above are related as follows:

$$ \text { Density }=\frac{\text { Mass }}{\text { Volume }} $$

Density of a substance is its amount of mass per unit volume. So, SI units of density can be obtained as follows:

$$ \begin{aligned} \text { SI unit of density } & =\frac{\text { SI unit of mass }}{\text { SI unit of volume }} \\ \\ & =\frac{\mathrm{kg}}{\mathrm{m}^{3}} \text { or } \mathrm{kg} \mathrm{m}^{-3} \end{aligned} $$

This unit is quite large and a chemist often expresses density in $\mathrm{g} \mathrm{cm}^{-3}$, where mass is expressed in gram and volume is expressed in $\mathrm{cm}^{3}$. Density of a substance tells us about how closely its particles are packed. If density is more, it means particles are more closely packed.

1.3.7 Temperature

There are three common scales to measure temperature $-{ }^{\circ} \mathrm{C}$ (degree celsius), ${ }^{\circ} \mathrm{F}$ (degree fahrenheit) and $\mathrm{K}$ (kelvin). Here, $\mathrm{K}$ is the SI unit. The thermometers based on these scales are shown in Fig. 1.8. Generally, the thermometer with celsius scale are calibrated from $0^{\circ}$ to $100^{\circ}$, where these two temperatures are the freezing point and the boiling point of water, respectively. The fahrenheit scale is represented between $32^{\circ}$ to $212^{\circ}$.

The temperatures on two scales are related to each other by the following relationship:

$$ { }^{\circ} \mathrm{F}=\frac{9}{5}\left({ }^{\circ} \mathrm{C}\right)+32 $$

The kelvin scale is related to celsius scale as follows:

$$ \mathrm{K}={ }^{\circ} \mathrm{C}+273.15 $$

It is interesting to note that temperature below $0{ }^{\circ} \mathrm{C}$ (i.e., negative values) are possible in Celsius scale but in Kelvin scale, negative temperature is not possible.

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1.4 UNCERTAINTY IN MEASUREMENT

Many a time in the study of chemistry, one has to deal with experimental data as well as theoretical calculations. There are meaningful ways to handle the numbers conveniently and present the data realistically with certainty to the extent possible. These ideas are discussed below in detail.

Reference Standard

After defining a unit of measurement such as the kilogram or the metre, scientists agreed on reference standards that make it possible to calibrate all measuring devices. For getting reliable measurements, all devices such as metre sticks and analytical balances have been calibrated by their manufacturers to give correct readings. However, each of these devices is standardised or calibrated against some reference. The mass standard is the kilogram since 1889. It has been defined as the mass of platinum-iridium (Pt-Ir) cylinder that is stored in an airtight jar at International Bureau of Weights and Measures in Sevres, France. Pt-Ir was chosen for this standard because it is highly resistant to chemical attack and its mass will not change for an extremely long time.

Scientists are in search of a new standard for mass. This is being attempted through accurate determination of Avogadro constant. Work on this new standard focuses on ways to measure accurately the number of atoms in a well-defined mass of sample. One such method, which uses X-rays to determine the atomic density of a crystal of ultrapure silicon, has an accuracy of about 1 part in $10^{6}$ but has not yet been adopted to serve as a standard. There are other methods but none of them are presently adequate to replace the Pt-Ir cylinder. No doubt, changes are expected within this decade.

The metre was originally defined as the length between two marks on a Pt-Ir bar kept at a temperature of $0^{\circ} \mathrm{C}(273.15 \mathrm{~K})$. In 1960 the length of the metre was defined as $1.65076373 \times 10^{6}$ times the wavelength of light emitted by a krypton laser. Although this was a cumbersome number, it preserved the length of the metre at its agreed value. The metre was redefined in 1983 by CGPM as the length of path travelled by light in vacuum during a time interval of 1/299 792 458 of a second. Similar to the length and the mass, there are reference standards for other physical quantities.

1.4.1 Scientific Notation

As chemistry is the study of atoms and molecules, which have extremely low masses and are present in extremely large numbers, a chemist has to deal with numbers as large as $602,200,000,000,000,000,000,000$ for the molecules of $2 \mathrm{g}$ of hydrogen gas or as small as $0.00000000000000000000000166 \mathrm{g}$ mass of a H atom. Similarly, other constants such as Planck’s constant, speed of light, charges on particles, etc., involve numbers of the above magnitude.

It may look funny for a moment to write or count numbers involving so many zeros but it offers a real challenge to do simple mathematical operations of addition, subtraction, multiplication or division with such numbers. You can write any two numbers of the above type and try any one of the operations you like to accept as a challenge, and then, you will really appreciate the difficulty in handling such numbers.

This problem is solved by using scientific notation for such numbers, i.e., exponential notation in which any number can be represented in the form $\mathrm{N} \times 10^{\mathrm{n}}$, where $\mathrm{n}$ is an exponent having positive or negative values and $\mathrm{N}$ is a number (called digit term) which varies between $1.000 \ldots$ and $9.999 \ldots$.

Thus, we can write 232.508 as $2.32508 \times 10^{2}$ in scientific notation. Note that while writing it, the decimal had to be moved to the left by two places and same is the exponent (2) of 10 in the scientific notation.

Similarly, 0.00016 can be written as $1.6 \times 10^{-4}$. Here, the decimal has to be moved four places to the right and $(-4)$ is the exponent in the scientific notation.

While performing mathematical operations on numbers expressed in scientific notations, the following points are to be kept in mind.

Multiplication and Division

These two operations follow the same rules which are there for exponential numbers, i.e.

$$ \begin{aligned} \left(5.6 \times 10^{5}\right) \times\left(6.9 \times 10^{8}\right)= & (5.6 \times 6.9)\left(10^{5+8}\right) \\ & =(5.6 \times 6.9) \times 10^{13} \\ & =38.64 \times 10^{13} \\ & =3.864 \times 10^{14} \\ \left(9.8 \times 10^{-2}\right) \times\left(2.5 \times 10^{-6}\right)= & (9.8 \times 2.5)\left(10^{-2+(-6)}\right) \\ & =(9.8 \times 2.5)\left(10^{-2-6}\right) \\ & =24.50 \times 10^{-8} \\ & =2.450 \times 10^{-7} \\ \frac{2.7 \times 10^{-3}}{5.5 \times 10^{4}}=(2.7 \div 5.5)\left(10^{-3-4}\right)= & 0.4909 \times 10^{-7} \\ & =4.909 \times 10^{-8} \end{aligned} $$

Addition and Subtraction

For these two operations, first the numbers are written in such a way that they have the same exponent. After that, the coefficients (digit terms) are added or subtracted as the case may be.

Thus, for adding $6.65 \times 10^{4}$ and $8.95 \times 10^{3}$, exponent is made same for both the numbers. Thus, we get $\left(6.65 \times 10^{4}\right)+\left(0.895 \times 10^{4}\right)$

Then, these numbers can be added as follows $(6.65+0.895) \times 10^{4}=7.545 \times 10^{4}$

Similarly, the subtraction of two numbers can be done as shown below:

$$ \begin{aligned} & \left(2.5 \times 10^{-2}\right)-\left(4.8 \times 10^{-3}\right) \\ & \quad=\left(2.5 \times 10^{-2}\right)-\left(0.48 \times 10^{-2}\right) \\ & \quad=(2.5-0.48) \times 10^{-2}=2.02 \times 10^{-2} \end{aligned} $$

1.4.2 Significant Figures

Every experimental measurement has some amount of uncertainty associated with it because of limitation of measuring instrument and the skill of the person making the measurement. For example, mass of an object is obtained using a platform balance and it comes out to be $9.4 \mathrm{g}$. On measuring the mass of this object on an analytical balance, the mass obtained is $9.4213 \mathrm{g}$. The mass obtained by an analytical balance is slightly higher than the mass obtained by using a platform balance. Therefore, digit 4 placed after decimal in the measurement by platform balance is uncertain.

The uncertainty in the experimental or the calculated values is indicated by mentioning the number of significant figures. Significant figures are meaningful digits which are known with certainty plus one which is estimated or uncertain. The uncertainty is indicated by writing the certain digits and the last uncertain digit. Thus, if we write a result as $11.2 \mathrm{~mL}$, we say the 11 is certain and 2 is uncertain and the uncertainty would be $\pm 1$ in the last digit. Unless otherwise stated, an uncertainty of $\pm 1$ in the last digit is always understood.

There are certain rules for determining the number of significant figures. These are stated below:

(1) All non-zero digits are significant. For example in $285 \mathrm{~cm}$, there are three significant figures and in $0.25 \mathrm{~mL}$, there are two significant figures.

(2) Zeros preceding to first non-zero digit are not significant. Such zero indicates the position of decimal point. Thus, 0.03 has one significant figure and 0.0052 has two significant figures.

(3) Zeros between two non-zero digits are significant. Thus, 2.005 has four significant figures.

(4) Zeros at the end or right of a number are significant, provided they are on the right side of the decimal point. For example, $0.200 \mathrm{g}$ has three significant figures. But, if otherwise, the terminal zeros are not significant if there is no decimal point. For example, 100 has only one significant figure, but 100 has three significant figures and 100.0 has four significant figures. Such numbers are better represented in scientific notation. We can express the number 100 as $1 \times 10^{2}$ for one significant figure, $1.0 \times 10^{2}$ for two significant figures and $1.00 \times 10^{2}$ for three significant figures.

(5) Counting the numbers of object, for example, 2 balls or 20 eggs, have infinite significant figures as these are exact numbers and can be represented by writing infinite number of zeros after placing a decimal i.e., $2=2.000000$ or $20=20.000000$.

In numbers written in scientific notation, all digits are significant e.g., $4.01 \times 10^{2}$ has three significant figures, and $8.256 \times 10^{-3}$ has four significant figures.

However, one would always like the results to be precise and accurate. Precision and accuracy are often referred to while we talk about the measurement.

Precision refers to the closeness of various measurements for the same quantity. However, accuracy is the agreement of a particular value to the true value of the result. For example, if the true value for a result is $2.00 \mathrm{g}$ and student ’ $A$ ’ takes two measurements and reports the results as 1.95 $\mathrm{g}$ and $1.93 \mathrm{g}$. These values are precise as they are close to each other but are not accurate. Another student ’ $\mathrm{B}$ ’ repeats the experiment and obtains $1.94 \mathrm{g}$ and $2.05 \mathrm{g}$ as the results for two measurements. These observations are neither precise nor accurate. When the third student ’ $C$ ’ repeats these measurements and reports $2.01 \mathrm{g}$ and $1.99 \mathrm{g}$ as the result, these values are both precise and accurate. This can be more clearly understood from the data given in Table 1.4.

Table 1.4 Data to Illustrate Precision and Accuracy

Measurements/g
1 2 Average (g)
Student A 1.95 1.93 1.940
Student B 1.94 2.05 1.995
Student C 2.01 1.99 2.000

Addition and Subtraction of Significant Figures

The result cannot have more digits to the right of the decimal point than either of the original numbers.

$$ \begin{array}{c} 12.11 \\ 18.0 \\ 1.012 \\ \overline{\underline{31.122}} \end{array} $$

Here, 18.0 has only one digit after the decimal point and the result should be reported only up to one digit after the decimal point, which is 31.1

Multiplication and Division of Significant Figures

In these operations, the result must be reported with no more significant figures as in the measurement with the few significant figures.

$2.5 \times 1.25=3.125$

Since 2.5 has two significant figures, the result should not have more than two significant figures, thus, it is 3.1.

While limiting the result to the required number of significant figures as done in the above mathematical operation, one has to keep in mind the following points for rounding off the numbers

  1. If the rightmost digit to be removed is more than 5, the preceding number is increased by one. For example, 1.386. If we have to remove 6 , we have to round it to 1.39 .

  2. If the rightmost digit to be removed is less than 5 , the preceding number is not changed. For example, 4.334 if 4 is to be removed, then the result is rounded upto 4.33.

  3. If the rightmost digit to be removed is 5 , then the preceding number is not changed if it is an even number but it is increased by one if it is an odd number. For example, if 6.35 is to be rounded by removing 5 , we have to increase 3 to 4 giving 6.4 as the result. However, if 6.25 is to be rounded off it is rounded off to 6.2.

1.4.3 Dimensional Analysis

Often while calculating, there is a need to convert units from one system to the other. The method used to accomplish this is called factor label method or unit factor method or dimensional analysis. This is illustrated below.

Example

A piece of metal is 3 inch (represented by in) long. What is its length in $\mathrm{cm}$ ?

Solution

We know that 1 in $=2.54 \mathrm{~cm}$

From this equivalence, we can write

$$ \frac{1 \mathrm{in}}{2.54 \mathrm{~cm}}=1=\frac{2.54 \mathrm{~cm}}{1 \mathrm{in}} $$

Thus, $\frac{1 \mathrm{in}}{2.54 \mathrm{~cm}}$ equals 1 and $\frac{2.54 \mathrm{~cm}}{1 \mathrm{in}}$

also equals 1 . Both of these are called unit factors. If some number is multiplied by these unit factors (i.e., 1), it will not be affected otherwise.

Say, the 3 in given above is multiplied by the unit factor. So,

3 in $=3$ in $\times \frac{2.54 \mathrm{~cm}}{1 \mathrm{in}}=3 \times 2.54 \mathrm{~cm}=7.62 \mathrm{~cm}$

Now, the unit factor by which multiplication is to be done is that unit factor ($\frac{2.54 \mathrm{~cm}}{1 \mathrm{in}}$ in the above case) which gives the desired units i.e., the numerator should have that part which is required in the desired result.

It should also be noted in the above example that units can be handled just like other numerical part. It can be cancelled, divided, multiplied, squared, etc. Let us study one more example.

Example

A jug contains $2 \mathrm{~L}$ of milk. Calculate the volume of the milk in $\mathrm{m}^{3}$.

Solution

Since $1 \mathrm{~L}=1000 \mathrm{~cm}^{3}$

and $1 \mathrm{~m}=100 \mathrm{~cm}$, which gives

$$ \frac{1 \mathrm{~m}}{100 \mathrm{~cm}}=1=\frac{100 \mathrm{~cm}}{1 \mathrm{~m}} $$

To get $\mathrm{m}^{3}$ from the above unit factors, the first unit factor is taken and it is cubed.

$$ \left(\frac{1 \mathrm{~m}}{100 \mathrm{~cm}}\right)^{3} \Rightarrow \frac{1 \mathrm{~m}^{3}}{10^{6} \mathrm{~cm}^{3}}=(1)^{3}=1 $$

Now $2 \mathrm{~L}=2 \times 1000 \mathrm{~cm}^{3}$

The above is multiplied by the unit factor

$2 \times 1000 \mathrm{~cm}^{3} \times \frac{1 \mathrm{~m}^{3}}{10^{6} \mathrm{~cm}^{3}}=\frac{2 \mathrm{~m}^{3}}{10^{3}}=2 \times 10^{-3} \mathrm{~m}^{3}$

Example

How many seconds are there in 2 days?

Solution

Here, we know 1 day $=24$ hours (h)

$$ \begin{aligned} & \text { or } \frac{1 \text { day }}{24 \mathrm{~h}}=1=\frac{24 \mathrm{~h}}{1 \text { day }} \\ & \text { then, } 1 \mathrm{~h}=60 \mathrm{~min} \end{aligned} $$

$$ \text { or } \frac{1 \mathrm{~h}}{60 \mathrm{~min}}=1=\frac{60 \mathrm{~min}}{1 \mathrm{~h}} $$

so, for converting 2 days to seconds,

i.e., 2 days $——=—$ seconds

The unit factors can be multiplied in series in one step only as follows:

$$ \begin{aligned} & 2 \text { day } \times \frac{24 \mathrm{~h}}{1 \text { day }} \times \frac{60 \mathrm{~min}}{1 \mathrm{~h}} \times \frac{60 \mathrm{~s}}{1 \mathrm{~min}} \\ & \quad=2 \times 24 \times 60 \times 60 \mathrm{~s} \\ & \quad=172800 \mathrm{~s} \end{aligned} $$

1.5 LAWS OF CHEMICAL COMBINATIONS

The combination of elements to form compounds is governed by the following five basic laws.

image

1.5.1 Law of Conservation of Mass

This law was put forth by Antoine Lavoisier in 1789. He performed careful experimental studies for combustion reactions and reached to the conclusion that in all physical and chemical changes, there is no net change in mass duting the process. Hence, he reached to the conclusion that matter can neither be created nor destroyed. This is called ‘Law of Conservation of Mass’. This law formed the basis for several later developments in chemistry. Infact, this was the result of exact measurement of masses of reactants and products, and carefully planned experiments performed by Lavoisier.

1.5.2 Law of Definite Proportions

This law was given by, a French chemist, Joseph Proust. He stated that a given compound always contains exactly the same proportion of elements by weight.

image

Proust worked with two samples of cupric carbonate - one of which was of natural origin and the other was synthetic. He found that the composition of elements present in it was same for both the samples as shown below:

% of
copper
% of
carbon
% of
oxygen
Natural Sample 51.35 9.74 38.91
Synthetic Sample 51.35 9.74 38.91

Thus, he concluded that irrespective of the source, a given compound always contains same elements combined together in the same proportion by mass. The validity of this law has been confirmed by various experiments. It is sometimes also referred to as Law of Definite Composition.

1.5.3 Law of Multiple Proportions

This law was proposed by Dalton in 1803. According to this law, if two elements can combine to form more than one compound, the masses of one element that combine with a fixed mass of the other element, are in the ratio of small whole numbers.

For example, hydrogen combines with oxygen to form two compounds, namely, water and hydrogen peroxide.

$$\substack{\text{Hydrogen} + \\ \substack{ {}\\ 2g} } \substack{\text{Oxygen } \rightarrow \\ \substack{ {}\\ 16g} } \substack{\text{Water} \\ \substack{ {}\\ 18g}}$$

$$\substack{\text{Hydrogen} + \\ \substack{ {}\\ 2g} } \substack{\text{Oxygen } \rightarrow \\ \substack{ {}\\ 32g} } \substack{\text{Hydrogen Peroxide} \\ \substack{ {}\\ 34g}}$$

Here, the masses of oxygen (i.e., $16 \mathrm{g}$ and $32 \mathrm{g}$ ), which combine with a fixed mass of hydrogen $(2 \mathrm{g})$ bear a simple ratio, i.e., $16: 32$ or 1: 2 .

1.5.4 Gay Lussa’s Law of Gaseous Volumes

This law was given by Gay Lussac in 1808 . He observed that when gases combine or are produced in a chemical reaction they do so in a simple ratio by volume, provided all gases are at the same temperature and pressure.

image

Thus, $100 \mathrm{~mL}$ of hydrogen combine with $50 \mathrm{~mL}$ of oxygen to give $100 \mathrm{~mL}$ of Joseph Louis Gay Lussac water vapour.

$$ \begin{array}{ccccc} \text{Hydrogen} & + & \text{Oxygen} & \longrightarrow & \text{Water} \\ 100 \text{ ml} & & 50 \text{ ml} & & 100 \text{ ml} \end{array} $$

Thus, the volumes of hydrogen and oxygen which combine (i.e., $100 \mathrm{~mL}$ and $50 \mathrm{~mL}$ ) bear a simple ratio of $2: 1$.

Gay Lussac’s discovery of integer ratio in volume relationship is actually the law of definite proportions by volume. The law of definite proportions, stated earlier, was with respect to mass. The Gay Lussac’s law was explained properly by the work of Avogadro in 1811.

1.5.5 Avogadro’s Law

In 1811, Avogadro proposed that equal volumes of all gases at the same temperature and pressure should contain equal number of molecules. Avogadro made a distinction between atoms and molecules which is quite understandable in present times. If we consider again the reaction of hydrogen and oxygen to produce water, we see that two volumes of hydrogen combine with one volume of oxygen to give two volumes of water without leaving any unreacted oxygen.

image

Note that in the Fig. 1.9 (Page 16) each box contains equal number of molecules. In fact, Avogadro could explain the above result by considering the molecules to be polyatomic. If hydrogen and oxygen were considered as diatomic as recognised now, then the above results are easily understandable. However, Dalton and others believed at that time that atoms of the same kind cannot combine and molecules of oxygen or hydrogen containing two atoms did not exist. Avogadro’s proposal was published in the French Journal de Physique. In spite of being correct, it did not gain much support.

image

After about 50 years, in 1860, the first international conference on chemistry was held in Karlsruhe, Germany, to resolve various ideas. At the meeting, Stanislao Cannizaro presented a sketch of a course of chemical philosophy, which emphasised on the importance of Avogadro’s work.

1.6 DALTON’S ATOMIC THEORY

Although the origin of the idea that matter is composed of small indivisible particles called ‘a-tomio’ (meaning, indivisible), dates back to the time of Democritus, a Greek Philosopher (460$370 \mathrm{BC})$, it again started emerging as a result of several experimental studies which led to the laws mentioned above.

image

In 1808, Dalton published ‘A New System of Chemical Philosophy’, in which he proposed the following:

  1. Matter consists of indivisible atoms.

  2. All atoms of a given element have identical properties, including identical mass. Atoms of different elements differ in mass.

  3. Compounds are formed when atoms of different elements combine in a fixed ratio.

  4. Chemical reactions involve reorganisation of atoms. These are neither created nor destroyed in a chemical reaction.

Dalton’s theory could explain the laws of chemical combination. However, it could not explain the laws of gaseous volumes. It could not provide the reason for combining of atoms, which was answered later by other scientists.

1.7 ATOMIC AND MOLECULAR MASSES

After having some idea about the terms atoms and molecules, it is appropriate here to understand what do we mean by atomic and molecular masses.

1.7.1 Atomic Mass

The atomic mass or the mass of an atom is actually very-very small because atoms are extremely small. Today, we have sophisticated techniques e.g., mass spectrometry for determining the atomic masses fairly accurately. But in the nineteenth century, scientists could determine the mass of one atom relative to another by experimental means, as has been mentioned earlier. Hydrogen, being the lightest atom was arbitrarily assigned a mass of 1 (without any units) and other elements were assigned masses relative to it. However, the present system of atomic masses is based on carbon-12 as the standard and has been agreed upon in 1961. Here, Carbon-12 is one of the isotopes of carbon and can be represented as ${ }^{12} \mathrm{C}$. In this system, ${ }^{12} \mathrm{C}$ is assigned a mass of exactly 12 atomic mass unit (amu) and masses of all other atoms are given relative to this standard. One atomic mass unit is defined as a mass exactly equal to one-twelfth of the mass of one carbon -12 atom.

And $1 \mathrm{amu}=1.66056 \times 10^{-24} \mathrm{g}$

Mass of an atom of hydrogen

$$ =1.6736 \times 10^{-24} \mathrm{g} $$

Thus, in terms of amu, the mass

$$ \begin{aligned} \text { of hydrogen atom } & =\frac{1.6736 \times 10^{-24} \mathrm{g}}{1.66056 \times 10^{-24} \mathrm{g}} \\ & =1.0078 \mathrm{amu} \\ & =1.0080 \mathrm{amu} \end{aligned} $$

Similarly, the mass of oxygen - $16\left({ }^{16} \mathrm{O}\right)$ atom would be $15.995 \mathrm{amu}$.

At present, ‘amu’ has been replaced by ’ $u$ ‘, which is known as unified mass.

When we use atomic masses of elements in calculations, we actually use average atomic masses of elements, which are explained below.

1.7.2 Average Atomic Mass

Many naturally occurring elements exist as more than one isotope. When we take into account the existence of these isotopes and their relative abundance (per cent occurrence), the average atomic mass of that element can be computed. For example, carbon has the following three isotopes with relative abundances and masses as shown against each of them.

Isotope Relative
Abundance
(%)
Atomic Mass
(amu)
${ }^{12} \mathrm{C}$ 98.892 12
${ }^{13} \mathrm{C}$ 1.108 13.00335
${ }^{14} \mathrm{C}$ $2 \times 10^{-10}$ 14.00317

From the above data, the average atomic mass of carbon will come out to be:

$(0.98892)(12 u)+(0.01108)(13.00335 u)+$ $\left(2 \times 10^{-12}\right)(14.00317 \mathrm{u})=12.011 \mathrm{u}$

Similarly, average atomic masses for other elements can be calculated. In the periodic table of elements, the atomic masses mentioned for different elements actually represent their average atomic masses.

1.7.3 Molecular Mass

Molecular mass is the sum of atomic masses of the elements present in a molecule. It is obtained by multiplying the atomic mass of each element by the number of its atoms and adding them together. For example, molecular mass of methane, which contains one carbon atom and four hydrogen atoms, can be obtained as follows:

Molecular mass of methane,

$\left(\mathrm{CH}_{4}\right)=(12.011 \mathrm{u})+4(1.008 \mathrm{u})$

$=16.043 \mathrm{u}$

Similarly, molecular mass of water $\left(\mathrm{H}_{2} \mathrm{O}\right)$

$=2 \times$ atomic mass of hydrogen $+1 \times$ atomic mass of oxygen

$=2(1.008 \mathrm{u})+16.00 \mathrm{u}$

$=18.02 \mathrm{u}$

1.7.4 Formula Mass

Some substances, such as sodium chloride, do not contain discrete molecules as their constituent units. In such compounds, positive (sodium ion) and negative (chloride ion) entities are arranged in a three-dimensional structure, as shown in Fig. 1.10.

image

It may be noted that in sodium chloride, one $\mathrm{Na}^{+}$ion is surrounded by six $\mathrm{Cl}^{-}$ion and vice-versa.

The formula, such as $\mathrm{NaCl}$, is used to calculate the formula mass instead of molecular mass as in the solid state sodium chloride does not exist as a single entity.

Thus, the formula mass of sodium chloride is atomic mass of sodium + atomic mass of chlorine

$$ =23.0 u+35.5 u=58.5 u $$

Problem 1.1

Calculate the molecular mass of glucose $\left( C_6 H_{12} O_6 \right)$ molecule.

Solution

Molecular mass of glucose $\left( C_6 H_{12} O_6 \right)$

$=6(12.011 u)+12(1.008 u)+6 (16.00 u)$

$=(72.066 u)+(12.096 u)+ (96.00 u) $

$=180.162 \mathrm{u}$

1.8 MOLE CONCEPT AND MOLAR MASSES

Atoms and molecules are extremely small in size and their numbers in even a small amount of any substance is really very large. To handle such large numbers, a unit of convenient magnitude is required.

Just as we denote one dozen for 12 items, score for 20 items, gross for 144 items, we use the idea of mole to count entities at the microscopic level (i.e., atoms, molecules, particles, electrons, ions, etc).

In SI system, mole (symbol, mol) was introduced as seventh base quantity for the amount of a substance.

The mole, symbol mol, is the SI unit of amount of substance. One mole contains exactly $6.02214076 \times 10^{23}$ elementary entities. This number is the fixed numerical value of the Avogadro constant, $\mathrm{N}_{\mathrm{A}}$, when expressed in the unit $\mathrm{mol}^{-1}$ and is called the Avogadro number. The amount of substance, symbol $n$, of a system is a measure of the number of specified elementary entities. An elementary entity may be an atom, a molecule, an ion, an electron, any other particle or specified group of particles. It may be emphasised that the mole of a substance always contains the same number of entities, no matter what the substance may be. In order to determine this number precisely, the mass of a carbon-12 atom was determined by a mass spectrometer and found to be equal to $1.992648 \times 10^{-23} \mathrm{g}$. Knowing that one mole of carbon weighs $12 \mathrm{g}$, the number of atoms in it is equal to:

$$ \begin{aligned} & \frac{12 \mathrm{g} / \mathrm{mol}{ }^{12} \mathrm{C}}{1.992648 \times 10^{-23} \mathrm{g} /{ }^{12} \mathrm{Catom}} \\ & =6.0221367 \times 10^{23} \text { atoms } / \mathrm{mol} \end{aligned} $$

This number of entities in $1 \mathrm{~mol}$ is so important that it is given a separate name and symbol. It is known as ‘Avogadro constant’, or Avogadro number denoted by $N_{A}$ in honour of Amedeo Avogadro. To appreciate the largeness of this number, let us write it with all zeroes without using any powers of ten.

602213670000000000000000

Hence, so many entities (atoms, molecules or any other particle) constitute one mole of a particular substance.

We can, therefore, say that $1 \mathrm{~mol}$ of hydrogen atoms $=6.022 \times 10^{23}$ atoms

$1 \mathrm{~mol}$ of water molecules $=6.022 \times 10^{23}$ water molecules

1 mol of sodium chloride $=6.022 \times 10^{23}$ formula units of sodium chloride

Having defined the mole, it is easier to know the mass of one mole of a substance or the constituent entities. The mass of one mole of a substance in grams is called its molar mass. The molar mass in grams is numerically equal to atomic/molecular/ formula mass in $u$.

Molar mass of water $=18.02 \mathrm{g} \mathrm{~mol}^{-1}$

Molar mass of sodium chloride $=58.5 \mathrm{g} \mathrm{~mol}^{-1}$

1.9 PERCENTAGE COMPOSITION

So far, we were dealing with the number of entities present in a given sample. But many a time, information regarding the percentage of a particular element present in a compound is required. Suppose, an unknown or new compound is given to you, the first question

image

you would ask is: what is its formula or what are its constituents and in what ratio are they present in the given compound? For known compounds also, such information provides a check whether the given sample contains the same percentage of elements as present in a pure sample. In other words, one can check the purity of a given sample by analysing this data.

Let us understand it by taking the example of water $\left(\mathrm{H}_{2} \mathrm{O}\right)$. Since water contains hydrogen and oxygen, the percentage composition of both these elements can be calculated as follows:

Mass % of an element $=$

mass of that element in the compound $\times 100$ molar mass of the compound

Molar mass of water $=18.02 \mathrm{g}$

Mass $%$ of hydrogen $=\frac{2 \times 1.008}{18.02} \times 100$

$=11.18$

Mass % of oxygen

$$ \begin{aligned} & =\frac{16.00}{18.02} \times 100 \\ & =88.79 \end{aligned} $$

Let us take one more example. What is the percentage of carbon, hydrogen and oxygen in ethanol?

Molecular formula of ethanol is: $C_2 H_5 OH$

Molar mass of ethanol is:

$(2 \times 12.01+6 \times 1.008+16.00) g=46.068 \mathrm{g}$

Mass per cent of carbon

$$ =\frac{24.02 \mathrm{g}}{46.068 \mathrm{g}} \times 100=52.14 % $$

Mass per cent of hydrogen

$$ =\frac{6.048 \mathrm{g}}{46.068 \mathrm{g}} \times 100=13.13 % $$

Mass per cent of oxygen

$$ =\frac{16.00 \mathrm{g}}{46.068 \mathrm{g}} \times 100=34.73 % $$

After understanding the calculation of per cent of mass, let us now see what information can be obtained from the per cent composition data.

1.9.1 Empirical Formula for Molecular Formula

An empirical formula represents the simplest whole number ratio of various atoms present in a compound, whereas, the molecular formula shows the exact number of different types of atoms present in a molecule of a compound.

If the mass per cent of various elements present in a compound is known, its empirical formula can be determined. Molecular formula can further be obtained if the molar mass is known. The following example illustrates this sequence.

Problem 1.2

A compound contains $4.07 %$ hydrogen, $24.27 %$ carbon and $71.65 %$ chlorine. Its molar mass is $98.96 \mathrm{g}$. What are its empirical and molecular formulas?

Solution

Step 1. Conversion of mass per cent to grams

Since we are having mass per cent, it is convenient to use $100 \mathrm{g}$ of the compound as the starting material. Thus, in the $100 \mathrm{g}$ sample of the above compound, $4.07 \mathrm{g}$ hydrogen, $24.27 \mathrm{g}$ carbon and $71.65 \mathrm{g}$ chlorine are present.

Step 2. Convert into number moles of each element

Divide the masses obtained above by respective atomic masses of various elements. This gives the number of moles of constituent elements in the compound

Moles of hydrogen $=\frac{4.07 \mathrm{g}}{1.008 \mathrm{g}}=4.04$

Moles of carbon $=\frac{24.27 \mathrm{g}}{12.01 \mathrm{g}}=2.021$

Moles of chlorine $=\frac{71.65 \mathrm{g}}{35.453 \mathrm{g}}=2.021$

Step 3. Divide each of the mole values obtained above by the smallest number amongst them

Since 2.021 is smallest value, division by it gives a ratio of $2: 1: 1$ for $\mathrm{H}: \mathrm{C}: \mathrm{Cl}$.

In case the ratios are not whole numbers, then they may be converted into whole number by multiplying by the suitable coefficient.

Step 4. Write down the empirical formula by mentioning the numbers after writing the symbols of respective elements

$\mathrm{CH}_{2} \mathrm{Cl}$ is, thus, the empirical formula of the above compound.

Step 5. Writing molecular formula

(a) Determine empirical formula mass by adding the atomic masses of various atoms present in the empirical formula. For $\mathrm{CH}_{2} \mathrm{Cl}$, empirical formula mass is $12.01+(2 \times 1.008)+35.453$ $=49.48 \mathrm{g}$

(b) Divide Molar mass by empirical formula mass

$$ \begin{aligned} \frac{\text { Molar mass }}{\text { Empirical formula mass }}= & \frac{98.96 \mathrm{g}}{49.48 \mathrm{g}} \\ & =2=(n) \end{aligned} $$

(c) Multiply empirical formula by $n$ obtained above to get the molecular formula

Empirical formula $=\mathrm{CH}_2 \mathrm{Cl}, n=2$. Hence molecular formula is $\mathrm{C}_2 \mathrm{H}_4 \mathrm{Cl}_2$.

1.10 STOICHIOMETRY AND STOICHIOMETRIC CALCULATIONS

The word ‘stoichiometry’ is derived from two Greek words - stoicheion (meaning, element) and metron (meaning, measure). Stoichiometry, thus, deals with the calculation of masses (sometimes volumes also) of the reactants and the products involved in a chemical reaction. Before understanding how to calculate the amounts of reactants required or the products produced in a chemical reaction, let us study what information is available from the balanced chemical equation of a given reaction. Let us consider the combustion of methane. A balanced equation for this reaction is as given below:

$$ \mathrm{CH}_4(\mathrm{g})+2 \mathrm{O}_2(\mathrm{g}) \rightarrow \mathrm{CO}_2(\mathrm{g})+2 \mathrm{H}_2 \mathrm{O}(\mathrm{g}) $$

Here, methane and dioxygen are called reactants and carbon dioxide and water are called products. Note that all the reactants and the products are gases in the above reaction and this has been indicated by letter $(\mathrm{g})$ in the brackets next to its formula. Similarly, in case of solids and liquids, (s) and (1) are written respectively.

The coefficients 2 for $\mathrm{O}_2$ and $\mathrm{H}_2 \mathrm{O}$ are called stoichiometric coefficients. Similarly the coefficient for $\mathrm{CH}_4$ and $\mathrm{CO}_2$ is one in each case. They represent the number of molecules (and moles as well) taking part in the reaction or formed in the reaction.

Thus, according to the above chemical reaction,

  • One mole of $\mathrm{CH}_4(\mathrm{g})$ reacts with two moles of $\mathrm{O}_2(\mathrm{g})$ to give one mole of $\mathrm{CO}_2(\mathrm{g})$ and two moles of $\mathrm{H}_2 \mathrm{O}(\mathrm{g})$

  • One molecule of $\mathrm{CH}_4(\mathrm{g})$ reacts with 2 molecules of $\mathrm{O}_2(\mathrm{g})$ to give one molecule of $\mathrm{CO}_2(\mathrm{g})$ and 2 molecules of $\mathrm{H}_2 \mathrm{O}(\mathrm{g})$

  • 22.7 $\mathrm{L}$ of $\mathrm{CH}_4(\mathrm{g})$ reacts with $45.4 \mathrm{~L}$ of $\mathrm{O}_2$ (g) to give $22.7 \mathrm{~L}$ of $\mathrm{CO}_2(\mathrm{g})$ and $45.4 \mathrm{~L}$ of $\mathrm{H}_2 \mathrm{O}(\mathrm{g})$

  • $16 \mathrm{g}$ of $\mathrm{CH}_4(\mathrm{g})$ reacts with $2 \times 32 \mathrm{g}$ of $\mathrm{O}_2$ (g) to give $44 \mathrm{g}$ of $\mathrm{CO}_2(\mathrm{g})$ and $2 \times 18 \mathrm{g}$ of $\mathrm{H}_2 \mathrm{O}(\mathrm{g})$.

From these relationships, the given data can be interconverted as follows: mass

mass $\leftrightharpoons$ moles $\leftrightharpoons$ no. of molecules

$$ \frac{\text { Mass }}{\text { Volume }}=\text { Density } $$

1.10.1 Limiting Reagent

Many a time, reactions are carried out with the amounts of reactants that are different than the amounts as required by a balanced chemical reaction. In such situations, one reactant is in more amount than the amount required by balanced chemical reaction. The reactant which is present in the least amount gets consumed after sometime and after that further reaction does not take place whatever be the amount of the other reactant. Hence, the reactant, which gets consumed first, limits the amount of product formed and is, therefore, called the limiting reagent.

In performing stoichiometric calculations, this aspect is also to be kept in mind.

1.10.2 Reactions in Solutions

A majority of reactions in the laboratories are carried out in solutions. Therefore, it is important to understand as how the amount of substance is expressed when it is present in the solution. The concentration of a solution or the amount of substance present in its given volume can be expressed in any of the following ways.

  1. Mass per cent or weight per cent (w/w %)
  2. Mole fraction
  3. Molarity
  4. Molality

Let us now study each one of them in detail.

Balancing a chemical equation

According to the law of conservation of mass, a balanced chemical equation has the same number of atoms of each element on both sides of the equation. Many chemical equations can be balanced by trial and error. Let us take the reactions of a few metals and non-metals with oxygen to give oxides $4 \mathrm{Fe}(\mathrm{s})+3 \mathrm{O}_2(\mathrm{g}) \rightarrow 2 \mathrm{Fe}_2 \mathrm{O}_3(\mathrm{~s})$ (a) balanced equation

$2 \mathrm{Mg}(\mathrm{s})+\mathrm{O}_2(\mathrm{g}) \rightarrow 2 \mathrm{MgO}(\mathrm{s})$ (b) balanced equation

$P_4(~s)+O_2(g) \rightarrow P_4 O_{10}(~s)$ (c) unbalanced equation

Equations (a) and (b) are balanced, since there are same number of metal and oxygen atoms on each side of the equations. However equation (c) is not balanced. In this equation, phosphorus atoms are balanced but not the oxygen atoms. To balance it, we must place the coefficient 5 on the left of oxygen on the left side of the equation to balance the oxygen atoms appearing on the right side of the equation.

$$ P_4(~s)+5 O_2(g) \rightarrow P_4 O_{10}(~s) \quad \text { balanced equation } $$

Now, let us take combustion of propane, $\mathrm{C}_3 \mathrm{H}_8$. This equation can be balanced in steps.

Step 1 Write down the correct formulas of reactants and products. Here, propane and oxygen are reactants, and carbon dioxide and water are products.

$$ \mathrm{C}_3 \mathrm{H}_8(\mathrm{g})+\mathrm{O}_2(\mathrm{g}) \rightarrow \mathrm{CO}_2(\mathrm{g})+\mathrm{H}_2 \mathrm{O}(\mathrm{l}) \text { unbalanced equation } $$

Step 2 Balance the number of $C$ atoms: Since 3 carbon atoms are in the reactant, therefore, three $\mathrm{CO}_{2}$ molecules are required on the right side.

$$ \mathrm{C}_3 \mathrm{H}_8(\mathrm{g})+\mathrm{O}_2(\mathrm{g}) \rightarrow 3 \mathrm{CO}_2(\mathrm{g})+\mathrm{H}_2 \mathrm{O}(\mathrm{l}) $$

Step 3 Balance the number of $H$ atoms: on the left there are 8 hydrogen atoms in the reactants however, each molecule of water has two hydrogen atoms, so four molecules of water will be required for eight hydrogen atoms on the right side.

$$ \mathrm{C}_3 \mathrm{H}_8(\mathrm{g})+\mathrm{O}_2(\mathrm{g}) \rightarrow 3 \mathrm{CO}_2(\mathrm{g})+4 \mathrm{H}_2 \mathrm{O}(\mathrm{l}) $$

Step 4 Balance the number of $O$ atoms: There are 10 oxygen atoms on the right side $(3 \times 2=6$ in $\mathrm{CO}_2$ and $4 \times 1=4$ in water). Therefore, five $\mathrm{O}_2$ molecules are needed to supply the required $10 \mathrm{CO}_2$ and $4 \times 1=4$ in water). Therefore, five $\mathrm{O}_2$ molecules are needed to supply the required 10 oxygen atoms.

$$ \mathrm{C}_3 \mathrm{H}_8(\mathrm{g})+5 \mathrm{O}_2(\mathrm{g}) \rightarrow 3 \mathrm{CO}_2(\mathrm{g})+4 \mathrm{H}_2 \mathrm{O}(\mathrm{l}) $$

Step 5 Verify that the number of atoms of each element is balanced in the final equation. The equation shows three carbon atoms, eight hydrogen atoms, and 10 oxygen atoms on each side.

All equations that have correct formulas for all reactants and products can be balanced. Always remember that subscripts in formulas of reactants and products cannot be changed to balance an equation.

Problem 1.3

Calculate the amount of water $(\mathrm{g})$ produced by the combustion of $16 \mathrm{g}$ of methane.

Solution

The balanced equation for the combustion of methane is :

$\mathrm{CH}_4(\mathrm{g})+2 \mathrm{O}_2(\mathrm{g}) \rightarrow \mathrm{CO}_2(\mathrm{g})+2 \mathrm{H}_2 \mathrm{O}(\mathrm{g})$

(i) $16 \mathrm{g}$ of $\mathrm{CH}_4$ corresponds to one mole.

(ii) From the above equation, $1 \mathrm{~mol}$ of $\mathrm{CH}_4(\mathrm{g})$ gives $2 \mathrm{~mol}$ of $\mathrm{H}_2 \mathrm{O}(\mathrm{g})$.

$2 \mathrm{~mol}$ of water $\left(\mathrm{H}_2 \mathrm{O}\right)=2 \times(2+16)$

$=2 \times 18=36 \mathrm{g}$

$1 \mathrm{~mol} \mathrm{~H}_2 \mathrm{O}=18 \mathrm{g} \mathrm{~H}_2 \mathrm{O} \Rightarrow \frac{18 \mathrm{g} \mathrm{~H}_2 \mathrm{O}}{1 \mathrm{~mol} \mathrm{~H}_2 \mathrm{O}}=1$

Hence, $2 \mathrm{~mol } \mathrm{~H}_{2} \mathrm{O} \times \frac{18 \mathrm{g} \mathrm{~H}_2 \mathrm{O}}{1 \mathrm{~mol} \mathrm{~H}_2 \mathrm{O}}$

$$ =2 \times 18 \mathrm{g} \mathrm{H}_2 \mathrm{O}=36 \mathrm{g} \mathrm{H}_2 \mathrm{O} $$

Problem 1.4

How many moles of methane are required to produce $22 \mathrm{g} \mathrm{CO}_{2}(\mathrm{g})$ after combustion?

Solution

According to the chemical equation,

$\mathrm{CH}_4(\mathrm{g})+2 \mathrm{O}_2(\mathrm{g}) \rightarrow \mathrm{CO}_2(\mathrm{g})+2 \mathrm{H}_2 \mathrm{O}(\mathrm{g})$

$44 \mathrm{g} \mathrm{~CO}_2(\mathrm{g})$ is obtained from $16 \mathrm{g} \mathrm{~CH}_4(\mathrm{g})$.

$\left[\therefore 1 \mathrm{~mol} \mathrm{~CO}_2(\mathrm{g})\right.$ is obtained from $1 \mathrm{~mol}$ of $\left.\mathrm{CH}_4(\mathrm{g})\right]$

Number of moles of $\mathrm{CO}_2(\mathrm{g})$

$=22 \mathrm{g} \mathrm{~CO}_2(\mathrm{g}) \times \frac{1 \mathrm{mol} \mathrm{~CO}_2(\mathrm{g})}{44 \mathrm{g} \mathrm{~CO}_2(\mathrm{g})}$

$=0.5 \mathrm{~mol} \mathrm{CO}_{2}(\mathrm{g})$

Hence, $0.5 \mathrm{~mol} \mathrm{CO}_2(\mathrm{g})$ would be obtained from $0.5 \mathrm{~mol} \mathrm{~C}_4^{2}(\mathrm{g})$ or $0.5 \mathrm{~mol}$ of $\mathrm{CH}_4(\mathrm{g})$ would be required to produce $22 \mathrm{g} \mathrm{~CO}_2(\mathrm{g})$.

Problem 1.5

$50.0 \mathrm{~kg}$ of $\mathrm{N}_2(\mathrm{g})$ and $10.0 \mathrm{~kg}$ of $\mathrm{H}_2(\mathrm{g})$ are mixed to produce $\mathrm{NH}_3(\mathrm{g})$. Calculate the amount of $\mathrm{NH}_3(\mathrm{g})$ formed. Identify the limiting reagent in the production of $\mathrm{NH}_3$ in this situation.

Solution

A balanced equation for the above reaction is written as follows:

$\mathrm{N}_2(\mathrm{g})+3 \mathrm{H}_2(\mathrm{g}) \rightleftharpoons 2 \mathrm{NH}_3(\mathrm{g})$

Calculation of moles :

Number of moles of $\mathrm{N}_{2}$

$=50.0 \mathrm{~kg} \mathrm{~N}_2 \times \frac{1000 \mathrm{g} \mathrm{~N}_2}{1 \mathrm{~kg} \mathrm{~N}_2} \times \frac{1 \mathrm{~mol} \mathrm{~N}_2}{28.0 \mathrm{g} \mathrm{~N}_2}$

$=17.86 \times 10^{2} \mathrm{~mol}$

Number of moles of $\mathrm{H}_{2}$

$=10.00 \mathrm{~kg} \mathrm{~H}_2 \times \frac{1000 \mathrm{g} \mathrm{~H}_2}{1 \mathrm{~kg} \mathrm{~H}_2} \times \frac{1 \mathrm{~mol} \mathrm{~H}_2}{2.016 \mathrm{g} \mathrm{~H}_2}$

$=4.96 \times 10^{3} \mathrm{~mol}$

According to the above equation, 1 $\mathrm{mol} \mathrm{~N}_2(\mathrm{g})$ requires $3 \mathrm{~mol} \mathrm{~H}_2(\mathrm{g})$, for the reaction. Hence, for $17.86 \times 10^2 \mathrm{~mol}$ of $\mathrm{~N}_2$, the moles of $\mathrm{H}_2(\mathrm{g})$ required would be

$17.86 \times 10^2 \mathrm{~mol} \mathrm{~N}_2 \times \frac{3 \mathrm{~mol} \mathrm{~H}_2(\mathrm{g})}{1 \mathrm{~mol} \mathrm{~N}_2(\mathrm{g})}$

$=5.36 \times 10^3 \mathrm{~mol} \mathrm~{H}_2$

But we have only $4.96 \times 10^{3} \mathrm{~mol} \mathrm{~H}_2$. Hence, dihydrogen is the limiting reagent in this case. So, $\mathrm{NH}_3(\mathrm{g})$ would be formed only from that amount of available dihydrogen i.e., $4.96 \times 10^3 \mathrm{~mol}$ Since $3 \mathrm{~mol} \mathrm{~H}_2(\mathrm{g})$ gives $2 \mathrm{~mol} \mathrm{~NH}_3(\mathrm{g})$

$4.96 \times 10^3 \mathrm{~mol} \mathrm{~H}_2(\mathrm{g}) \times \frac{2 \mathrm{~mol} \mathrm{~NH}_3(\mathrm{g})}{3 \mathrm{~mol} \mathrm{~H}_2(\mathrm{g})}$

$=3.30 \times 10^{3} \mathrm{~mol} \mathrm{~NH}_{3}(\mathrm{g})$

$3.30 \times 10^{3} \mathrm{~mol} \mathrm{~NH}_{3}(\mathrm{g})$ is obtained.

If they are to be converted to grams, it is done as follows :

$1 \mathrm{~mol} \mathrm{~NH}_3(\mathrm{g})=17.0 \mathrm{g} \mathrm{~NH}_3(\mathrm{g})$

$3.30 \times 10^3 \mathrm{~mol} \mathrm{~NH}_3(\mathrm{g}) \times \frac{17.0 \mathrm{g} \mathrm{~NH}_3(\mathrm{g})}{1 \mathrm{~mol} \mathrm{~NH}_3(\mathrm{g})}$ $=3.30 \times 10^3 \times 17 \mathrm{g} \mathrm{~NH}_3(\mathrm{g})$

$=56.1 \times 10^{3} \mathrm{g} \mathrm{NH}_{3}$

$=56.1 \mathrm{~kg} \mathrm{NH}$

1. Mass per cent

It is obtained by using the following relation:

Mass per cent $=\frac{\text { Mass of solute }}{\text { Mass of solution }} \times 100$

Problem 1.6

A solution is prepared by adding $2 \mathrm{g}$ of a substance A to $18 \mathrm{g}$ of water. Calculate the mass per cent of the solute.

Solution

Mass per cent of $A=\frac{\text { Mass of } A}{\text { Mass of solution }} \times 100$

$=\frac{2 \mathrm{g}}{2 \mathrm{g} \text { of } \mathrm{A}+18 \mathrm{g} \text { of water }} \times 100$

$=\frac{2 \mathrm{g}}{20 \mathrm{g}} \times 100$

$=10 %$

2. Mole Fraction

It is the ratio of number of moles of a particular component to the total number of moles of the solution. If a substance ’ $A$ ’ dissolves in substance ’ $\mathrm{B}$ ’ and their number of moles are $n_{\mathrm{A}}$ and $n_{\mathrm{B}}$, respectively, then the mole fractions of A and B are given as:

$$ \begin{aligned} & \text { Mole fraction of } \mathrm{A} \\ & =\frac{\text { No. of moles of } \mathrm{A}}{\text { No. of moles of solutions }} \\ & =\frac{n_{\mathrm{A}}}{n_{\mathrm{A}}+n_{\mathrm{B}}} \\ & \text { Mole fraction of } \mathrm{B} \\ & =\frac{\text { No. of moles of } \mathrm{B}}{\text { No. of moles of solutions }} \\ & =\frac{n_{\mathrm{B}}}{n_{\mathrm{A}}+n_{\mathrm{B}}} \end{aligned} $$

3. Molarity

It is the most widely used unit and is denoted by $M$. It is defined as the number of moles of the solute in 1 litre of the solution. Thus,

Molarity $(M)=\frac{\text { No. of moles of solute }}{\text { Volume of solution in litres }}$

Suppose, we have $1 \mathrm{M}$ solution of a substance, say $\mathrm{NaOH}$, and we want to prepare a $0.2 \mathrm{M}$ solution from it.

$1 \mathrm{M} \mathrm{NaOH}$ means $1 \mathrm{~mol}$ of $\mathrm{NaOH}$ present in 1 litre of the solution. For $0.2 \mathrm{M}$ solution, we require 0.2 moles of $\mathrm{NaOH}$ dissolved in 1 litre solution.

Hence, for making $0.2 \mathrm{M}$ solution from $1 \mathrm{M}$ solution, we have to take that volume of $1 \mathrm{M}$ $\mathrm{NaOH}$ solution, which contains $0.2 \mathrm{~mol}$ of $\mathrm{NaOH}$ and dilute the solution with water to 1 litre.

Now, how much volume of concentrated (1M) $\mathrm{NaOH}$ solution be taken, which contains 0.2 moles of $\mathrm{NaOH}$ can be calculated as follows:

If $1 \mathrm{~mol}$ is present in $1 \mathrm{~L}$ or $1000 \mathrm{~mL}$ solution

then, $0.2 \mathrm{~mol}$ is present in

$$ \begin{aligned} & \frac{1000 \mathrm{~mL}}{1 \mathrm{~mol}} \times 0.2 \mathrm{~mol} \text { solution } \\ & =200 \mathrm{~mL} \text { solution } \end{aligned} $$

Thus, $200 \mathrm{~mL}$ of $1 \mathrm{M} \mathrm{NaOH}$ are taken and enough water is added to dilute it to make it 1 litre.

In fact for such calculations, a general formula, $\mathrm{M}_1 \times V_1=\mathrm{M}_2 \times \mathrm{V}_2$ where $\mathrm{M}$ and $V$ are molarity and volume, respectively, can be used. In this case, $\mathrm{M}_1$ is equal to $0.2 \mathrm{M} ; V_1=1000$ $\mathrm{mL}$ and, $\mathrm{M}_2=1.0 \mathrm{M} ; \mathrm{V}_2$ is to be calculated. Substituting the values in the formula:

$$ \begin{aligned} & 0.2 \mathrm{M} \times 1000 \mathrm{~mL}=1.0 \mathrm{M} \times V_{2} \\ & \therefore V_{2}=\frac{0.2 \mathrm{M} \times 1000 \mathrm{~mL}}{1.0 \mathrm{M}}=200 \mathrm{~L} \end{aligned} $$

Note that the number of moles of solute $(\mathrm{NaOH})$ was 0.2 in $200 \mathrm{~mL}$ and it has remained the same, i.e., 0.2 even after dilution ( in 1000 $\mathrm{mL})$ as we have changed just the amount of solvent (i.e., water) and have not done anything with respect to $\mathrm{NaOH}$. But keep in mind the concentration.

Problem 1.7

Calculate the molarity of $\mathrm{NaOH}$ in the solution prepared by dissolving its $4 \mathrm{g}$ in enough water to form $250 \mathrm{~mL}$ of the solution.

Solution

Since molarity (M)

$$ =\frac{\text { No. of moles of solute }}{\text { Volume of solution in litres }} $$

$=\frac{\text { Mass of NaOH / Molar mass of NaOH }}{0.250 \mathrm{~L}}$

$=\frac{4 \mathrm{g} / 40 \mathrm{g}}{0.250 \mathrm{~L}}=\frac{0.1 \mathrm{~mol}}{0.250 \mathrm{~L}}$

$=0.4 \mathrm{~mol}^{-1}$

$=0.4 \mathrm{M}$

Note that molarity of a solution depends upon temperature because volume of a solution is temperature dependent.

4. Molality

It is defined as the number of moles of solute present in $1 \mathrm{~kg}$ of solvent. It is denoted by $\mathrm{m}$.

Thus, Molality $(\mathrm{m})=\frac{\text { No. of moles of solute }}{\text { Mass of solvent in kg }}$

Problem 1.8

The density of $3 \mathrm{M}$ solution of $\mathrm{NaCl}$ is $1.25 \mathrm{g} \mathrm{~mL}^{-1}$. Calculate the molality of the solution.

Solution

$\mathrm{M}=3 \mathrm{~mol} \mathrm{~L}^{-1}$

Mass of $\mathrm{NaCl}$

in $1 \mathrm{~L}$ solution $=3 \times 58.5=175.5 \mathrm{g}$

Mass of

$1 \mathrm{~L}$ solution $=1000 \times 1.25=1250 \mathrm{g}$ (since density $=1.25 \mathrm{g} \mathrm{~mL}^{-1}$ )

Mass of water in solution $=1250-75.5$

$$ =1074.5 \mathrm{g} $$

Molality $=\frac{\text { No. of moles of solute }}{\text { Mass of solvent in kg }}$

$$ =\frac{3 \mathrm{~mol}}{1.0745 \mathrm{~kg}}=2.79 \mathrm{~m} $$

Often in a chemistry laboratory, a solution of a desired concentration is prepared by diluting a solution of known higher concentration. The solution of higher concentration is also known as stock solution. Note that the molality of a solution does not change with temperature since mass remains unaffected with temperature.

SUMMARY

Chemistry, as we understand it today is not a very old discipline. People in ancient India, already had the knowledge of many scientific phenomenon much before the advent of modern science. They applied the knowledge in various walks of life.

The study of chemistry is very important as its domain encompasses every sphere of life. Chemists study the properties and structure of substances and the changes undergone by them. All substances contain matter, which can exist in three states solid, liquid or gas. The constituent particles are held in different ways in these states of matter and they exhibit their characteristic properties. Matter can also be classified into elements, compounds or mixtures. An element contains particles of only one type, which may be atoms or molecules. The compounds are formed where atoms of two or more elements combine in a fixed ratio to each other. Mixtures occur widely and many of the substances present around us are mixtures.

When the properties of a substance are studied, measurement is inherent. The quantification of properties requires a system of measurement and units in which the quantities are to be expressed. Many systems of measurement exist, of which the English and the Metric Systems are widely used. The scientific community, however, has agreed to have a uniform and common system throughout the world, which is abbreviated as SI units (International System of Units).

Since measurements involve recording of data, which are always associated with a certain amount of uncertainty, the proper handling of data obtained by measuring the quantities is very important. The measurements of quantities in chemistry are spread over a wide range of $10^{-31}$ to $10^{+23}$. Hence, a convenient system of expressing the numbers in scientific notation is used. The uncertainty is taken care of by specifying the number of significant figures, in which the observations are reported. The dimensional analysis helps to express the measured quantities in different systems of units. Hence, it is possible to interconvert the results from one system of units to another.

The combination of different atoms is governed by basic laws of chemical combination - these being the Law of Conservation of Mass, Law of Definite Proportions, Law of Multiple Proportions, Gay Lussac’s Law of Gaseous Volumes and Avogadro Law. All these laws led to the Dalton’s atomic theory, which states that atoms are building blocks of matter. The atomic mass of an element is expressed relative to ${ }^{12} \mathrm{C}$ isotope of carbon, which has an exact value of $12 \mathrm{u}$. Usually, the atomic mass used for an element is the average atomic mass obtained by taking into account the natural abundance of different isotopes of that element. The molecular mass of a molecule is obtained by taking sum of the atomic masses of different atoms present in a molecule. The molecular formula can be calculated by determining the mass per cent of different elements present in a compound and its molecular mass.

The number of atoms, molecules or any other particles present in a given system are expressed in the terms of Avogadro constant $\left(6.022 \times 10^{23}\right)$. This is known as $\mathbf{1}$ mol of the respective particles or entities.

Chemical reactions represent the chemical changes undergone by different elements and compounds. A balanced chemical equation provides a lot of information. The coefficients indicate the molar ratios and the respective number of particles taking part in a particular reaction. The quantitative study of the reactants required or the products formed is called stoichiometry. Using stoichiometric calculations, the amount of one or more reactant(s) required to produce a particular amount of product can be determined and vice-versa. The amount of substance present in a given volume of a solution is expressed in number of ways, e.g., mass per cent, mole fraction, molarity and molality.

EXERCISES

1.1 Calculate the molar mass of the following:

(i) $\mathrm{H}_2 \mathrm{O}$ (ii) $\mathrm{CO}_2$ (iii) $\mathrm{CH}_4$

Show Answer

Answer

(i) $H_2 O$ :

The molecular mass of water, $H_2 O$

$=(2 \times$ Atomic mass of hydrogen $)+(1 \times$ Atomic mass of oxygen $)$

$=[2(1.0084)+1(16.00 u)]$

$=2.016 u+16.00 u$

$=18.016$

$=18.02 u$

(ii) $CO_2$

The molecular mass of carbon dioxide, $CO_2$

$=(1 \times$ Atomic mass of carbon $)+(2 \times$ Atomic mass of oxygen $)$

$=[1(12.011 u)+2(16.00 u)]$

$=12.011 u+32.00 u$

$=44.01 u$

(iii) $CH_4$

The molecular mass of methane, $CH_4$

$=(1 \times$ Atomic mass of carbon $)+(4 \times$ Atomic mass of hydrogen $)$

$=[1(12.011 u)+4(1.008 u)]$

$=12.011 u+4.032 u$

$=16.043 u$

1.2 Calculate the mass per cent of different elements present in sodium sulphate $\left(\mathrm{Na}_2 \mathrm{SO}_4\right)$.

Answer :

The molecular formula of sodium sulphate is $Na_2 SO_4$.

Molar mass of $Na_2 SO_4=[(2 \times 23.0)+(32.066)+4(16.00)]$

$=142.066 g$

Mass percent of an element

$ =\frac{\text{ Mass of that element in the compound }}{\text{ Molar mass of the compound }} \times 100 $

$\therefore$ Mass percent of sodium:

$=\frac{46.0 g}{142.066 g} \times 100$

$=32.379$

$=32.4 %$

Mass percent of sulphur:

$=\frac{32.066 g}{142.066 g} \times 100$

$=22.57$

$=22.6 %$

Mass percent of oxygen:

$ \begin{aligned} & =\frac{64.0 g}{142.066 g} \times 100 \\ & =45.049 \\ & =45.05 % \end{aligned} $

1.3 Determine the empirical formula of an oxide of iron, which has $69.9 %$ iron and $30.1 %$ dioxygen by mass.

Show Answer

Answer

$%$ of iron by mass $=69.9 %$ [Given]

$%$ of oxygen by mass $=30.1 %$ [Given]

Relative moles of iron in iron oxide: $=\frac{ \% \text{ of iron by mass }}{\text{ Atomic mass of iron }}$

$=\frac{69.9}{55.85}$

$=1.25$

Relative moles of oxygen in iron oxide:

$=\frac{ \% \text{ of oxygen by mass }}{\text{ Atomic mass or oxygen }}$

$=\frac{30.1}{16.00}$

$=1.88$

Simplest molar ratio of iron to oxygen:

$=1.25: 1.88$

$=1: 1.5$

$\simeq 2: 3$

$\therefore$ The empirical formula of the iron oxide is $Fe_2 O_3$.

1.4 Calculate the amount of carbon dioxide that could be produced when

(i) 1 mole of carbon is burnt in air.

(ii) 1 mole of carbon is burnt in $16 \mathrm{~g}$ of dioxygen.

(iii) 2 moles of carbon are burnt in $16 \mathrm{~g}$ of dioxygen.

Show Answer

Answer

The balanced reaction of combustion of carbon can be written as:

$C _{(s)}$ $O _{2(g)} \longrightarrow$ $CO _{2(g)}$
1 mole 1 mole 1 mole
$(32 g)$ $(44 g)$

(i) As per the balanced equation, 1 mole of carbon burns in1 mole of dioxygen (air) to produce1 mole of carbon dioxide.

(ii) According to the question, only $16 g$ of dioxygen is available. Hence, it will react with 0.5 mole of carbon to give 22 $g$ of carbon dioxide. Hence, it is a limiting reactant.

(iii) According to the question, only $16 g$ of dioxygen is available. It is a limiting reactant. Thus, $16 g$ of dioxygen can combine with only 0.5 mole of carbon to give $22 g$ of carbon dioxide.

1.5 Calculate the mass of sodium acetate $\left(\mathrm{CH}_{3} \mathrm{COONa}\right)$ required to make $500 \mathrm{~mL}$ of 0.375 molar aqueous solution. Molar mass of sodium acetate is $82.0245 \mathrm{~g} \mathrm{~mol}^{-1}$.

Show Answer

Answer

$0.375 M$ aqueous solution of sodium acetate

$\utilde{A} \subset a \hat{A}_i 1000 , \text{mL} $ of solution containing 0.375 moles of sodium acetate

$\therefore$ Number of moles of sodium acetate in $500 mL$

$=\frac{0.375}{1000} \times 500$

$=0.1875$ mole

Molar mass of sodium acetate $=82.0245 g$ mole $^{a E^{-1}}$ (Given)

$\therefore$ Required mass of sodium acetate $=(82.0245 g mol^{1 \epsilon^{1-1}})(0.1875$ mole $)$

$=15.38 g$

1.6 Calculate the concentration of nitric acid in moles per litre in a sample which has a density, $1.41 \mathrm{~g} \mathrm{~mL}^{-1}$ and the mass per cent of nitric acid in it being $69 \%$.

Show Answer

Answer

Mass percent of nitric acid in the sample $=69 %$ [Given]

Thus, $100 g$ of nitric acid contains $69 g$ of nitric acid by mass.

Molar mass of nitric acid $(HNO_3)$

$={1+14+3(16)} g mol^{\text{â }-1}$

$=1+14+48$

$=63 g mol^{1 \hat{e} e^{-1}}$

$\therefore$ Number of moles in $69 g$ of $HNO_3$

$=\frac{69 g}{63 g mol^{-1}}$

$=1.095 mol$

Volume of $100 g$ of nitric acid solution $=\frac{\text{ Mass of solution }}{\text{ density of solution }}$

$=\frac{100 g}{1.41 g mL^{-1}}$

$=70.92 mL \equiv 70.92 \times 10^{-3} L$

Concentration of nitric acid

$=\frac{1.095 mole}{70.92 \times 10^{-3} L}$

$=15.44 mol / L$

$\therefore$ Concentration of nitric acid $=15.44 mol / L$

1.7 How much copper can be obtained from $100 \mathrm{~g}$ of copper sulphate $\left(\mathrm{CuSO}_4\right)$ ?

Answer :

1 mole of $CuSO_4$ contains 1 mole of copper.

Molar mass of $CuSO_4=(63.5)+(32.00)+4(16.00)$

$=63.5+32.00+64.00$

$=159.5 g$

$159.5 g$ of $CuSO_4$ contains $63.5 g$ of copper.

$\Rightarrow 100 g$ of $CuSO_4$ will contain $\frac{63.5 \times 100 g}{159.5}$ of copper.

$\therefore$ Amount of copper that can be obtained from $100 g CuSO_4=\frac{63.5 \times 100}{159.5}$

$=39.81 g$

1.8 Determine the molecular formula of an oxide of iron, in which the mass per cent of iron and oxygen are 69.9 and 30.1, respectively.

Show Answer

Answer

Mass percent of iron $(Fe)=69.9 %$ (Given)

Mass percent of oxygen $(O)=30.1 %$ (Given)

Number of moles of iron present in the oxide $=\frac{69.90}{55.85}$

$=1.25$

Number of moles of oxygen present in the oxide $=\frac{30.1}{16.0}$

$=1.88$

Ratio of iron to oxygen in the oxide,

$=1.25: 1.88$

$=\frac{1.25}{1.25}: \frac{1.88}{1.25}$

$=1: 1.5$

$=2: 3$

$\therefore$ The empirical formula of the oxide is $Fe_2 O_3$

Empirical formula mass of $Fe_2 O_3=[2(55.85)+3(16.00)] g$

Molar mass of $Fe_2 O_3=159.69 g$

$ \begin{aligned} \therefore n=\frac{\text{ Molar mass }}{\text{ Emprical formula mass }} & =\frac{159.69 g}{159.7 g} \\ & =0.999 \\ & =1(\text{ approx }) \end{aligned} $

Molecular formula of a compound is obtained by multiplying the empirical formula with $n$.

Thus, the empirical formula of the given oxide is $Fe_2 O_3$ and $n$ is 1 .

Hence, the molecular formula of the oxide is $Fe_2 O_3$.

1.9 Calculate the atomic mass (average) of chlorine using the following data:

$\%$ Natural Abundance Molar Mass
${ }^{35} \mathrm{Cl}$ 75.77 34.9689
${ }^{37} \mathrm{Cl}$ 24.23 36.9659

Answer :

The average atomic mass of chlorine

$ \begin{aligned} & =[(\begin{matrix} \text{ Fractional abundance } \\ \text{ of }{ }^{35} Cl \end{matrix} )(\begin{matrix} \text{ Molar mass } \\ \text{ of }{ }^{35} Cl \end{matrix} )+(\begin{matrix} \text{ Fractional } \\ \text{ abundance } \\ \text{ of }{ }^{37} Cl \end{matrix} )(\begin{matrix} \text{ Molar mass } \\ \text{ of }{ }^{37} Cl \end{matrix} )] \\ & =[{(\frac{75.77}{100})(34.9689 u)}+{(\frac{24.23}{100})(36.9659 u)}] \\ & =26.4959+8.9568 \\ & =35.4527 u \\ & \therefore \text{ The average atomic mass of chlorine }=35.4527 u \end{aligned} $

1.10 In three moles of ethane $\left(\mathrm{C}_2 \mathrm{H}_6\right)$, calculate the following:

(i) Number of moles of carbon atoms.

(ii) Number of moles of hydrogen atoms.

(iii) Number of molecules of ethane.

Show Answer

Answer

(i) 1 mole of $C_2 H_6$ contains 2 moles of carbon atoms.

$\therefore$ Number of moles of carbon atoms in 3 moles of $C_2 H_6$

$=2 \times 3=6$

(ii) 1 mole of $C_2 H_6$ contains 6 moles of hydrogen atoms.

$\therefore$ Number of moles of carbon atoms in 3 moles of $C_2 H_6$

$=3 \times 6=18$

(iii) 1 mole of $C_2 H_6$ contains $6.023 \times 10^{23}$ molecules of ethane.

$\therefore$ Number of molecules in 3 moles of $C_2 H_6$

$=3 \times 6.023 \times 10^{23}=18.069 \times 10^{23}$

1.11 What is the concentration of sugar $\left(C_{12} H_{22} O_{11}\right)$ in $\mathrm{mol} ~L^{-1}$ if its $20 \mathrm{~g}$ are dissolved in enough water to make a final volume up to 2L?

Answer :

Molarity (M) of a solution is given by, $=\frac{\text{ Number of moles of solute }}{\text{ Volume of solution in Litres }}$

$=\frac{\text{ Mass of sugar } / \text{ molar mass of sugar }}{2 L}$

$=\frac{20 g /[(12 \times 12)+(1 \times 22)+(11 \times 16)] g}{2 L}$

$=\frac{20 g / 342 g}{2 L}$

$=\frac{0.0585 mol}{2 L}$

$=0.02925 mol L^{\hat{\text{ Âe-1 }}}$

$\therefore$ Molar concentration of sugar $=0.02925 mol^{L} \mathrm{\textrm {A } ^ { - 1 }}$

1.12 If the density of methanol is $0.793 \mathrm{~kg} \mathrm{~L}^{-1}$, what is its volume needed for making 2.5 L of its $0.25 \mathrm{M}$ solution?

Answer :

Molar mass of methanol $(CH_3 OH)=(1 \times 12)+(4 \times 1)+(1 \times 16)$

$=32 g mol^{\hat{a} \epsilon^{" 1}}$

$=0.032 kg mol l^{\hat{e} e^{-1}}$

Molarity of methanol solution $=\frac{0.793 kg L^{-1}}{0.032 kg mol^{-1}}$

$=24.78 mol L^{\text{â } E-1}$

(Since density is mass per unit volume)

Applying,

$M_1 V_1=M_2 V_2$

(Given solution) (Solution to be prepared)

$V_1=0.0252 L$

$V_1=25.22 mL$

1.13 Pressure is determined as force per unit area of the surface. The SI unit of pressure, pascal is as shown below:

$1 \mathrm{~Pa}=1 \mathrm{~N} \mathrm{~m}^{-2}$

If mass of air at sea level is $1034 \mathrm{~g} \mathrm{~cm}^{-2}$, calculate the pressure in pascal.

Show Answer

Answer

Pressure is defined as force acting per unit area of the surface.

$ \begin{aligned} P & =\frac{F}{A} \\ & =\frac{1034 g \times 9.8 ms^{-2}}{cm^{2}} \times \frac{1 kg}{1000 g} \times \frac{(100)^{2} cm^{2}}{1 m^{2}} \end{aligned} $

$=1.01332 \times 10^{5} kg m^{Ae^{-1}} s^{s^{EF} 2}$

We know,

$1 N=1 kg ms^{at-2}$

Then,

$1 Pa=1 Nm^{3 E^{+2} 2}=1 kg m^{aE \cdot 2} s^{af e^{-2}}$

$1 Pa=1 kg m^{ak^{-1}} s^{ate-2}$

$\therefore$ Pressure $=1.01332 \times 10^{5} Pa$

1.14 What is the SI unit of mass? How is it defined?

Answer :

The SI unit of mass is kilogram $(kg)$. 1 Kilogram is defined as the mass equal to the mass of the international prototype of kilogram.

1.15 Match the following prefixes with their multiples:

Prefixes Multiples
(i) micro $10^{6}$
(ii) deca $10^{9}$
(iii) mega $10^{-6}$
(iv) giga $10^{-15}$
(v) femto $10$

Answer :

Prefix Multiples
(i) micro $10^{-6}$
(ii) deca 10
(iii) mega $10^{6}$
(iv) giga $10^{9}$
(v) femto $10^{-15}$

1.16 What do you mean by significant figures?

Show Answer

Answer

Significant figures are those meaningful digits that are known with certainty.

They indicate uncertainty in an experiment or calculated value. For example, if $15.6 mL$ is the result of an experiment, then 15 is certain while 6 is uncertain, and the total number of significant figures are 3.

Hence, significant figures are defined as the total number of digits in a number including the last digit that represents the uncertainty of the result.

1.17 A sample of drinking water was found to be severely contaminated with chloroform, $\mathrm{CHCl}_{3}$, supposed to be carcinogenic in nature. The level of contamination was 15 ppm (by mass).

(i) Express this in per cent by mass.

(ii) Determine the molality of chloroform in the water sample.

Answer :

(i) $1 ppm$ is equivalent to 1 part out of 1 million $(10^{6})$ parts.

$\therefore$ Mass percent of 15 ppm chloroform in water

$=\frac{15}{10^{6}} \times 100$

$\simeq 1.5 \times 10^{-3} %$

(ii) $100 g$ of the sample contains $1.5 \times 10^{\hat{a} \epsilon}{ }^{3} g$ of $CHCl_3$.

$\Rightarrow 1000 g$ of the sample contains $1.5 \times 10^{3 et^{-2}} g$ of $CHCl_3$.

$\therefore$ Molality of chloroform in water

$=\frac{1.5 \times 10^{-2} g}{\text{ Molar mass of } CHCl_3}$

Molar mass of $CHCl_3=12.00+1.00+3(35.5)$

$=119.5 g mol^{\hat{ta} E^{1}}$

$\therefore$ Molality of chloroform in water $=0.0125 \times 10^{\hat{a} \epsilon=2} m$

$=1.25 \times 10^{\hat{\epsilon} e^{4} 4 m}$

1.18 Express the following in the scientific notation:

(i) 0.0048

(ii) 234,000

(iii) 8008

(iv) 500.0

(v) 6.0012

Answer :

(i) $0.0048=4.8 \times 10^{-3}$

(ii) $234,000=2.34 \times 10^{5}$

(iii) $8008=8.008 \times 10^{3}$

(iv) $500.0=5.000 \times 10^{2}$

(v) $6.0012=6.0012$

1.19 How many significant figures are present in the following?

(i) 0.0025

(ii) 208

(iii) 5005

(iv) 126,000

(v) 500.0

(vi) 2.0034

Answer :

(i) 0.0025

There are 2 significant figures.

(ii) 208

There are 3 significant figures.

(iii) 5005

There are 4 significant figures.

(iv) 126,000

There are 3 significant figures.

(v) 500.0

There are 4 significant figures.

(vi) 2.0034

There are 5 significant figures.

1.20 Round up the following upto three significant figures:

(i) 34.216

(ii) 10.4107

(iii) 0.04597

(iv) 2808

Show Answer

Answer

(i) 34.2

(ii) 10.4

(iii) 0.0460

(iv) 2810

1.21 The following data are obtained when dinitrogen and dioxygen react together to form different compounds:

Mass of dinitrogen Mass of dioxygen
(i) $14 \mathrm{~g}$ $16 \mathrm{~g}$
(ii) $14 \mathrm{~g}$ $32 \mathrm{~g}$
(iii) $28 \mathrm{~g}$ $32 \mathrm{~g}$
(iv) $28 \mathrm{~g}$ $80 \mathrm{~g}$

(a) Which law of chemical combination is obeyed by the above experimental data? Give its statement.

(b) Fill in the blanks in the following conversions:

(i) 1 km = ___________ mm = _________ pm

(ii) 1 mg = __________ kg = __________ ng

(iii) 1 mL = __________ L = __________ $dm^3$

Show Answer

Answer

(a)

If we fix the mass of dinitrogen at $28 g$, then the masses of dioxygen that will combine with the fixed mass of dinitrogen are $32 g, 64 g, 32 g$, and $80 g$.

The masses of dioxygen bear a whole number ratio of 1:2:2:5. Hence, the given experimental data obeys the law of multiple proportions. The law states that if two elements combine to form more than one compound, then the masses of one element that combines with the fixed mass of another element are in the ratio of small whole numbers.

(b) (i) $1 km=1 km \times \frac{1000 m}{1 km} \times \frac{100 cm}{1 m} \times \frac{10 mm}{1 cm}$

$\therefore 1 km=10^{6} mm$

$1 km=1 km \times \frac{1000 m}{1 km} \times \frac{1 pm}{10^{-12} m}$

$\therefore 1 km=10^{15} pm$

Hence, $1 km=10^{6} mm=10^{15} pm$

(ii) $1 mg=1 mg \times \frac{1 g}{1000 mg} \times \frac{1 kg}{1000 g}$

$\Rightarrow 1 mg=10^{ae} kg$

$1 mg=1 mg \times \frac{1 g}{1000 mg} \times \frac{1 ng}{10^{-9} g}$

$\Rightarrow 1 mg=10^{6} ng$

$\therefore 1 mg=10^{a \epsilon^{-6} 6} kg=10^{6} ng$

$1 L$

(iii) $1 mL=1 mL \times$

$1000 mL$

$\Rightarrow 1 mL=10^{at e^{3}} L$

$1 mL=1 cm^{3}=1 cm^{3} \frac{1 dm \times 1 dm \times 1 dm}{10 cm \times 10 cm \times 10 cm}$

$\Rightarrow 1 mL=10^{a^{\mathrm{\epsilon}} 3} dm^{3}$

$\therefore 1 mL=10^{ate^{E-3} L}=10^{ate^{\mathrm{E \epsilon}} 3 3} dm^{3}$

1.22 If the speed of light is $3.0 \times 10^{8} \mathrm{~m} \mathrm{~s}^{-1}$, calculate the distance covered by light in $2.00 \mathrm{~ns}$.

Answer :

According to the question:

Time taken to cover the distance $=2.00 ns$

$=2.00 \times 10^{-9} s$

Speed of light $=3.0 \times 10^{8} ms^{-1}$

Distance travelled by light in $2.00 ns$

$=$ Speed of light $x$ Time taken

$=(3.0 \times 10^{8} ms^{-1})(2.00 \times 10^{-9} s)$

$=6.00 \times 10^{-1} m$

$=0.600 m$

1.23 In a reaction

$\mathrm{A}+\mathrm{B}_2 \rightarrow \mathrm{AB}_2$

Identify the limiting reagent, if any, in the following reaction mixtures.

(i) $\quad 300$ atoms of $A+200$ molecules of $B$

(ii) $2 \mathrm{~mol} \mathrm{~A}+3 \mathrm{~mol} \mathrm{~B}$

(iii) 100 atoms of $\mathrm{A}+100$ molecules of $\mathrm{B}$

(iv) $5 \mathrm{~mol} \mathrm{~A}+2.5 \mathrm{~mol} \mathrm{~B}$

(v) $\quad 2.5 \mathrm{~mol} \mathrm{~A}+5 \mathrm{~mol} \mathrm{~B}$

Answer :

A limiting reagent determines the extent of a reaction. It is the reactant which is the first to get consumed during a reaction, thereby causing the reaction to stop and limiting the amount of products formed.

(i) According to the given reaction, 1 atom of $A$ reacts with 1 molecule of $B$. Thus, 200 molecules of $B$ will react with 200 atoms of A, thereby leaving 100 atoms of $A$ unused. Hence, $B$ is the limiting reagent.

(ii) According to the reaction, 1 mol of $A$ reacts with 1 mol of $B$. Thus, 2 mol of $A$ will react with only 2 mol of $B$. As a result, 1 mol of $B$ will not be consumed. Hence, $A$ is the limiting reagent.

(iii) According to the given reaction, 1 atom of A combines with 1 molecule of $B$. Thus, all 100 atoms of $A$ will combine with all 100 molecules of $B$. Hence, the mixture is stoichiometric where no limiting reagent is present.

(iv) 1 mol of atom A combines with 1 mol of molecule $B$. Thus, $2.5 mol$ of $B$ will combine with only $2.5 mol$ of $A$. As a result, $2.5 mol$ of $A$ will be left as such. Hence, $B$ is the limiting reagent.

(v) According to the reaction, 1 mol of atom A combines with 1 mol of molecule B. Thus, 2.5 mol of A will combine with only $2.5 mol$ of $B$ and the remaining $2.5 mol$ of $B$ will be left as such. Hence, $A$ is the limiting reagent.

1.24 Dinitrogen and dihydrogen react with each other to produce ammonia according to the following chemical equation:

$\mathrm{N}_2(\mathrm{~g})+\mathrm{H}_2(\mathrm{~g}) \rightarrow 2 \mathrm{NH}_3(\mathrm{~g})$

(i) Calculate the mass of ammonia produced if $2.00 \times 10^{3} \mathrm{~g}$ dinitrogen reacts with $1.00 \times 10^{3} \mathrm{~g}$ of dihydrogen.

(ii) Will any of the two reactants remain unreacted?

(iii) If yes, which one and what would be its mass?

Show Answer

Answer

(i) Balancing the given chemical equation,

$ N _{2(g)}+3 H _{2(g)} \longrightarrow 2 NH _{3(g)} $

From the equation, 1 mole ( $28 g$ ) of dinitrogen reacts with 3 mole $(6 g)$ of dihydrogen to give 2 mole $(34 g)$ of ammonia.

$\Rightarrow 2.00 \times 10^{3} g$ of dinitrogen will react with $\frac{6 g}{28 g} \times 2.00 \times 10^{3} g$ dihydrogen i.e.,

$2.00 \times 10^{3} g$ of dinitrogen will react with $428.6 g$ of dihydrogen.

Given,

Amount of dihydrogen $=1.00 \times 10^{3} g$

Hence, $N_2$ is the limiting reagent. $\therefore 28 g$ of $N_2$ produces $34 g$ of $NH_3$

Hence, mass of ammonia produced by $2000 g$ of $N_2$

$ =\frac{34 g}{28 g} \times 2000 g $

$=2428.57 g$

(ii) $N_2$ is the limiting reagent and $H_2$ is the excess reagent. Hence, $H_2$ will remain unreacted.

(iii) Mass of dihydrogen left unreacted $=1.00 \times 10^{3} g$ â€" $428.6 g$

$=571.4 g$

1.25 How are $0.50 \mathrm{~mol} \mathrm{~Na}_2 \mathrm{CO}_3$ and $0.50 \mathrm{M} \mathrm{Na}_2 \mathrm{CO}_3$ different?

Answer :

Molar mass of $Na_2 CO_3=(2 \times 23)+12.00+(3 \times 16)$

$=106 g mol^{\hat{E}} en^{-1}$

Now, 1 mole of $Na_2 CO_3$ means $106 g$ of $Na_2 CO_3$.

$\therefore 0.5 mol$ of $Na_2 CO_3=\frac{106 g}{1 mole} \times 0.5 mol Na_2 CO_3$

$=53 g Na_2 CO_3$

$\Rightarrow 0.50 M$ of $Na_2 CO_3=0.50 mol / L Na_2 CO_3$

Hence, $0.50 mol$ of $Na_2 CO_3$ is present in $1 L$ of water or $53 g$ of $Na_2 CO_3$ is present in $1 L$ of water.

1.26 If 10 volumes of dihydrogen gas reacts with five volumes of dioxygen gas, how many volumes of water vapour would be produced?

Show Answer

Answer

Reaction of dihydrogen with dioxygen can be written as:

$ 2 H _{2(g)}+O _{2(g)} \longrightarrow 2 H_2 O _{(g)} $

Now, two volumes of dihydrogen react with one volume of dihydrogen to produce two volumes of water vapour. Hence, ten volumes of dihydrogen will react with five volumes of dioxygen to produce ten volumes of water vapour.

1.27 Convert the following into basic units:

(i) $\quad 28.7 \mathrm{pm}$

(ii) $\quad 15.15 \mathrm{pm}$

(iii) $\quad 25365 \mathrm{mg}$

Answer :

(i) $28.7 pm$ :

$1 pm=10^{\hat{a} \epsilon^{-12}} m$

$=2.87 \times 10^{\hat{a} et^{-11}} m$

(ii) $15.15 pm$ :

$1 pm=10^{\hat{E} E^{-12}} m$

$\therefore 15.15 pm=15.15 \times 10^{\hat{3} E^{-12}} m$

$=1.515 \times 10^{\hat{a} \epsilon^{* 11}} m$

(iii) $25365 mg$ :

$1 mg=10^{\hat{\epsilon} \epsilon e} g$

$25365 mg=2.5365 \times 10^{4} \times 10^{\hat{\text{ Aี }} \mathbf{3 3}} g$

Since,

$1 g=10^{\hat{et} e^{3}} kg$

$2.5365 \times 10^{1} g=2.5365 \times 10^{1} \times 10^{\hat{a} et^{3}} kg$

$\therefore 25365 mg=2.5365 \times 10^{\frac{16}{}{ }^{* 2}} kg$

1.28 Which one of the following will have the largest number of atoms?

(i) $\quad 1 \mathrm{~g} \mathrm{Au}(\mathrm{s})$

(ii) $ \quad 1 \mathrm{~g} \mathrm{Na}(\mathrm{s})$

(iii) $\quad 1 \mathrm{~g} \mathrm{Li}(\mathrm{s})$

(iv) $\quad 1 \mathrm{~g}$ of $\mathrm{Cl}_{2}(\mathrm{~g})$

Answer :

$1 g$ of $Au(s) \quad=\frac{1}{197} mol$ of $Au(s)$

$=\frac{6.022 \times 10^{23}}{197}$ atoms of $Au(s)$ $=3.06 \times 10^{21}$ atoms of $Au(s)$

$1 g$ of $Na(s)=\frac{1}{23} mol$ of $Na(s)$

$=\frac{6.022 \times 10^{23}}{23}$

atoms of $Na(s)$

$=0.262 \times 10^{23}$ atoms of $Na(s)$

$=26.2 \times 10^{21}$ atoms of $Na(s)$

$1 g$ of Li (s) $=\frac{1}{7}$ mol of Li (s)

$=\frac{6.022 \times 10^{23}}{7}$

atoms of Li (s)

$=0.86 \times 10^{23}$ atoms of $Li(s)$

$=86.0 \times 10^{21}$ atoms of $Li(s)$

$1 g$ of $Cl_2(g)=\frac{1}{71}$ mol of $Cl_2(g)$

(Molar mass of $Cl_2$ molecule $=35.5 \times 2=71 g mol^{\text{हEe-1 }}$ )

$=\frac{6.022 \times 10^{23}}{71}$ molecules of $Cl_2(g)$

$=0.0848 \times 10^{23}$ molecules of $Cl_2(g)$

$=8.48 \times 10^{21}$ molecules of $Cl_2(g)$

As one molecule of $Cl_2$ contains two atoms of $Cl$.

Number of atoms of $Cl=2 \times 8.48 \times 10^{21}=16.96 \times 10^{21}$ atoms of $Cl$

Hence, $1 g$ of $Li(s)$ will have the largest number of atoms.

1.29 Calculate the molarity of a solution of ethanol in water, in which the mole fraction of ethanol is 0.040 (assume the density of water to be one).

Answer :

Mole fraction of $C_2 H_5 OH=\frac{\text{ Number of moles of } C_2 H_5 OH}{\text{ Number of moles of solution }}$

$0.040=\frac{n _{C_2 H_5 OH}}{n _{C_2 H_3 OH}+n _{H_2 O}}$

Number of moles present in $1 L$ water:

$n _{H_2 O}=\frac{1000 g}{18 g mol^{-1}}$

$n _{H_2 O}=55.55 mol$

Substituting the value of $n _{H_2 O}$ in equation (1),

$\frac{n _{C_2 H_5 OH}}{n _{C_2 H_3 OH}+55.55}=0.040$

$n _{C_2 H_3 OH}=0.040 n _{C_2 H_3 OH}+(0.040)(55.55)$

$0.96 n _{C_2 H_5 OH}=2.222 mol$

$n _{C_2 H_5 OH}=\frac{2.222}{0.96} mol$

$n _{C_2 H_3 OH}=2.314 mol$

$\therefore$ Molarity of solution $=\frac{2.314 mol}{1 L}$

$=2.314 M$

1.30 What will be the mass of one ${ }^{12} \mathrm{C}$ atom in g?

Answer :

1 mole of carbon atoms $=6.023 \times 10^{23}$ atoms of carbon

$=12 g$ of carbon

$\therefore$ Mass of one ${ }^{12} C$ atom $=\frac{12 g}{6.022 \times 10^{23}}$

$=1.993 \times 10^{\frac{16}{}-23} g$

1.31 How many significant figures should be present in the answer of the following calculations?

$\begin{array}{ll}\text { (i) } \frac{0.02856 \times 298.15 \times 0.112}{0.5785} & \text { (ii) } 5 \times 5.364\end{array}$

(iii) $\quad 0.0125+0.7864+0.0215$

Show Answer

Answer

$0.02856 \times 298.15 \times 0.112$

(i)

$ 0.5785 $

Least precise number of calculation $=0.112$

Number of significant figures in the answer

$=$ Number of significant figures in the least precise number

$=3$

(ii) $5 \times 5.364$

Least precise number of calculation $=5.364$

Number of significant figures in the answer $=$ Number of significant figures in 5.364

$=4$

(iii) $0.0125+0.7864+0.0215$

Since the least number of decimal places in each term is four, the number of significant figures in the answer is also 4.

1.32 Use the data given in the following table to calculate the molar mass of naturally occuring argon isotopes:

Isotope Isotopic molar mass Abundance
${ }^{36} \mathrm{Ar}$ $35.96755 \mathrm{~g} \mathrm{~mol}^{-1}$ $0.337 \%$
${}^{38}\mathrm{Ar}$ $37.96272 \mathrm{~g}\mathrm{~mol}^{-1}$ $0.063 \%$
${}^{40}\mathrm{Ar}$ $39.9624 \mathrm{~g}\mathrm{~mol}^{-1}$ $99.600 \%$

Show Answer

Answer

Molar mass of argon

$ \begin{aligned} & =[(35.96755 \times \frac{0.337}{100})+(37.96272 \times \frac{0.063}{100})+(39.9624 \times \frac{90.60}{100})] gmol^{-1} \\ & =[0.121+0.024+39.802] gmol^{-1} \\ & =39.947 gmol^{\hat{\epsilon} E^{-1}} \end{aligned} $

1.33 Calculate the number of atoms in each of the following (i) 52 moles of Ar (ii) $52 \mathrm{u}$ of $\mathrm{He}$ (iii) $52 \mathrm{~g}$ of $\mathrm{He}$.

Answer :

(i) 1 mole of $Ar=6.022 \times 10^{23}$ atoms of $Ar$

$\therefore 52 mol$ of $Ar=52 \times 6.022 \times 10^{23}$ atoms of $Ar$

$=3.131 \times 10^{25}$ atoms of $Ar$

(ii) 1 atom of $He=4 u$ of $He$

Or,

$4 u$ of $He=1$ atom of $He$

$1 u$ of $He=\frac{1}{4}$ atom of $He$

$52 u$ of $He \quad \frac{52}{4}$ atom of $He$

$=13$ atoms of $He$

(iii) $4 g$ of $He=6.022 \times 10^{23}$ atoms of $He$

$\therefore 52 g$ of $He=\frac{6.022 \times 10^{23} \times 52}{4}$ atoms of $He$

$=7.8286 \times 10^{24}$ atoms of $He$

1.34 A welding fuel gas contains carbon and hydrogen only. Burning a small sample of it in oxygen gives $3.38 \mathrm{~g}$ carbon dioxide, $0.690 \mathrm{~g}$ of water and no other products. A volume of $10.0 \mathrm{~L}$ (measured at STP) of this welding gas is found to weigh $11.6 \mathrm{~g}$. Calculate (i) empirical formula, (ii) molar mass of the gas, and (iii) molecular formula.

Show Answer

Answer

(i) 1 mole $(44 g)$ of $CO_2$ contains $12 g$ of carbon.

$=0.9217 g$

$18 g$ of water contains $2 g$ of hydrogen.

$\therefore 0.690 g$ of water will contain hydrogen

$ =\frac{2 g}{18 g} \times 0.690 $

$=0.0767 g$

Since carbon and hydrogen are the only constituents of the compound, the total mass of the compound is:

$=0.9217 g+0.0767 g$

$=0.9984 g$

$\therefore$ Percent of $C$ in the compound

$ =\frac{0.9217 g}{0.9984 g} \times 100 $

$=92.32 %$

Percent of $H$ in the compound

$ =\frac{0.0767 g}{0.9984 g} \times 100 $

$=7.68 %$

Moles of carbon in the compound $=\frac{92.32}{12.00}$ $=7.69$

Moles of hydrogen in the compound $=\frac{7.68}{1}$

$=7.68$

$\therefore$ Ratio of carbon to hydrogen in the compound $=7.69: 7.68$

$=1: 1$

Hence, the empirical formula of the gas is $CH$.

(ii) Given,

Weight of 10.0L of the gas (at S.T.P) $=11.6 g$

$\therefore$ Weight of $22.4 L$ of gas at STP

$ =\frac{11.6 g}{10.0 L} \times 22.4 L $

$=25.984 g$

Hence, the molar mass of the gas is $26 g$.

(iii) Empirical formula mass of $CH=12+1=13 g$

$ \begin{aligned} n & =\frac{\text{ Molar mass of gas }}{\text{ Empirical formula mass of gas }} \\ & =\frac{26 g}{13 g} \\ n & =2 \\ \therefore & \text{ Molecular formula of gas }=(CH) _{n} \\ = & C_2 H_2 \end{aligned} $

1.35 Calcium carbonate reacts with aqueous $\mathrm{HCl}$ to give $\mathrm{CaCl}_2$ and $\mathrm{CO}_2$ according to the reaction, $\mathrm{CaCO}_3(\mathrm{~s})+2 \mathrm{HCl}(\mathrm{aq}) \rightarrow \mathrm{CaCl}_2(\mathrm{aq})+\mathrm{CO}_2(\mathrm{~g})+\mathrm{H}_2 \mathrm{O}(\mathrm{l})$

What mass of $\mathrm{CaCO}_3$ is required to react completely with $25 \mathrm{~mL}$ of $0.75 \mathrm{M} \mathrm{HCl}$ ?

Show Answer

Answer

$0.75 M$ of $HCl \tilde{A} \not c {\hat{a}} €^{\circ} \hat{A_i} 0.75 mol$ of $HCl$ are present in $1 L$ of water

$ \tilde{A} \not c \hat{a} € \hat{A}_i [(0.75 , \text{mol}) \times (36.5 , \text{g mol}^{\hat{a} €-1})] HCl$ is present in $1 L$ of water

$\tilde{A} \not c \hat{a} € \hat{A}_i 27.375 g$ of $HCl$ is present in $1 L$ of water

Thus, $1000 mL$ of solution contains $27.375 g$ of $HCl$.

$\therefore$ Amount of $HCl$ present in $25 mL$ of solution

$=\frac{27.375 g}{1000 mL} \times 25 mL$

$=0.6844 g$

From the given chemical equation,

$ CaCO _{3(s)}+2 HCl _{(a q)} \longrightarrow CaCl _{2(a q)}+CO _{2(g)}+H_2 O _{(l)} $

$2 mol$ of $HCl(2 \times 36.5=71 g)$ react with $1 mol$ of $CaCO_3(100 g)$.

$\therefore$ Amount of $CaCO_3$ that will react with $0.6844 g$

$ =\frac{100}{71} \times 0.6844 g $

$=0.9639 g$

1.36 Chlorine is prepared in the laboratory by treating manganese dioxide $\left(\mathrm{MnO}_{2}\right)$ with aqueous hydrochloric acid according to the reaction

$4 \mathrm{HCl}(\mathrm{aq})+\mathrm{MnO}_2(\mathrm{~s}) \rightarrow 2 \mathrm{H}_2 \mathrm{O}(\mathrm{l})+\mathrm{MnCl}_2(\mathrm{aq})+\mathrm{Cl}_2(\mathrm{~g})$

How many grams of $\mathrm{HCl}$ react with $5.0 \mathrm{~g}$ of manganese dioxide?

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Answer

$1 mol[55+2 \times 16=87 g] MnO_2$ reacts completely with $4 mol[4 \times 36.5=146 g]$ of $HCl$.

$\therefore 5.0 g$ of $MnO_2$ will react with

$=\frac{146 g}{87 g} \times 5.0 g$

of $HCl$ $=8.4 g$ of $HCl$

Hence, $8.4 g$ of $HCl$ will react completely with $5.0 g$ of manganese dioxide.