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#### Page No 152:

#### Question 5.1:

What
will be the minimum pressure required to compress 500 dm^{3}
of air at 1 bar to 200 dm^{3}
at 30°C?

#### Answer:

Given,

Initial
pressure, *p*_{1}
= 1 bar

Initial
volume, *V*_{1}
= 500 dm^{3}

Final
volume, *V*_{2}
= 200 dm^{3}

Since
the temperature remains constant, the final pressure (*p*_{2})
can be calculated using Boyle’s law.

According to Boyle’s law,

Therefore, the minimum pressure required is 2.5 bar.

#### Page No 153:

#### Question 5.2:

A vessel of 120 mL capacity contains a certain amount of gas at 35 °C and 1.2 bar pressure. The gas is transferred to another vessel of volume 180 mL at 35 °C. What would be its pressure?

#### Answer:

Given,

Initial
pressure, *p*_{1}
= 1.2 bar

Initial
volume, *V*_{1
}= 120 mL

Final
volume, *V*_{2}
= 180 mL

Since
the temperature remains constant, the final pressure (*p*_{2})
can be calculated using Boyle’s law.

According to Boyle’s law,

Therefore, the pressure would be 0.8 bar.

#### Page No 153:

#### Question 5.3:

Using
the equation of state *pV *=
*n*R*T*;
show that at a given temperature density
of a gas is proportional to gas pressure*p*.

#### Answer:

The equation of state is given by,

*pV* = *n*R*T* ……….. (i)

Where,

*p** → *Pressure of gas

*V* → Volume of gas

*n*→ Number of moles of gas

R → Gas constant

*T* → Temperature of gas

From equation (i) we have,

Replacing *n* with , we have

Where,

*m* → Mass of gas

*M* → Molar mass of gas

But, (*d* = density of gas)

Thus, from equation (ii), we have

Molar mass (*M*) of a gas is always constant and therefore, at constant temperature= constant.

Hence, at a given temperature, the density (*d*) of gas is proportional to its pressure (*p)*

#### Page No 153:

#### Question 5.4:

At 0°C, the density of a certain oxide of a gas at 2 bar is same as that of dinitrogen at 5 bar. What is the molecular mass of the oxide?

#### Answer:

Density
(d) of the substance at temperature (*T*)
can be given by the expression,

*d*
=

Now,
density of oxide (*d*_{1})
is given by,

Where,
*M*_{1}
and *p*_{1}
are the mass and pressure of the oxide respectively.

Density
of dinitrogen gas (*d*_{2})
is given by,

Where,
*M*_{2}
and *p*_{2}
are the mass and pressure of the oxide respectively.

According to the given question,

Molecular
mass of nitrogen, *M*_{2}
= 28 g/mol

Hence, the molecular mass of the oxide is 70 g/mol.

#### Page No 153:

#### Question 5.5:

Pressure of 1 g of an ideal gas A at 27 °C is found to be 2 bar. When 2 g of another ideal gas B is introduced in the same flask at same temperature the pressure becomes 3 bar. Find a relationship between their molecular masses.

#### Answer:

For ideal gas A, the ideal gas equation is given by,

Where,
*p*_{A}
and *n*_{A}
represent the pressure and number of moles of gas A.

For ideal gas B, the ideal gas equation is given by,

Where,
*p*_{B
}and *n*_{B}
represent the pressure and number of moles of gas B.

[*V*
and *T* are constants for gases A and B]

From equation (i), we have

From equation (ii), we have

Where,
M_{A }and M_{B} are the molecular masses of gases A
and B respectively.

Now, from equations (iii) and (iv), we have

Given,

(Since total pressure is 3 bar)

Substituting these values in equation (v), we have

Thus, a relationship between the molecular masses of A and B is given by

.

#### Page No 153:

#### Question 5.6:

The drain cleaner, Drainex contains small bits of aluminum which react with caustic soda to produce dihydrogen. What volume of dihydrogen at 20 °C and one bar will be released when 0.15g of aluminum reacts?

#### Answer:

The reaction of aluminium with caustic soda can be represented as:

At
STP (273.15 K and 1 atm), 54 g (2 ×
27 g) of Al gives 3 ×
22400 mL of H_{2..}

0.15 g Al gives
i.e.,
186.67 mL of H_{2.}

At STP,

Let
the volume of dihydrogen be
at *p*_{2}
= 0.987 atm (since 1 bar = 0.987 atm) and *T*_{2}
= 20°C
= (273.15 + 20) K = 293.15 K._{.}

Therefore, 203 mL of dihydrogen will be released.

#### Page No 153:

#### Question 5.7:

What will be the pressure exerted by a mixture of 3.2 g of methane and 4.4 g of carbon dioxide contained in a 9 dm^{3} flask at 27 °C ?

#### Answer:

It is known that,

For methane (CH_{4}),

For carbon dioxide (CO_{2}),

Total pressure exerted by the mixture can be obtained as:

Hence, the total pressure exerted by the mixture is 8.314** **× 10^{4} Pa.

#### Page No 153:

#### Question 5.8:

What will be the pressure of the gaseous mixture when 0.5 L of H_{2} at 0.8 bar and 2.0 L of dioxygen at 0.7 bar are introduced in a 1L vessel at 27°C?

#### Answer:

Let the partial pressure of H_{2} in the vessel be.

Now,

= ?

It is known that,

Now, let the partial pressure of O_{2} in the vessel be.

${}\phantom{\rule{0ex}{0ex}}{{\mathrm{p}}}_{1}{{\mathrm{V}}}_{1}{=}{{\mathrm{p}}}_{2}{{\mathrm{V}}}_{2}\phantom{\rule{0ex}{0ex}}{\Rightarrow}{{\mathrm{p}}}_{2}{=}\frac{{\mathrm{p}}_{1}{\mathrm{V}}_{1}}{{\mathrm{V}}_{2}}\phantom{\rule{0ex}{0ex}}{\Rightarrow}{{\mathrm{p}}}_{{\mathrm{O}}_{2}}{=}\frac{0.7\times 2.0}{1}{=}{}{1}{.}{4}{}{\mathrm{bar}}\phantom{\rule{0ex}{0ex}}$

Total pressure of the gas mixture in the vessel can be obtained as:

Hence, the total pressure of the gaseous mixture in the vessel is.

#### Page No 153:

#### Question 5.9:

Density of a gas is found to be 5.46 g/dm^{3} at 27 °C at 2 bar pressure. What will be its density at STP?

#### Answer:

Given,

The density (*d*_{2}) of the gas at STP can be calculated using the equation,

Hence, the density of the gas at STP will be 3 g dm^{–3}.

#### Page No 153:

#### Question 5.10:

34.05 mL of phosphorus vapour weighs 0.0625 g at 546 °C and 0.1 bar pressure. What is the molar mass of phosphorus?

#### Answer:

Given,

*p* = 0.1 bar

*V* = 34.05 mL = 34.05 × 10^{–3} L = 34.05 × 10^{–3} dm^{3}

R = 0.083 bar dm^{3} K^{–1} mol^{–1}

*T* = 546°C = (546 + 273) K = 819 K

The number of moles (*n*) can be calculated using the ideal gas equation as:

Therefore, molar mass of phosphorus = 1247.5 g mol^{–1}

Hence, the molar mass of phosphorus is 1247.5 g mol^{–1}.

#### Page No 153:

#### Question 5.11:

A student forgot to add the reaction mixture to the round bottomed flask at 27 °C but instead he/she placed the flask on the flame. After a lapse of time, he realized his mistake, and using a pyrometer he found the temperature of the flask was 477 °C. What fraction of air would have been expelled out?

#### Answer:

Let the volume of the round bottomed flask be *V.*

Then, the volume of air inside the flask at 27° C is *V.*

Now,

*V*_{1} = *V*

*T*_{1} = 27°C = 300 K

*V*_{2} =?

*T*_{2} = 477° C = 750 K

According to Charles’s law,

Therefore, volume of air expelled out = 2.5 *V* – *V* = 1.5 *V*

Hence, fraction of air expelled out

#### Page No 153:

#### Question 5.12:

Calculate
the temperature of 4.0 mol of a gas occupying 5 dm^{3
}at 3.32 bar.

(R
= 0.083 bar dm^{3}
K^{–1}
mol^{–1}).

#### Answer:

Given,

*n*
= 4.0 mol

*V*
= 5 dm^{3}

*p*
= 3.32 bar

R
= 0.083 bar dm^{3}
K^{–1}
mol^{–1}

The temperature (T) can be calculated using the ideal gas equation as:

Hence, the required temperature is 50 K.

#### Page No 153:

#### Question 5.13:

Calculate the total number of electrons present in 1.4 g of dinitrogen gas.

#### Answer:

Molar mass of dinitrogen (N_{2}) = 28 g mol^{–1}

Thus, 1.4 g of

Now, 1 molecule of contains 14 electrons.

Therefore, 3.01 × 10^{23} molecules of N_{2} contains = 1.4 × 3.01 × 10^{23}

= 4.214 × 10^{23} electrons

#### Page No 153:

#### Question 5.14:

How much time would it take to distribute one Avogadro number of wheat grains, if 10^{10} grains are distributed each second?

#### Answer:

Avogadro number = 6.02 × 10^{23}

Thus, time required

=

Hence, the time taken would be.

#### Page No 153:

#### Question 5.15:

Calculate the total pressure in a mixture of 8 g of dioxygen and 4 g of dihydrogen confined in a vessel of 1 dm^{3} at 27°C. R = 0.083 bar dm^{3} K^{–}^{1} mol^{–}^{1.}

#### Answer:

Given,

Mass
of dioxygen (O_{2}) = 8 g

Thus, number of moles of

Mass
of dihydrogen (H_{2}) = 4 g

Thus, number of moles of

Therefore, total number of moles in the mixture = 0.25 + 2 = 2.25 mole

Given,

*V*
= 1 dm^{3}

*n*
= 2.25 mol

R
= 0.083 bar dm^{3} K^{–1} mol^{–1}

*T*
= 27°C = 300 K

Total
pressure (*p*) can be calculated as:

*pV*
=* n*R*T*

Hence, the total pressure of the mixture is 56.025 bar.

#### Page No 153:

#### Question 5.16:

Pay load is defined as the difference between the mass of displaced air and the mass of the balloon. Calculate the pay load when a balloon of radius 10 m, mass 100 kg is filled with helium at 1.66 bar at 27°C. (Density of air = 1.2 kg m^{–}^{3} and R = 0.083 bar dm^{3} K^{–}^{1} mol^{–}^{1}).

#### Answer:

Given,

Radius of the balloon, *r* = 10 m

Volume of the balloon

Thus, the volume of the displaced air is 4190.5 m^{3}.

Given,

Density of air = 1.2 kg m^{–3}

Then, mass of displaced air = 4190.5 × 1.2 kg

= 5028.6 kg

Now, mass of helium (*m*) inside the balloon is given by,

Now, total mass of the balloon filled with helium = (100 + 1117.5) kg

= 1217.5 kg

Hence, pay load = (5028.6 – 1217.5) kg

= 3811.1 kg

Hence, the pay load of the balloon is 3811.1 kg.

#### Page No 153:

#### Question 5.17:

Calculate
the volume occupied by 8.8 g of CO_{2}
at 31.1°C and 1 bar pressure.

R
= 0.083 bar L K^{–1}
mol^{–1}.

#### Answer:

It is known that,

Here,

*m*
= 8.8 g

R
= 0.083 bar LK^{–1}
mol^{–1}

*T*
= 31.1°C
= 304.1 K

*M*
= 44 g

*p*
= 1 bar

Hence, the volume occupied is 5.05 L.

#### Page No 153:

#### Question 5.18:

2.9 g of a gas at 95 °C occupied the same volume as 0.184 g of dihydrogen at 17 °C, at the same pressure. What is the molar mass of the gas?

#### Answer:

Volume
(*V*)
occupied by dihydrogen is given by,

Let
M be the molar mass of the unknown gas. Volume (*V*)
occupied by the unknown gas can be calculated as:

According to the question,

Hence,
the molar mass of the gas is 40 g mol^{–1}.

#### Page No 153:

#### Question 5.19:

A mixture of dihydrogen and dioxygen at one bar pressure contains 20% by weight of dihydrogen. Calculate the partial pressure of dihydrogen.

#### Answer:

Let the weight of dihydrogen be 20 g and the weight of dioxygen be 80 g.

Then, the number of moles of dihydrogen, and the number of moles of dioxygen, .

Given,

Total pressure of the mixture, *p*_{total }= 1 bar

Then, partial pressure of dihydrogen,

Hence, the partial pressure of dihydrogen is.

#### Page No 153:

#### Question 5.20:

What
would be the SI unit for the quantity *pV*^{2}*T
*^{2}/*n?*

#### Answer:

The
SI unit for pressure, *p*
is Nm^{–2}.

The
SI unit for volume, *V*
is m^{3.}

The
SI unit for temperature, *T*
is K.

The
SI unit for the number of moles, *n *is
mol.

Therefore, the SI unit for quantity is given by,

#### Page No 153:

#### Question 5.21:

In terms of Charles’ law explain why –273°C is the lowest possible temperature.

#### Answer:

Charles’ law states that at constant pressure, the volume of a fixed mass of gas is directly proportional to its absolute temperature.

It was found that for all gases (at any given pressure), the plots of volume vs. temperature (in °C) is a straight line. If this line is extended to zero volume, then it intersects the temperature-axis at – 273°C. In other words, the volume of any gas at –273°C is zero. This is because all gases get liquefied before reaching a temperature of – 273°C. Hence, it can be concluded that – 273°C is the lowest possible temperature.

#### Page No 153:

#### Question 5.22:

Critical temperature for carbon dioxide and methane are 31.1 °C and –81.9 °C respectively. Which of these has stronger intermolecular forces and why?

#### Answer:

Higher
is the critical temperature of a gas, easier is its liquefaction.
This means that the intermolecular forces of attraction between the
molecules of a gas are directly proportional to its critical
temperature. Hence, intermolecular forces of attraction are stronger
in the case of CO_{2}.

#### Page No 153:

#### Question 5.23:

Explain the physical significance of Van der Waals parameters.

#### Answer:

**Physical
significance of ‘a’:**

‘a’ is a measure of the magnitude of intermolecular attractive forces within a gas.

**Physical
significance of ‘b’:**

‘b’ is a measure of the volume of a gas molecule.

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