Kinetic Theory Test

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Kinetic Theory Test - 63

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Question 1
1 / -0

If the temperature of the gas becomes three times the initial absolute temperature, speed of the gas molecules

A
Becomes $$\dfrac{1}{ 3}$$ times the initial ms speed

B
Becomes $$\dfrac{1}{\sqrt { 3 }}$$ times the initial rms speed

C
Becomes $$\sqrt { 3 }$$ times times the initial ms speed

D
Becomes 3 times the initial rms speed

Solution
Question 2
1 / -0

Find the amount of work done to increase the temperature of 1 mol of an ideal gas by $$30 ^ { \circ } { C }$$ if it is expanding under the condition $$V \propto T ^ { 2 / 3 }$$ .

A
$$166.2$$ $${ J }$$

B
$$136.2$$ $${ J }$$

C
$$126.2$$ $${ J }$$

D
None of these

Solution
Question 3
1 / -0

An ideal gas is expanding such that $$P T ^ { 2 } =$$ constant. The coefficient of volume expansion of the gas is

A
$$\dfrac{1}{T}$$

B
$$\dfrac{2}{T}$$

C
$$\dfrac{3}{T}$$

D
$$\dfrac{4}{T}$$

Solution

Correct Answer: Option C

Hint: Using ideal gas equation rearrange the given equation and then differentiate.
Where P - Pressure, T - Temperature

Consider the ideal gas equation and substitute the value of pressure in the given equation.

Explanation of Correct Option:

Step 1: Consider the formulas mentioned

Expression of is given by,

Volume expansion can be expressed as:

$$V={{V}_{0}}(1+\gamma t)$$

Where V is the volume at temperature t

$${{V}_{0}}$$ Is the volume at temperature t = 0

$$\gamma $$ is the coefficient of volume expansion and t is temperature.

Step 2: Consider the ideal gas expansion

Ideal gas is expansion is given as

$$P{{T}^{2}}=\text{constant}$$….. (1)

Step 3: Consider the ideal gas equation,

$$PV=nRT $$

$$\dfrac{PV}{T}=\text{constant}$$

$$P=\dfrac{\text{constant}\times T}{V}......\left( 2 \right)$$

Coefficient of volume expansion can be calculated by the values of gas denoted by $$\gamma$$

Step 4: Coefficient of volume expansion of gas is given by

$$V={{V}_{0}}(1+\gamma t).......\left( 3 \right)$$

Substitute the equation (2) in equation (1),

$$\dfrac{\text{constant}\times T}{V}\times {{T}^{2}}=\text{constant}$$

$$ \dfrac{{{T}^{3}}}{V}=\text{constant=k}$$

$$ V=\dfrac{1}{k}{{T}^{3}}={{k}^{1}}{{T}^{3}}.....\left( 4 \right)\text{ }\left( \because {{k}^{1}}=\dfrac{1}{k} \right)$$

Step 5: Differentiate equation (3) with respect to t

On differentiating with respect to t

$$ \dfrac{dV}{dt}={{V}_{0}}(\gamma .1) $$

$$\dfrac{dV}{dt}={{V}_{0}}\gamma .......\left( 5 \right) $$

Dedifferentiate equation (4) with respect to T,

$$\dfrac{dV}{dT}={{k}^{1}}3{{T}^{2}}$$

Put values of $${{k}^{1}}$$ from equation (4)

$$ \dfrac{dV}{dT}=\dfrac{V}{{{T}^{3}}}\times 3{{T}^{2}} $$

$$\dfrac{dV}{dT}=\dfrac{3V}{T} $$

$$\therefore \dfrac{dV}{V}=3\dfrac{dT}{T} $$

$$dV=\dfrac{3}{T}VdT......(6)$$

Volume expansion is given by,

$$\Delta V=\gamma {{V}_{0}}\Delta T......\left( 7 \right)$$

Step 6: Compare the equations (6) and (7)

$$dV=\Delta V$$

$$\dfrac{3}{T}VdT = \gamma {{V}_{0}}\Delta T......\left( 7 \right)$$

$$\gamma =\dfrac{3}{T}$$

Hence the coefficient of volume expansion of the gas is $$\gamma =\dfrac{3}{T}$$.
Question 4
1 / -0

2 moles of an ideal monoatomic gas at temperature $$T_0$$ is mixed wth 4 moles of another ideal monoatomic gas at temperature $$2T_0$$ then the temperature of the mixture is:

A
$$\frac{5}{3} T_0$$

B
$$\frac{3}{2} T_0$$

C
$$\frac{4}{3} T_0$$

D
$$\frac{5}{4} T_0$$

Solution
Question 5
1 / -0

The translational kinetic energy of molecules of one mole of a mono atomic gas is $$U=\dfrac{3NKT}2$$. The value of atomic specific heat of gas under constant pressure will be

A

$$\dfrac32 R$$

B
$$\dfrac52 R$$

C
$$\dfrac72 R$$

D
$$\dfrac92 R$$

Solution
Question 6
1 / -0

A sample of gas is at $$0 ^ { \circ } \mathrm { C }$$.The temperature at which its rms speed of the molecules will be doubled is

A
$$103 ^ { \circ } \mathrm { C }$$

B
$$273 ^ { \circ } \mathrm { C }$$

C
$$723 ^ { \circ } \mathrm { C }$$

D
$$819 ^ { \circ } \mathrm { C }$$
Question 7
1 / -0

Average kinetic energy per mole if an monoatomic ideal gas at

A
$$5.8\times { 10 }^{ -2 }\quad J$$

B
$$9.5\times { 10 }^{ -2 }\quad J$$

C
$$5.6\times { 10 }^{ -2 }\quad J$$

D
$$12.47 J$$
Question 8
1 / -0

An ideal gas is initially at $$ P_{l}, V_{1} $$ is expanded to $$ P_{2}, V_{2} $$ and then compressed adiabatically to the same volume $$ V_{l} $$ and pressure $$ P_{3} $$.If W is the net work done by the gas in complete process which of the

A
$$
W>0 ; P_{3}>P_{1}
$$

B
$$
W<0 ; P_{3}>P_{1}
$$

C
$$W<0;{P_3}$$

D
$$P_{2}>P_{1}$$;$$W<0$$

Solution

Hence, option $$(D)$$ is correct answer.
Question 9
1 / -0

When a certain amount of ethylene was burnt $$6226$$ kJ heat was evolved. If heat of combustion of ethylene is $$1411$$ kJ/mol the volume of $$O_2$$ ( at NTP) that entered into the reaction is

A
$$296.5 $$ mL

B
$$296.5$$ litre

C
$$6226 \times 22.4 $$ litre

D
$$22.4$$ litre

Solution
Question 10
1 / -0

The temperature of a gas is $$-{ 68 }^{ \circ }C$$ At what temperature will the average kinetic energy of its molecules be twice that of $$-{ 68 }^{ \circ }C$$ ?

A
$$137^{ \circ }C$$

B
$$127^{ \circ }C$$

C
$$100^{ \circ }C$$

D
$$105^{ \circ }C$$

Solution