The fraction of molecular volume to the actual volume occupied by oxygen gas at STP is: (Take the diameter of an oxygen molecule to be 3 Å).
1. 4 × 10−4
2. 5 × 10−4
3. 3 × 10−4
4. 1 × 10−4
Molar volume is the volume occupied by 1 mol of any (ideal) gas at standard temperature and pressure is:
(STP: \(1\) atmospheric pressure, \(0^\circ \text{C}\))
1. \(0\)
2. \(22.4\) litres
3. \(11.2\) litres
4. \(1\) litres
The figure shows a plot of \(\frac{PV}{T}\) versus \(P\) for \(1.00\times10^{-3} \) kg of oxygen gas at two different temperatures.
Then relation between \(T_1\) and \(T_2\) is:
1. \(T_1=T_2\)
2. \(T_1<T_2\)
3. \(T_1>T_2\)
4. \(T_1 \geq T_2\)
The figure shows a plot of PV/T versus P for of oxygen gas at two different temperatures.
The value of PV/T where the curves meet on the y-axis is:
An oxygen cylinder of volume 30 litres has an initial gauge pressure of 15 atm and a temperature of 27 °C. After some oxygen is withdrawn from the cylinder, the gauge pressure drops to 11 atm, and its temperature drops to 17 °C. The mass of oxygen taken out of the cylinder is:
1. 0.14 kg
2. 0.16 kg
3. 0.18 kg
4. 0.21 kg
An air bubble of volume 1.0 rises from the bottom of a lake 40 m deep at a temperature of 12 °C. To what volume does it grow when it reaches the surface, which is at a temperature of 35 °C?
1. 5.3 cm3
2. 4.0 cm3
3. 3.7 cm3
4. 4.9 cm3
What is the total number of air molecules (inclusive of oxygen, nitrogen, water vapor, and other constituents) in a room of capacity \(25.0\) m3 at a temperature of \(27^\circ \mathrm C\) and \(1\) atm pressure?
1. | \(6.1\times10^{23}\) molecules |
2. | \(6.1\times10^{26}\) molecules |
3. | \(7.1\times10^{23}\) molecules |
4. | \(7.1\times10^{26}\) molecules |
What is the average thermal energy of a helium atom at room temperature (\(27^{\circ}\mathrm{C}\))?
1. | \(11 . 21 \times 10^{- 20} \text{J}\) | 2. | \(3 . 09 \times 10^{- 16} \text{J}\) |
3. | \( 6 . 21 \times 10^{- 21} \text{J} \) | 4. | \(5 . 97 \times 10^{- 19} \text{J}\) |
At what temperature is the root mean square speed of an atom in an argon gas cylinder equal to the rms speed of a helium gas atom at \(-20^\circ \mathrm{C}?\)
(Given the atomic mass of \(\text{Ar}=39.9~\text{u}\) and of \(\text{He}=4.0~\text{u}\)).
1. \(1.01 \times 10^3 ~\text{K} \)
2. \(3.15 \times 10^3 ~\text{K} \)
3. \(1.91 \times 10^3~ \text{K} \)
4. \(2.52 \times 10^3 ~\mathrm{K}\)
From a certain apparatus, the diffusion rate of hydrogen has an average value of 28.7 . The diffusion of another gas under the same conditions is measured to have an average rate of 7.2 . The unknown gas is:
1. Oxygen
2. Nitrogen
3. Helium
4. None of these