24.4 cm.
HCl and NH₃ reacts to form NH₄Cl immediately after coming into contact. Where NH₄Cl is found is the place the two gases ran into each other. To figure out where the two gases came into contact, you'll need to know how fast they move relative to each other.
The speed of a HCl or NH₃ molecule depends on its kinetic energy.
[tex]E_\text{k} = 1/2 \; m \cdot v^{2}[/tex]
Where
Besides, the kinetic theory of gases suggests that for an ideal gas,
[tex]E_\text{k} \propto T[/tex]
where [tex]\text{T}[/tex] its temperature in degrees kelvins. The two quantities are directly proportional to each other. In other words, the average kinetic energy of molecules shall be the same for any ideal gas at the same temperature. So is the case for HCl and NH₃
[tex]E_\text{k} (\text{HCl}) = E_\text{k} (\text{NH}_3)[/tex]
[tex]m(\text{HCl}) \cdot v^{2}(\text{HCl}) = E_\text{k} (\text{HCl}) = E_\text{k} (\text{NH}_3) = m(\text{NH}_3) \cdot v^{2}(\text{NH}_3)[/tex]
Where
The ratio between the mass of an HCl molecule and a NH₃ molecule equals to the ratio between their molar mass. HCl has a molar mass of 35.45; NH₃ has a molar mass of 17.03. As a result, [tex]m(\text{HCl}) = 36.45 / 17.03 \; m(\text{NH}_3)[/tex]. Therefore:
[tex]36.45 /17.03\; m(\text{NH}_3) \cdot v^{2}(\text{HCl}) = m(\text{HCl}) \cdot v^{2}(\text{HCl}) = m(\text{NH}_3) \cdot v^{2}(\text{NH}_3)[/tex]
[tex]36.45 /17.03\; v^{2}(\text{HCl}) = v^{2}(\text{NH}_3)[/tex]
[tex]\sqrt{36.45 /17.03}\; v(\text{HCl}) = v(\text{NH}_3)[/tex]
The average speed NH₃ molecules would be [tex]\sqrt{36.45/17.03} \approx 1.463[/tex] if the average speed of HCl molecules [tex]v(\text{HCl})[/tex] is 1.
[tex]\text{Time before the two gases meet} = \frac{\text{Length of the Tube}}{v(\text{HCl}) + v(\text{NH}_3)}[/tex]
[tex]\text{Distance from the HCl end} = v(\text{HCl}) \times \text{Time before the two gases meet}\\\phantom{\text{Distance from the HCl end}} = v(\text{HCl}) \times \frac{ \text{Length of the Tube}}{v(\text{HCl}) + v(\text{NH}_3)}\\\phantom{\text{Distance from the HCl end}} = \frac{v(\text{HCl})}{v(\text{HCl}) + v(\text{NH}_3)} \times \text{Length of the Tube}\\\phantom{\text{Distance from the HCl end}} = \frac{1}{1 + 1.463} \times 60.0\; \text{cm} \\\phantom{\text{Distance from the HCl end}} = 24.4 \; \text{cm}[/tex]
