Answer : The final chamber pressure is 0.746 atm.
Explanation:
First we have to calculate the moles of [tex]KClO_3[/tex].
Molar mass of [tex]KClO_3[/tex] = 122.5 g/mole
[tex]\text{ Moles of }KClO_3=\frac{\text{ Mass of }KClO_3}{\text{ Molar mass of }KClO_3}=\frac{2.00g}{122.5g/mole}=0.0163moles[/tex]
Now we have to calculate the moles of [tex]O_2[/tex].
The balanced chemical reaction will be:
[tex]2KClO_3\rightarrow 2KCl+3O_2[/tex]
From the balanced reaction we conclude that,
As, 2 moles of [tex]KClO_3[/tex] react to give 3 moles of [tex]O_2[/tex]
So, 0.0163 moles of [tex]KClO_3[/tex] react to give [tex]\frac{3}{2}\times 0.0163=0.0244[/tex] moles of [tex]O_2[/tex]
Now we have to calculate the pressure of gas.
Using ideal gas equation:
[tex]PV=nRT[/tex]
where,
P = pressure of gas = ?
V = volume of gas = 0.800 L
T = temperature of gas = [tex]25.0^oC=273+25.0=298K[/tex]
R = gas constant = 0.0821 L.atm/mole.K
n = number of moles of gas = 0.0244 mole
Now put all the given values in the ideal gas equation, we get:
[tex]P\times (0.800L)=0.0244mole\times (0.0821L.atm/mole.K)\times (298K)[/tex]
[tex]P=0.746atm[/tex]
Therefore, the final chamber pressure is 0.746 atm.