Answer:
[tex]m_{KClO_3}=64.4gKClO_3[/tex]
Explanation:
Hello,
At first, the undergoing chemical reaction is:
[tex]2KClO_3(s)-->2KCl(s)+3O_2(s)[/tex]
As 15.0 L of oxygen were produced, one computes this amount in moles considering STP conditions (0°C and 1 atm) for the ideal gas equation as shown below:
[tex]n_{O_2}=\frac{PV}{RT} =\frac{1atm*15.0L}{0.082 \frac{atm*L}{mol*K} *273.15K}=0.670molO_2[/tex]
Now, since those moles are the actual obtained moles, one computes the theoretical moles of oxygen which are more precisely associated with the needed grams of potassium chlorate as follows:
[tex]n_{O_2}^{Theoretical}=\frac{0.670molO_2}{0.85} =0.788molO_2[/tex]
Finally, we apply the stoichiometry to determine the moles of potassium chlorate as shown below:
[tex]m_{KClO_3}=0.788molO_2*\frac{2molKClO_3}{3molO_2} *\frac{122.55gKClO_3}{1molKClO_3} \\m_{KClO_3}=64.4gKClO_3[/tex]
Best regards.
