Answer:
94.58 g of [tex]H_2O[/tex]
Explanation:
For this question we have to start with the reaction:
[tex]H_2~+~O_2~->~H_2O[/tex]
Now, we can balance the reaction:
[tex]2H_2~+~O_2~->~2H_2O[/tex]
We have the amount of [tex]H_2[/tex] and the amount of [tex]O_2[/tex] . Therefore we have to find the limiting reactive, for this, we have to follow a few steps.
1) Find the moles of each reactive, using the molar mass of each compound ([tex]H_2~=~2~g/mol~~O_2=~32~g/mol[/tex] ).
2) Divide by the coefficient of each compound in the balanced reaction ("2" for [tex]H_2[/tex] and "1" for [tex]O_2[/tex]).
Find the moles of each reactive
[tex]32.0~g~H_2\frac{1~mol~H_2}{2~g~of~H_2}=15.87~mol~H_2[/tex]
[tex]84.0~g~of~O_2\frac{1~mol~of~O_2}{32~g~of~O_2}=2.62~mol~of~O_2[/tex]
Divide by the coefficient
[tex]\frac{15.87~mol~H_2}{2}=7.94[/tex]
[tex]\frac{2.62~mol~of~O_2}{1}=2.62[/tex]
The smallest values are for [tex]H_2[/tex], so hydrogen is the limiting reagent. Now, we can do the calculation for the amount of water:
[tex]32.0~g~H_2\frac{1~mol~H_2}{2~g~of~H_2}\frac{2~mol~H_2O}{2~mol~H_2}\frac{18~g~H_2O}{1~mol~H_2O}=94.58~g~H_2O[/tex]
We have to remember that the molar ratio between [tex]H_2O[/tex] and [tex]H_2[/tex] is 2:2 and the molar mass of [tex]H_2O[/tex] is 18 g/mol.
