Answer:
[tex]V_{CO_2}=1.55x10^{5}LCO_2=155m^3CO_2[/tex]
Explanation:
Hello,
In this case, given the reaction:
[tex]2 C_8H_{18}(l) + 25 O_2(g)\rightarrow 16 CO_2(g) + 18 H_2O(g)[/tex]
The total consumed gallons are computed by considering 686 miles were driven and the consumption is 21.2 miles per gallon, thus:
[tex]V_{C_8H_{18}}=686miles*\frac{1gal}{21.2miles} =32.4gal[/tex]
Hence, with the given density, one could compute the consumed grams and consequently moles of gasoline as well as moles that were consumed:
[tex]n_{C_8H_{18}}=32.4gal*\frac{3785.41cm^3}{1gal} *\frac{0.805g}{1cm^3} *\frac{1mol}{114g}=864.95mol C_8H_{18}[/tex]
Next, since gasoline (molar mass = 114 is in a 2:16 molar relationship with the yielded carbon dioxide, we compute its produced moles as shown below:
[tex]n_{CO_2}=864.95mol C_8H_{18}*\frac{16molCO_2}{2molC_8H_{18}} =6919.6molCO_2[/tex]
Finally, we could assume the given STP conditions to compute the volume of carbon dioxide, as no more information regarding the space wherein the carbon dioxide is available:
[tex]V_{CO_2}=\frac{n_{CO_2}RT}{P} =\frac{6919.6mol*0.082\frac{atm*L}{mol*K}*(0+273)K}{1atm} \\\\V_{CO_2}=1.55x10^{5}LCO_2=155m^3CO_2[/tex]
Best regards.
